MATHEMATICS NOTES: TOPICAL MATHS ASSIGNMENTS F1-4 WITH ANSWERS

ASSIGNMENTS ARRANGED TOPICALLY F1-4

FORM 1

NUMBERS

PAST KCSE QUESTIONS ON THE TOPIC

  1. Mogaka and Onduso together can do a piece of work in 6 days. Mogaka, working alone, takes 5 days longer than Onduso. How many days does it take Onduso to do the same work alone?
  2.  (a)       Evaluate

-8 ¸2 + 12 x 9-4 x 6

56 ¸ 7 x 2

(b)        Simplify the expression

5a – 4b – 2(a-(`2b+c)

  1. Evaluate

28-(-18) 15 –(-2)(-6)

-2                 3

  1. Three people Odawa, Mliwa and Amina contributed money to purchase a flour mill. Odawa contributed 1/3 of the total amount, Mliwa contributed 3/8 of the remaining amount and Amina contributed the rest of the money. The difference in contribution between Mliwa and Amina was Kshs 40000. Calculate the price of the flour mill.
  2. Evaluate:

-12 ¸(-3) x 4 – (-20)

-6 x 6 ¸ 3 + (-6)

  1. Without using logarithm tables or a calculator evaluate.

 

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384.16 x 0.0625

96.04

 

  1. Evaluate without  using mathematical table

 

 

1000          0.0128

200

  1. Express the numbers 1470 and 7056, each as a product of its prime factors.

Hence evaluate:           14702

7056

Leaving the answer in prime factor form

  1. Evaluate:

¾ + 1 5/7 ¸ 4/7 of 2 1/3

(1 3/75/8) x 2/3

  1. Pipes A can fill an empty water tank in 3 hours while pipe B can fill the same tank in 6 hours. When the tank is full it can be emptied by pipe C in 8 hours. Pipe A and B are opened at the same time when the tank is empty. If one hour later, pipe C is also opened, find the total time taken to fill the tank.
  2. In a fund- raising committee of 45 people the ratio of men to women 7.2. Find the number of women  required to join  the existing  committee  so that the ratio of men to women is changes to 5:4
  3. Without  using mathematical tables or calculators, evaluate

 

 

675 x 135

2025

  1. All prime numbers less than ten are arranged  in descending order to form a number

(a) Write down the number formed

(b) What is the total value of the second digit?

  1. Evaluate without using mathematical tables or a calculator 0.0084 x 1.23 x 3.5,

2.87 x 0.056

Expressing the answer as a fraction in its simplest form.

 

  1. Evaluate 1/3 of (2 ¾ – 5 ½ ) x 36/7 ¸ 9/4

 

  1. Evaluate without  using mathematical tables  or the calculator

(.0.0625 x 2. 56)

0.25 x 0.08 x 0.5

 

  1. Evaluate without using mathematical tables or the calculator

1.9 x 0.032

20 x 0.0038

  1. Evaluate 2 ¾ x 8/33

3 + (52/5 ¸9/25)

 

  1. Without using tables  or calculators evaluate

 

 

153 x 0.18

0.68 x 0.32

 

  1. Without using mathematical tables, evaluate

 

 

1.2 x     0.0324

0.0072

 

  1. Simplify 2/3 of 12 – (1 1/3 + 1 ¼ )

 

  1. If x= 2, Find the value of x3 – 5x2 – 4x + 3

 

  1. If X = ½ y= ¼ and z = 2/3 Find the value of

x + yz

y – xz

 

  1. Find a and b if 3.168 = 3a/b

 

  1. Find the greatest common factor of x8 y2 and 4xy4. Hence factorize completely the expression x3y2 – 4xy4

 

  1. A hot water tap can fill a bath in 5 minutes while a cold water tap can fill the same bath in 3 minutes. The drain pipe can empty the full bath in 3 ¾ minutes. The two taps  and the drain pipe are fully open for 1 ½ minutes  after which the drain  pipe  are fully open for 1 ½ minutes after which  the drain pipe is closed.  How much will take it take to fill the bath?

 

  1. A farmer distributed his cabbages as follows

A certain hospital received a quarter of the total number of bags.  A nearby school received half of the remainder. A green grocer received a third of what the school received. What remained were six bags more than what the green grocer received. How many bags of cabbages did the farmer have?

 

 

 

TOPIC 2

ALGEBRAIC EXPRESSIONS

PAST KCSE QUESTIONS ON THE TOPIC

  1. Given that y =    2x – z

x + 3z    express x in terms of y and z

  1. Simplify the expression

x – 1     –   2x + 1

x                3x

Hence solve the equation

x – 1     –    2x + 1   = 2

x                 3x         3

  1. Factorize a2 – b2

Hence find the exact value of 25572 – 25472

  1. Simplify    p2 – 2pq + q2

P3 – pq2 + p2 q –q3

  1. Given that y = 2x – z, express x in terms of y and z.

Four farmers took their goats to a market. Mohammed had two more goats as Koech had 3 times as many goats as Mohammed, whereas Odupoy had 10 goats less than both Mohammed and Koech.

(i)         Write a simplified algebraic expression with one variable, representing the total number of goats.

(ii)        Three butchers bought all the goats and shared them equally. If each butcher got 17 goats, how many did odupoy sell to the butchers?

  1. Factorize completely 3x2 – 2xy – y2
  2. Solve the equation

1  =  5  -7

4x    6x

  1. Simplify

  a        +             b

2(a+ b)             2(a-b)

 

  1. Factorize completely 28x2 + 3x -1
  2. Three years ago, Juma was three times as old. As Ali in two years time, the sum of their ages will be 62. Determine their ages
  3. Two pairs of trousers and three shirts cost a total of Kshs. Five such  pairs of trousers and two shirt cost a total of Kshs 810. Find the price of a pair of trouser and shirt.

 

 

TOPIC 3

RATES, RATIO PERCENTAGE AND PROPORTION

PAST KCSE QUESTIONS ON THE TOPIC

  1. Akinyi bought and beans from a wholesaler. She then mixed the maize and beans in the ratio 4:3 she bought the maize at Kshs 21 per kg and the beans 42 per kg. If she was to make a profit of 30%. What should be the selling price of 1 kg of the mixture?
  2. Water flows from a tap at the rate of 27 cm3 per second into a rectangular container of length 60 cm, breadth 30 cm and height 40 cm. If at 6.00 PM the container was half full, what will be the height of water at 6.04 pm?
  3. Two businessmen jointly bought a minibus which could ferry 25 paying passengers when full. The fare between two towns A and B was Kshs 80 per passenger for one way. The minibus made three round trips between the two towns daily. The cost of fuel was Kshs 1500 per day. The driver and the conductor were paid daily allowances of Kshs 200 and Kshs 150 respectively.

A further Kshs 4000 per day was set aside for maintenance, insurance and loan repayment.

(a)        (i)         How much  money was collected from the passengers that day?

(ii)        How much was the net profit?

(b)        On another day, the minibus was 80% full on the average for the three round trips, how much did each businessman get if the day’s profit was shared in the ratio 2:3?

  1. Wainaina has two dairy farms, A and B. Farm A produces milk with 3 ¼ percent fat and farm B produces milk with 4 ¼ percent fat.

(a)        Determine

(i)         The total mass of milk fat in 50 kg of milk from farm A and 30 kg of milk from farm B

(ii)        The percentage of fat in a mixture of 50kg of milk A and 30kg of milk from B

(b)        The range of values of mass of milk from farm B that must be used  in a 50kg mixture so that the mixture may  have at least 4 percent fat.

  1. In the year 2001, the price of a sofa set in a shop was Kshs 12,000

(a)        Calculate the amount of money received from the sales of 240 sofa sets that year.

(b)        (i)         In the year 2002 the price of each sofa set increased by 25% while

the number  of sets sold decreased by 10%. Calculate the percentage increase in the amount received from the sales

(ii)       If the end of year 2002, the price of each sofa set changed in the ratio 16: 15, calculate the price of each sofa set in the year 2003.

 

(c)        The number of sofa sets sold in the year 2003 was P% less than the number sold in the year 2001.

Calculate the value of P, given that the amounts received from sales if the two years were equal.

  1. A solution whose volume is 80 litres is made up of 40% of water and 60% of alcohol. When x litres of water is added, the percentage of alcohol drops to 40%.

(a)        Find the value of x

(b)        Thirty litres of water is added to the new solution. Calculate the percentage of alcohol in the resulting solution

(c)        If 5 litres of the solution in (b) above is added to 2 litres of the original solution, calculate in the simplest form, the ratio of water to that of alcohol in the resulting solution.

  1. Three business partners, Asha, Nangila and Cherop contributed Kshs 60,000, Kshs 85,000 and Kshs 105, 000 respectively. They agreed to put 25% of the profit back into business each year. They also agreed to put aside 40% of the remaining profit to cater for taxes and insurance. The rest of the profit would then be shared among the partners in the ratio of their contributions. At the end of the first year, the business realized a gross profit of Kshs 225, 000.

(a)        Calculate the amount of money Cherop received more than Asha at the end of the first year.

(b)        Nangila further invested Kshs 25,000 into the business at the beginning of the second year.  Given that the gross profit at the end of the second year increased in the ratio 10:9, calculate Nangila’s share of the profit at the end of the second year.

 

  1. Kipketer can cultivate a piece of land in 7 hrs while Wanjiku can do the same work in 5 hours. Find the time they would take to cultivate the piece of land when working together.

 

  1. Mogaka and Ondiso working together can do a piece of work in 6 days. Mogaka working alone, takes 5 days longer than Onduso. How many days does it take Onduso to do the work alone.

 

  1. A certain amount of money was shared among 3 children in the ratio 7:5:3 the largest share was Kshs 91. Find the

(a)        Total amount of money

(b)        Difference in the money received as the largest share and the smallest share.

 

 

 

 

 

 

 

TOPIC 4

MEASUREMENT

PAST KCSE QUESTIONS ON THE TOPIC

  1. The figure below shows a portable kennel

 

 

 

 

 

 

 

(a)        Calculate

(i)         The total surface area of the walls and the floor (include the door as part of the wall.

(ii)        The total surface area of the roof

(b)        The cost of roofing is Kshs 300 per square metre and that of making walls and floor Kshs 350 per square metre. Find the cost of making the kennel.

  1. The enclosed region shown in the figure below represents a ranch draw to scale. The actual area  of the ranch  is 1075 hectares

 

 

 

(a)        Estimate the area of the enclosed region in square centimeters

(b)        Calculate the linear scale used

  1. The figure below shows an octagon obtained by cutting off four congruent triangles from a rectangle  measuring 19.5 by 16.5 cm

 

 

 

 

 

 

 

 

 

Calculate the area of the octagon

  1. The length of a hollow cylindrical pipe is 6 metres. Its external diameter is 11cm and has a thickness of 1 cm. Calculate the, volume in cm3 of the materials used to make the pipe. Take π as 3.142.
  2. The area of rhombus is 60 cm2. Given that one of its diagonals is 15 cm long, calculate the perimeter of the rhombus.
  3. A cylindrical piece of wood of radius 4.2 cm and length 150 cm is cut lengthwise into two equal pieces.

Calculate the surface area of one piece

(Take π as 22/7)

  1. The diagram below (not drawn to scale) represents the cross section  of  a solid prism of height 8.0 cm

 

 

 

 

(a)        Calculate the volume of the prism

(b)        Given that the density of the prism is 5.75 g/cm3, calculate its mass in

grams

(c)        A second prism is similar to the first one but is made of different material. The volume of the second prism is 246.24 cm3

(i)         Calculate the area of cross section of the second prism

(ii)        Given the ratio of the mass of the first prism to the second is 2:5, find the density of the second prism.

  1. A square brass plate is 2 mm thick and has a mass of 1.05 kg.  The density of the brass is 8.4g/ cm3. Calculate the length of the plane in centimeters.
  2. Two cylindrical containers are similar. The larger one has internal cross- section area of 45cm2 and can hold 0.95 litres of liquid when full. The smaller container has internal cross- section area of 20cm2

(a)        Calculate the capacity of the smaller container

(b)        The larger container is filled with juice to a height of 13 cm. Juice is then drawn from it and empties into the smaller container until the depth of the juice in both containers are equal. Calculate the depth of juice in each container.

(c)        One fifth of the juice  in the larger container in part (b) above  is further drawn  and emptied into the smaller  container. Find the differences in the depths of the juice in the two containers.

 

  1. Pieces of soap are packed in a cuboid container measuring 36 cm by 24 cm by 18 cm. Each piece of soap is similar to the container. If the linear scale factor between the container and the soap is 1/6. Find the volume of each piece of soap.

 

  1. A cylindrical water tank is of diameter 7 metres and height 2.8 metres

(a)        Find the capacity of the water tank in litres

(b)        Six members of family use15 litres each per day. Each day 80 litres are used for cooking and washing. And a further 60 litres are wasted.

Find the number of complete days a full tank would last the family

(c)        Two members of the family were absent for 90 days. During the 90 days, wastage was reduced by 20% but cooking and washing remained the same.

Calculate the number of days a full tank would now last the family

 

  1. A company is to construct parking bay whose area is 135m2. It is to be covered with a concrete slab of uniform thickness of 0.15m. To make the slab cement, ballast and sand are to be mixed so that their masses are in the ratio 1:4:4 the mass of 1m3 of dry slab is 2,500 kg.

(a)        Calculate

(i)         The volume of the slab

(ii)        The mass of dry slab

(iii)       The mass of cement to be used

(b)        If one bag of cement is 50kg. Find the number of bags to be purchased

(c)        If a lorry carries 7 tonnes of sand, calculate the number of lorries of sand to be purchased

  1. An Artisan has 63 kg of metal of density 7000 kg/m3. He intends to use to make a rectangular pipe with external dimensions 12 cm by 15 cm and internal dimensions 10cm by 12 cm. Calculate the length of the pipe in metres.

 

  1. The figure below represents hollow cylinder. The internal and external radii are estimated to be 6 cm and 8 cm respectively, to the nearest whole number. The height of the cylinder is exactly 14 cm.

 

 

 

 

 

 

(a)        Determine the exact values for internal and external radii which will give maximum volume of the material used.

(b)        Calculate the maximum possible volume of the material used. Take the value of TT to be 22/7

 

  1. Calculate the volume of a prism whose length is 25 cm and  whose length is 25 cm and whose cross – section is an equilateral  triangle of side 3 cm

 

  1. The figure below shows an octagon obtained  by cutting off   four congruent triangles from a rectangle  measuring 19.5 by 16.5 cm

 

 

 

 

 

 

 

 

 

 

 

 

 

Calculate the area of the octagon

 

  1. The figure below represents a kite ABCD, AB = AD = 15 cm. the diagonals BD and AC intersect at O, AC = 30 cm and AO = 12 cm.

 

 

 

 

 

 

 

Find the area of the kite

 

  1. The figure below is a map of a forest drawn on a grid of 1 cm squares

 

 

 

 

 

 

(a)        Estimate the area of the map in square centimeters if the scale of the map is 1: 50, 000; estimate the area of the forest in hectares.

TOPIC 5:

LINEAR EQUATIONS

PAST KCSE QUESTIONS ON THE TOPIC

  1. A cloth dealer sold 3 shirts and 2 trousers for Kshs 840 and 4 shirts and 5 trousers for Kshs 1680 find the cost of 1 shirt and the cost of 1 trouser
  2. Solve the simultaneous equations

2x – y = 3

x2 – xy = -4

  1. The cost of 5 skirts and blouses is Kshs 1750. Mueni bought three of the skirts and one of the blouses for Kshs 850. Find the cost of each item.
  2. Akinyi bought three cups and four spoons for Kshs 324. Wanjiru bought five cups and Fatuma bought two spoons of the same type as those bought by Akinyi, Wanjiku paid Kshs 228 more than Fatuma. Find the price of each cup and each spoon.
  3. Mary has 21 coins whose total value is Kshs. 72. There are twice as many five shillings coins as there are ten shilling coins. The rest one shillings coins. Find the number of ten shillings coins that Mary has.                   ( 4 mks)
  4. The mass of 6 similar art books and 4 similar biology books is 7.2 kg. The mass of 2 such art books and 3 such biology books is 3.4 kg. Find the mass of one art book  and the mass of one  biology  book
  5. Karani bought 4 pencils and 6 biros – pens for Kshs 66 and Tachora bought 2 pencils and 5 biro pens for Kshs 51.

(a)        Find the price of each item

(b)        Musoma spent Kshs. 228 to buy the same type of pencils and biro – pens if the number of biro pens he bought were 4 more than the number of pencils, find the number of pencils bought.

  1. Solve the simultaneous equations below

2x – 3y = 5

-x + 2y = -3

  1. The length of a room is 4 metres longer than its width. Find the length of the room if its area is 32m2
  2. Hadija and Kagendo bought the same types of pens and exercise books from the same types of pens and exercise books from the same shop. Hadija bought 2 pens and 3 exercise books for Kshs 78. Kagendo bought 3 pens and 4 exercise books for Kshs 108.

Calculate the cost of each item

  1. In fourteen years time, a mother will be twice as old as her son. Four years ago, the sum of their ages was 30 years. Find how old the mother was, when the son was born.

 

  1. Three years ago Juma was three times as old as Ali. In two years time the sum of their ages will be 62. Determine their ages.

 

  1. Two pairs of trousers and three shirts costs a total of Kshs 390. Five such pairs of trousers and two shirts cost a total of Kshs 810. Find the price of a pair of trousers and a shirt.

 

  1. A shopkeeper sells two- types of pangas type x and type y. Twelve  x pangas and five type y pangas cost Kshs 1260, while nine type x pangas and fifteen type y pangas cost  Mugala bought eighteen type y pangas. How much did he pay for them?

 

 

 

TOPIC 6:

COMMERCIAL ARITHMETICS

PAST KCSE QUESTIONS ON THE TOPIC

  1. The cash prize of a television set is Kshs 25000. A customer paid a deposit of Kshs 3750. He repaid the amount owing in 24 equal monthly installments. If he was charged simple interest at the rate of 40% p.a how much was each installment?
  2. Mr Ngeny borrowed Kshs 560,000 from a bank to buy a piece of land. He was required to repay the loan with simple interest for a period of 48 months. The repayment amounted to Kshs 21,000 per month.

Calculate

(a) The interest paid to the bank

(b) The rate per annum of the simple interest

  1. A car dealer charges 5% commission for selling a car. He received a commission of Kshs 17,500 for selling car. How much money did the owner receive from the sale of his car?
  2. A company saleslady sold goods worth Kshs 240,000 from this sale she earned a commission of Kshs 4,000

(a) Calculate the rate of commission

(b) If she sold good whose total marked price was Kshs 360,000 and allowed

a discount of 2% calculate the amount of commission she received.

  1. A business woman bought two bags of maize at the same price per bag. She discovered that one bag was of high quality and the other of low quality. On the high quality bag she made a profit by selling at Kshs 1,040, whereas on the low quality bag she made a loss by selling at Kshs 880. If the profit was three times the loss, calculate the buying price per bag.
  2. A salesman gets a commission of 2. 4 % on sales up to Kshs 100,000. He gets an additional commission of 1.5% on sales above this. Calculate the commission he gets on sales worth Kshs 280,000.
  3. Three people Koris, Wangare and Hassan contributed money to start a business. Korir contributed a quarter of the total amount and Wangare two fifths of the remainder.

Hassan’s contribution was one and a half times that of Koris. They borrowed the rest of the money from the bank which was Kshs 60,000 less than Hassan’s contribution. Find the total amount required to start the business.

  1. A Kenyan tourist left Germany for Kenya through Switzerland. While in Switzerland he bought a watch worth 52 deutsche Marks. Find the value of the watch in:

(a)        Swiss Francs.

(b)        Kenya Shillings

Use the exchange rtes below:

1 Swiss Franc = 1.28 Deutsche Marks.

1 Swiss Franc = 45.21 Kenya Shillings

  1. A salesman earns a basic salary of Kshs. 9000 per month

In addition he is also paid a commission of 5% for sales above Kshs 15000

In a certain month he sold goods worth Kshs. 120, 000 at a discount of 2½ %. Calculate his total earnings that month

  1. In this question, mathematical table should not be used

A Kenyan bank buys and sells foreign currencies as shown below

Buying                                                Selling

(In Kenya shillings)                 In Kenya Shillings

1 Hong Kong dollar                      9.74                                         9.77

1 South African rand                    12.03                                       12.11

A tourists arrived in Kenya with 105 000 Hong Kong dollars and changed the whole amount to Kenyan shillings. While in Kenya, she pent Kshs 403 897 and changed the balance to South African rand before leaving for South Africa. Calculate the amount, in South African rand that she received.

  1. A Kenyan businessman bought goods from Japan worth 2, 950 000 Japanese yen. On arrival in Kenya custom duty of 20% was charged on the value of the goods.

If the exchange rates were as follows

1 US dollar = 118 Japanese Yen

1 US dollar = 76 Kenya shillings

Calculate the duty paid in Kenya shillings

 

  1. Two businessmen jointly bought a minibus which could ferry 25 paying passengers when full. The fare between two towns A and B was Kshs. 80 per passenger for one way. The minibus made three round trips between the two towns daily. The cost of fuel was Kshs 1500 per day. The driver and the conductor were paid daily allowances of Kshs 200 and Kshs 150 respectively.

A further Kshs 4000 per day was set aside for maintenance.

(a) One day the minibus was full on every trip.

(i)         How much money was collected from the passengers that day?

(ii)        How much was the net profit?

  • On another day, the minibus was 80% on the average for the three round

trips. How much did each business get if the days profit was shared in the ratio 2:3?

 

  1. A traveler had sterling pounds 918 with which he bought Kenya shillings at the rate of Kshs 84 per sterling pound. He did not spend the money as intended. Later, he used the Kenyan shillings to buy sterling pound at the rate of Kshs. 85 per sterling pound. Calculate the amount of money in sterling pounds lost in the whole transaction.

 

  1. A commercial bank buys and sells Japanese Yen in Kenya shillings at the rates shown below

Buying      0.5024

Selling       0.5446

A Japanese tourist at the end of his tour of Kenya was left with Kshs. 30000 which he converted to Japanese Yen through the commercial bank. How many Japanese Yen did he get?

 

  1. In the month of January, an insurance salesman earned Kshs. 6750 which was commission of 4.5% of the premiums paid to the company.

(a) Calculate the premium paid to the company.

(b) In February the rate of commission was reduced by 662/3% and the

premiums reduced by 10% calculate the amount earned by the salesman in the month of  February

 

  1. Akinyi, Bundi, Cura and Diba invested some money in a business in the ratio of 7:9:10:14 The business realized a profit of Kshs 46800. They shared 12% of the profit equally and the remainder in the ratio of their contributions. Calculate the total amount of money received by Diba.

 

  1. A telephone bill includes Kshs 4320 for a local calls Kshs 3260 for trank calls and rental charge Kshs 2080. A value added tax (V.A.T) is then charged at 15%, Find the total bill.
  2. During a certain period. The exchange rates were as follows

1 sterling pound = Kshs 102.0

1 sterling pound = 1.7 us dollar

1 U.S dollar = Kshs 60.6

A school management intended to import textbooks worth Kshs 500,000 from UK. It changed the money to sterling pounds. Later the management found out that the books the sterling pounds to dollars. Unfortunately a financial crisis arose and the money had to be converted to Kenya shillings. Calculate the total amount of money the management ended up with.

 

  1. A fruiterer bought 144 pineapples at Kshs 100 for every six pineapples. She sold some of them at Kshs 72 for every three and the rest at Kshs 60 for every two.

If she made a 65% profit, calculate the number of pineapples sold at Kshs 72 for every three.

 

 

 

TOPIC 7:

GEOMETRY

PAST KCSE QUESTIONS ON THE TOPIC

  1. A point B is on a bearing of 0800 from a port A and at a distance of 95 km. A submarine is stationed at a port D, which is on a bearing of 2000 from AM and a distance of 124 km from B.

A ship leaves B and moves directly southwards to an island P, which is on a bearing of 140 from A. The submarine at D on realizing that the ship was heading fro the island P, decides to head straight for the island to intercept the ship

Using a scale 0f 1 cm to represent 10 km, make a scale  drawing showing the  relative positions  of A, B, D, P.

Hence find

(i)   The distance from A to D

(ii) The bearing of the submarine from the ship was setting off from B

(iii) The bearing of the island P from D

(iv) The distance the submarine had to cover to reach the island P

  1. Four towns R, T, K and G are such that T  is 84  km  directly to the north R, and K is on a bearing of 2950 from R at a distance  of 60 km. G is on a bearing of 3400 from K and a distance of 30 km. Using a scale of 1  cm  to represent 10 km, make  an accurate scale drawing  to show  the relative positions of the town.

Find

  • The distance and the bearing of  T  from K
  • The distance  and the bearing G from T
  • The bearing of R from G
  1. Two aeroplanes, S and T leave airports A at the same time. S flies on a bearing of 060 at 750 km/h while T flies on a bearing of 2100 at 900km/h.

(a)        Using a suitable scale, draw a diagram to show the positions of the aeroplane after two hours.

(b)        Use your diagram to determine

(i) The actual distance between the two aeroplanes

(ii) The bearing of T from S

(iii) The bearing of S from T

  1. A point A is directly below a window. Another point B is 15 m from A and at the same horizontal level. From B angle of elevation of the top of the bottom of the window is 300 and the angle of elevation of the top of the window is 350. Calculate the vertical distance.
  • From A to the bottom of the window
  • From the bottom to top  of the window
  1. Find by calculation the sum of all the interior angles in the figure ABCDEFGHI below

 

 

 

  1. Shopping centers X, Y and Z are such that Y is 12 km south of X and Z is 15 km from X. Z is on a bearing of 3300 from Y. Find the bearing of Z from X.
  2. An electric pylon is 30m high. A point S on the top of the pylon is vertically above another point R on the ground. Points A and B are on the same horizontal ground as R. Point A due south of the pylon and the angle of elevation of S from A is 260. Point B is due west of the pylon and the angle of elevation of S from B is 320

Find the

(a)        Distance from A and B

(b)        Bearing of B from A

  1. The figure below is a polygon in which AB = CD = FA = 12cm BC = EF = 4cm

and BAF =- CDE = 1200. AD is a line of symmetry.

 

 

 

 

Find the area of the polygon.

  1. The figure below shows a triangle ABC.

 

 

 

 

  1. a) Using a ruler and a pair of compasses, determine a point D on the line BC

such that BD:DC = 1:2.

  1. b) Find the area of triangle ABD, given that AB = AC.
  2. A boat at point x is 200 m to the south of point Y. The boat sails X to another

point Z. Point Z is 200m on a bearing of 3100 from  X, Y and Z are on the same  horizontal plane.

  • Calculate the bearing and the distance of Z from Y
  • W is the point on the path of the boat nearest to Y.

Calculate the distance WY

  • A vertical tower stands at point Y. The angle of point X from the top of the tower is 60 calculate the angle of elevation of the top of the tower from W.
  1. The figure below shows a quadrilateral ABCD in which AB = 8 cm, DC = 12 cm, Ð BAD = 450, Ð CBD = 900 and BCD = 300.

 

 

 

 

 

Find:

  • The length of BD
  • The size of the angle A D B
  1. In the figure below, ABCDE is a regular pentagon and ABF is an equilateral triangle

 

 

 

 

Find the size of

  1. Ð ADE
  2. Ð AEF
  3. Ð DAF
  4. In this question use a pair of compasses and a ruler only
  • construct triangle ABC such that AB = 6 cm, BC = 8cm and ÐABC 1350

(2 marks)

  • Construct the height  of triangle ABC  in a) above taking BC as the  base

(1 mark)

  1. The size of an interior angle of a regular polygon is 3x0 while its exterior angle is (x- 20)0. Find the number of sides of the polygon
  2. Points L and M are equidistant from another point K. The bearing of L from K is 3300. The bearing of M from K is 2200.

Calculate the bearing of M from L

  1. Four points B,C,Q and D lie on the same plane point B is the 42 km due south- west of town Q. Point C is 50 km on a bearing of 5600 from Q. Point D  is equidistant from B, Q and C.

(a)        Using the scale 1 cm represents 10 km, construct a diagram showing the position of B, C, Q and D

(b)        Determine the

(i)         Distance between B and C

(ii)        Bearing D from B

 

  1. Two aeroplanes P and Q, leave an airport at the same time flies on a bearing of 2400 at 900km/hr while Q flies due East at 750 km/hr

(a)        Using a scale of 1v cm drawing to show the positions of the aeroplanes after 40 minutes.

(b)        Use the scale drawing to find the distance between the two aeroplane after 40 minutes

(c)        Determine the bearing of

(i)         P from Q ans 2540

(ii)        Q from P ans 740

 

  1. A port B is no a bearing of 080 from a port A and at a distance of 95 km. A submarine is stationed port D which is on a bearing of 2000 from A, and a distance of 124 km from B.

A ship leaves B and moves directly southwards to an island P, which is on a bearing of 1400 from A. The submarine at D on realizing that the ship was heading for the island P decides to head straight for the island to intercept the ship.

Using a scale of 1 cm to represent 10 km, make a scale drawing showing the relative position of A, B D  and P.

Hence find:

(i)         The distance from A and D

(ii)        The bearing of the submarine from the ship when the ship was setting off from B

(iii)       The baring of the island P from D

(iv)       The distance the submarine had to cover to reach the island

  1. Four towns R, T, K and G are such that T is 84 km directly to the north R and K is on a bearing of 2950 from R at a distance of 60 km. G is on a bearing of 3400 from K and a distance of 30 km. Using a scale of 1 cm to represent 10 km, make an acute scale drawing to show the relative positions of the towns.

Find

(a) The distance and bearing of T from K

(b) The bearing of R from G

 

  1. In the figure below, ABCDE is a regular pentagon and M is the midpoint of AB. DM intersects EB at N. (T7)

 

 

 

 

 

Find the size of

(a) Ð BAE

(b) Ð BED

(c) Ð BNM

  1. Use a ruler and compasses in this question. Draw a parallelogram ABCD in which AB = 8cm, BC = 6 cm and BAD = 75. By construction, determine the perpendicular distance between AB and CD.

 

  1. The interior angles of the hexagon are 2x0, ½ x0, x + 400, 1100, 1300 and 1600. Find the value of the smallest angle.

 

  1. The size of an interior angle of a regular polygon is 1560. Find the number of sides of the polygon.

 

 

 

 

 

 

 

 

 

 

TOPIC 8:

COMMON SOLIDS

PAST KCSE QUESTIONS ON THE TOPIC

  1. The figure below shows a net of a prism whose cross – section is an equilateral triangle.

 

 

 

 

 

 

 

 

  1. a) Sketch the prism
  2. b) State the number of planes of symmetry of the prism.
  3. The figure below represents a square based solid with a path marked on it.

 

 

 

 

 

 

Sketch and label the net of the solid.

  1. The figure below represents below represents a prism of length 7 cm

AB = AE = CD = 2 cm and BC – ED = 1 cm

 

 

 

 

 

 

Draw the net of the prism                                                                   ( 3 marks)

  1. The diagram below represents a right pyramid on a square base of side 3 cm. The slant of the pyramid is 4 cm.

 

 

 

 

(a)        Draw a net of the pyramid                                                      ( 2 marks)

(b)        On the net drawn, measure the height of a triangular face from the top of

the Pyramid                                                                             ( 1 mark)

  1. (a)        Draw a regular pentagon of side 4 cm                                    ( 1 mark)

(b)        On the diagram drawn, construct a circle which touches all the sides of the pentagon                                                                                 ( 2 marks)

 

  1. The figure below shows a solid  regular tetrapack of sides 6 cm

 

 

 

 

 

(a)        Draw a net of the solid

(b)        Find the surface area of the solid

 

  1. The figure below shows a solid made by pasting two equal regular tetrahedral

 

 

 

 

 

(a)        Draw a net of the solid

(b)        If each face is an equilateral triangle of side 5cm, find the surface area of the solid.

 

 

  1. (a) Sketch the net of the prism shown below

 

 

 

 

(b) Find the surface area of the solid

 

 

 

 

FORM TWO

TOPIC 1

NUMBERS

PAST KCSE QUESTIONS ON THE TOPIC

  1. Use logarithms to evaluate

 

 

3 36.15 x 0.02573

1,938

  1. Find the value of x which satisfies the equation.

16x2 = 84x-3        

  1. Use logarithms to evaluate ( 1934)2   x     √00324

436

  1. Use logarithms to evaluate

55.9 ÷ (02621 x 0.01177) 1/5

  1. Simplify 2x x 52x ¸ 2-x
  2. Use logarithms to evaluate

(3.256 x 0.0536)1/3

 

  1. Solve for x in the equation

32(x-3) ÷8 (x-4) = 64 ÷2x

  1. Solve for x in the equations 812x x 27x = 729

9x

  1. Use reciprocal and square tables to evaluate to 4 significant figures, the expression:

1      + 4 .3462

24.56

  1. Use logarithm tables, to evaluate

 

 

0.032 x 14.26    2/3

0.006

 

  1. Find the value of x in the following equation

49(x +1) + 7(2x) = 350

 

  1. Use logarithms to evaluate

(0.07284)2

3√0.06195

  1. Find the value of m in the following equation

(1/27m x (81)-1 = 243

  1. Given that P = 3y express the equation 3(2y-1) + 2 x 3 (y-1) = 1 in terms of P hence or otherwise find the value of y in the equation 3 (2y – 1) + 2 x 3 (y-1) = 1

 

  1. Use logarithms to evaluate 55.9 ¸(0.2621 x 0.01177)1/5
  2. Use logarithms to evaluate

 

 

6.79 x 0.3911    ¾

Log 5

 

  1. Use logarithms to evaluate

 

1.23 x 0.0089

79.54

 

  1. Solve for x in the equation

X = 0.0056 ½

1.38 x 27.42

 

 

 

TOPIC 2:

EQUATIONS OF LINES

PAST KCSE QUESTIONS ON THE TOPIC

  1. The coordinates of the points P and Q are (1, -2) and (4, 10) respectively.

A point T divides the line PQ in the ratio 2: 1

(a)  Determine the coordinates of T

(b) (i)         Find the gradient of a line perpendicular to PQ

  • Hence determine the equation of the line perpendicular PQ and passing through T
  • If the line meets the y- axis at R, calculate the distance TR, to three significant figures
  1. A line L1 passes though point (1, 2) and has a gradient of 5. Another line L2, is perpendicular to L1 and meets it at a point where x = 4. Find the equation for L2 in the form of y = mx + c
  2. P (5, -4) and Q (-1, 2) are points on a straight line. Find the equation of the perpendicular bisector of PQ: giving the answer in the form y = mx+c.
  3. On the diagram below, the line whose equation is 7y – 3x + 30 = 0 passes though the

points A and B. Point A on the x-axis while point B is equidistant from x and y axes.

 

 

 

 

Calculate the co-ordinates of the points A and B

  1. A line with gradient of -3 passes through the points (3. k) and (k.8). Find the value of k and hence express the equation of the line in the form a ax + ab = c, where a, b, and c are constants.
  2. Find the equation of a straight line which is equidistant from the points (2, 3) and (6, 1), expressing it in the form ax + by = c where a, b and c are constants.
  3. The equation of a line -3/5x + 3y = 6. Find the:

(a) Gradient of the line                                                                                         (1 mk)

(b) Equation of a line passing through point (1, 2) and perpendicular to the given line b

  1. Find the equation of the perpendicular to the line x + 2y = 4 and passes through point (2,1)
  2. Find the equation of the line which passes through the  points P (3,7) and Q (6,1)
  3. Find the equation of the  line  whose x- intercepts is -2 and y-  intercepts  is 5
  4. Find the gradient and y- intercept of the line whose equation is 4x – 3y – 9 = 0

 

 

TOPIC 3

TRANSFORMATIONS

PAST KCSE QUESTIONS ON THE TOPIC

  1. A translation maps a point (1, 2) onto) (-2, 2). What would be the coordinates of the object whose image is (-3, -3) under the same translation?
  2. Use binomial expression to evaluate (0.96)5 correct to 4 significant figures
  3. In the figure below triangle ABO represents a part of a school badge. The badge has as symmetry of order 4 about O. Complete the figures to show the badge.

 

 

 

 

 

  1. A point (-5, 4) is mapped onto (-1, -1) by a translation. Find the image of (-4, 5) under the same translation.
  2. A triangle is formed by the coordinates A (2, 1) B (4, 1) and C (1, 6). It is rotated

clockwise through 900 about the origin. Find the coordinates of this image.

  1. The diagram on the grid provided below shows a trapezium ABCD

 

 

 

 

 

 

 

 

 

 

 

 

 

 

On the same grid

(a)        (i)         Draw the image A’B’C’D of ABCD under a rotation of 900

clockwise about the origin .

(ii)        Draw the image of A”B”C”D” of A’B’C’D’ under a reflection in

line y = x. State coordinates of A”B”C”D”.

(b)        A”B”C”D” is the image of A”B”C”D under the reflection in the line x=0.

Draw the image   A”B” C”D” and state its coordinates.

(c)        Describe a single transformation that maps A” B”C”D onto ABCD.

  1. A translation maps a point P(3,2) onto P’(5,4)

(a)  Determine the translation vector

(b) A point Q’ is the image of the point Q (, 5) under the same translation. Find the length of ‘P’ Q leaving the answer is surd form.

  1. Two points P and Q have coordinates (-2, 3) and (1, 3) respectively. A translation map point P to P’ ( 10, 10)

(a)  Find the coordinates of Q’ the image of Q under the translation      (1 mk)

(b)  The position vector of P and Q in (a) above are p and q respectively given that mp – nq = -12

9       Find the value of m and n                               (3mks)

  1. on the Cartesian plane below, triangle PQR has vertices P(2, 3), Q ( 1,2)  and  R ( 4,1)  while triangles P” q “  R” has vertices P” (-2, 3), Q” ( -1,2) and R” ( -4, 1)

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(a)        Describe fully a single transformation which maps triangle PQR onto triangle P”Q”R”

(b)        On the same plane, draw triangle P’Q’R’, the image of triangle PQR, under reflection in line y = -x

(c)        Describe fully a single transformation which maps triangle P’Q’R’ onto triangle P”Q”R

(d)       Draw triangle P”Q”R” such that it can be mapped onto triangle PQR by a positive quarter turn about (0, 0)

(e)        State all pairs of triangle that are oppositely congruent

 

TOPIC 4:

MEASUREMENT

PAST KCSE QUESTIONS ON THE TOPIC

  1. A solid cone of height 12 cm and radius 9 cm is recast into a solid sphere. Calculate the surface area of the sphere.
  2. A circular path of width 14 metres surrounds a field of diameter 70 metres. The path is to be carpeted and the field is to have a concrete slab with an exception of four rectangular holes each measuring 4 metres by 3 metres.

A contractor estimated the cost of carpeting the path at Kshs. 300 per square metre and the cost of putting the concrete slab at Kshs 400 per square metre. He then made a quotation which was 15% more than the total estimate. After completing the job, he realized that 20% of the quotation was not spent.

(a) How much money was not spent?

(b) What was the actual cost of the contract?

  1. In the figure below BAD and CBD are right angled triangles.

 

 

 

 

 

 

Find the length of AB.

  1. A cylinder of radius 14 cm contains water. A metal solid cone of base radius 7 cm and height 18 cm is submerged into the water. Find the change in height of the water level in the cylinder.
  2. A cyndrical container of radius 15 cm has some water in it. When a solid is submerged into the water, the water level rises by 1.2 cm.
    • Find, the volume of the water displaced by the solid leaving  your  answer in terms of  ∏
    • If the solid is a circular cone of height 9 cm, calculate the radius of the cone to 2 decimal places.
  3. A balloon, in the form of a sphere of radius 2 cm, is blown up so that the volume increases by 237.5%. Determine the new volume of balloon in terms of ∏

 

A girl wanted to make a rectangular octagon of side 14 cm. She made it from a square piece of a card of size y cm by cutting off four isosceles triangles whose equal sides were x cm each, as shown below.

 

 

 

 

 

 

  • Write down an expression for the octagon in terms of x and y
  • Find the value of x
  • Find the area of the octagon
  1. A pyramid VABCD has a rectangular horizontal base ABCD with AB= 12 cm and BC = 9 cm. The vertex V is vertically above A and VA = 6 cm. calculate the volume of the pyramid.
  2. A solid made up of a conical frustrum and a hemisphere top as shown in the figure below. The dimensions are as indicated in the figure.

 

 

 

 

(a) Find the area of

(i)         The circular base

(ii)        The curved surface of the frustrum

(iii)       The hemisphere surface

(b) A similar solid has a total area of 81.51 cm2. Determine the radius of its base.

  1. Two sides of triangles are 5 cm each and the angle between them is 1200. Calculate the area of the triangle.
  2. The figure below represents a kite ABCD, AB = AD = 15 cm. The diagonals BD and AC intersect at O. AC = 30 cm and AO = 12 cm.

 

 

 

 

 

Find the area of the kite

  1. The diagram below represents a solid made up of a hemisphere mounted on a

cone. The radius of the hemisphere are each 6 cm and the height of the cone is 9 cm.

 

 

 

 

 

 

Calculate the volume of the solid take ח = (22/7)

  1. The internal and external diameters of a circular ring are 6 cm and 8cm respectively. Find the volume of the ring if its thickness is 2 millimeters.

2003

  1. A wire of length 21 cm is bent to form the shape down in the figure below, ABCD is a rectangle and AEB is an equilateral triangle. (2mks)

 

 

 

 

 

If the length of AD of the rectangle is 1 ½ times its width, calculate the

width of the rectangle.

  1. The length of a hallow cylindrical pipe is 6 metres. Its external diameter is 11 cm and has a thickness of 1 cm. Calculate the volume in cm3 of the material used to make the pipe. Take π as 3.142.
  2. The figure below represents a hexagon of side 5 cm and 20 cm height

 

 

 

 

 

 

Find the volume of the prism.

  1. A cylindrical piece of wood of radius 4.2 cm and length 150 cm is cut length into

two equal  pieces.

Calculate the surface area of one piece

(Take π as 22/7

  1. The figure below is a model representing a storage container. The model whose total height is 15 cm is made up of a conical top, a hemispherical bottom and the middle part is cylindrical. The radius of the base of the cone and that of the hemisphere are each 3 cm. The height of the cylindrical part is 8cm.

 

 

 

 

 

 

 

(a)        Calculate the external surface area of the model

(b)        The actual storage container has a total height of 6 metres. The outside of the actual storage container is to be painted. Calculate the amount of paint required if an area of 20m2 requires 0.75 litres of the paint.

  1. A garden measures 10m long and 8 m wide. A path of uniform width is made all round the garden. The total area of the garden and the paths is 168 m2.

(a)  Find the width of the path

(b)  The path is to be covered with square concrete slabs. Each corner of the path is covered with a slab whose side is equal to the width of the path.

The rest of the path is covered with slabs of side 50 cm. The cost of making each corner slab is Kshs 600 while the cost of making each smaller slab is Kshs 50.

Calculate

(i)   The number of smaller slabs used

(ii) The total cost of the slabs used to cover the whole path

  1. A cylindrical solid of radius 5 cm and length 12 cm floats lengthwise in water to a depth of 2.5 cm as shown in the figure below.

 

 

 

 

Calculate the area of the curved surface of the solid in contact with water, correct to 4 significant figures

  1. Two cylindrical containers are similar. The larger one has internal cross- section area of 45 cm2 and can hold 0.945 litres of liquid when full. The smaller container has internal cross- section area of 20 cm2
    • Calculate the capacity of the smaller container
    • The larger container is filled with juice to a height of 13 cm. Juice is then drawn from is and emptied into the smaller container until the depths of the juice in both containers are equal.

Calculate the depths of juice in each container.

  • On fifth of the juice in the larger container in part (b) above is further drawn and emptied into the smaller container. Find the difference in the depths of the juice in the two containers.

 

  1. A metal bar is a hexagonal prism whose length is 30 cm, the cross section is a regular hexagon with each side of length 6 cm

Find

(i)         The area of the hexagonal face                                                           (3mks)

(ii)        The volume of the metal bar                                                               (2mks)

  1. A cylindrical water tank of diameter 7 metres and height 2.8 metres

(a)        Find the capacity of the water tank in litres

(b)        Six members of family use 15 litres each per day. Each day 80 litres are

sued for cooking and washing and a further 60 litrese are wasted.

Find the number of complete days a full tank would last the family (2mks)

(c)        Two members of the family were absent for 90 days. During the 90 days wastage was reduced by 20% but cooking and washing remained the same. Calculate the number of days a full tank would now last the family

 

  1. Pieces of soap are packed in a cuboid container measuring 36 cm by 24 cm by 18 cm. Each piece of soap is a similar to the container. If the linear scale factor between the container and the soap is 1/6 find the volume of each piece of soap.

 

  1. A pyramid of height 10cm stands, on a square base ABCD of side 6 cm.

(a)        Draw a sketch of the pyramid

(b)        Calculate the perpendicular distance from the vertex to the side AB.

 

 

 

 

TOPIC 5

QUADRATIC EQUATIONS

PAST KCSE QUESTIONS ON THE TOPIC

  1. Simplify

2x – 2          ÷         x – 1

6x2 – x – 12           2x – 3

  1. Solve the simultaneous equations

2x – y = 3

x2 – xy = -4

  1. Find the value of x in the following equations:

49x + 1 + 72x = 350

  1. Simplify completely

3x2 – 12x + 1

x2 – 1       x + 1

  1. Factorize completely 3x2 – 2 xy – y2
  2. Factorize a2 – b2

Hence find the exact value of 25572 – 25472

  1. If x2 + y2 = 29 and x + y = 3
    • Determine the values of
  • x2 + 2xy + y2
  • 2xy
  • x2 – 2xy + y2
  • x – y
    • Find the value of x  and y
  1. Simplify the expression   3a2 + 4ab+ b2

4a2 + 3ab – b2

  1. (a)        Write an expression in terms of x and y for the total value of a two digit

number having x as the tens digit and y as the units digit.

  1. b) The number in (a) above is such that three times the sum of its digits is less than the value of the number by 8. When the digits are reversed the value of the number increases by 9. Find the number xy.
  2. Simplify the expression 2a2 – 3 ab – 2b2

4a2 – b2

  1. Simplify the expression 9t2 – 25a2

6t2 + 19 at + 15a2

  1. Simplify

P2 + 2pq + q2

P3 – pq2 + p2q – q3

  1. Expand the expression ( x2 – y2) ( x2 + y2) ( x4 – y4)
  2. The sum of two numbers x and y is 40. Write down an expression, in terms of x, for the sum of the squares of the two numbers.

Hence determine the minimum value of x2 + y2   

  1. Simplify the expression 15a2b – 10ab2

– 5ab + 2b2

  1. Four farmers took their goats to the market Mohamed had two more goats than Ali Koech had 3 times as many goats as Mohamed. Whereas Odupoy had 10 goats less than both Mohamed and Koech.

(i)   Write a simplified algebraic expression with one variable. Representing the total number of goats

(ii) Three butchers bought all the goats and shared them equally. If each butcher got 17 goats. How many did Odupoy sell to the butchers?

 

  1. Find the value of x which satisfies the equation 162x = 84x – 3

 

  1. Mary has 21 coins whose total value is Kshs 72. There are twice as many five shillings coins as there are ten shillings coins. The rest one shilling coins. Find the number of ten shilling coins that Mary has.

 

  1. Simplify the expression

x- 1      –           2x + 1

x                   3x

Hence solve the equation x – 12x + 1 = 2

x          3x       3

  1. Given that P= 3y express the equation

32y-1 + 2 x 3y-1 = 1 in terms of P.

Hence or otherwise find the value of y in the equation 32y-1 + 2 x 3y-1 = 1

 

  1. Simplify the expression

      4x2 – y2

2x2 – 7xy + 3y

  1. Three years ago Juma was three times as old as Ali. In two years time the sum of their ages will be 62. Determine their present ages.
  2. Simplify

x – 2  –   2x + 20

x + 2       x2 – 4

  1. If the expression 25y2 – 70y + d is a perfect square, where d is a constant, find the value of d

 

TOPIC 6

INEQUALITIES

PAST KCSE QUESTIONS ON THE TOPIC

  1. Find the range of x if 2≤ 3 – x <5
  2. Find all the integral values of x which satisfy the inequalities:

2(2-x) <4x -9<x + 11

  1. Solve the inequality and show the solution

3 – 2x Ð x ≤ 2x + 5 on the number line

3

  1. Solve the inequality x – 3 + x – 54x + 6 -1

4          6          8

  1. A family is planning a touring holiday, during which time (x days) will be spent walking and the rest of the time (y days) in traveling by bus. Each day they can walk 30 km or travel 80 km by bus  and they wish to travel at least 600 km altogether.

The holiday must not last more than 14 days. Each day walking will cost Kshs. 200 and each day traveling by bus will cost Kshs. 1400. The holiday must not cost more than Kshs 9800

(a)        Write down all the inequalities in x and y based on the above facts

(b)        Represent the inequalities graphically

(c)        Use the graph to determine the integral values of x and y which give

(i)         The cheapest holiday

(ii)        The longest distance traveled

 

TOPIC 7

CIRCLES

PAST KCSE QUESTIONS ON THE TOPIC

  1. In the figure below CP= CQ and <CQP = 1600. If ABCD is a cyclic quadrilateral, find < BAD.

 

 

 

 

 

 

 

  1. In the figure below AOC is a diameter of the circle centre O; AB = BC and < ACD = 250, EBF is a tangent to the circle at B.G is a point on the minor arc CD.

 

 

 

 

 

 

 

(a)        Calculate the size of

(i) < BAD

(ii) The Obtuse < BOD

(iii) < BGD

(b)        Show the < ABE = < CBF. Give reasons

  1. In the figure below PQR is the tangent to circle at Q. TS is a diameter and TSR and QUV are straight lines. QS is parallel to TV. Angles SQR = 400 and angle TQV = 550

 

 

 

 

 

 

 

 

 

 

 

Find the following angles, giving reasons for each answer

  • QST
  • QRS
  • QVT
  • UTV
    1. In the figure below, QOT is a diameter. QTR = 480, TQR = 760 and SRT = 370

 

 

 

 

 

 

 

Calculate

(a)        <RST

(b)       <SUT

(c)        Obtuse <ROT

  1. In the figure below, points O and P are centers of intersecting circles ABD and

BCD respectively. Line ABE is a tangent to circle BCD at B. Angle BCD = 420

 

 

 

 

 

 

 

 

 

 

(a)        Stating reasons, determine the size of

(i)            <CBD

(ii)        Reflex <BOD

(b) Show that ∆ ABD is isosceles

  1. The diagram below shows a circle ABCDE. The line FEG is a tangent to the circle at point E. Line DE is parallel to CG, < DEC = 280 and        < AGE = 320

 

 

 

 

 

 

 

 

Calculate:

(a)        < AEG

(b)        < ABC

  1. In the figure below R, T and S are points on a  circle centre O PQ is a tangent to

the circle at T. POR is  a straight line and Ð QPR = 200

 

 

 

 

 

 

 

Find the size of Ð RST

  • The figure below shows a circle centre O and a point Q which is outside the

circle

 

 

Using a ruler and a pair of compasses, only locate a point on the circle such that angle OPQ = 90o

 

 

 

 

TOPIC 8

LINEAR MOTION

PAST KCSE QUESTION ON THE TOPIC

  1. Two towns P and Q are 400 km apart. A bus left P for Q. It stopped at Q for one hour and then started the return journey to P. One hour after the departure of the bus from P, a trailer also heading for Q left P. The trailer met the returning bus ¾ of the way from P to Q. They met t hours after the departure of the bus from P.
  • Express the average speed  of the trailer in terms of  t
  • Find the ration of the speed of the bus so that of the trailer.
  1. The athletes in an 800 metres race take 104 seconds and 108 seconds respectively to complete the race. Assuming each athlete is running at a constant speed. Calculate the distance between them when the faster athlete is at the finishing line.
  2. A and B are towns 360 km apart. An express bus departs form A at 8 am and maintains an average speed of 90 km/h between A and B. Another bus starts from B also at 8 am and moves towards A making four stops at four equally spaced points between B and A. Each stop is of duration 5 minutes and the average speed between any two spots is 60 km/h. Calculate distance between the two buses at 10 am.
  3. Two towns A and B are 220 km apart. A bus left town A at 11. 00 am and traveled towards B at 60 km/h. At the same time, a matatu left town B for town A and traveled at 80 km/h. The matatu stopped for a total of 45 minutes on the way before meeting the bus. Calculate the distance covered by the bus before meeting the matatu.
  4. A bus travels from Nairobi to Kakamega and back. The average speed from Nairobi to Kakamega is 80 km/hr while that from Kakamega to Nairobi is 50 km/hr, the fuel consumption is 0.35 litres per kilometer and at 80 km/h, the consumption is 0.3 litres per kilometer .Find
  5. i) Total fuel consumption for the round trip
  6. ii) Average fuel consumption per hour for the round trip.
  7. The distance between towns M and N is 280 km. A car and a lorry travel from M to N. The average speed of the lorry is 20 km/h less than that of the car. The lorry takes 1h 10 min more than the car to travel from M and N.
  • If the speed of the lorry is x km/h, find x                                                            (5mks)
  • The lorry left town M at 8: 15 a.m. The car left town M and overtook the lorry at 15 p.m. Calculate the time the car left town  M.
  1. A bus left Mombasa and traveled towards Nairobi at an average speed of 60 km/hr. after 21/2 hours; a car left Mombasa and traveled along the same road at an average speed of 100 km/ hr. If the distance between Mombasa and Nairobi is 500 km, Determine

(a)        (i)         The distance of the bus from Nairobi when the car took off (2mks)

(ii)        The distance the car traveled to catch up with the bus

(b)        Immediately the car caught up with the bus

(c)        The car stopped for 25 minutes. Find the new average speed at which the car traveled in order to reach Nairobi at the same time as the bus.

  1. A rally car traveled for 2 hours 40 minutes at an average speed of 120 km/h. The car consumes an average of 1 litre of fuel for every 4 kilometers.

A litre of the fuel costs Kshs 59

Calculate the amount of money spent on fuel

 

  1. A passenger notices that she had forgotten her bag in a bus 12 minutes after the bus had left. To catch up with the bus she immediately took a taxi which traveled at 95 km/hr. The bus maintained an average speed of 75 km/ hr. determine

(a)        The distance covered by the bus in 12 minutes

(b)        The distance covered by the taxi to catch up with the bus

 

  1. The athletes in an 800 metre race take 104 seconds and 108 seconds respectively to complete the race. Assuming each athlete is running at a constant speed. Calculate the distance between them when the faster athlete is at the finishing line.
  2. Mwangi and Otieno live 40 km apart. Mwangi starts from his home at 7.30 am and cycles towards Otieno’s house at 16 km/ h Otieno starts from his home at 8.00 and cycles at 8 km/h towards Mwangi at what time do they meet?

 

  1. A train moving at an average speed of 72 km/h takes 15 seconds to completely cross a bridge that is 80m long.

(a) Express 72 km/h in metres per second

(b) Find the length of the train in metres

FORM 3

TOPIC 1

QUADRATIC EXPRESSIONS AND EQUATIONS

PAST KCSE QUESTIONS ON THE TOPIC

  1. The table shows the height metres of an object thrown vertically upwards varies with the time t seconds

The relationship between s and t is represented by the equations s = at2 + bt + 10 where b are constants.

 

t 0 1 2 3 4 5 6 7 8 9 10
s 45.1
  • (i) Using the information in the table, determine the values of a and b

(2 marks)

(ii) Complete the table                                                                  (1 mark)

(b)(i)    Draw a graph to represent the relationship between s and t   (3 marks)

(ii)   Using the graph determine the velocity of the object when t = 5 seconds

  1. (a) Construct a table of value for the function y = x2 – x – 6 for -3≤ x ≤ 4

(b)        On the graph paper draw the graph of the function

Y=x2 – x – 6 for -3 ≤ x ≤4

(c)        By drawing a suitable line on the same grid estimate the roots of the equation        x2 + 2x – 2 =0

  1. (a) Draw the graph of y= 6+x-x2, taking integral value of x in -4 ≤ x ≤ 5. (The

grid is provided. Using the same axes draw the graph of y = 2 – 2x

(b)        From your graphs, find the values of X which satisfy the simultaneous

equations y = 6 + x  – x2

y = 2 – 2x

(c)        Write down and simplify a quadratic equation which is satisfied by the

values of x where the two  graphs intersect.

  1. (a) Complete the following table for the equation y = x3 – 5x2 + 2x + 9
x -2 -1.5 -1 0 1 2 3 4 5
x2 -3.4 -1 0 1 27 64 125
-5x2 -20 -11.3 -5 0 -1 -20 -45
2x -4 -3 0 2 4 6 8 10
9 9 9 9 9 9 9 9 9 99
-8.7 9 7 -3

 

(b) On the grid provided draw the graph of y = x3 – 5x2 + 2x + 9 for -2 ≤ x ≤ 5

(c) Using the graph estimate the root of the equation x3 – 5x2 + 2 + 9 = 0 between x =

2 and x = 3

(d)             Using the same axes draw the graph of y = 4 – 4x and estimate a solution to the

equation x2 – 5x2 + 6x + 5 =0

  1. (a) Complete the table below, for function y = 2x2 + 4x -3
x -4 -3 -2 -1 0 1 2
2x2 32 8 2 0 2
4x – 3 -11 -3 5
y -3 3 13

(b)        On the grid provided, draw the graph of the function y=2x2 + 4x -3 for

-4 ≤ x ≤ 2 and use the graph to estimate the rots of the equation 2x2+4x – 3 = 0 to 1 decimal place.                                                                        (2mks)

(c)        In order to solve graphically the equation 2x2 +x -5 =0, a straight line must be drawn to intersect the curve y = 2x2 + 4x – 3. Determine the equation of this straight line, draw the straight line hence obtain the roots.

2x2 + x – 5 to 1 decimal place.

  1. (a) (i)         Complete the table below for the function y = x3 + x2 – 2x   (2mks)

 

x -3 -2.5 -2 -1.5 -1 -0.5 0 0.5 1 2 2.5
x3 15.63 -0.13 1
x2 4 0.25 6.25
-2x 1 -2
y 1.87 0.63 16.88

 

(ii)        On the grid provided, draw the graph of y = x3 + x2 – 2x for the values of x in the interval – 3 ≤ x ≤ 2.5

(iii)       State the range of negative values of x for which y is also negative

(b)        Find the coordinates of two points on the curve other than (0, 0) at which x- coordinate and y- coordinate are equal

  1. The table shows some corresponding values of x and y for the curve represented by Y = ¼ x3 -2

 

X -3 -2 -1 0 1 2 3
Y -8.8 -4 -2.3 -2 -1.8 0 4.8

 

On the grid provided below, draw the graph of y = ¼ x2 -2 for -3 ≤ x ≤3. Use the graph to estimate the value of x when y = 2

  1. A retailer planned to buy some computers form a wholesaler for a total of Kshs 1,800,000. Before the retailer could buy the computers the price per unit was reduced by Kshs 4,000. This reduction in price enabled the retailer to buy five more computers using the same amount of money as originally planned.

(a)        Determine the number of computers the retailer bought

(b)        Two of the computers purchased got damaged while in store, the rest were sold and the retailer made a 15% profit Calculate the profit made by the retailer on each computer sold

 

  1. The figure below is a sketch of the graph of the quadratic function y = k

( x+1) (x-2)

 

 

 

 

 

 

Find the value of k

  1. (a) Draw the graph of y= x2 – 2x + 1 for values -2 ≤ x ≤ 4

(b) Use the graph to solve the equations x2 – 4= 0 abd line y = 2x +5

 

  1. (a) Draw the  graph  of y = x3 + x2 – 2x for -3≤ x ≤ 3 take scale of 2cm to

represent 5 units as the horizontal axis

(b)        Use the graph to solve x3 + x 2 – 6 -4 = 0 by drawing a suitable linear graph on the same axes.

 

  1. Solve graphically the simultaneous equations 3x – 2y = 5 and 5x + y = 17

 

 

TOPIC 2

APPROXIMATION AND ERRORS

PAST KCSE QUESTIONS ON THE TOPIC

  1. (a) Work out the exact value of R =               1_________                

0.003146 – 0.003130

(b)        An approximate value of R may be obtained by first correcting each of the decimal in the denominator to 5 decimal places

  • The approximate value

(ii)        The error introduced by the approximation

  1. The radius of circle is given as 2.8 cm to 2 significant figures
  • If C is the circumference of the circle, determine the  limits between which C/π lies
  • By taking ∏ to be 3.142, find, to 4 significant figures the line between which the circumference lies.
  1. The length and breath of a rectangular floor were measured and found to be 4.1 m and 2.2 m respectively. If possible error of 0.01 m was made in each of the measurements, find the:
  • Maximum and minimum possible area of the floor
  • Maximum possible wastage in carpet ordered to cover the whole floor
  1. In this question Mathematical Tables should not be used

The base and perpendicular height of a triangle measured to the nearest centimeter

are 6 cm and 4 cm respectively.

 

Find

(a) The absolute error in calculating the area of the triangle

(b) The percentage error in the area, giving the answer to 1 decimal place

  1. By correcting each number to one significant figure, approximate the value of 788 x 0.006. Hence calculate the percentage error arising from this approximation.
  2. A rectangular block has a square base whose side is exactly 8 cm. Its height measured to the nearest millimeter is 3.1 cm

Find in cubic centimeters, the greatest possible error in calculating its volume.

  1. Find the limits within the area of a parallegram whose base is 8cm and height is 5 cm lies. Hence find the relative error in the area
  2. Find the minimum possible perimeter of a regular pentagon whose side is 15.0cm.
  3. Given the number 0.237

(i)         Round off to two significant figures and find the round off error

(ii)        Truncate to two significant figures and find the truncation error

  1. The measurements a = 6.3, b= 15.8, c= 14.2 and d= 0.00173 have maximum possible errors of 1%, 2%, 3% and 4% respectively. Find the maximum possible percentage error in ad/bc correct to 1sf.

 

TOPIC 3

TRIGONOMETRY 1

PAST KCSE QUESTIONS ON THE TOPIC 1

  1. Solve the equation

Sin 5 θ = –1 for 00 ≤ 0 ≤ 1800

2         2

  1. Given that sin θ = 2/3 and is an acute angle find:
  • Tan θ giving your answer in surd form
  • Sec2 θ
  1. Solve the equation 2 sin2(x-300) = cos 600 for – 1800 ≤ x ≤ 1800
  2. Given that sin (x + 30)0 = cos 2x0for 00, 00 ≤ x ≤900 find the value of x. Hence find the value of cos 23x0.
  3. Given that sin a =1 where a is an acute angle find, without using

√5

Mathematical tables

(a) Cos a in the form of a√b, where a and b are rational numbers

(b) Tan (900 – a).

  1. Give that xo is an angle in the first quadrant such that 8 sin2 x + 2 cos x -5=0

Find:

  1. a) Cos x
  2. b) tan x
  3. Given that Cos 2x0 = 0.8070, find x when 00 ≤ x ≤ 3600

8          The figure below shows a quadrilateral ABCD in which AB = 8 cm, DC = 12 cm, < BAD = 450, < CBD = 900 and BCD = 300.

 

 

 

 

 

 

Find:

(a)        The length of BD

(b)        The size of the angle ADB

 

  1. The diagram below represents a school gate with double shutters. The shutters are such opened through an angle of 630.

The edges of the gate, PQ and RS are each 1.8 m

 

 

 

 

 

 

 

 

Calculate the shortest distance QS, correct to 4 significant figures

  1. The figure below represents a quadrilateral piece of land ABCD divided into three triangular plots. The lengths BE and CD are 100m and 80m respectively. Angle ABE = 300 ÐACE = 450 and Ð ACD = 1000

 

 

 

(a)  Find to four significant figures:

(i)         The length of AE

(ii)        The length of AD

(iii)       The perimeter of the piece of land

 

(b) The plots are to be fenced with five strands of barbed wire leaving an entrance of 2.8 m wide to each plot. The type of barbed wire to be used is sold in rolls of lengths 480m. Calculate the number of rolls of barbed wire that must be bought to complete the fencing of the plots.

  1. Given that x is an acute angle and cos x = 2Ö 5, find without using mathematical

5

tables or a calculator, tan ( 90 – x)0.

 

 

  1. In the figure below ÐA = 620, ÐB = 410, BC = 8.4 cm and CN is the bisector of ÐACB.

 

 

 

 

Calculate the length of CN to 1 decimal place.

  1. In the diagram below PA represents an electricity post of height 9.6 m. BB and RC represents two storey buildings of heights 15.4 m and 33.4 m respectively. The angle of depression of A from B is 5.50 While the angle of elevation of C from B is 30.50 and BC = 35m.

 

 

 

 

 

 

(a)        Calculate, to the nearest metre, the distance AB

(b)        By scale drawing find,

(i)         The distance AC in metres

(ii)        Ð BCA and hence determine the angle of depression of A from C

 

TOPIC 4

SURDS AND FURTHER LOGARITHM

PAST KCSE QUESTIONS ON THE TOPIC

  1. Without using logarithm tables, find the value of x in the equation

Log x3 + log 5x = 5 log2 – log 2                                                                                                                                 5

  1. Simplify (1 ÷ √3) (1 – √3)

Hence evaluate            1          to 3 s.f. given that √3 = 1.7321

1 + √3

  1. If √14      –      √ 14        =  a√7 + b√2

√7-√2         √ 7 + √ 2

Find the values of a and b where a and b are rational numbers.

  1. Find the value of x in the following equation 49(x+1) + 7(2x) = 350
  2. Find x if 3 log 5 + log x2 = log 1/125
  3. Simplify as far as possible leaving your answer inform of a surd

            1            –                   1                              

√14   – 2 √3                   √14 + 2 √3

  1. Given that tan 750 = 2 + √3, find without using tables tan 150 in the form p+q√m, where p, q and m are integers.
  2. Without using mathematical tables, simplify

 

 

63        +          72

32        +          28

  1. Simplify  +   1   leaving the answer in the form a + b Öc, where a, b and c

Ö5 -2    Ö5

are rational numbers

 

  1. Given that P = 3y express the questions 32y -1) + 2 x 3(y-1) = 1 in terms of P

Hence or otherwise find the value of y in the equation: 3(2y-1) + 2 x 3(y-1) =1

 

  1. Solve for (log3x)2 – ½ log3x = 3/2

 

  1. Find the values of x which satisfy the equation 52x – 6 (5x) + 5 =0

 

  1. Solve the equation

Log (x + 24) – 2 log 3 = log (9-2x)

 

 

 

TOPIC 5

COMMERCIAL ARITHMETIC

PAST KCSE QUESTIONS ON THE TOPIC

  1. A business woman opened an account by depositing Kshs. 12,000 in a bank on 1st July 1995. Each subsequent year, she deposited the same amount on 1st July. The bank offered her 9% per annum compound interest. Calculate the total amount in her account on

(a)        30th June 1996

(b)        30th June 1997

  1. A construction company requires to transport 144 tonnes of stones to sites A and
  2. The company pays Kshs 24,000 to transport 48 tonnes of stone for every 28
  3. Kimani transported 96 tonnes to a site A, 49 km away.

(a)        Find how much he paid

(b)        Kimani spends Kshs 3,000 to transport every 8 tonnes of stones to site.

Calculate his total profit.

(c)        Achieng transported the remaining stones to sites B, 84 km away. If she made 44% profit, find her transport cost.

 

  1. The table shows income tax rates
Monthly taxable pay Rate of tax Kshs in 1 K£
1 – 435

436 – 870

871-1305

1306 – 1740

Excess Over 1740

2

3

4

5

6

 

A company employee earn a monthly basic salary of Kshs 30,000 and is also given taxable allowances amounting to Kshs 10, 480.

(a)        Calculate the total income tax

(b)        The employee is entitled to a personal tax relief of Kshs 800 per month.

Determine the net tax.

(c)        If the employee received a 50% increase in his total income, calculate the

corresponding percentage increase on the income tax.

  1. A house is to be sold either on cash basis or through a loan. The cash price is Kshs.750, 000. The loan conditions area as follows: there is to be down payment

of 10% of the cash price and the rest of the money is to be paid through a loan

at 10% per annum compound interest.

A customer decided to buy the house through a loan.

  1. a) (i)         Calculate the amount of money loaned to the customer.

(ii)        The customer paid the loan in 3 year’s. Calculate the total amount

paid for the house.

  1. b) Find how long the customer would have taken to fully pay for the house

if she paid a total of Kshs 891,750.

  1. A businessman obtained a loan of Kshs. 450,000 from a bank to buy a matatu valued at the same amount. The bank charges interest at 24% per annum compound quarterly
  2. a) Calculate the total amount of money the businessman paid to clear the loan in 1 ½ years.
  3. b) The average income realized from the matatu per day was Kshs. 1500. The matatu worked for 3 years at an average of 280 days year. Calculate the total income from the matatu.
  4. c) During the three years, the value of the matatu depreciated at the rate of 16% per annum. If the businessman sold the matatu at its new value, calculate the total profit he realized by the end of three years.
  5. A bank either pays simple interest as 5% p.a or compound interest 5% p.a on deposits. Nekesa deposited Kshs P in the bank for two years on simple interest terms. If she had deposited the same amount for two years on compound interest terms, she would have earned Kshs 210 more.

Calculate without using Mathematics Tables, the values of P

  1. (a) A certain sum of money  is deposited in  a bank that pays simple interest at

a certain rate. After 5 years the total amount of money in an account is Kshs 358 400. The interest earned each year is 12 800

Calculate

  • The amount of money which was deposited (2mks)
  • The annual rate of interest that the  bank  paid                     (2mks)

(b)        A computer whose marked price is Kshs 40,000 is sold at Kshs 56,000 on hire purchase terms.

(i)         Kioko bought the computer on hire purchase term. He paid a deposit of 25% of the hire purchase price and cleared the balance by equal monthly installments of Kshs 2625. Calculate the number of installments     (3mks)

(ii)        Had Kioko bought the computer on cash terms he would have been allowed a discount of 12 ½ % on marked price. Calculate the difference between the cash price and the hire purchase price and express as a percentage of the cash price

(iii)       Calculate the difference between the cash price and hire purchase price and express it as a percentage of the cash price.

  1. The table below is a part of tax table for monthly income for the year 2004

 

Monthly taxable income

In ( Kshs)

Tax rate percentage

(%) in each shillings

Under Kshs 9681 10%
From Kshs 9681 but under 18801 15%
From Kshs 18801 but 27921 20%

In the tax year 2004, the tax of Kerubo’s monthly income was Kshs 1916.

Calculate Kerubo’s monthly income

  1. The cash price of a T.V set is Kshs 13, 800. A customer opts to buy the set on hire purchase terms by paying a deposit of Kshs 2280.

If simple interest of 20 p. a is charged on the balance and the customer is required to repay by 24 equal monthly installments. Calculate the amount of each installment.

  1. A plot of land valued at Kshs. 50,000 at the start of 1994.

Thereafter, every year, it appreciated by 10% of its previous years value find:

(a)        The value of the land at the start of 1995

(b)        The value of the land at the end of 1997

 

  1. The table below shows Kenya tax rates in a certain year.

 

Income K £ per annum Tax rates Kshs per K £
1- 4512 2
4513 – 9024 3
9025 – 13536 4
13537 – 18048 5
18049 – 22560 6
Over 22560 6.5

 

In that year Muhando earned a salary of Kshs. 16510 per month. He was entitled to a monthly tax relief of Kshs. 960

Calculate

(a)        Muhando’s annual salary in K £

(b)        (i)         The monthly tax paid by Muhando in Kshs

  1. A tailor intends to buy a sewing machine which costs Kshs 48,000. He borrows the money from a bank. The loan has to be repaid at the end of the second year. The bank charges an interest at the rate of 24% per annum compounded half yearly. Calculate the total amount payable to the bank.

 

  1. The average rate of depreciation in value of a water pump is 9% per annum. After three complete years its value was Kshs 150,700. Find its value at the start of the three year period.

 

  1. A water pump costs Kshs 21600 when new, at the end of the first year its value depreciates by 25%. The depreciation at the end of the second year is 20% and thereafter the rate of depreciation is 15% yearly. Calculate the exact value of the water pump at the end of the fourth year.

 

 

 

TOPIC 6

CIRCLES, CHORDS AND TANGENTS

PAST KCSE QUESTIONS ON THE TOPIC

  1. The figure below represents a circle a diameter 28 cm with a sector subtending an angle of 750 at the centre.

 

 

 

 

Find the area of the shaded segment to 4 significant figures

(a) <PST

  1. The figure below represents a rectangle PQRS inscribed in a circle centre 0 and radius 17 cm. PQ = 16 cm.

 

 

 

 

 

Calculate

  • The length PS of the rectangle
  • The angle POS
  • The area of the shaded region

 

  1. In the figure below, BT is a tangent to the circle at B. AXCT and BXD are

straight lines. AX = 6 cm, CT = 8 cm, BX = 4.8 cm and XD = 5 cm.

 

 

 

 

Find the length of

(a) XC

(b) BT

  1. The figure below shows two circles each of radius 7 cm, with centers at X and Y. The circles touch each other at point Q.

 

 

 

 

 

 

 

 

Given that <AXD = <BYC = 1200 and lines AB, XQY and DC are parallel, calculate the area of:

  1. a) Minor sector XAQD (Take π 22/7)
  2. b) The trapezium XABY
  3. c) The shaded regions.
  4. The figure below shows a circle, centre, O of radius 7 cm. TP and TQ are tangents to the circle at points P and Q respectively. OT =25 cm.

 

 

 

 

Calculate the length of the chord PQ

  1. The figure below shows a circle centre O and a point Q which is outside the circle

 

 

Using a ruler and a pair of compasses, only locate a point on the circle such that angle OPQ = 90o

  1. In the figure below, PQR is an equilateral triangle of side 6 cm. Arcs QR, PR and PQ arcs of circles with centers at P, Q and R respectively.

 

 

 

 

 

Calculate the area of the shaded region to 4 significant figures

  1. In the figure below AB is a diameter of the circle. Chord PQ intersects AB at N. A tangent to the circle at B meets PQ produced at R.

 

 

 

 

 

 

 

 

 

 

Given that PN = 14 cm, NB = 4 cm and BR = 7.5 cm, calculate the length of:

(a)        NR

(b)        AN

 

 

 

TOPIC 7

MATRICES

PAST KCSE QUESTIONS ON THE TOPIC

  1. A and B are two matrices. If A = 1     2     find B given that A2 = A + B

4      3

  1. Given that A= 1 3  , B= 3   1  , C = p   0    and AB =BC, determine the value of P

5   3          5  -1           0    q

  1. A matrix A is given by A = x 0

5 y

  1. a) Determine A2

 

 

1   0    ,

0   1

  1. b) If A2 = determine the possible pairs of values of x and y
  2. (a) Find the inverse of the matrix   9   8

7    6

(b)        In a certain week a businessman bought 36 bicycles and 32 radios for total of Kshs 227 280. In the following week, he bought 28 bicycles and 24 radios for a total of Kshs 174 960. Using matrix method, find the price of each bicycle and each radio that he bought

 

(c)        In the third week, the price of each bicycle was reduced by 10% while the price of each radio was raised by 10%. The businessman bought as many bicycles and as many radios as he had bought in the first two weeks.

Find by matrix method, the total cost of the bicycles and radios that the businessman bought in the third week.

 

 

  1. Determine the inverse T-1 of the matrix 1    2

1   -1

Hence find the coordinates to the point at which the two lines x + 2y=7 and x-y=1

 

  1. Given that A = 0       -1         and B =   -1     0

3       2                         2      -4

Find the value of x if

(i)         A – 2x = 2B

(ii)        3x – 2A = 3B

(iii)       2A – 3B = 2x

  1. Find the non- zero value of k for which k + 1          2      is an inverse.

4k               2k

  1. A clothes dealer sold 3 shirts and 2 trousers for Kshs. 840 and 4 shirts and 5 trousers for Kshs 1680. Form a matrix equation to represent the above information. Hence find the cost of 1 shirt and the cost of 1 trouser.

 

 

TOPIC 8

FORMULAE AND VARIATIONS

PAST KCSE QUESTIONS ON THE TOPIC

  1. The volume Vcm3 of an object is given by

 

V = 2 π r3    1 – 2

3          sc2

 

Express in term of π r, s and V

  1. Make V the subject of the formula

T = 1 m (u2 – v2)

2

  1. Given that y =b – bx2 make x the subject

cx2 – a

  1. Given that log y = log (10n) make n the subject
  2. A quantity T is partly constant and partly varies as the square root of S.
    1. Using constants a and b, write down an equation connecting T and S.
    2. If S = 16, when T = 24 and S = 36 when T = 32,  find  the values of the constants a and b,
    3. A quantity P is partly constant and partly varies inversely as a quantity q, given that p = 10 when q = 1.5 and p = 20, when q = 1.25, find the value of p when q= 0.5

 

  1. Make y the subject of the formula p = xy

x-y

  1. Make P the subject of the formula

P2 = (P – q) (P-r)

  1. The density of a solid spherical ball varies directly as its mass and inversely as the cube of its radius

When the mass of the ball is 500g and the radius is 5 cm, its density is 2 g per cm3

Calculate the radius of a solid spherical ball of mass 540 density of 10g per cm3

  1. Make s the subject of the formula

 

 

√P = r     1 – as2

  1. The quantities t, x and y are such that t varies directly as x and inversely as the  square root of y. Find the percentage  in t if x decreases by 4% when y  increases  by 44%
  2. Given that y is inversely proportional to xn and k as the constant of proportionality;

(a)        (i)         Write down a formula connecting y, x, n and k

(ii)        If x = 2 when y = 12 and x = 4 when y = 3, write down two expressions for k in terms of n.

Hence, find the value of n and k.

(b)        Using the value of n obtained in (a) (ii) above, find y when x = 5 1/3

 

  1. The electrical resistance, R ohms of a wire of a given length is inversely proportional to the square of the diameter of the wire, d mm. If R = 2.0 ohms when d = 3mm. Find the vale R when d = 4 mm.

 

  1. The volume Vcm3 of a solid depends partly on r and partly on r where rcm is one of the dimensions of the solid.

When r = 1, the volume is 54.6 cm3 and when r = 2, the volume is 226.8 cm3

(a) Find an expression for V in terms of r

(b) Calculate the volume of the solid when r = 4

(c) Find the value of r for which the two parts of the volume are equal

 

  1. The mass of a certain metal rod varies jointly as its length and the square of its radius. A rod 40 cm long and radius 5 cm has a mass of 6 kg. Find the mass of a similar rod of length 25 cm and radius 8 cm.

 

  1. Make x the subject of the formula

P =       xy

z + x

  1. The charge c shillings per person for a certain service is partly fixed and partly inversely proportional to the total number N of people.

(a)        Write an expression for c in terms on N

(b)        When 100 people attended the charge is Kshs 8700 per person while for 35 people the charge is Kshs 10000 per person.

(c)        If a person had paid the full amount charge is refunded. A group of people paid but ten percent of organizer remained with Kshs 574000.

Find the number of people.

 

  1. Two variables A and B are such that A varies partly as B and partly as the square root of B given that A=30, when B=9 and A=16 when B=14, find A when B=36.

 

  1. Make p the subject of the formula

A =      -EP     

√P2 + N

 

 

 

 

TOPIC 9

SEQUENCE AND SERIES

PAST KCSE QUESTIONS ON THE TOPIC

  1. The first, the third and the seventh terms of an increasing arithmetic progression are three consecutive terms of a geometric progression. In the first term of the arithmetic progression is 10 find the common difference of the arithmetic progression.
  2. Kubai saved Kshs 2,000 during the first year of employment. In each subsequent year, he saved 15% more than the preceding year until he retired.

(a) How much did he save in the second year?

(b) How much did he save in the third year?

(c) Find the common ratio between the savings in two consecutive years

  • How many years did he take to save the savings a sum of Kshs 58,000?

(e) How much had he saved after 20 years of service?

  1. In geometric progression, the first is a and the common ratio is r. The sum of the first two terms is 12 and the third term is 16.
  • Determine the ratio ar2

a + ar

(b) If the first term is larger than the second term, find the value of r.

  1. (a) The first term of an arithmetic progression is 4 and the last term is 20. The

sum of the term is 252. Calculate the number of terms and the common differences of the arithmetic progression

(b)        An Experimental culture has an initial population of 50 bacteria. The population increased by 80% every 20 minutes. Determine the time it will take to have a population of 1.2 million bacteria.

  1. Each month, for 40 months, Amina deposited some money in a saving scheme. In the first month she deposited Kshs 500. Thereafter she increased her deposits by Kshs. 50 every month.

Calculate the:

  1. a) Last amount deposited by Amina
  2. b) Total amount Amina had saved in the 40 months.
  3. A carpenter wishes to make a ladder with 15 cross- pieces. The cross- pieces are to diminish uniformly in length from 67 cm at the bottom to 32 cm at the top.

Calculate the length in cm, of the seventh cross- piece from the bottom

 

  1. The second and fifth terms of a geometric progression are 16 and 2 respectively. Determine the common ratio and the first term.

 

  1. The eleventh term of an arithmetic progression is four times its second term. The sum of the first seven terms of the same progression is 175

(a)        Find the first term and common difference of the progression

(b)        Given that pth term of the progression is greater than 124, find the least

value of P

  1. The nth term of sequence is given by 2n + 3 of the sequence

(a)        Write down the first four terms of the sequence

(b)        Find sn the sum of the fifty term of the sequence

(c)        Show that the sum of the first n terms of the sequence is given by

Sn = n2 + 4n

Hence or otherwise find the largest integral value of n such that Sn <725

 

TOPIC 10

VECTORS

PAST KCSE QUESTIONS ON THE TOPIC

  1. The figure below is a right pyramid with a rectangular base ABCD and VO as the height. The vectors AD= a, AB = b and DV = v

 

 

 

 

  1. Express

(i)         AV in terms of a and c

(ii)        BV in terms of a, b and c

(b)  M is point on OV such that OM: MV=3:4, Express BM in terms of a, b and c.

Simplify your answer as far as possible

  1. In triangle OAB, OA = a OB = b and P lies on AB such that AP: BP = 3.5
  • Find the terms of a and b the vectors
  • AB
  • AP
  • BP
  • OP
  • Point Q is on  OP such AQ = -5 + 9

8a  40b

Find the ratio OQ: QP

  1. The figure below shows triangle OAB in which M divides OA in the ratio 2: 3 and N divides OB in the ratio 4:1 AN and BM intersect at X

 

 

 

 

 

 

(a) Given that OA = a and OB = b, express in terms of a and b:

(i)         AN

(ii)        BM

(b) If AX = s AN and BX = tBM, where s and t are constants, write two expressions

for OX in terms of a,b s and t

Find the value of s

Hence write OX in terms of a and b

  1. The position vectors for points P and Q are 4 I + 3 j + 6 j + 6 k respectively. Express vector PQ in terms of unit vectors I, j and k. Hence find the length of PQ, leaving your answer in simplified surd form.
  2. In the figure below, vector OP = P and OR =r. Vector OS = 2r and OQ = 3/2p.

 

 

 

  1. a) Express in terms of p and r (i) QR and (ii) PS
  2. b) The lines QR and PS intersect at K such that QK = m QR and PK = n PS, where m and n are scalars. Find two distinct expressions for OK in terms of p,r,m and n. Hence find the values of m and n.
  3. c) State the ratio PK: KS
  4. Point T is the midpoint of a straight line AB. Given the position vectors of A and T are i-j + k and 2i+ 1½ k respectively, find the position vector of B in terms of  i, j  and k
  5. A point R divides a line PQ internally in the ration 3:4. Another point S, divides the line PR externally in the ration 5:2. Given that PQ = 8 cm, calculate the length of RS, correct to 2 decimal places.
  6. The points P, Q, R and S have position vectors 2p, 3p, r and 3r respectively, relative to an origin O. A point T divides PS internally in the ratio 1:6

(a)        Find, in the simplest form, the vectors OT and QT in terms p and r

(b)        (i)         Show that the  points Q, T, and R lie on a straight line

(ii)        Determine the ratio in which T divides QR

  1. Two points P and Q have coordinates (-2, 3) and (1, 3) respectively. A translation map point P to P’ (10, 10)
  • Find the coordinates of Q’  the image of Q under the translation
  • The position vector of P and Q in (a) above are p and q respectively given that mp – nq = -12

9

Find the value of m and n

  1. Given that q i + 1/3 j + 2/3 k is a unit vector, find q
  2. In the diagram below, the coordinates of points A and B are (1, 6) and (15, 6) respectively). Point N is on OB such that 3 ON = 2 OB. Line OA is produced to L such that OL = 3 OA

 

 

 

 

 

 

 

(a) Find vector LN

(b) Given that a point M is on LN such that LM: MN = 3: 4, find the coordinates of M

(c) If line OM is produced to T such that OM: MT = 6:1

(i)         Find the position vector of T

(ii)        Show that points L, T and B are collinear

  1. In the figure below, OQ = q and OR = r. Point X divides OQ in the ratio 1: 2 and Y divides OR in the ratio 3: 4 lines XR and YQ intersect at E.

 

 

 

 

  • Express in terms of q and r

(i)         XR

(ii)        YQ

(b) If XE = m XR and YE = n YQ, express OE in terms of:

(i)         r, q and m

(ii)        r, q and n

(c) Using the results in (b) above, find the values of m and n.

  1. Vector q has a magnitude of 7 and is parallel to vector p. Given that

p= 3 i –j + 1 ½ k, express vector q in terms of i, j, and k.

 

  1. In the figure below, OA = 3i + 3j ABD OB = 8i – j. C is a point on AB such that AC:CB 3:2, and D is a point such that OB//CD  and 2OB = CD (T17)

 

 

 

 

Determine the vector DA in terms of I and j

  1. In the figure below, KLMN is a trapezium in which KL is parallel to NM and KL = 3NM

 

 

 

 

Given that KN = w, NM = u and ML = v. Show that 2u = v + w

  1. The points P, Q and R lie on a straight line. The position vectors of P and R are 2i + 3j + 13k and 5i – 3j + 4k respectively; Q divides SR internally in the ratio 2: 1. Find the

(a) Position vector of Q

(b) Distance of Q from the origin

  1. Co-ordinates of points O, P, Q and R are (0, 0), (3, 4), (11, 6) and (8, 2) respectively. A point T is such that the vector OT, QP and QR satisfy the vector equation OT = QP ½ QT. Find the coordinates of T.

 

  1. In the figure below OA = a, OB = b, AB = BC and OB: BD = 3:1

 

 

 

 

 

 

(a)        Determine

(i)         AB in terms of a and b

(ii)        CD, in terms of a and b

(b)        If CD: DE = 1 k and OA: AE = 1m determine

(i)         DE in terms of a, b and k

(ii)        The values of k and m

  1. The figure below shows a grid of equally spaced parallel lines

 

 

 

 

 

 

 

AB = a and BC = b

(a)        Express

(i)         AC in terms of a and b

(ii)        AD in terms of a and b

(b)        Using triangle BEP, express BP in terms of a and b

(c)       PR produced meets BA produced at X and PR = 1/9b – 8/3a

By writing PX as kPR and BX as hBA and using the triangle BPX determine the ratio PR: RX

 

  1. The position vectors of points x and y are x = 2i + j – 3k and y = 3i + 2j – 2k respectively. Find XY

 

  1. Given that X = 2i + j -2K, y = -3i + 4j – k and z= 5i + 3j + 2k and that p= 3x – y + 2z, find the magnitude of vector p to 3 significant figures.

TOPIC 11

BINOMIAL EXPRESSION

PAST KCSE QUESTIONS ON THE TOPIC

  1. (a) Write down the simplest expansion ( 1 + x)6

(b)        Use the expansion up to the fourth term to find the value of (1.03)6 to the nearest one thousandth.

  1. Use binomial expression to evaluate (0.96)5 correct to 4 significant figures.
  2. Expand and simplify (3x – y)4 hence use the first three terms of the expansion to proximate the value of (6 – 0.2)4
  3. Abdi and Amoit were employed at the begging of the same year. Their annual salaries in shillings progressed as follows

Abdi: 60000, 64800, 69600

Amoit: 60000, 64800, 69984

(a)        Calculate Abdi’s annual salary increment and hence write down an

expression for his annual salary in his nth year of employment?

(b)        Calculate Amoit’s annual percentage rate of salary increment and hence write down an expression for her annual salary in her nth year employment?

(c)        Calculate the difference in the annual salary for Abdi and Amoit in their 7th year of employment.

  1. Use binomial expression to evaluate

2 + 1    5   +       2 –  1   5

√2                      √2

  1. (a) Expand the expression 1 + 1x    5  in ascending powers of x, leaving

2

the coefficients as fractions in their simplest form.

(b)        Use the first three terms of the expression in (a) above to estimate the value of       1 1      5

20

  1. (a) Expand (a- b)6

(b)        Use the first three terms of the expansion in (a) above to find the approximate value of (1.98)6

 

  1. Expand (2 + x)5 in ascending powers of x up to the term in x3 hence approximate  the value of (2.03)5 to 4 s.f

 

  1. (a) Expand (1 + x)5

Hence use the expansion to estimate (1.04)5 correct to 4 decimal places

(b)        Use the expansion up to the fourth term to find the value of (1.03)6 to the nearest one thousandth.

 

  1. Expand and Simplify (1-3x)5 up to the term in x3

Hence use your expansion to estimate (0.97)5 correct to decimal places.

 

  1. Expand (1 + a)5

Use your expansion to evaluate (0.8)5 correct to four places of decimal

 

  1. (a) Expand (1 + x)5

(b)        Use the first three terms of the expansion in (a) above to find the approximate value of (0.98)5

 

 

 

 

TOPIC 12

PROBABILITY

PAST KCSE QUESTIONS ON THE TOPIC

  1. The probabilities that a husband and wife will be alive 25 years from now are 0.7 and 0.9 respectively.

Find the probability that in 25 years time,

  • Both will be alive
  • Neither will be alive
  • One will be alive
  • At least one will be alive
  1. A bag contains blue, green and red pens of the same type in the ratio 8:2:5 respectively. A pen is picked at random without replacement and its colour noted

(a)        Determine the probability that the first pen picked is

(i)         Blue

(ii)        Either green or red

(b)        Using a tree diagram, determine the probability that

(i)         The first two pens picked are both green

(ii)        Only one of the first two pens picked is red.

  1. A science club is made up of boys and girls. The club has 3 officials. Using a tree diagram or otherwise find the probability that:

(a) The club officials are all boys

(b) Two of the officials are girls

  1. Two baskets A and B each contain a mixture of oranges and limes, all of the same size. Basket A contains 26 oranges and 13 limes. Basket B contains 18 oranges and 15 limes. A child selected a basket at random and picked a fruit at a random from it.

(a)        Illustrate this information by a probabilities tree diagram

(b)        Find the probability that the fruit picked was an orange.

  1. In form 1 class there are 22 girls and boys. The probability of a girl completing the secondary education course is 3 whereas that of a boy is 2/3

(a)        A student is picked at random from class. Find the possibility that,

  • The student picked is a boy and will complete the course
  • The student picked will complete the course

(b)        Two students are picked at random. Find the possibility that they are a boy

and a girl and that both will not complete the course.

  1. Three representatives are to be selected randomly from a group of 7 girls and 8

boys. Calculate the probability of selecting two girls and one boy.

  1. A poultry farmer vaccinated 540 of his 720 chickens against a disease. Two months later, 5% of the vaccinated and 80% of the unvaccinated chicken, contracted the disease. Calculate the probability that a chicken chosen random contacted the disease.
  2. The probability of three darts players Akinyi, Kamau, and Juma hitting the bulls eye are 0.2, 0.3 and 1.5 respectively.

(a)        Draw a probability tree diagram to show the possible outcomes

(b)        Find the probability that:

(i)         All hit the bull’s eye

(ii)        Only one of them hit the bull’s eye

(iii)       At most one missed the bull’s eye

  1. (a) An unbiased coin with two faces, head (H)  and tail (T), is tossed three

times, list all the possible outcomes.

Hence determine the probability of getting:

(i)         At least two heads

(ii)        Only one tail

(b)        During a certain motor rally it is predicted that the weather will be either dry (D) or wet (W). The probability that the weather will be dry is estimated to be 7/10. The probability for a driver to complete (C) the rally during the dry weather is estimated to be 5/6. The probability for a driver to complete the rally during wet weather is estimated to be 1/10.  Complete the probability tree diagram given below.

 

 

 

 

 

 

 

 

What is the probability that:

(i)         The driver completes the rally?

(ii)        The weather was wet and the driver did not complete the rally?

  1. There are three cars A, B and C in a race. A is twice as likely to win as B while B is twice as likely to win as c. Find the probability that.
  2. a) A wins the race
  3. b) Either B or C wins the race.
  4. In the year 2003, the population of a certain district was 1.8 million. Thirty per cent of the population was in the age group 15 – 40 years. In the same year, 120,000 people in the district visited the Voluntary Counseling and Testing (VCT) centre for an HIV test.

If a person was selected at random from the district in this year. Find the probability that the person visited a VCT centre and was in the age group 15 – 40 years.

  1. (a) Two integers x and y are selected at random from the integers 1 to 8. If the

same integer may be selected twice, find the probability that

  • |x – y| = 2
  • |x – y| is 5 or more

(iii)       x>y

(b)        A die is biased so that when tossed, the probability of a number r showing up, is given by p ® = Kr where K is a constant and r = 1, 2,3,4,5 and 6 (the number on the faces of the die

(i)         Find the value of K

(ii)        If the die is tossed twice, calculate the probability that the total

score is 11

  1. Two bags A and B contain identical balls except for the colours. Bag A contains 4 red balls and 2 yellow balls. Bag B contains 2 red balls and 3 yellow balls.
    • If a ball is drawn at random from each bag, find the probability that both balls are of the same colour.
    • If two balls are drawn at random from each bag, one at a time without replacement, find the probability that:

(i)         The two balls drawn from bag A or bag B are red

(ii)        All the four balls drawn are red

 

  1. During inter – school competitions, football and volleyball teams from Mokagu high school took part. The probability that their football and volleyball teams would win were 3/8 and 4/7 respectively.

Find the probability that

(a)        Both their football and volleyball teams

(b)        At least one of their teams won

 

  1. A science club is made up of 5 boys and 7 girls. The club has 3 officials. Using a tree diagram or otherwise find the probability that:

(a)        The club officials are all boys

(b)        Two of the officials are girls

 

  1. Chicks on Onyango’s farm were noted to have either brown feathers brown or black tail feathers. Of those with black feathers 2/3 were female while 2/5 of those with brown feathers were male. Otieno bought two chicks from Onyango. One had black tail feathers while the other had brown find the probability that Otieno’s chicks were not of the same gender

 

  1. Three representatives are to be selected randomly from a group of 7 girls and 8 boys. Calculate the probability of selecting two girls and one boy
  2. The probability that a man wins a game is ¾. He plays the game until he wins. Determine the probability that he wins in the fifth round.

 

  1. The probability that Kamau will be selected for his school’s basketball team is ¼. If he is selected for the basketball team. Then the probability that he will be selected for football is 1/3 if he is not selected for basketball then the probability that he is selected for football is 4/5. What is the probability that Kamau is selected for at least one of the two games?

 

  1. Two baskets A and B each contains a mixture of oranges and lemons. Baskets A contains 26 oranges and 13 lemons. Baskets B contains 18 oranges and 15 lemons. A child selected a basket at random and picked at random a fruit from it. Determine the probability that the fruit picked was an orange.

 

 

TOPIC 13

COMPOUND PROPORTION AND MIXTURES

PAST KCSE QUESTIONS ON THE TOPIC

  1. Akinyi bought and beans from a wholesaler. She then mixed the maize and beans the ratio 4:3 she brought the maize as Kshs. 12 per kg and the beans 4 per kg. If she was to make a profit of 30% what should be the selling price of 1 kg of the mixture?
  2. A rectangular tank of base 2.4 m by 2.8 m and a height of 3 m contains 3,600 liters of water initially. Water flows into the tank at the rate of 0.5 litres per second

Calculate the time in hours and minutes, required to fill the tank

  1. A company is to construct a parking bay whose area is 135m2. It is to be covered with concrete slab of uniform thickness of 0.15. To make the slab cement. Ballast and sand are to be mixed so that their masses are in the ratio 1: 4: 4. The mass of m3 of dry slab is 2, 500kg.

Calculate

(a)        (i)         The volume of the slab

(ii)        The mass of the dry slab

(iii)       The mass of cement to be used

(b)        If one bag of the cement is 50 kg, find the number of bags to be purchased

  •      If a lorry carries 7 tonnes of sand, calculate the number of lorries of sand

to be purchased.

  1. The mass of a mixture A of beans and maize is 72 kg. The ratio of beans to maize

is 3:5 respectively

(a)        Find the mass of maize in the mixture

(b)        A second mixture of B of beans and maize of mass 98 kg in mixed with A. The final ratio of beans to maize is 8:9 respectively. Find the ratio of beans to maize in B

  1. A retailer bought 49 kg of grade 1 rice at Kshs. 65 per kilogram and 60 kg of grade II rice at Kshs 27.50 per kilogram. He mixed the tow types of rice.
  • Find the buying price of one kilogram of the mixture
  • He packed the mixture into 2 kg packets
    • If he intends to make a 20% profit find the selling price per packet
    • He sold 8 packets and then reduced the price by 10% in order to attract customers. Find the new selling price per packet.
    • After selling 1/3 of the remainder at reduced price, he raised the price so as to realize the original goal of 20% profit overall. Find the selling price per packet of the remaining rice.
  1. A trader sells a bag of beans for Kshs 1,200. He mixed beans and maize in the ration 3: 2. Find how much the trader should he sell a bag of the mixture to realize the same profit?
  2. Pipe A can fill an empty water tank in 3 hours while, pipe B can fill the same tank in 6 hours, when the tank is full it can be emptied by pipe C in 8 hours. Pipes A and B are opened at the same time when the tank is empty.

If one hour later, pipe C is also opened, find the total time taken to fill the tank

  1. A solution whose volume is 80 litres is made 40% of water and 60% of alcohol. When litres of water are added, the percentage of alcohol drops to 40%

(a)        Find the value of x

(b)        Thirty litres of water is added to the new solution. Calculate the percentage

(c)        If 5 litres of the solution in (b) is added to 2 litres of the original solution, calculate in the simplest form, the ratio of water to that of alcohol in the resulting solution

  1. A tank has two inlet taps P and Q and an outlet tap R. when empty, the tank can be filled by tap P alone in 4 ½ hours or by tap Q alone in 3 hours. When full, the tank can be emptied in 2 hours by tap R.

(a)        The tank is initially empty. Find how long it would take to fill up the tank

  • If tap R is closed and taps P and Q are opened at the same time                                                                                                     (2mks)
  • If all the three taps are opened at the same time

(b)        The tank is initially empty and the three taps are opened as follows

P at 8.00 a.m

Q at 8.45 a.m

R at 9.00 a.m

(i)         Find the fraction of the tank that would be filled by 9.00 a.m

(ii)        Find the time the tank would be fully filled up

 

  1. Kipketer can cultivate a piece of land in 7 hrs while Wanjiru can do the same work in 5 hours. Find the time they would take to cultivate the piece of land when working together.

 

  1. Mogaka and Ondiso working together can do a piece of work in 6 days. Mogaka, working alone, takes 5 days longer than Onduso. How many days does it take Onduso to do the work alone.

 

  1. Wainaina has two dairy farms A and B. Farm A produces milk with 3 ¼ percent fat and farm B produces milk with 4 ¼ percent fat.

(a)        (i)         The total mass of milk fat in 50 kg of milk from farm A and 30kg

of milk from farm B.

(ii)        The percentage of fat in a mixture of 50 kg of milk A and 30 kg of milk from B

(b)        Determine the range of values of mass of milk from farm B that must be used in a 50 kg mixture so that the mixture may have at least 4 percent fat.

 

  1. A construction firm has two tractors T1 and T2. Both tractors working together can complete the work in 6 days while T1 alone can complete the work in 15 days. After the two tractors had worked together for four days, tractor T1­ broke down.

Find the time taken by tractor T2 complete the remaining work.

 

  1. The points P, Q, R and S have position vectors 2p, 3 p, r and 3r respectively, relative to an origin O. A point T divides PS internally in the ratio 1: 6

(a)        Find in the simplest form, the vectors OT and QT in terms of P and r

(b)        (i)         Show that the points Q, T and R lie on a straight line.

(ii)        Determine the ratio in which T divides QR.

 

 

 

 

TOPIC 14

GRAPHICAL METHODS

PAST KCSE QUESTIONS ON THE TOPIC

  1. The table shows the height metres of an object thrown vertically upwards varies with the time t seconds

The relationship between s and t is represented by the equations s = at2 + bt + 10 where b are constants.

 

t 0 1 2 3 4 5 6 7 8 9 10
s 45.1 49.9 -80
  • (i) Using the information in the table, determine the values of a and b

(ii) Complete the table

(b) (i)   Draw a graph to represent the relationship between s and t

(ii)   Using the graph determine the velocity of the object when t = 5 seconds

  1. Data collected form an experiment involving two variables X and Y was recorded as shown in the table below
x 1.1 1.2 1.3 1.4 1.5 1.6
y -0.3 0.5 1.4 2.5 3.8 5.2

The variables are known to satisfy a relation of the form y = ax3 + b where a and b are constants

  • For each value of x in the table above,  write  down the value  of  x3
  •      (i) By drawing a suitable straight line graph, estimate the values of a and b

(ii) Write down the relationship connecting y and x

  1. Two quantities P and r are connected by the equation p = krn. The table of values

of P and r is given below.

 

P 1.2 1.5 2.0 2.5 3.5 4.5
r 1.58 2.25 3.39 4.74 7.86 11.5

 

  1. a) State a liner equation connecting P and r.
  2. b) Using the scale 2 cm to represent 0.1 units on both axes, draw a suitable

line graph on the grid provided. Hence estimate the values of K and n.

  1. The points which coordinates (5,5) and (-3,-1) are the ends of a diameter of  a circle centre A

Determine:

(a)        The coordinates of A

The equation of the circle, expressing it in form x2 + y2 + ax + by + c = 0

where a, b, and c are constants each computer sold

  1. The figure below is a sketch of the graph of the quadratic function y = k

(x+1) (x-2)

 

 

 

 

 

 

Find the value of k

  1. The table below shows the values of the length X ( in metres ) of a pendulum and the corresponding values of the period T ( in seconds) of its oscillations  obtained  in an experiment.
X ( metres) 0.4 1.0 1.2 1.4 1.6
T ( seconds) 1.25 2.01 2.19 2.37 2.53

(a)       Construct a table of values of log X and corresponding values of log T,

correcting each value to 2 decimal places

(b)        Given that the relation between the values of log X and log T approximate to a linear law  of the form m log X + log a where  a and b are constants

(i)         Use the axes on the grid provided to draw the line of best fit for the graph of log T against log X.

 

 

 

 

 

 

 

 

 

 

 

 

(ii)        Use the graph to estimate the values of a and b

(iii)       Find, to decimal places the length of the pendulum whose period is 1 second.

 

  1. Data collection from an experiment involving two variables x and y was recorded as shown in the table below

 

X 1.1 1.2 1.3 1.4 1.5 1.6
Y -0.3 0.5 1.4 2.5 3.8 5.2

 

The variables are known to satisfy a relation of the form y = ax3 + b where a and b

are constants

(a)        For each value of x in the table above. Write down the value of x3

(b)        (i) By drawing s suitable straight line graph, estimate the values of  a and b

(ii) Write down the relationship connecting y and x

 

  1. Two variables x and y, are linked by the relation y = axn. The figure below shows part of the straight line graph obtained when log y is plotted against log x.

 

 

 

 

Calculate the value of a and n

 

  1. The luminous intensity I of a lamp was measured for various values of voltage v across it. The results were as shown below
V(volts) 30 36 40 44 48 50 54
L (Lux ) 708 1248 1726 2320 3038 3848 4380

 

It is believed that V and l are related by an equation of the form l = aVn where a and n are constant.

(a)        Draw a suitable linear graph and determine the values of a and n

(b)        From the graph find

(i)         The value of I when V = 52

(ii)        The value of V when I = 2800

 

  1. In a certain relation, the value of A and B observe a relation B= CA + KA2 where C and K are constants. Below is a table of values of A and B

 

A 1 2 3 4 5 6
B 3.2 6.75 10.8 15.1 20 25.2

 

(a) By drawing a suitable straight line graphs, determine the values of C and K.

(b) Hence write down the relationship between A and B

(c) Determine the value of B when A = 7

 

  1. The variables P and Q are connected by the equation P = abq where a and b are constants. The value of p and q are given below
P 6.56 17.7 47.8 129 349 941 2540 6860
q 0 1 2 3 4 5 6 7

 

(a)        State the equation in terms of p and q which gives a straight line graph

(b)        By drawing a straight line graph, estimate the value of constants a and b and give your answer correct to 1 decimal place.

 

 

FORM FOUR WORK

TOPIC 1

MATRICES AND TRANSFORMATIONS

PAST KCSE QUESTIONS ON THE TOPIC

  1. Matrix p is given by 1          2

4          3

(a)        Find P-1

(b)        Two institutions, Elimu and Somo, purchase beans at Kshs. B per bag and

maize at Kshs m per bag. Elimu purchased 8 bags of beans and 14 bags of maize for Kshs 47,600. Somo purchased 10 bags of beans and 16 of maize for Kshs. 57,400

(c)        The price of beans later went up by 5% and that of maize remained constant. Elimu bought the same quantity of beans but spent the same total amount of money as before on the two items. State the new ratio of beans to maize.

  1. A triangle is formed by the coordinates A (2, 1) B (4, 1) and C (1, 6). It is rotated

clockwise through 900 about the origin. Find the coordinates of this image.

  1. On the grid provided on the opposite page A (1, 2) B (7, 2) C (4, 4) D (3, 4) is a trapezium

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(a)        ABCD is mapped onto A’B’C’D’ by a positive quarter turn. Draw the image A’B’C’D on the grid

(b)        A transformation -2  -1   maps A’B’C’D  onto A”B” C”D” Find the coordinates

0    1     of A”B”C”D”

  1. A triangle T whose vertices are A (2, 3) B (5, 3) and C (4, 1) is mapped onto triangle T1 whose vertices are A1 (-4, 3) B1 (-1, 3) and C1 (x, y) by a

Transformation M =   a    b

c    d

 

 

  1. a) Find the:          (i)         Matrix M of the transformation

(ii)        Coordinates of C1

  1. b) Triangle T2 is the image of triangle T1 under a reflection in the line y = x.

Find a single matrix that maps T and T2

  1. Triangles ABC is such that A is (2, 0), B (2, 4), C (4, 4) and A”B”C” is such that A” is (0, 2), B” (-4 – 10) and C “is (-4, -12) are drawn on the Cartesian plane

Triangle ABC is mapped onto A”B”C” by two successive transformations

R =      a          b

c          d          Followed by    P =       0         -1

-1         0

(a)        Find R

(b)        Using the same  scale  and axes, draw triangles A’B’C’, the image of triangle ABC under transformation R

Describe fully, the transformation represented by matrix R

  1. Triangle ABC is shown on the coordinates plane below

 

 

 

 

 

 

 

(a)        Given that A (-6, 5) is mapped onto A (6,-4) by a shear with y- axis invariant

  • Draw triangle A’B’C’, the image of triangle ABC under the shear
  • Determine the matrix representing this shear

(b)        Triangle A B C is mapped on to A” B” C” by a transformation defined by the matrix        -1         0

1½       -1

(i) Draw triangle A” B” C”

(ii) Describe fully a single transformation that maps ABC onto A”B” C”

 

  1. Determine the inverse T‑1 of the matrix 1   2

1   -1

Hence find the coordinates to the point at which the two lines

x + 2y = 7 and x – y =1

 

  1. Given that A = 0 -1 and B =   -1    0

3      2                  2     -4

Find the value of x if

(i)         A- 2x = 2B

(ii)        3x – 2A = 3B

(iii)       2A – 3B = 2x

 

 

  1. The transformation R given by the matrix

 

 

A = a   b          maps 17           to         15        and      0          to   -8

c   d                    0                          8                    17             15

 

(a)        Determine the matrix A giving a, b, c and d as fractions

(b)        Given that A represents a rotation through the origin determine the angle of rotation.

(c)        S is a rotation through 180 about the point (2, 3). Determine the image of (1, 0) under S followed by R.

 

 

TOPIC 2

STATISTICS

PAST KCSE QUESTIONS ON THE TOPIC

  1. Every week the number of absentees in a school was recorded. This was done for 39 weeks these observations were tabulated as shown below
Number of absentees 0.3 4 -7 8 -11 12 – 15 16 – 19 20 – 23
(Number of weeks) 6 9 8 11 3 2

Estimate the median absentee rate per week in the school

  1. The table below shows high altitude wind speeds recorded at a weather station in a period of 100 days.
 Wind speed ( knots) 0 – 19 20 – 39 40 – 59 60-79 80- 99 100- 119 120-139 140-159 160-179
Frequency (days) 9 19 22 18 13 11 5 2 1

(a)        On the grid provided draw a cumulative frequency graph for the data

(b)        Use the graph to estimate

(i)         The interquartile range

(ii)        The number of days when the wind speed exceeded 125 knots

  1. Five pupils A, B, C, D and E obtained the marks 53, 41, 60, 80 and 56 respectively. The table below shows part of the work to find the standard deviation.
Pupil Mark x x – a ( x-a)2
A

B

C

D

E

53

41

60

80

56

-5

-17

2

22

-2

(a)       Complete the table

(b)        Find the standard deviation

  1. In an agricultural research centre, the length of a sample of 50 maize cobs were  measured and recorded as shown in the frequency distribution table below.
Length in cm Number  of  cobs
8 – 10

11 – 13

14 – 16

17 – 19

20 – 22

23 – 25

4

7

11

15

8

5

Calculate

  • The mean
  • (i) The variance

(ii) The standard deviation

  1. The table below shows the frequency distribution of masses of 50 new- born calves in a ranch

Mass (kg)                    Frequency

15 – 18                        2

19- 22                          3

23 – 26                        10

27 – 30                        14

31 – 34                        13

35 – 38                        6

39 – 42                        2

 

(a)        On the grid provided draw a cumulative frequency graph for the data

(b)        Use the graph to estimate

(i)         The median mass

(ii)        The probability that a calf picked at random has a mass lying between 25 kg and 28 kg.

  1. The table below shows the weight and price of three commodities in a given period

Commodity                 Weight                        Price Relatives

X                                 3                      125

Y                                 4                      164

Z                                  2                      140

Calculate the retail index for the group of commodities.

  1. The number of people who attended an agricultural show in one day was 510 men, 1080 women and some children. When the information was represented on a pie chart, the combined angle for the men and women was 2160. Find the angle representing the children.
  2. The mass of 40 babies in a certain clinic were recorded as follows:

Mass in Kg                  No. of babies.

1.0 – 1.9                                 6

2.0 – 2.9                                  14

3.0 -3.9                                    10

4.0 – 4.9                                  7

5.0 – 5.9                                  2

6.0 – 6.9                                  1

Calculate

(a)        The inter – quartile range of the data.

(b)        The standard deviation of the data using 3.45 as the assumed mean.

  1. The data below shows the masses in grams of 50 potatoes
Mass (g) 25- 34 35-44 45 – 54 55- 64 65 – 74 75-84 85-94
No of potatoes 3 6 16 12 8 4 1

(a)        On the grid provide, draw a cumulative frequency curve for the data

(b)        Use the graph in (a) above to determine

(i)         The 60th percentile mass

(ii)        The percentage of potatoes whose masses lie in the range 53g to 68g

  1. The histogram below represents the distribution of marks obtained in a test.

The bar marked A has a height of 3.2 units and a width of 5 units. The bar marked B has a height of 1.2 units and a width of 10 units

 

 

 

 

 

 

 

 

 

 

 

If the frequency of the class represented by bar B is 6, determine the frequency of the class represented by bar A.

  1. A frequency distribution of marks obtained by 120 candidates is to be represented in a histogram. The table below shows the grouped marks. Frequencies for all the groups and also the area and height of the rectangle for the group 30 – 60 marks.

 

Marks 0-10 10-30 30-60 60-70 70-100
Frequency 12 40 36 8 24
Area of rectangle 180
Height of rectangle 6

 

(a) (i)   Complete the table

(ii)   On the grid provided below, draw the histogram

 

(b) (i)   State the group in  which the median mark  lies

(ii) A vertical line drawn through the median mark divides the total area of the histogram into two equal parts

Using this information or otherwise, estimate the median mark

 

  1. In an agriculture research centre, the lengths of a sample of 50 maize cobs were measured and recorded as shown in the frequency distribution table below
Length in cm Number of cobs
8 – 10

11- 13

14 – 16

17- 19

20 – 22

23- 25

4

7

11

15

8

5

Calculate

(a)        The mean

(b)        (i)         The variance

(ii)        The standard deviation

 

  1. The table below shows the frequency distribution of masses of 50 newborn calves in a ranch.

 

 

Mass (kg) Frequency
15 – 18

19- 22

23 – 26

27 – 30

31- 34

35 – 38

39 – 42

2

3

10

14

13

6

2

(a)        On the grid provided draw a cumulative frequency graph for the data

(b)       Use the graph to estimate

(i)         The median mass

(ii)        The probability that a calf picked at random has a mass lying

between 25 kg and 28 kg

 

  1. The table shows the number of bags of sugar per week and their moving averages
Number of bags per week 340 330 x 343 350 345
Moving averages 331 332 y 346

(a) Find the order of the moving average

(b) Find the value of X and Y axis

 

 

TOPIC 3

LOC1

PAST KCSE QUESTIONS ON THE TOPIC

  1. Using ruler and compasses only, construct a parallelogram ABCD such that AB = 10cm, BC = 7 cm and < ABC = 1050. Also construct the loci of P and Q within the parallel such that AP ≤ 4 cm, and BC ≤ 6 cm. Calculate the area within the parallelogram and outside the regions bounded by the loci.
  2. Use ruler and compasses only in this question

The diagram below shows three points A, B and D

(a)        Construct the angle bisector of acute angle BAD

(b)        A point P, on the same side of AB and D, moves in such a way that < APB = 22 ½ 0 construct the locus of P

(c)        The locus of P meets the angle bisector of < BAD at C measure < ABC

 

 

 

 

  1. Use a ruler and a pair of compasses only for all constructions in this question.

(a)        On the line BC given below, construct triangle <ABC such that <ABC = 300 and BA = 12 cm

 

 

 

(b)        Construct a perpendicular from A to meet BC produced at D. Measure CD

(c)        Construct triangle A’B’C’ such that the area of triangle A’B’C is the three quarters of the area of triangle ABC and on the same side of BC as triangle ABC.

(d)       Describe the lucus of A’

  1. Use a ruler and compasses in this question. Draw a parallegram ABCD in which AB = 8 cm, BC = 6 cm and BAD = 750. By construction, determine the perpendicular distance between AB and CD.
  2. In this question use a ruler and a pair of compasses.
  3. a) Line PQ drawn below is part of a triangle PQR. Construct the triangle

PQR in which < QPR = 300 and line PR = 8 cm

 

 

 

  1. b) On the same diagram construct triangle PRS such that points S and Q

are no the opposite sides of PR<PS = PS and QS = 8 cm

  1. C) A point T is on the a line passing through R and parallel to
  2. If <QTS =900, locate possible positions of T and label them T1

and T2, Measure the length of T1T2.

  1. (a) ABCD is a rectangle in which AB = 7.6 cm and AD = 5.2 cm. Draw the

rectangle and construct the lucus of a  point P within the rectangle such that  P is equidistant from CB and CD                             ( 3  marks)

(b)       Q is a variable point within the rectangle ABCD drawn in (a) above such that 600 ≤ < AQB≤ 900

On the same diagram, construct and show the locus of point Q, by leaving unshaded, the region in which point Q lies.

  1. The figure below is drawn to scale. It represents a field in the shape of an equilateral triangle of side 80m

 

 

 

 

 

The owner wants to plant some flowers in the field. The flowers must be at most, 60m from A and nearer to B than to C. If no flower is to be more than 40m from BC, show by shading, the exact region where the flowers may be planted.

  1. In this question use a ruler and a pair of compasses only

In the figure below, AB and PQ are straight lines

 

 

 

 

 

(a) Use the figure to:

(i)         Find a point R on AB such that R is equidistant from P and Q

(ii)        Complete a polygon PQRST with AB as its line of symmetry and hence measure the distance of R from TS.

(b) Shade the region within the polygon in which a variable point X must lie given that X satisfies the following conditions

  1. X is nearer to PT than to PQ
  2. RX is not more than 4.5 cm
  3. Ð PXT > 900

 

  1. Four points B, C, Q and D lie on same plane. Point B is 42 km due south – west of town Q. Point C is 50 km on a bearing of 5600 from Q. Point D is equidistant from B, Q and C.

(a)        Using the scale: 1 cm represents 10 km, construct a diagram showing the position of B, C, Q and D

(b)        Determine the

(i)         Distance between B and C

(ii)        Bearing of D from B

 

  1. The diagram below represents a field PQR

 

 

 

 

 

 

 

(a)        Draw the locus of point equidistant from sides PQ and PR

(b)        Draw the locus of points equidistant from points P and R

(c)        A coin is lost within a region which is near to point P than R and closer to side PR than to side PQ. Shade the region where the coin can be located.

 

  1. In the figure below, a line XY and three point A,B and C are as given. On the figure construct

(a)        The perpendicular bisector if AB

(b)        A point P on the line XY such that angle APB = angle ACB

 

 

 

TOPIC 4:

TRIGONOMETRY

PAST KCSE QUESTIONS ON THE TOPIC

  1. (a) Complete the table for the function y = 2 sin x

 

x 00 100 200 300 400 500 600 700 800 900 1000 1100 1200
Sin 3x 0 0.5000 -08660
y 0 1.00 -1.73

 

(b)        (i)         Using the values in the completed table, draw the graph of

y = 2 sin 3x for 00 ≤ x ≤ 1200 on the grid provided

(ii)        Hence solve the equation 2 sin 3x = -1.5

  1. Complete the table below by filling in the blank spaces

 

X0 00 300 600 900 1200 1500 1800 2100 2400 2700 3000 3300 3600
Cos x0 1.00 0.50 -0.87 -0.87
2 cos ½ x0 2.00 1.93 0.52 -1.00 -2.00

 

Using the scale 1 cm to represent 300 on the horizontal axis and 4 cm to represent 1 unit  on the vertical axis draw, on the grid  provided, the graphs of y = cosx0 and y = 2 cos ½ x0 on the same axis.

(a)        Find the period and the amplitude of y = 2 cos ½ x0

(b)        Describe the transformation that maps the graph of y = cos x0 on the graph of y = 2 cos 1/2 x0

  1.  (a)       Complete the table below for the value of y = 2 sin x + cos x.
x 00 300 450 600 900 1200 1350 1500 1800 2250 2700 3150 3600
2 sin x 0 1.4 1.7 2 1.7 1.4 1 0 -2 -1.4 0
Cos x 1 0.7 0.5 0 -0.5 -0.7 -0.9 -1 0 0.7 1
y 1 2.1 2.2 2 1.2 0.7 0.1 -1 -2 -0.7 1

(b)        Using the grid provided draw the graph of y=2sin x + cos x for 00. Take 1cm represent 300 on the x- axis and 2 cm to represent 1 unit on the axis.

(c)        Use the graph to find the range of x that satisfy the inequalities

2 sin x cos x > 0.5

  1. (a) Complete the table below, giving your values correct to 2 decimal places.

 

x 0 10 20 30 40 50 60 70
Tan x 0
2 x + 300 30 50 70 90 110 130 150 170
Sin ( 2x + 300) 0.50 1

 

  1. b) On the grid provided, draw the graphs of y = tan x and y = sin ( 2x + 300) for 00 ≤ x 700

Take scale:       2 cm for 100 on the x- axis

4 cm for unit on the y- axis

Use your graph to solve the equation tan x- sin ( 2x + 300 ) = 0.

 

 

  1. (a) Complete the table below, giving your values correct to 2 decimal places

 

X0 0 30 60 90 120 150 180
2 sin x0 0 1 2 1
1 – cos x0 0.5 1

 

(b)        On the grid provided, using the same scale and axes, draw the graphs of

y = sin x0 and y = 1 – cos x0 ≤ x ≤ 1800

Take the scale:  2 cm for 300 on the x- axis

2 cm for I unit on the y- axis

(c)        Use the graph in (b) above to

(i)         Solve equation

2 sin xo + cos x0 = 1

(ii)        Determine the range of values x for which 2 sin xo > 1 – cos x0

  1. (a) Given that y = 8 sin 2x – 6 cos x, complete the table below for the missing

values of y, correct to 1 decimal place.

X 00 150 300 450 600 750 900 1050 1200
Y = 8 sin 2x – 6 cos x -6 -1.8 3.8 3.9 2.4 0 -3.9

 

(b)        On the grid provided, below, draw the  graph of y = 8 sin 2x – 6 cos for

00 ≤ x ≤ 1200

Take the scale 2 cm for 150 on the x- axis

2 cm for 2 units on the y – axis

(c)        Use the graph to estimate

(i)         The maximum value of y

(ii)        The value of x for which 4 sin 2x – 3 cos x =1

 

  1. Solve the equation 4 sin (x + 300) = 2 for 0 ≤ x ≤ 3600

 

  1. Find all the positive angles not greater than 1800 which satisfy the equation

Sin2 x – 2 tan x = 0

Cos x

  1. Solve for values of x in the range 00 ≤ x ≤ 3600 if 3 cos2 x – 7 cos x = 6

 

  1. Simplify 9 – y2 where y = 3 cos θ

y

 

  1. Find all the values of Ø between 00 and 3600 satisfying the equation 5 sin Ө = -4

 

  1. Given that sin (90 – x) = 0.8. Where x is an acute angle, find without using mathematical tables the value of tan x0
  2. Complete the table given below for the functions

y= -3 cos 2x0 and y = 2 sin (3x/20 + 30) for 0 ≤ x ≤ 1800

 

X0 00 200 400 600 800 1000 1200 1400 1600 1800
-3cos 2x0 -3.00 -2.30 -0.52 1.50 2.82 2.82 1.50 -0.52 -2.30 -3.00
2 sin (3 x0 + 300) 1.00 1.73 2.00 1.73 1.00 0.00 -1.00 -1.73 -2.00 -1.73

 

Using the graph paper draw the graphs of y = -3 cos 2x0 and y = 2 sin (3x/20 + 300)

(a)        On the same axis. Take 2 cm to represent 200 on the x- axis and 2 cm to represent one unit on the y – axis

(b)        From your graphs. Find the roots of 3 cos 2 x0 + 2 sin (3x/20 + 300) = 0

 

  1. Solve the values of x in the range 00 ≤ x ≤ 3600 if 3 cos2x – 7cos x = 6

 

  1. Complete the table below by filling in the blank spaces

 

x0 00 300 600 90 10 1500 180 210 240 270 300 330 360
Cosx0 1.00 0.50 -0.87 -0.87
2cos ½ x0 2.00 1.93 0.5

 

Using the scale 1 cm to represent 300 on the horizontal axis and 4 cm to represent 1 unit on the vertical  axis draw on the grid provided, the graphs of y – cos x0 and y = 2 cos ½ x0 on the same axis

(a)        Find the period and the amplitude of y =2 cos ½ x0

Ans.  Period = 7200. Amplitude = 2

(b)        Describe the transformation that maps the graph of y = cos  x0 on the graph of y = 2 cos ½ x0

 

 

TOPIC 5

THREE DIMENSIONAL GEOMETRY

PAST KCSE QUESTIONS ON THE TOPIC

  1. The diagram below shows a right pyramid VABCD with V as the vertex. The base of the pyramid is rectangle ABCD, WITH ab = 4 cm and BC= 3 cm. The height of the pyramid is 6 cm.

 

 

 

 

 

 

 

 

 

 

(a)        Calculate the

  • Length of the projection of VA on the base
  • Angle between the face VAB and the base

(b)        P is the mid- point of VC and Q is the mid – point of VD.

Find the angle between the planes VAB and the plane ABPQ

  1. The figure below represents a square based solid with a path marked on it.

 

 

 

 

 

 

Sketch and label the net of the solid.

  1. The diagram below represents a cuboid ABCDEFGH in which FG= 4.5 cm, GH = 8 cm and HC = 6 cm

 

 

 

 

 

 

 

Calculate:

(a) The length of FC

(b) (i)   The size of the angle between the lines FC and FH

(ii) The size of the angle between the lines AB and FH

(c) The size of the angle between the planes ABHE and the plane FGHE

 

  1. The base of a right pyramid is a square ABCD of side 2a cm. The slant edges VA, VB, VC and VD are each of length 3a cm.

(a)        Sketch and label the pyramid

(b)        Find the angle between a slanting edge and the base

 

  1. The triangular prism shown below has the sides AB = DC = EF = 12 cm. the ends are equilateral triangles of sides 10cm. The point N is the mid point of FC.

 

 

 

 

Find the length of:

(a)        (i)         BN

(ii)        EN

(b)        Find the angle between the line EB and the plane CDEF

 

 

TOPIC 6:

LATITUDES AND LONGITUDES

PAST KCSE QUESTIONS ON THE TOPIC

  1. An aeroplane flies from point A (10 15’S, 370 E) to a point B directly North of A. the arc AB subtends an angle of 450 at the center of the earth. From B, aeroplanes flies due west two a point C on longitude 230 W.)

(Take the value of π 22/ 7 as and radius of the earth as 6370km)

(a)        (i)         Find  the latitude of B

(ii)        Find the distance traveled by the aeroplane between B and C

(b)       The aeroplane left at 1.00 a.m local time. When the aeroplane was leaving B, hat was the local time at C?

  1. The position of two towns X and Y are given to the nearest degree as X (450 N, 100W) and Y (450 N, 700W)

Find

(a)        The distance between the two towns in

  • Kilometers (take the radius of the earth as 6371)
  • Nautical miles (take 1 nautical mile to be 1.85 km)

(b)        The local time at X when the local time at Y is 2.00 pm.

  1. A plane leaves an airport A (38.50N, 37.050W) and flies dues North to a point B on latitude 520N.

(a)        Find the distance covered by the plane

(b)        The plane then flies due east to a point C, 2400 km from B. Determine the position of C

Take the value π of as 22/7 and radius of the earth as 6370 km

  1. A plane flying at 200 knots left an airport A (300S, 310E) and flew due North to an airport B (300 N, 310E)

(a)        Calculate the distance covered by the plane, in nautical miles

(b)        After a 15 minutes stop over at B, the plane flew west to an airport C (300 N, 130E) at the same speed.

Calculate the total time to complete the journey from airport C, though airport B.

  1. Two towns A and B lie on the same latitude in the northern hemisphere.

When its 8 am at A, the time at B is 11.00 am.

  1. a) Given that the longitude of A is 150 E find the longitude of B.
  2. b) A plane leaves A for B and takes 31/2 hours to arrive at B traveling along a parallel of latitude at 850 km/h. Find:

(i)         The radius of the circle of latitude on which towns A and B lie.

(ii)         The latitude of the two towns (take radius of the earth to be 6371 km)

  1. Two places A and B are on the same circle of latitude north of the equator. The longitude of A is 1180W and the longitude of B is 1330 E. The shorter distance between A and B measured along the circle of latitude is 5422 nautical miles.

Find, to the nearest degree, the latitude on which A and B lie

 

  1. (a) A plane flies by the short estimate route from P (100S, 600 W) to Q (700 N,

1200 E) Find the distance flown in km and the time taken if the aver age speed is 800 km/h.

(b)        Calculate the distance in km between two towns on latitude 500S with long longitudes and 200 W. (take the radius of the earth to be 6370 km)

 

  1. Calculate the distance between M (300N, 360E) and N (300 N, 1440 W) in nautical miles.

(i)         Over the North Pole

(ii)        Along the parallel of latitude 300 N

 

  1. (a) A ship sailed due south along a meridian from 120 N to 10030’S. Taking

the earth to be a sphere with a circumference of 4 x 104 km, calculate in km the distance traveled by the ship.

(b)        If a ship sails due west from San Francisco (370 47’N, 1220 26’W) for distance of 1320 km. Calculate the longitude of its new position (take the radius of the earth to be 6370 km and π = 22/7).

 

 

 

TOPIC 7

LINEAR PROGRAMMING

PAST KCSE QUESTIONS ON THE TOPIC

  1. A school has to take 384 people for a tour. There are two types of buses available, type X and type Y. Type X can carry 64 passengers and type Y can carry 48 passengers. They have to use at least 7 buses.

(a)        Form all the linear inequalities which will represent the above information.

(b)        On the grid [provide, draw the inequalities and shade the unwanted region.

(c)        The charges for hiring the buses are

Type X: Kshs 25,000

Type Y Kshs 20,000

Use your graph to determine the number of buses of each type that should be hired to minimize the cost.

  1. An institute offers two types of courses technical and business courses. The institute has a capacity of 500 students. There must be more business students than technical students but at least 200 students must take technical courses. Let x represent the number of technical students and y the number of business students.

(a)        Write down three inequalities that describe the given conditions

(b)        On the grid provided, draw the three inequalities

(c)        If the institute makes a profit of Kshs 2, 500 to train one technical students and Kshs 1,000 to train one business student, determine

  • The number of students that must be enrolled in each course to maximize the profit
  • The maximum profit.
  1. A draper is required to supply two types of shirts A and type B.

The total number of shirts must not be more than 400. He has to supply more type A than of type B however the number of types A shirts must be more than 300 and the number of type B shirts not be less than 80.

Let x be the number of type A shirts and y be the number of types B shirts.

  • Write down in terms of x and y all the linear inequalities representing the information above.
  • On the grid provided, draw the inequalities and shade the unwanted regions
  • The profits were as follows

Type A: Kshs 600 per shirt

Type B: Kshs 400 per shirt

  • Use the graph to determine the number of shirts of each type that should be made to maximize the profit.
  • Calculate the maximum possible profit.
  1. A diet expert makes up a food production for sale by mixing two ingredients N and S. One kilogram of N contains 25 units of protein and 30 units of vitamins. One kilogram of S contains 50 units of protein and 45 units of vitamins. The foiod is sold in small bags each containing at least 175 units of protein and at least 180 units of vitamins. The mass of the food product in each bag must not exceed 6kg.

If one bag of the mixture contains x kg of N and y kg of S

  • Write down all the inequalities, in terms of x and representing the information above                                                       ( 2 marks)
  • On the grid provided draw the inequalities by shading the unwanted regions                                                                   ( 2 marks)

(c) If one kilogram of N costs Kshs 20 and one kilogram of S costs Kshs 50, use the graph to determine the lowest cost of one bag of the mixture.

  1. Mwanjoki flying company operates a flying service. It has two types of aeroplanes. The smaller one uses 180 litres of fuel per hour while the bigger one uses 300 litres per hour.

The fuel available per week is 18,000 litres. The company is allowed 80 flying hours per week.

(a) Write down all the inequalities representing the above information

(b) On the grid provided on page 21, draw all the inequalities in (a) above by

shading the unwanted regions

(c) The profits on the smaller aeroplane is Kshs 4000 per hour while that on the

bigger one is Kshs. 6000 per hour. Use your graph to determine the maximum profit that the company made per week.

  1. A company is considering installing two types of machines. A and B. The information about each type of machine is given in the table below.

 

Machine Number of operators Floor space Daily profit
A 2 5m2 Kshs 1,500
B 5 8m2 Kshs 2,500

 

The company decided to install x machines of types A and y machines of type B

(a)        Write down the inequalities that express the following conditions

  1. The number of operators available is 40
  2. The floor space available is 80m2
  • The company is to install not less than 3 type of A machine
  1. The number of type B machines must be more than one third the number of type A machines

(b)       On the grid provided, draw the inequalities in part (a) above and shade the

unwanted region.

(c)        Draw a search line and use it to determine the number of machines of each

type that should be installed to maximize the daily profit.

 

 

 

TOPIC 8:

CALCULUS

PAST KCSE QUESTIONS ON THE TOPIC

  1. The shaded region below represents a forest. The region has been drawn to scale where 1 cm represents 5 km. Use the mid – ordinate rule with six strips to estimate the area of forest in hectares.             (4 marks)

 

 

 

 

 

 

 

 

 

 

 

  1. Find the area bounded by the curve y=2x3 – 5, the x-axis and the lines x=2 and x=4.
  2. Complete the table below for the function y=3x2 – 8x + 10 (1 mk)
x 0 2 4 6 8 10
y 10 6 70 230

Using the values in the table and the trapezoidal rule, estimate the area bounded by the curve y= 3x2 – 8x + 10 and the lines y=0, x=0 and x=10.

  1. Use the trapezoidal rule with intervals of 1 cm to estimate the area of the shaded region below

 

 

 

 

 

 

 

 

 

 

 

 

 

  1. (a) Find the value of x at which the curve y= x- 2x2 – 3 crosses the x- axis

(b)        Find ò(x2 – 2x – 3) dx

(c)        Find the area bounded by the curve y = x2 – 2x – 3, the axis and the lines x= 2 and x = 4.

 

  1. The graph below consists of a non- quadratic part (0 ≤ x ≤ 2) and a quadrant part (2 ≤ x 8). The quadratic part is y = x2 – 3x + 5, 2 ≤ x ≤ 8

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(a) Complete the table below

x 2 3 4 5 6 7 8
y 3

(1mk)

(b) Use the trapezoidal rule with six strips to estimate the area enclosed by the

curve, x = axis and the line x = 2 and x = 8                                        (3mks)

(c) Find the exact area of the region given in (b)                                      (3mks)

(d) If the trapezoidal rule is used to estimate the area under the curve between

x = 0 and x = 2, state whether it would give an under- estimate or an over- estimate. Give a reason for your answer.

  1. Find the equation of the gradient to the curve Y= (x‑2 + 1) (x – 2) when x = 2
  2. The distance from a fixed point of a particular in motion at any time t seconds is given by

S = t3 – 5t2 + 2t + 5

2t2

Find its:

(a)        Acceleration after 1 second

(b)        Velocity when acceleration is Zero

  1. The curve of the equation y = 2x + 3x2, has x = -2/3 and x = 0 and x intercepts.

The area bounded by the axis x = -2/3 and x = 2 is shown by the sketch below.

 

 

 

 

 

 

Find:

(a) (2x + 3 x2) dx

(b) The area bounded by the curve x – axis, x = – 2/3 and x =2

  1. A particle is projected from the origin. Its speed was recorded as shown in the table below

 

Time (sec) 0 5 10 15 20 25 39 35
Speed (m/s) 0 2.1 5.3 5.1 6.8 6.7 4.7 2.6

 

Use the trapezoidal rule to estimate the distance covered by the particle within the 35 seconds.

  1. (a) The gradient function of a curve is given  by             dy = 2x2 – 5

dx

Find the equation of the curve, given that y = 3, when x = 2

(b)        The velocity, vm/s of a moving particle after seconds is given:

v = 2t3 + t2 – 1. Find the distance covered by the particle in the interval 1 ≤ t ≤ 3

  1. Given the curve y = 2x3 + 1/2x2 – 4x + 1. Find the:
  2. i) Gradient of curve at {1, – 1/2}
  3. ii) Equation of the tangent to the curve at {1, – 1/2}

 

  1. The diagram below shows a straight line intersecting the curve y = (x-1)2 + 4

At the points P and Q. The line also cuts x-axis at (7, 0) and y axis at (0, 7)

 

 

 

 

 

 

 

  1. a) Find the equation of the straight line in the form y = mx +c.
  2. b) Find the coordinates of p and Q.
  3. c) Calculate the area of the shaded region.
  4. The acceleration, a ms-2, of a particle is given by a =25 – 9t2, where t in seconds after the particle passes fixed point O.

If the particle passes O, with velocity of 4 ms-1, find

(a)        An expression of velocity V, in terms of t

(b)        The velocity of the particle when t = 2 seconds

  1. A curve is represented by the function y = 1/3 x3+ x2 – 3x + 2

(a)        Find:    dy

dx

(b)        Determine the values of y at the turning points of the curve

y = 1/3x3 + x2 – 3x + 2

(c)        In the space provided below, sketch the curve of y = 1/3 x3 + x2 – 3x + 2

  1. A circle centre O, ha the equation x2 + y2 = 4. The area of the circle in the first quadrant is divided into 5 vertical strips of width 0.4 cm

(a)        Use the equation of the circle to complete the table below for values of y

correct to 2 decimal places

 

X 0 0.4 0.8 1.2 1.6 2.0
Y 2.00 1.60 0

 

(b)        Use the trapezium rule to estimate the area of the circle

  1. A particle moves along straight line such that its displacement S metres from a given point is S = t3 – 5t2 + 4 where t is time in seconds

Find

(a) The displacement of particle at t = 5

(b) The velocity of the particle when t = 5

(c) The values of t when the particle is momentarily at rest

(d) The acceleration of the particle when t = 2

  1. The diagram below shows a sketch of the line y = 3x and the curve y = 4 – x2 intersecting at points P and Q.

 

 

 

(a)        Find the coordinates of P and Q

(b)        Given that QN is perpendicular to the x- axis at N, calculate

(i)         The area bounded by the curve y = 4 – x2, the x- axis and the line QN                                                                                (2 marks)

(ii)        The area of the shaded region that lies below the x- axis

(iii)       The area of the region enclosed by the curve y = 4-x2, the line

y – 3x and the y-axis.

2007

  1. The gradient of the tangent to the curve y = ax3 + bx at the point (1, 1) is -5

Calculate the values of a and b.

2007

  1. The diagram on the grid below represents as extract of a survey map showing

two adjacent plots belonging to Kazungu and Ndoe.

The two dispute the common boundary with each claiming boundary along different smooth curves coordinates (x, y) and (x, y2) in the table below, represents points on the boundaries as claimed by Kazungu Ndoe respectively.

 

x 0 1 2 3 4 5 6 7 8 9
y1 0 4 5.7 6.9 8 9 9.8 10.6 11.3 12
y2 0 0.2 0.6 1.3 2.4 3.7 5.3 7.3 9.5 12

 

(a)        On the grid provided above draw and label the boundaries as claimed by Kazungu and Ndoe.

 

(b)        (i)         Use the trapezium rule with 9 strips to estimate the area of the

section of the land in dispute

(ii)        Express the area found in b (i) above, in hectares, given that 1 unit on each axis represents 20 metres

  1. The gradient function of a curve is given by the expression 2x + 1. If the curve passes through the point (-4, 6);

(a)        Find:

(i)         The equation of the curve

(ii)        The vales of x, at which the curve cuts the x- axis

(b)        Determine the area enclosed by the curve and the x- axis

  1. A particle moves in a straight line through a point P. Its velocity v m/s is given by v= 2 -t, where t is time in seconds, after passing P. The distance s of the particle from P when t = 2 is 5 metres. Find the expression for s in terms of t.

 

  1. Find the area bonded by the curve y=2x – 5 the x-axis and the lines x=2 and x = 4.

 

  1. Complete the table below for the function

Y = 3x2 – 8 x + 10

X 0 2 4 6 8 10
Y 10 6 70 230

Using the values in the table and the trapezoidal rule, estimate the area bounded by the curve y = 3x2 – 8x + 10 and the lines y – 0, x = 0 and x = 10

 

  1. (a) Find the values of x which the curve y = x2 – 2x – 3 crosses the axis

(b)        Find (x2 – 2 x – 3) dx

(c)        Find the area bounded by the curve Y = x2 – 2x – 3. The x – axis and the

lines x = 2 and x = 4

 

  1. Find the equation of the tangent to the curve y = (x + 1) (x- 2) when x = 2

 

  1. The distance from a fixed point of a particle in motion at any time t seconds is given by s = t – 5/2t2 + 2t + s metres

Find its

(a)        Acceleration after t seconds

(b)        Velocity when acceleration is zero

  1. The curve of the equation y = 2x + 3x2, has x = – 2/3 and x = 0, as x intercepts. The area bounded by the curve, x – axis, x = –2/3 and x = 2 is shown by the sketch below.

 

 

 

 

 

 

(a)        Find ò(2x + 3x2) dx

(b)        The area bounded by the curve, x axis x = –2/3 and x = 2

 

  1. A curve is given by the equation y = 5x3 – 7x2 + 3x + 2

Find the

(a)        Gradient of the curve at x = 1

(b)        Equation of the tangent to the curve at the point (1, 3)

 

  1. The displacement x metres of a particle after t seconds is given by x = t2 – 2t + 6, t> 0

(a)        Calculate the velocity of the particle in m/s when t = 2s

(b)        When the velocity of the particle is zero,

Calculate its

(i)         Displacement

(ii)        Acceleration

 

  1. The displacement s metres of a particle moving along a straight line after t seconds is given by s = 3t + 3/2t2 – 2t3

(a)        Find its initial acceleration

(b)        Calculate

(i)         The time when the particle was momentarily at rest.

(ii)        Its displacement by the time it comes to rest momentarily when

t = 1 second, s = 1 ½ metres when t = ½ seconds

(c)        Calculate the maximum speed attained

 

MATHEMATICS ANSWERS

FORM 1

TOPIC 1

NUMBERS

  1. 1000 0.0064

100

 

1000    (0.08)

10

1000 x 0.008

=8

  1. (a) -8 ¸ 2 + 12 x 9 – 4 x 6

56 ¸ 7 x 2

 

4 + 108 – 24

16

= 80/16

 

= 5

  1. 463 = 23 – 1

-2    3  = 24

  1. Mliwa: 3/8 x 2/3 x = ¼ x

Amina:                        x – (1/3 + ¼ )x = 5/12 x

5/12 x – ¼ x = 40,000

2/12 x = 40,000

X = 240,000

  1. +4 x 4 – (-20) = 4 x 4 + 20 = 36

-6(6 ¸3) + (-6)    -6 x 2 -6        -18

= 2

  1. 384. 16 x 0.625

96.04

 

 

24 x 74 x 10­-2 x 54 x 10-4

22 x 74 x 10-2

 

 

 

22 x 54 x 10-4

 

= 2 x 52 x 10-2

= 0.5

7          1/x + 1/ x + 5 = 1/6

6( x + 5) + 6x = x (x + 5)

X2 – 7x – 30 = 0

(x – 10 ) (x + 3) =0

X = 10, -3

Onduso takes 10 days

  1. (1470)2 = [2 x 3 x 5 x 72]8

√ 7056        √(24 x 32 x 72)

 

= 22 x 32 x 52 x 74

22 x 3 x 7

= 3 x 52 x 73

  1. ¾ + 1 5/7 ¸4/7 of 2 1/3

(13/75/8) x 2/3

 

¾ + 9/7

45/56 x 2/3

57/28 x 28/ 15 or 399/196 x 28/15

  1. A and B opened for 1 hr

1/3 + 1/6 = ½

 

A,B,C opened for 1 hr

½ – 1/8 = 3/8

Time taken to fill the tank when all pieces are opened  = ½ x 2/3 + 1

21/3 hr

  1. 4/9 (45 + W) = 10 + W

4 (45 + w) = 9 (10 + w)

180 + 4W = 90 + 8 w

5w = 90

W = 18

  1. 91125

 

2025

 

45/45 = 1

  1. (a) 7532

(b)        500

 

  1. 0.0084 x 1.23 x 3.5

2.87 x 0.056

 

84 x 123 x 35

287 x 56 x 100

 

= 9/40

  1. 14/7
  2. 3
  3. 4/5 or 0.8
  4. 1/27
  5. 11. 25
  6. 30
  7. 6 5/18
  8. -17
  9. 1 5/11
  10. a = 38, b = 225
  11. GCD = xy2, xy2 (x- 2y) x + 2y)
  12. 9/4
  13. 48

 

 

TOPIC 2.

ALGEBRAIC EXPRESSIONS

  1. Let Ali be a goats

A + a + 2 + 3 (a + 2) + a + 2 + 3 (a + 2) – 10

9a + b

 

9a + 6 = 17 x 3

9a = 45

a= 5

Odupoy sold 28 – 10 = 18 goats

  1. yx + 3 yz = 2x- z

X (2-y) = 3yz + z)

X = z (3y + 1)

2 – y

  1. 3x2 – 3xy + xy – y2

3x (x-y) + y (x – y)

(x-y) (3x + y)

  1. 3 (x-1) –(2x + 1) = 3x – 3 – 2 x -1

3x                    3x

X – 4

3x

X -4 = 2

3x       3

3x – 12 = 6x

X = -4

  1. (a + b) (a –b)

(2557 – 2547) (2557 + 2547)

510 x 10

51040

  1. (p + q) (p + q)

P2 (p + q) – q2 (p + q)

(p + q) (p + q)                                      1

(p + q) (p- q) (p + q)                =          p-q

  1. yx + 3yz = 2x – z

Yx – 2x = – 3yz – z

X (y-2) = 3yz – z

X = –3x – z

Y -2

  1. 1/4x = 5/6x – 7

 

    a      +             b

  1. 2(a + b) 2 (a- b)

 

  1. (7 x – 1) (4x + 1)
  2. Ali’s age = 16 yrs. Juma’s age = 42 yrs
  3. Trouser 150, shirt cost 30

 

TOPIC 3

RATES, RATIO PERCENTAGES AND PROPORTION

  1. (4 x 21) + (3 x 42) = 30

7

130 x 30 = 39

100

  1. 27 x 4 x 60 = 3.6

60 x 30

Height = 23.6 cm

 

  1. (a) (i) Total collected Kshs 80 x 25 x 6

Kshs 12000

(ii) Net profit = 12000 – ( 1500 + 200 + 150 + 4000

Kshs 12000 – 5850 = Kshs 6250

(b) The days collection = Kshs 80 x 12000

100

= Kshs 9600

Net profit = Kshs 9600- 5850

Kshs 3750

Shares = 25/5 x 3750 or 3/5 x 3750

Kshs 1500 and Kshs. 2250

  1. 3.5/100 x 50 = 1.75

(a) 4.75 x 30 = 1.425

Total = 3.175 kg

 

(ii) 3.175 x 100 = 3.9688

80

 

= 3.969%

 

(b)        No. of fat kg = x/50 x 100 = 4

X = 2 kg fat

Milk

Kg of A = y

Kg of B = 50 – y

 

3/5y + 4.75 (50 – y) = 2

100             100

 

3.5y + 237.5 – 4.75 = 200

1.2y = 37.5

Y = 37.7

1.25

 

Y = 30

A= 30 kg

B = 20 kg

B≥ 20 kg

  1. (a) 240 x 12000

= Kshs 2,880, 000

(b) (i) New price = 125/100 x 12000

 

= Kshs. 15,000

New no of sets = 90/100 x 240 = 216

 

Amount from sale = 216 x 15,000

= Kshs 3, 240,000

Increase = 3, 240, 000 – 2, 880,000

= 360, 000

 

% increase = 360, 000 x 100               = 12.5%

2,880, 000

 

(ii) 16/ 15 x 15,000         = Kshs 16,000

 

(c) Let the no of sets sold in 2003 be x

16000 x = 2,880,000

X = 2, 880, 000

16,000

 

P% = 240 – 180 x 100 = 25%

240

\ p = 25

  1. (a) Initial volume of alcohol

= 60 /100 x 80

New volume of solution = (80 + x) ltrs)

     48               = 40

(80 + x)             100

 

4800 = 3200 + 40x

 

40x = 1600

X = 40 ltrs

(b) New volume of solution

80 + 40 + 30    = 150 ltrs

48/150 x 100 = 32

% age of alcohol         = 32%

(b)        in 5 lts

32% of 5         = 1.6 ltrs of alcohol

68% of 5         = 3.4 ltrs of water

In 2 ltrs            60% of 2         = 1.2 lts of alcohol

40% of 2         = 0.8 ltrs of water
In final solution (7 lts)

2.8 ltrs are alcohol

4.2 ltrs are water

\Ratio of water to alcohol

= 4.2: 2.8         = 3.2

 

Alternately

(c)       5 lts.    W.A    = 68:32            = 17:8

\Water           = 17/25 x 5      = 17/5

Alcohol           = 8/25 x 5        = 8/5

In 2 lts

Water              = 40/100 x 2    = 4/5

Alcohol           = 60/100 x 2    = 6/5

Final solution

Water alcohol

17/5 + 4/5: 8/5 + 6/5

21/5 : 14/5

21: 14

= 3: 2

  1. (a) % Profit taxes and insurance

40/100 x 75/100

Amount shared

= 100 – (25 + 30) x 225000

100

45/100 x 225000

= 101250

Amount Cherop received more than Asha:

Ratio of contribution

60,000: 85000: 105 000

12        :  17     :  21

21 – 12 x 101250 = 18225

50

(b) Profit during 2nd year

 

225000 x 10/9 = 250, 000

 

Nangila’s new ratio

= 110000 = 2

275000   5

\Nangila’s new share of profit

= 2/3 x 112500 = 45000

 

  1. 2 11/ 12 hours
  2. 10 days
  3. Kshs 52

 

TOPIC 4

MEASUREMENTS

  1. (a) (i)        (0.8 x 1.2) + (1.2) x 2 + (0.8 x 1) + ½ x 0.8 x 0.3 x 2

= 0.96 + 2.4 + 1.6 + 0.24

= 5.2 m2

 

(ii)        0.6 x 1.2 x 2

= 1.44

 

(b)        300 x 1.44

432 + 1820

= Kshs 2252

 

(c)        432 (1.5)2

= Kshs 972

  1. (a) 29 + 28/2 = 43

= 43 cm2

(b)        43.1075 x 104 x 104

1:25 x 108

1:5 x 104

= 1: 50000

  1. Area of rectangle = 19.5 x 16.5

= 321.75 cm2

Area of 4 triangles = ½ x 6 x 4.5 x 4

= 54 cm2

Area of Octagon = 321.75 – 54

  1. V1 = π h (11/2) 2

= 3.142 x (5.5)2 x  600

V2 = π(9/2)2 h

= 3.142 x (4.5)2  x 600

Volume of material used = V1 – V2

3.142 x 600 (5.52 – 4.52)

3.142 x 600  (5.5 + 4.5) (5.5 – 4.5)

  1. 142 x 600 (10) (1)

5.

 

 

¼ of area = ¼ x 60

= 15 cm2

\ ½ x 7.5 x X = 15

75 x = 30/75 = 4

 

\One of the sides = 7.52 + 42

= 8.5 cm

Perimeter = 8.5 x 4

= 34 cm

  1. Curved S.A = ½ x 22/ 7 x 2 x 4.2 x 150

= 22 x 0.6 x 150

= 1980 cm2

Area of two semi circular ends = ½ πr2 x 2 = 55.44 cm2

 

Area of rectangular surface = 8.4 x 150

= 1260 cm2

Total surface area = 1980 + 55.44 + 1260

= 3295 . 44 cm2

 

  1. a)

 

 

 

V = cross section area x height

= ½ x 2.4 x (2 + 5.6) x 8

= 72.96 cm3

 

(b)        Mass = 72. 96 x 5.75 = 419.52g

 

(c)        (i)         246.24 cross section Area x 8

Cross section Area = 246. 46 = 30.85 cm2

 

(ii)        419. 52 2

M2          5

M2 = 419. 52 x 5

2

= 1048.8 g

Density = 1048.8        = 4.26g cm-3

  1. 24

 

  1. Volume of plate = 1.05 x 1000

8.4

= 125 cm3

Length of the side = 125

0.2

= 25 cm

 

  1. (a) L.S.F = 20                    4

45        or        9          or 2

3

\V.S.F = 8

27

Capacity of smaller container

= 8 x 0.0945    = 0.28L

27

(b)        Let depth be h

45 (13 – h) = 20h

585 = 65h

H = 9

(c)        Amount in smaller container

1 x 9 x 45 + 20 x 9

5

= 261

Height in smaller container

261      = 13.05 cm

20

Difference 13.05 – 4  x 9

5

= 13.05 – 7.2

= 5.85

  1. 72
  2. (a) 107,800 litres

(b) 486 days

(c) 485 days

 

  1. (a) (i) 20.25m2

(ii) 50625 kg

(iii) 5625 kg

(b)        112.5 ( 113)

(c)        4 lorries

  1. 1.5 m
  2. (a) R = 8.5

R = 5.5

V = 1848 cm

  1. 97.43 cm3
  2. 267/75 cm2
  3. 270 cm2
  4. 425 ha

 

 

TOPIC 5

LINEAR EQUATIONS

  1. 3S + 2T = 840

4S + 5T = 1680

12 S + 8T = 3360

12 S + 15T = 5040

7T = 1680

T = 240, S = 120

  1. Y = 2x – 3

X2 – x ( 2x – 3) = 4

X2 – 3x – 4 = 0

(x + 1) (x – 4) = 0

X = -1 or x = 4

And

  1. 5s + 3b = 1750 ….( i)

3s + b = 850                ….(ii)

 

5s + 3b = 1750            ….(iii)

9s + 3b = 2550            ….(iv)

 

4s = 800

S= 200

B = 250

  1. Let the cost be Kshs c- cups

S – spoon

3c + 4s = 324

5c – 2s = 228

 

15c + 20s = 1620

15c – 6c = 684

26s = 936

 

S = 36 c= 60

  1. Let no of ten shillings coin be 6

No of five shilling coin = 2t

No of one shilling coin = 21- 3t

Value = 1 ot + 2t x 5 + (21 – 3t) x 1 = 72

17t = 51

T = 3

  1. 6a + 4b = 7.2

2a + 3b = 3.4

6a + 4b = 7.2

6a + 9b = 10.2

5b = 3b = 0.6 a = 0.5

  1. 4p + 6b = 66 ….(i)

2p + 5b = 51                ….(ii)

 

(a)        4p + 6b = 66    ….(iii)

4p + 10b = 102            ….( iv)

4b = 36

b = 9    p = 3

(b)        Let number of pencils bought be x;

3x + 9 (x+4) = 228

12x = 192

X = 16

  1. x (9x+4) = 32

X2 + 4x – 32 = 0

(x – 4) (x + 8) = 0

X = 4 or x = -8

Length of room is 4 + 4 = 8m

  1. 2p + 3b = 78 …………..(i) x 3

3p + 4b = 108  …………..(ii) x 2)

6p + 9b = 234

6p + 8b = 216

B = 18

Substituting for b in e.g. ii

3p + 72 = 108

3p = 36

P = 12

  1. m + 14 = 2(s+14)

(m + 4) + (s – 4) = 30

M= 2s + 14

M + s = 38

\2s + 14 + s = 38

S = 8

M = 30

\Mother’s age when son was born

= 30- 8 = 22

Present 14 years

  1. Ali’s age is 16 years

Juma’s age is 42 years

  1. s = 30, t = 150 total 180
  2. 1080

 

 

TOPIC 6

COMMERCIAL ARITHMETIC

  1. 25000 – 3750 = 21250

Amount to pay = 21250 + 21250 x 40 x 2

100

= 38250

One installment = 38250

24

= 1, 593.75

  1. (a) 21000 x 48 – 560, 000

1008000- 560000

= 448,000

(b) 448, 000 = 560, 000 x R x $

100

R = 448,000 x 100

560, 000 x 4

  1. 17500 x 95/5

= Kshs 322, 500

Let pineapples sold at Kshs 72 for every 3 be x and at Kshs 60 for every 2 be 144 – x

144 – x   x 60 + x x     72 = 3960

2                        3

4320 – 30 x + 24x = 3960

6x = 360

X = 60

  1. (a) C.P = 4000 x 100 = 1 2/3% or 5/3 %

(b)        Commission = 5/300 x 98/ 100 x 360,000

= 5, 880

  1. Let the buying price be x

Profit = (1048 – x)

Loss – (x – 880)

4x = 3680

X = Kshs 920

  1. Commission = 2.4 x 100,000 + 3.9 x 180, 000

100                    100

= 2,400 + 7, 020

= Kshs 9, 420

  1. Korir Wangari                       Hassan

¼ x      2/5 x ¾ x or  3/10x          3/2 x ¼ x or 3/8 x

Bank = x – (  ¼ x + 3/10 x + 3/8x)

= 3/40x

3/8 x – 3/40 x = 60,000

X = 200,000

  1. (a) Swiss Francs

 

52 = 40.63

1.28

 

(b) Kshs 40. 63 x 45 . 21

= 1837

  1. Selling price = 97. 5 x 120,000

100

= 117, 000

Commission = 5  x 117, 000

100

Kshs 5850

Total earning = 5850 + 9000

Kshs 14, 850

  1. 105, 000 x 9.74

= Kshs 1, 022, 700

Amt. Remaining = 1, 022, 700  – 403879

= 618, 821

= S.A and Received = 51, 100

  1. 2950000

118

= US dollar 25000

Duty Paid = 25000 x   20 x 76

100

= Kshs 380, 000

  1. (a) (i) Kshs 12, 000

(ii) Kshs 6150

(b)        Kshs 1500 and Kshs 2250

  1. £ 10 or £ 10.6
  2. 55086
  3. (a) Kshs 150, 000

(b) Kshs 2025

  1. Kshs 15818.40
  2. 11109 or 11110 ( table)
  3. Kshs 505, 000
  4. n = 60

 

 

TOPIC 7

GEOMETRY

  1. AB correctly constructed

ABP correctly constructed

(i)         AD = 4.5 ± 0.1 cm

Distance A to D = 4.5 x 10 = 45 km

(ii)        Bearing D from B = 241 ± 1

(iii)       Bearing p from D  = 123 ± 2

(iv)       DP = 12.9 + 0.2 cm

Distance D to P = 12.9 x 10 = 129 km

  1. Location of T

Location of K

Location of G

(a)        Distance TK = 80 ± 2km

Bearing of T from K: 0430 ± 1

(b)        Distance GT = 72 ± 2k

Bearing of G from T: 2450 ± 20

(c)        Bearing of R from G: 1300 ±

  1. (a) Bearing of 0600 drawn

Bearing of 2100 drawn

Distance on scale drawing

Representing 150 km

Representing 1800 km

(b)        (i)         Actual distance

(16 ± 0.1) x 200 or equivalent

= 3200 Km

(ii)        Bearing of T from S

= 224 ± 10

(iii)       Bearing of S from T

0440 ± 10

.           Measure AB  = 15 m

Measure 300 at B

Construct 900 at A

(a)        Measure height AT = 105.5 ± 1

Measure height AH = 8.7 ± 14

Measure height HT = 1.8 ± 1

  1. 2n – 4 right angles

2 xg – 4 = 14 right angles

14 x 90 = 12600

  1. sin β = Sin 300

12          15

Sin β = 0.5 x 12 = 0.4

15

Β = 23. 580 (23035)

Α 1800 – ( 30 – 23. 58)

= 126. 420 ( 1260 25)

Bearing of Z from X

1800 + 126. 420

= 306. 42 ( 3060 25)

N= 530 25W

  1. (a) RA = 30 or   RA = 30 tan 640

Tan 260

= 30 or 30 x 2.050

0.4877

= 61. 51 ( 61.5)

RB =     30      or = 30 tans 58

Tan 32

= 30    or 30 x 2.050

0.6249

= 48. 01 (48)

 

 

AB      61.522 + 48.012

 

= 3783 + 2305             = 6088

= 78.03

 

(b)        tan θ = 48.01

61.51

= 0.7805

θ = 370 58

= 32202 ( 322. 03)

  1. H = 12 sin 60

= 10.39

AD = ( 12 cos 60) x 2 + 4)

= 16

Area [ ½ x (4 + 16) 10. 39]2

= 103.9 x 2

= 207. 8 cm2

  1. (a)

 

 

 

 

 

  1. (a)

 

 

 

 

 

 

 

yz = 2002 + 2002 – 2x ( 200 x 200) cos 50

yz = 103. 53

Bearing of z from y = 2450

(b)        (i)

 

 

 

 

 

 

Yw = 200 cos 50

= 128.6

(c)        (i)

 

 

 

 

 

 

 

 

TY = 200 tan 60

= 21.02 m

 

 

 

 

 

 

 

Tan Ө = 21. 02

128.6

Tan Ө = w 0.1635

Ө = 9.280

  1. (a) From ∆ BCD

Sin 300 = BD

12

BD = 12 sin 30

= 12 x ½

= 6 cm

(b)        From ∆ ABD

Sin 45 = sin Ð ADB

6                 8

Sin Ð ADB = 8 sin 45

6

= 4 x 0.7071

3

= 0.9428

Ð ADB = 70.53

  1. (a) Ð ADE = 360

(b) Ð AEF = 660

(c) Ð DAF = 120

13.

 

 

 

  1. Ð LKM = 1100 ( – seen or implied)

Ð KLM = 350 ( or kml = 350)

Bearing is 1850

  1. (a) Diagram

(b)        (i)         73 ± 1 km

(ii)        1020 ± 10 or 5780 E ± 10

  1. (a) Diagram

600 km am 500 km seen or used

Scale used

Bearing and distance of P

Bearing and distance of Q

(b)        1060 ± 10 km

(c)        (i)         254 ± 10

(ii)        0.74 ± 10

  1. (i) 45 km

(ii)        124 ± 1

(iii)       123 ± 2

(iv)       129 km

  1. Location of T

Location of K

Location of G

(a)        Distance TK = 80 ± 2 km

Bearing of T from K: 0430 ± 1

(b)        Distance GT = 72 ± 2k

Bearing of G from T: 2450 ± 20

(c)        Bearing of R from G: 1300 ± 20

  1. (a) < BAE = 5400 = 1080

5

(b) < BED = 1080 – 360

= 720

(c) <BNM = 900 – 360

 

= 540

20.

 

 

 

 

 

 

  1. 2x + ½ x + x + 40 + 100 + 130 + 160 = 720

7x        = 280

2

X = 280 x 2 = 800

7

Smallest angle ½ x = 400

  1. Ext angle = 180 – 156

= 24

N = 360

24

= 15

 

 

TOPIC 8

COMMON SOLIDS

  1. (a)

(b)        Four (4) planes of symmetry

 

2.

 

 

 

 

 

 

 

 

3.

 

 

 

 

 

 

 

  1. (a)

 

 

 

 

 

 

 

 

 

 

 

 

(b)        VO = 3.7 cm   ( Not to scale)

5.

 

 

 

 

 

 

 

 

 

 

6.

 

 

 

 

 

 

  1. (a)

 

 

 

 

 

 

 

(b)        64.95 cm2

8.

 

 

 

FORM TWO

TOPIC 1

NUMBERS

  1. No Log

36.15               1.5581

0.02573           2.4104

1.9685

1.838               0.2874

1.6811 ¸ 3

[3 + 2.6811] ¸ 3

 

7.829 x 10-1 1.8937

= 0.7829 or 7828

  1. 24(x2) = 23(4 – 3)

4x2 = 12x – 9

4x2 – 12x + 9 =0

= (2 x -3) (2x + 9)=0

X  = 3/2 or 1.5

  1. No Log

(1934)2            3.2865 x 2

6.5730

0.0034 3.5105 ¸ 2

 

4 + 1.5105

2

2.75525

  1. 32825

436                  2.63950

4.884 x 102      2.6888

= 488.4 or 488.5

  1. No Log

55.9                 1.7474

0.2621             1.4185

0.01177           2.0708

= 3.4893

5 + 2.4893       = 1.4979

5                2.2495

 

1.776 x 102

= 177.6

  1. 22 x 52x

(2 x 5)2x – 2) = 10

  1. No Log

3.256               0.5127

0.0536             2.7292

1.2419 ¸ 3

( 3 + 2.2.2419) ¸ 3

0.5589             1.7473

  1. 25(x-3) x 22(x+4) = 26 ¸2x

5(x-3) + 3(x + 4) = 6 – x

9x = 9

X =1

  1. (34) 2x x (33)x = 36

8x + 3x – 2x = 6

9x = 6

X = 2/3

  1. 1 = 0.04072

24.56

4.3462 = 18.89

0.04072 + 18.89 = 18.93072

= 18.93

  1. No Log

0.032               2.5051

14.26               1.1541

1.6592

0.006               3.7782

1.8810x 2/3

17.954              1.2540

17.95

  1. x = ½
  2. 0.01341
  3. m = -3
  4. y = 0
  5. 177.6
  6. 2.721
  7. 0.0523
  8. 0.001977

 

 

TOPIC 2

EQUATIONS OF LINES

 

 

  1. (a) OT = 1/3           –1/2   +    2/3        4/10   =     3/6

 

(b)        (i)         Gradient PQ = 4

Gradient normal / ^ = – ¼

 

(ii)        y -6 = -1

X -3

4(y-6) = -1 (x-3)

4y – 24 = -x + 3

4y = -x + 27

 

 

(iii)       (6 ¾ – 6)2 + (3-0)2

 

=    9.5625

 

= 3.092

= 3.09 (3 s.f)

  1. L1 -2 =5

x-1

y = 5x -3

L2 at x = 4, y = 17

y -17 = -1

x – 5       5

y= 1/5 x + 89/5

  1. Midpoint of PQ = 5 + (-1) – (4 + (-2)

2                 2

= 2, -3

Gradient of PQ = -4 – (-2)

5 – (-1)

= -1/3

\Gradient of ^ bisector = 3

Equation of ^ bisector = y – (-3) = 3

x – 2

y + 3 = 3x -6

y = 3x – 9

  1. 7y = 3x -30

Y = 3x30

7     7

Y intercept = -30

7

X intercept = 10

A is (10, 0)

Based on line y = -x

Y = 3x30 = 3(-y)30

7      7        7        7

Y = -3y – 30

7       7

10y/7 = -30/7

Y = -3

\x =3

B (3, -3)

  1. 8-k = -3

k-3

8-k = -3k + 9

2k = 1

\k= ½

Taking a general point (x,  y)

Y – 8 = -3

X  – ½

y- 8 = -3x + 3/2

3x + y = 9 ½ or 6x + 2x + 2y = 19

  1. 6+2 1+3      = (4,2)

2           2

1 -3    x u2  = -1  (M2 = 2

6 – 2

Y – 2  = 2

X – 4

 

\2x – y = 6

 

  1. (a) 1/5

(b) y = -5x + 7

  1. y = 2x – 3
  2. y = -2x + 13
  3. y = 2/5x + 5
  4. Gradient = 4/3 or 1 1/3

Y – intercept  = -3

 

 

 

TOPIC 3

TRANSFORMATIONS

 

 

 

  1. x =          -1        –            1          -2         =

y                      2                      2          0

 

 

 

x1         =          -3         +          -2         -5

y1                     -3                     0          -3

 

=> (x’, y’) = (-5, -3)

 

 

 

 

 

 

 

 

  1. -5 + T       =          -1

4                                 -1

 

T =       -1         –           -5

-1                     4

 

 

T =       4

-5

 

 

-4         +          4          =   0

5                     -5              0

 

 

  1. 0 1    2   4   1   =       1    1    6

-1  0     1   1   6            -2  -4  -1

  1. (a) (i) Diagram

(ii) A” (2) B” (7 -2) C”( 5, -4) D” (3, -4)

(b)        A” (2) B” (-7, -2)  C” (-5, -4) D”(-3, 4)

(c)        Half turn

Centre (0,0)

 

  1. 5 –     3          =          2

4          2                      6

 

OQ = 2    +       2         =  4

5            -6              1

 

 

PQ =  4         5       =    -1

-1       -4              3

 

 

PQ =    (-1)2 + 32

 

                 = 10

  1. (a) Translation = 10 –  -2      =      12

10        3                7

 

\Q = 1           + 12     =          13

3               7                  10

 

 

= 13, 10

 

(b)        m        -2m      – n        1          =          -12

3m                  3                         9

 

-2m      –           n          = -12

3                     3n              9

 

-2m – n = -12 ………….. x3

3m – 3n = 19 ………….. x1

-6 m – 3n = 36

3m – 3n = 9

-9 = -45

M = 5; n = 2

  1. (a) Reflection along y- axis          (x =0)

(b)        ( on graph)

(c)        Rotation about (0,0) through 900

(d)       On the graph

(e)        P” Q” R” and P” Q” R”

P Q R and P’ Q’ R’

P” Q’ R’ and P” Q” R”

 

TOPIC 4

MEASUREMENT

  1. 4/3 x 22/7 x r31/3 x 22/ 7 x 9 x 9 x 12

R3 = 243

R = 6.24 or equivalent

A = 4 π r2 = 4 x 22/7 x 6.24 x 6.24

= 489. 5 cm3

  1. (a) Area of path = 22/7 x 49222/7  x 352 = 36976m2

Area of slab=

22/7 x 35 – 4 x 4 x 3 = 3850 – -48 = 3802m2

Total cost  = 3696 x 300 + 3802 x 400 = 2629600

Amount nit spent = 20/100 x 115/ 100 x 2629600

Kshs 604808

(b)        Actual expenditure

= 80/100 x 115/100 x 2629100 = 2419232

  1. 1 + x2 = (2x -1)2 -1

3x2 – 4x – 1 = 0

X = 1.549m

  1. Volume of the cone = 1/3 x 22/7 x 7 x 7 x 18

= 924 cm2

Let change in height be H

Volume of water displaced = 22/7 x 14 x 14 x H

= 616 cm3

Π x 14 x 14 x H = 1/3 π x 7 x 7 x 18

H = 49 x 6 = 1.5 cm

14 x 14

  1. (a) 1/3 π x r2 x 9 = 270 π

R2 = 270 x 3 = 90

9

R = √90 = 9.49

  1. Initial volume = 4/3 πx 23

= 32/3 π

New vol. = 32/3 π x   337.5

100

= 36 π

  1. (a) y2 – ( ½ x x2 x4)

Y2 – 2x2

(b)        2x2 = 142

X = 7 √2

(c)        Area of the octagon

Y = 14 + 2x = 14 + 2x 9.9

A = y2 – 2x2

= (3.38)2 – 2 x (9.9)2

= 946. 44 cm2

  1. Volume = 1/3 x 12 x 9 x 6

= 216 cm3

  1. (a) (i)         A = 22/7 x 4.2 x 4.2 = 55. 44

= 55.44 cm2

(ii)        Let slanting length cone be L

\L- 8 = 3.5 or equivalent

L        4.2

L= 48 cm

Curved area of frustum

= 22/2 (4.2 x 48- 3.5 x 40)

= 193.6 cm2

(iii)       Hemispherical surface area

= ½ x 4 x 22/7 x 3.5 x 3.5

= 77 cm2

(b)        Ratio of area = 81.51: 326. 04

= 1.4

Ratio of lengths = 1.2

Radius of base = 4.2

2

= 2.1 cm

  1. ½ x 5 x 5 sin 120

½ x 25 x 0.8666

10.83 cm2

  1. BO – OD = 152 – 122 = 81 = 9

Area = ½ x 9 x 12 x 2 x ½ x 9 x 18 x 2

= 108 +  162

270 cm2

  1. 1/3 x 22/7 x 6 x 6 x 9 + ½ x 4/3 x 22/7 x 6 x 6 x 6

339.4 + 452.6

= 792

  1. X –section Area = 22/7 (42 – 32) cm2

= 7 x 22/7

Vol = 7 x 0.2 x 22/7

= 4.4 cm3

 

  1. Let the width be x

(3/2 x + x) 2 + 2x= 21

3x + 2x + 2x = 21

7x = 21

X = 3 cm

  1. V1 = π h (11/2)2

= 3.142 x (5.5)2 x 600

V2 = π (9/2)2 h

= 3.142 x (4.5)2 x 600

Volume of material used = V1 – V2

3.142 x 600 (5.52 – 4.52)

3.142 x 600 (5.5 + 4.5) (5.5 – 4.5)

3.142 x 600 (10) (1)

= 18.852 cm3

  1. X- Section Area = ( ½ x 5 x 5 sin 60 ) x 6

= 10.825 x 6

= 64.95

Volume = 64.95 x 20

1,299 cm3

  1. Curved S.A = ½ x 22/7 x 2 x 4.2 x 150

= 22 x 0.6 x 150

= 1980 cm2

Area of two semi- circular ends = ½ πr2 x 2

= 55. 44 cm2

Area of rectangular surface = 8.4 x 150

= 1260 cm2

Total surface area = 1980 + 55. 44 + 1260

= 3295. 44 cm2

18 (a)

 

 

 

 

 

Ac        = πrl

= 3.142 x 3 x 5

= 47.13 cm2

Acs       = πDh

= 3.142 x 6 x 8

= 150. 82 cm2

 

As        = ½ 4πr2 = 2 πr2

= 2 x 3.142 x 9

= 56. 56 cm2

Ext S.A = 47. 13 + 150. 82 + 56. 56 = 254 cm2

(b)        c.s.f     = 15/600          = 1/40

\A.S.F           = 1/1600

254.5               = 1

actual area         1600

Actual Area     =          407, 200 cm2

Actual area      =          40.72 m2

40.72 x 0.75    = 1.527 ltrs

20

  1. (a) Let width of path be xm

L = 10 + 2x

W = 8 + 2x

(10 + 2x) (8+ 2x) = 168m2

80 + 16x + 20 x + 4x2 = 168

4x2 + 36x – 88 = 0

X2 + ox – 22 = 0

(x-2) (x + 11) = 0

\x = 2m

(b) (i)   Area of path = 168 – (10 x 8) = 88m2

Area covered  by corner slabs

= 4(2x)            = 16m2

Area to be covered by smaller slabs

= 88 – 16 = 72m2

No. of smaller slabs used

= 72 x 100 x 100 = 288

50 x 50

(ii)        Cost of corner slabs

600 x 4            = 2400

Cost of smaller slabs

288 x 50 = 14400

Total cost = 2400 + 14400

Kshs 16,800

  1. Cos 0 = 2.5/ 5 = 0.5

θ = 600

Surface under water = 2 x 60 x π x 10 x 12 = 125.7

360

  1. Area of each sector

60 x π x 62

360

= 18.84955592

Area of ∆ = ½ x 6 x 6 x sin 600

= 15.5884527

\ Area of the shaded region

15.58845727 + 2(18.84955592) – 15.5884527)

= 15.58845727 + 6.522197303

= 22. 11065457

= 22.11

  1. (i) 93.54 cm2

(ii) 28.06 cm2

  1. (a) 107,800 litres

(b) 486 days

(c) 485 days

  1. 72
  2. (a) Sketch

(b) 10.44 cm

 

 

TOPIC 5

QUADRATIC EXPRESSIONS AND EQUATIONS

  1. 2x – 2 ¸          x   –  1

6x2 –x – 12                  2x – 3

2(x -1)             x         (2x -3)

3x + 4) (2x – 3)           x-1

= 2

3x + 4

  1. y = 2x – 3

X2 – x (2x – 3) = 4

X2 – 3x – 4  = 0

(x + 1) (x- 4) = 0

X=-1 or x = 4

And

Y = -5 or y = 5

  1. 72(x -1) + 72x = 350

7(2x + 2)  + 72x = 350

49 (72x) + 72x = 350

72x (49 + 1) = 350

72x (50) = 350

72x = 7; 2x = 1

X = ½

 

  1. 3x2 – 1 – (2x + 1) (x-1)

X2 – 1

X2 + x

X2 – 1

X (x+ 1)          = X

(x + 1) (x – 1)   x -1

  1. 3x2 – 3xy + xy – y2

3x (x –y) + y( x- y)

(x- y) (3x + y)

  1. (a + b) (a- b)

(2557 + 2547) (2557 – 2547)

5104 x 10

51040

  1. (a) (i)         (x + y)2 = x2 + 2xy + y2 = 32

\x2 + 2xy + y2 = 9

(ii)        2xy = 9 – (x2 + y2)

= g – 2g

= -20

(iii)       (x-y)2 = x2 + y2 – 2xy

= 2g – (-20)

= 49

(iv)       x-y = ±  √49

= + 7 or -7

(b)        x + y = 3

X – y = 7                     x + y = 3

2x = 10                        x – y = -7

X = 5                           2x = -4

Y = -2                          x = -2

Y =5

  1. (3a + b) ( a+ b)

(4a – b)  (a+ b)

3a + b

4a – b

  1. (a) 10x + y

(b)        3(x+ y) + 8 = 10x + y  …… (i)

10y + x = 10x + y + 9 …….(ii)

2y – 7x = -8

9y – 9x = 9

18y – 18x = 18

18y – 63x = -72

45x = 90

X = 2; y = 3

Xy = 23

  1. 2a2 – 3ab – 2b2 = 2a + b)(a – 2b)

4a2 – b2 = (2a – b) (2a + b)

(2a+ b) (a – 2b)

(2a – b) (2a + b)

a – 2b

2a – b

  1. (3t + 5a) (3t – 5a)

3t + 5a (2t + 3a)

= 3t – 5a

2t + 3a

  1. p2+ 2pq + q2

                P3 – pq2 + p2q – q3

 

(p + q) (p + q)

P2 – q2) (p + q)

 

(p+ q) ( p + q)

(p – q) (p + q) (p + q)

 

    1

(p – q)

  1. 14(x2 – y2) (x2 + y2) (x4 – y4)

 

= (x4 – y4) (x4 – y4)

= x8 – 2x4 y4 + y8

(x2 – y2) (x6 – x2 y4 + x4 y2 – y6)

  1. x + y = 40 Þ y = 40 – x

\Sum of the squares in terms of x

S = x2 + (40 – x)2

2x2 – 80x + 1600

  1. 15a2 b – 10ab2 = 5ab (3a – 2b)

3a2 – 5ab + 2b2            (3a – 2b) (a- b)

= 5ab

a-b

  1. (i) 9a + 6

(ii) 18

  1. x = 3/2
  2. 3
  3. x = 4
  4. y = 0
  5. 2x + y

X – 3y

  1. Juma = 42 years

Ali = 16 years

  1. x – 8

X – 2

  1. d = 49

 

 

TOPIC 6

INEQUALITIES

  1. 2 £ 3 – x 3 – x < 5

-1 £ -x             -x <2

1³ x

-2 x £ 1 or 1 ³ x > -2

  1. 4 – 2x < 4x – 9

13< 6x

13/6 < x

4x – 9 < + 11

Þ 3x < 20

X < 20/3

Integral value of x = (3,4,5,6)

  1. 3-2x < x

3 – 2x + 2x < x + 2x

3 < 3x

1 < x

x = £ 2x + 5

3

3x £ 2x + 5

x £ 5

= 1 £ x £ 5

  1. x = ³ -16
  2. (a) x > 0, y >0

(b)        200x + 1400 y £ 9800 or x + 7y £ 49

(c)        (i)         x = 10, y =4

(ii)        x = 7, y =6

Distance = 690 km

 

TOPIC 7

CIRCLES

  1. < PCB = 40 or <DCQ = 40

Or < BCD = 1400

\< BAD = 400

 

  1. (i) < BAC or < BCA = ½  x 90 = 450

< CAD = 180 – (90 + 25)

½ x (180 – 2 x 25)

= 650

<BAD = 450 + 650 = 1100

(ii)        Obtuse < BOD = 2 ( 45 + 25)

= 1400

= BGD = 700

(iii)       < ABC = < BAC = 450 base

< ABE = <ACB = 450 < s is alt- segment

< CBF = < BAC = 450 <’s alt- segment

\< ABE = CBF

  1. (a) < QTS = 400

< s’ in alt- segment

(b)        < QRS = 100

Reasons: < SQT = 900 on semi circle

Þ < TSQ = 500

\QRS = 50 – 40 etc < of  ∆

(c)        < QVT = 350

Reasons < QVT = SQV alt < S

(d)       < UTV = 150

Reasons < QUT = UTV + QVT

Ext < of triangle

\ = 50 – 35

  1. (a) < RSTY = 104

(b)        < TSU = 180 – 104 = 760

< QTS =  180 – (90 + 37) = 530

Or < QRU = 180 – 48 = 132

< SUT = ( 48 + 53)0 – 760

Quadrilateral

OR 360 – ( 132 + 76 + 127)

= 250

(c)        Obtuse < RUT = 76 x 2

= 1520

(d)       <PST = 70 – 48 or equivalent

= 420

  1. (a) (i)         <CBD = 90 – 42 = 48

Subtended by diameter

(ii)        < BOD = 180 – 42 = 1380

Cyclic quadrilateral

Reflex BOD = 360 – 138 = 2220

 

(b)        In ∆ BAD

< BAD = ½ x 138 = 690

< ADB = 1800 – 42 + ½ x 138)

= 180 – 111

= 690

  1. (a) < ECA = 280

< CEG = 1200 or < EAG = 1200

< ABC = 880

  1. < RST = 35 + 200 = 55

550

 

 

 

 

 

 

 

 

 

TOPIC 8

LINEAR MOTION

  1. (a) 300

T – 1

(b)        Speed of the bus = 500

T -1

500:     300 = 5: 3

T -1      t – 1

  1. Speed of slower athlete = 800

108

Distance =   800 x 4

108

= 29.63

  1. Distance covered by bus A at loan

= 90 x 2 = 180 km

Bus B time between 2 stops

72 = 1.2 hours

60

Bus B leaves L at 9.17 am

Distance between 9: 17 and 10.00 a.m

= 60 x 43 = 43 km

60

At 10 am Bus B has covered 72 + 43 = 115 km

Distance between Bus A and B at 10 am

360 – ( 180 + 115) = 65 km

  1. Let dist covered by bus be x km

X = 220 – x + 3

60      80          4

4x = 3 (220- x) + 3 x 60

4x = 660 – 3x + 180

7x = 840

X = 120

ALT METHOD 2

Let time taken when both are moving to be t hrs

60 ( 1 + ¾ ) = 220 – 80 t

Þ t = 1 ¼ h

Time bus moving  = 1 ¼ + ¾ = 2 h

Distance bus covered = 60 x 2

= 120

 

 

 

ALT METHOD 3

Relative velocity = 140

\ time taken  = 220 – ¾ x 60

140

= 1.25 h

\Distance bus covered

1.25 x 50 + 45 = 120

  1. (a) d  – d = 3

50   80

8d – 5d = 3

400

3d = 1200

D = 400 km

(b)        (i)         400 x 0.35 + 400 x 0.3 = 260 ltr

(ii)        Total time

400 + 400 = 12 hours

50        80

Average consumption = 260

13

= 20 litres/ hr

  1. (a) Time taken by lorry = 280h

X

Time taken by car =   280 h

x + 20

280 –    280 =      7

X         x + 20      6

280 ( x + 20) – x ( 280) = 7

X (x + 20)            6

280 x + 5600 – 280 x = 7/6 (x2 + 20x)

7x2 + 140x – 33600 = 0

X2 + 20x – 4800  = 0

(x+ 80) (x – 60) = 0

X = -80 or x = 60

\Speed of lorry = 60 km/h

(b)        Speed of car = 80 km/ h

Time taken to meet = 4h

Distance covered by lorry in 4 hours = 60 x 4 = 240 km

Distance covered by car at meeting point = 240 km

Time taken by car = 240

80

= 3 hrs

\Car left M at 9.15 am

  1. Distance covered by bus in 2 ½ hrs

60 x 5  = 150 km

2

(a)        (i)         500 – 150 = 350 km

(ii)        Overtaking speed = 100 – 60 = 40 km/h-1

Distance  = 150 km

Time taken to overtake  = 150 = 3 ¾ hrs

40

Distance traveled by car to catch up

= 100 x 15/4 = 375 km

(b)        Distance remaining = 500 – 375  = 125 km

Time taken by bus to cover 125 km

= 125   = 2 ½

60

Time left for the car after rest

= 2 hrs 5 min – 25 min

= 1 hr 40 min

\New average speed = 125 ¸ 1 2/3 = 75 kmh-1

  1. Amount of fuel used = 120 x 8

4       3

 

Amount of money spent = 80 x 59

= 4720

  1. (a) 15 km

(b) 71.25 km

  1. 97
  2. 9.20 am
  3. (a) 20 m/s

(b) 220 m

 

 

FORM 3

TOPIC 1

QUADRATIC EXPRESSIONS AND EQUATIONS

  1. a) (i)         b – a = 35……..(i)

7b – 490a = 39.9….(ii)

A = 4.9 b = 40

(ii)        S = 4.9t2 + 40t + 10

 

t 0 1 2 3 4 5 6 7 8 9 10
t 10 70.4 85.9 91.6 87.5 73.6 16.4 -26.4

(b)        (i)        Suitable scale

Plotting

Curve

(ii)        Tangent at t = 5

Velocity = -9.0 ± 0.5 m/s

  1. (a)
X -3 -2 -1 0 1 2 3 4
Y 6 0 -4 -6 -6 -4 0 6

(b)        Suitable scale

Plotting

Curve

(c)        y = -3x -4

Line drawn

  1. (a)
X -4 -3 -2 -1 0 -0.5 1 2 3 4 5
Y -14 -6 0 4 6 6.25 6 4 0 -6 14

B1 For all values correct

Line graph = y = 2 – 2x

(b)        x = -1  x =4

(c)        6 + x – x2 = 2 – 2x

X2 – 3x – 4 = 0

  1. (a) x          -2         -15       1          0          1          2          3          4          5

X3       8          -3.4      -1         0          1          8          27        64        125

-5×2     -20       -11.3    -5         0          -5         -20       -45       -80       -125

2x        -4         -3         -2         0          2          4          6          8          10

y          9          9          9          9          9          9          9          9          9

(b)        On the graph scale

Plotting

Curve

(c)        2.15 ± 0.1

(d)       y = 4 – 4x

X = 0.55 ± 0.1

5.

X -4 -3 -2 -1 0 1 2
2x2 32 18 8 2 0 2 8
4x-3 -19 -15 -11 -7 -3 1 13
Y 13 3 -3 -5 -3 3 13

Plotting and linear scale

(b) X = 2. 6; x = 0.6

(c) Eq. of straight line = y = 3x + 3

  1. (a) (i)
x -3 -2.5 -2 -1.5 -1 -05 0 0.5 1 2 2.5
X3 -27 -15.63 -8 -3.38 -1 -0.13 0 0.13 1 8 15.63
X2 9 6.25 4 2.25 1 0.25 0 0.25 1 4 6.25
-2x 6 5 4 3 2 1 -1 -2 -4 -5
y -12 -4.38 0 1.87 2 1.12 0 -0.63 0 8 16.88

 

(ii) 0 < x < 1                -3 <x<-2

(b)       Line y = 2

(1.3, 1.3) and ( -2, -2.3)

  1. a0 Find midpoint (centre) = 5 + (-1),   5 + (-3)

2              2

=[4/2 , 2/2]

= (2, 1)

(b)        Vector of (a,b) = (2,1)

 

 

R =      5          –           2          =          3

5                      1                      4

 

\r = 32 + 42

 

= 5 units

(x  – 2)2 + (y – 1)2 = 52

X2 – 4x + 4 + y2 – 2y + 1        = 25

X2 + y2 – 4x – 2y – 20                        = 0

  1. (a) Let x be the number of computer bought. Using original price.

Original price per unit = 1800000

X

New price per unit = 1800000 – 4000

X

\1800000 – 4000 = 1800000

X                     x + 5

 

1800000 x – 4000 x2 + 9000000 – 20000x

= 1800000 x

X2 + 5 x – 2250 = 0

X2 + 50 x – 45x – 2250 = 0

X( x + 50) – 45 (x + 50) = 0

(x – 45) (x + 50) = 0

X = 45

\No of computers bought = 50

(b)        No of computers left after breakage = 50- 2 = 49

Selling price to realize 15% profit

= 1800000 x 1.15 = 2070000

Buying price per unit =     1800000

50

Profit per unit = 2070000       1800000

48                  50

= 43125 – 36 000

= 7125

  1. When x = 0, y = 2 \ k x 1 x -2

2 = -2k

K = -1

 

 

 

TOPIC 2

APPROXIMATION AND ERRORS

1 .(a)  R = 1                        = 1 x 106

0.000016                   1.6

=625,000

(b)  (i)         Approximate value  =                         1                     

0.00315 -0.00313

=        1          =  1 x 105

0,00002        2

= 50,000

(ii)        Error = 62500 – 50,000

= 12500

  1. (a) c = 2×2.8 x 22/7  =17.6

c/π=  17.6 x 7/22  = 5.6

5.6 + 0.05

(b)        3.142 x 2.8 x 2 = 17.595

3.142 x 5.5 = 17. 281

3.142 5.7  =  19.909

Limits  17.28 – 19.91

. (a)      Maximum possible Area

4.11 x 2.21 = 9.083

Minimum possible Area

4.09 x 2.19 = 8.9571

(b)   Maximum possible wastage

9.0831 – 8.957

0.126m2

  1. (a) Working area = ½ x 6 x 4 =12

Maximum area = ½ x 6.5 x 4.5 = 14. 625

Minimum area = ½ x 5.5 x 3.5 = 9.625

Absolute error = 14.625 – 9.625

= 5

(b)        %  error = 5/12 x 100

= 41. 7%

Actual value = 788 x 0.006

  1. 4.728

Approximate value = 800 x 0.006

= 4. 728

Approximate vale = 800 x 0.006

= 4.8

% Error            = 4.8 – 4.728 x 100

4.728

  1. Greatest possible error = 64 ( 3. 15 – 3.05)

2

= 201.6 – 195 . 2

2

= 3.2 cm3

  1. 40 ± 6.5

6.5 = 0.1625

40

  1. Min Perimeter = 74.75 cm
  2. (i) Ans. 0.24 error 0.003

(ii) Ans 0.23 error 0.007

  1. Ans 10%

 

 

TOPIC 3

TRIGONOMETRY

  1. 5/2 θ = 2100, 3300

θ = 4200, 660

5       5

= 840, 1320

  1. (a) X = 32 – 22

Tan θ = 2

√5

(b)        Sec2 θ = tan2 θ + 1

= 4/5 + 1

= 1.8

  1. Sin2 (x – 30) t = ½ x ½ = ¼

Sin (x – 30) = ½ = ± 0.5

X = 30 = 300, 1500, -300, -2100

X = 600, 1800, 00, -1200, – 1800

  1. Cos 2x = sin (90 – 2x)

Sin (x + 30) = Sin (90 – 2x)

S + 30 = 90 – 2x

3x = 60

X = 200

Cos2 3x = Cos 260

= ( ½ )2

= ¼ or 0.25

  1. X2 = (√= 12 = 4

X = 2

(a) \Cos α = 2

√5

(b) Tan ( 90 – α) = 2

  1. (a) Sin2X + cos X = 1

Sin2 x  = 1  – cos2 x

8 ( 1-cos2) + 2 cos X – 5 = 0

8 – 8 (cos2 x + 2 cos X – 5 = 0

-8 cos2X + 2 cos X + 3 =0

Let Cos X be t

– 8t2 + 2t + 3 = 0

Let Cos x be t

-8t2 + 2t + 3 = 0

T = ½  t= ¾

Cos X = ¾

(b)        Tan X = √7

3

 

 

 

 

 

  1. Cos 2x0 = 0/8070

2x0 = 36.20, 323.80, 396. 20, 638.80

X0 = 18.10, 161.90, 198.10, 341.90

  1. (a) From ∆ BCD

Sin 300 = BD

12

BD = 12sin 30

= 12 x ½

= 6 cm

(b)        From ∆ ABD

Sin 45 = sin Ð ADB

6                  8

Sin Ð ADB = 8 sin 45

6

= 4 x 0.7071

3

= 0.9428

ÐADB = 70.53

9.

 

 

 

 

 

 

 

Where 2d + Qs = 3.6m

Qs        =          3.6 – 2d

1.8       =          d

Sin 900             Sin 270

D = 1.8 sin 270

Sin 900

= 0.8172

QS = 3.6 – 1.6344

= 1.9656m

  1. Tan 300 = AE

100

(a)        (i)         AE = 100 Tan 300 = 57.74m

(ii)        57.74   = AC   = 81.6m

Sin 450   Sin 900

AD2 = 802 + 81.662 – 2(80 + 81. 66) cos 100

= 6400 + 6668. 36 – 2 (161. 66) cos 100

= 13124.48

AD = 114. 6m

(iii)       Cos 300 = 100 ; AB = 100 = 115. 47

AB             cos 300

EC = 57.74m ( ÐAEC is isosceles)

Perimeter = BE + EC + CD + DA + AB

= 100 + 57. 74 + 80 + 114.6 + 115.5

= 487. 84

(b)        487.84 – 2.8 = 485. 04

485.04 x 5       = 5.0525

480

  • 6 rolls of barbed wire are required

11        l2 = 52 – (2√5)2 = 5

L = √5

\tan (90 – x)0 = 2 √5 or 2

√5

  1. 1 Ð ACB = 38.50

2

            8.4       = x

Sin 100.5   sin 410

X = 8.4 sin 410

Sin 100.5

X = CN = 5.6

  1. (a) Ð ABQ = 180 – 9550 = 8450

\ AB =              5.8    = 60.5 m = 14.50 = 61m

Cos 84.5

(b)        (i)         Ð ABC = 95.5 + (90.30.5)

= 1550

Scale 1cm: 10cm

 

 

 

AC = 9.4 x 10 = 94m

(Using 63 m = 96m) ± 1m

 

(ii)        Ð BCA = 160 ± 10

\Ð of depression of A from C

= 30.50   –  160

 

 

 

TOPIC 4

SURDS AND FURTHER LOGARITHMS

  1. Log x3 + log 5x = 5 log 2/5

Log (x3  x 5x) = log 32 x 5

2

5x4 = 80

X4 = 16

X = 2

  1. (1 + √3) (1- √3) = 1-3 = -2

1          x          1-√3

1 + √ 3             1-√3

 

= 1- √3 = – ½ + √3

-2                3

 

1.7321 – 0.5

2

= 0.366

  1. √14 √7 + √2) – √14 √7-√2)

(√7 – √2) (√7 + √ 2)

a = 4/5, b = 0

  1. 49(x+1) + 7(2x)= 350

49(72x) + 7(2x) = 350

50 (7(2x) ) = 350

7(2x) = 7

2x = 1

X = ½

  1. 5 log 1 x2 =   log  1

125               125

 

1 x2      = 1

125        125

 

X2 = 1

X = 1

  1. √14 + 2 √3 – (√ 14 – 2√3) = 4√3

(√14)2 – (2√3)2                        2

7.

 

 

 

 

 

 

 

 

 

 

Tan 150 =         1

2 + √3

 

1             x       2-√3

2 + √3              2 + √3

 

= 2 -√3

  1. 3√7 + 6√2

4√2 + 2√7

 

(3√ + 6 √2) (4√2 – 2√7)

(4√2 + 2√7(4√2-2√7)

 

12√14 – 42 + 48 – 12 √14

32 – 38

= 6/4 or 1.5

  1. 3 + 1       =          3(√5 + 2) + 1 √5

√5 – 2        √5                    5 – 4           5

= 3√5 + 6 + 1   √5

5

= 6 + 16  √5

5

  1. y =0
  2. x = 5, x = 1/3
  3. x =1, x =0
  4. x =3

 

 

 

TOPIC 5

COMMERCIAL ARITHMETIC

  1. (a) by 30th June, 1996

A = 12000 x 0.9

= Kshs 13080

(b)        By 30th June 1997

A = 12000 x 1.092

13080 + 14257.20

Kshs 27337.20

  1. (a) Cost/ ton/km = 24000

28 x 48

Kimani received

24000 x 96 x 49

28 x 48

= 84000

(b)        Profit = 84000 – 96 x 3000 = 48,000

8

(c)        Achieng received 84 x 24, 000 = 72,000

28

Transportation cost = 72,000 x  100 = 50,000

144

  1. (a) Total earning   40480

20

435 x 2 =         870

435 x 3 =         1305

435 x 4 =         1740

435 x 5 =         2175

284 x 6 =         1704

7794

(b)        Net tax – Kshs 7794 – 800

Kshs 6994

(c)        New earnings

1.5 x 2024 = £3036

£ 3036 – £ 2024 = £ 1012

Net tax = 1012 x 6

= Kshs 6072

% age excess = 60 72 x 100

7794

  1. (a) (i)         750,000 x 90

100

= 675, 000

(ii)        675, 000 (1.1)3 = 898, 425

898, 425 + 75,000 = 973, 425

 

(b)        675,000 (1.1)n = 816, 750

(1.1)n = 1.21

N =     0.0828

0.0414

N = 2 years

  1. S1 = P x 2 x 5

100

= 0.1P

Amount after 2 years = P ( 1+ 5)2

100

P (1.05)2 = 1.1025P

Compound  interest = 1.1025P – p

= 0.1025P

0.1025P – 0.1P = 0.0025P = 210

P 210 x 104 =       84 000

0.0025 x 104

  1. (a) (i)         A = P + l

Total interest = 12,800 x 3

= 38,400

P = A – l

P = 358, 400 – 38, 400

= Kshs 320,000

(ii)        R         = l

100        PT

R =      1 x 100

PT

= 12,800 x 100

320, 000

R = 4%

(b)        Deposit            = 25 x 56 000 = 14,000

100

Balance = 56,000  – 14,00 = 42,000

42,000 = 2625             n = 16 installments

N

(ii)        B.P =  175 x 40,000 = Kshs 35,000

200

Difference       = 56,000 – 35,000

= 21, 000

21,000 x 100 = 60%

35,000

  1. Let monthly income be y
Taxable income Rate Tax payable Acc. Tax
9681 10% 10% x 9681 968.10
18,801 – 9681 = 9120 15% 15% x 9120 = 1368 2336.10
\y – 9684 = x 15% 15% x = 947. 90 1961

X =  94.90 x 100

15

= 6319. 3

Y = 9681 = 6319.3

Y = 6319.3 + 9681

= 16000.30

= Kshs 16,000

  1. Interest = (13 800 – 2280) x 20 x 2

100

= 11520 x 0.2 x 2 = 4608

Each monthly installments = 11520 + 4608

24

Kshs 672

  1. (a) Kshs 60, 000

(b) Kshs 79, 860

  1. Kshs 240, 000
  2. Amount payable = Kshs 75510
  3. = 200,00
  4. 9663.6

 

 

TOPIC 6

CIRCLES CHORDS AND TANGENTS

  1. Area of the sect or = 75 x 22 x 14 x 14

360   7

= 128. 3 cm2

Area of ∆ = ½ x 14 x 14 sin 750

= ½ x 14 x 14 x 0.9659

= 94.64 cm2

  1. (a) PS = (342 – 162 ) = 900

= 30

(b)        Cos POS = 172 + 172 – 302 = -322

2 x 17 x 17      578

= -0.5572

\POS = 1230 50 ( 123. 860)

  1. (a) 6 x C = 4.8 x 5

XC = 4.8 x 5 = 4

6

(b)        BT2 = (6 + 4 + 8) x 8

= 18 x 8 = 144

BT  = 12

  1. (a) Area = 120 x 7 x 7 x 22= 51 1/3 cm2

360                7

(b)        ½ AD = 7sin 600 = 7 cos 60

AB = 14 -2 x 7x 0.5 = 7

Area of trapezium XZBY = ½ ) (7 + 14) x 6.062

= 63.65 cm2

(c)        Area of shaded region = 2 (63. 65 – 511 1/3)

= 127. 30 – 102. 67

= 24. 63 cm2

  1. θ = Angle POT

Cos θ = 7/25

θ = 730 55’ or 73. 74

PQ = 7 x 2 sin 73. 74

= 14 x 0.9608

= 13. 44 cm

6.

 

 

 

< RST = 35 + 20 = 55

= 550

  1. Area of each sector

60 360 x π x 62

360

= 18.849555592

Area of ∆ = ½ x 6 x 6 x sin 600

= 15. 5884527

\Area of the shaded region

  1. 588445727 + 2(18.84955592) – 15.5884527)

= 15. 58845727 + 6.522197303

= 22.11065457

= 22.11

  1. (a) NR = 42 + 7.52

= 8.5 cm

(b)        QR (14 + 8.5) = 7.52

4xAN = 14 (8.5 – 2.5)

AN = 14 x 6

4

= 21 cm

 

 

 

TOPIC 7

MATRICES

  1. A2 = 1   2      1   2     =          9    8

4   3     4   3                 16  17

 

 

 

B =      9     8        1   2            =          8     6

16  17       4   3            =          12  14

 

  1. 1 3     3   1      –         3   1     =          p  0

5   3     5   -1                5   -1                0  q

 

18 = 3p 5q = 30

P = 6  q = 6

  1. (a) x2   0   –           x   0     =          x2            0

5    y                5   y                 5x + 5y   y2

 

 

(b)        x2            0       =          1   0

5x + 5y   y2                  0    1

 

 

5x + 5y = 0

 

If x = 1,  y       = -1

If x = -1, y       = 1

  1. (a) m = 54 – 56 = -2

 

 

Inverse matrix = -1      6         -8

2      -7         9

 

Or        -3         4

7    –     9

2          2

(b)        Let the price  of each bicycle be x and each radio be y

36 x + 32y = 227280

28x + 24 y = 174960

 

 

36        32        x          =          227280

28        24        y                      174960

 

 

 

9   8       x        =          56        820

7   6       y                    43        740

 

 

6    -8      9    8            x         =   6     -8         56        820

-7     9     7    6             y              -7     9          43        740

 

 

 

-2    0               x          =          -9000               1          0          x

0    -2              y                      -4080               0          1          y

 

 

4500

2040

 

  • each bicycle price = 4500 x 0.9 = 4050

New price of radio = 2040 x 1.1 = 2244

 

 

\ (64   56)      4050         = (259200 + 125664)

2244

\Total cost in 3rd week

= 259200 + 125664 = 384864

  1. T-1 = 1/3         2/3

1/3         -1/3

Coordinates (3,2)

  1. (i) 1          – ½

– ½        5

 

 

 

(ii)        -1/3        -2/3

4         -8/3

 

 

(iii)       -3/2       -1

0          7/2

  1. k= 3

 

  1. Shirts cost Kshs 120

Trousers cost Kshs 240

 

 

 

TOPIC 8

FORMULAE AND VARIATIONS

  1. 1 =          3V + 2

Sc2                   2π3

C2 = 2πr3

3SV + 4 πr3 S

 

 

C= 2πr3

3SV + 4πr3S

  1. 2T = V2 – r2

M

V2 = v2 = v22T

M

V = V22T

M

  1. y(Cx2 – a) = b – bx2

X2 (yc + b) = b + ya

X2 =    b + ya

Yc + b

X = b + ya

Ya + b

  1. logy = log (10xn)

Log y = log 10 + n log x

n log x = log y – log 10

n = logy – log 10

Log x

  1. (a) T = a + b√s or T = b + a√s

(b)        a + b √16 = 24

a + b √36 = 32

a + 3b = 24

a + 6b = 32

-2b = -8

b = 4              a = 8

  1. P = k + c

q

10 = k + C = k + 1.5c

1.5            1.5

K + 1.5c = 15

20 =     k        +    c  = k + 1.25

1.25                 1.25

K = 1.25c = 25

K + 1.5c = 15

K + 1.25c = 25

0.25c = -10

C = -40, k = 75

  1. px – py = xy

Px = xy + py

Px = xy + py

Px = y(x+p)

Y = px

X + p

  1. p2 = p2 – pr – pq + qr

Pr + pq = qr

P(r+q) = qr

P = qr

r + q

  1. D = km

R3

2 = k     x 500 =>k = ½

125

D = 1 x m = m

R3   2r3

R3 = 540          = 27

2 x 10

R = 3cm

 

  1. p = r 1 – as2

 

P = r2 (1 –as2)

P = 1 – as2)

R2

as2 = 1 – P       = r2 – p

r2             r2

S2         =          r2 – p

a  r2

S          = r2 – p

a   r2

  1. t a     x

Y

\t = kx

y

 

 

t1 =      kx1

y1

 

t2 = k. 096x1    = k0.96x1         = 0.8kx1           = 0.8t1

 

 

1.44y1           1.2 y1              y1

 

% Decrease     = t1 – t2 x 100

t1

= t1 – 0.8t1 x 100

t1

= 20%

  1. (a) (i)         y = k

xn

(ii)        K = 12 x 2 and K = 3 x 4n

12 x n2  and k = 3 x 4n or k     = k2

3         144

2n+2 = 22n  or k2 – 48k =0

N + 2 = 2n  or k(k – 48) =0

N = 2               or k = 48

K = 48 or K = 48

K = 48 or n = 2

(b)        y = 48              = 1 11/16 or 1.6875

5 1/3    2

 

=1.688

  1. 9/8 Ohms
  2. (a) V= 52.5r2 + 2.1r3

(b)        974.4 cm3

(c)        25

  1. 9.6 kg
  2. X = p2z

Y–p2

  1. (a) C = a + b where a + b are consonants

N

(b)        Fixed charge, a = Kshs 8000

(c)        70 people

  1. A = 79,(-78.82)
  2. P = A2N

E2 – n2

 

 

 

TOPIC 9

SEQUENCE AND SERIES

  1. 10, 10 + 2d , 10 + 6d

10d + 2d =    10d + 6d

10              10 + 2d

100 + 40d + 4d2 = 100 + 60d

4d2 – 20d = 0

D = 5 or d = 0

  1. (a) 2nd year saving = 2000 x 115

100

= Kshs 2300

 

(b) 3rd year saving = 2300 x    115

100

= Kshs 645

 

(c)        Common ration = 115 or   23

100       10

(d)       2000 (1.15 – 1) = 58000

1.15 – 1

2000 x 1.15 n = 8700 + 2000

1.15n = (8700 + 2000)

2000

n log 1.15n = log 5.35

0.0607n = 0.7284

N =     0.7284   = 11. 99

0.0607

= 12

(e)        S20 = 2000 (1.1520 – 1)

1.15 – 1

= 2000 x 16.37 – 2000 = 30.730

0.15                      0.15

= 204800

= 204933

  1. (a) ar2        16  = 4

a + ar       12      3

Ratio = 4:3

 

(b)        3r2 – 4r – 4 = 0

3r2– 6r – 2r – 4 = 0

(3r + 2) (r – 2) = 0

R = 2/3 0r r = 2

\r = -2/3

  1. (a) n/2 (4 + 20) = 252

N = 504/24 = 21

21/7 (2  x 4 + (21 – 1) d = 252

21 (8+ 20d) = 504

D = 16/20 = 4/5

 

(b)        50 x 1.8n = 1200000

N log 1.8 = log 1200000

50

N x 0.2553 = 4.3802

= 4.3802

= 0.2553

= 17.16

Time taken 17.16 x 20

= 343.2 minutes (5.72 h)

  1. (a) T40 = 500 + (40-1) 50

= 500 + 1950

= 2450

 

(b)        S40 = 40/2 (500 x 2 + (40 – 1) 50

= 20 (1000 + 1950

= 59,000

  1. 67 – 32

14

= 2.5

= 67.6 x 2.5

= 52 cm

  1. (a) = 32, r = ½
  2. (a) d = 5; a = 10

(b) p > 119/5

  1. (a) 5, 7, 9, 11

(b) 2700

(c) n = 24

 

 

 

TOPIC 10

VECTORS

  1. (a) (i) AV = AD + DV = a + c

(ii) BV = BA + AV = a + c – b

(b)        BO = ½ BD = ½ (a – b)

OV = OB + BV

= ½ (b – a) + a + c –b

= ½ a + c – ½ b

OM = 3/7 OV

= 3/7 ( ½ a + c – ½ b)

BM = BO + OM

½ (a-b) + 3/7 ( ½ a + c – ½ b)

= 7a – 7b + 3a + 6c – 3b

14

10a – 10b + 6c

14

= 1/7 (5a – 5b + 3c)

  1. (a) (i)         AB = b – a

(ii)        AP = 5/8 (b- a)

(iii)       BP = 5/8 (a- b)

(iv)       OP = OA + AP or OB + BP

= a + 5/8 (b –a)

= 5/8 a + 5/8b

(b)        OP = 5/8 + 5/8b

OQ = a – 5/8 a + 9/40b

= 3/8a + 9/40b

OQ: OP = 3/8a + 9/40b: 5/8a + 3/8b

= 3/8(a+ 3/5b) : 5/8(a+ 3/5b)

OQ: QP = 3:2

  1. (a) (i)         AN = OM – OA

4/5b – a

(ii)        BM = OM – OB

2/5a – b

(b)        (i)         AX = sAN

= s(4/5 b – a)

= 4/5 sb – sa

BX – tBM

= t(2/5a – b)

= 2/5ta – tb

(ii)        OX = OA + AX

= a + 4/5 b5 – as

= a (1-5) + 4/5 sb

OX = OB + BX

B + 2/5at – bt

= 2/5 ta – b (l-t)

\a (1 – s) + 4/5sb = 2/5ta – b (l-t)

\l- S = 2/5t

And

4/5 S = l – t ……….(ii)

From equal (ii)

S= (l – t) 5/4

= 5/4 – 5/4 t

Substituting in l

L – S = 2/5 t; l= 2/5 t + S

L = 2/5t + 5/4 – 5/4 t

5/4 t – 2/5t = 5/4 – l

17t =   1

20        4

T = 5/17

S = 10/17

  1. PQ = 3i         4i         -1

 

6j – 3j = 9j

6k   2k   4k

PQ =    (-1)2   + (9)2 + (4)2

 

= √98

= 7√2

|PQ| = √12 + (9)2 + 42

= 7√2

  1. (a) OR = r – 3/2 p

PS = 2r – p

(b)        OK = 2/3 p + m (r -3/2 p)

OK = p + n (2r –p)

3/2 p + m (r – 3/2p) + n (2r-p)

2n = m …….(i)

3/2, -3/2 = 1- n ….. (ii)

M = ½  n = ¼

(c)        PK: KS = 1:3

  1. OA =          1

-1

1

 

 

OT       =          2

0

1.5

 

 

Let OB            =          x

Y

Z

 

X + 1 = 2;        y + (-1) = 0; Z+ 1 = 1.5

2                       2                  2

 

X + 1 = 4’ y -1 = 0; z + 1 = 3

 

X = 3; y=1; z = 1

 

\OB =            3

1

2

OB = 3i + j + 2k

7.

|           |           |           |           |           |           |           |

P                                  R                     S                      Q

PR: RQ = 3: 4

PS : SR = 5: -2

PQ = 8 cm

RS = 2/7 PQ

= 2/7 x 8

= 2.29cm

  1. (a) OT = 12/7p + 3/7r

QT = 3/7r – 9/7p

= 3/7 (r-3p)

(b)        (i)         QR = r – 3p

QT = 3/7QR

\ QT & QR are parallel  and Q is a common point

\Q, T and R lie on a straight line

(ii) QT : TR = 3:4

\T divides QR in the ratio 3:4

  1. 8 – k =-3

K – 3

8 – k = -3 k + 9

2k = 1

K = ½

Taking a general point (x, y)

Y – 8 = -3

X – ½

Y – 8 = -3x + 3/2

3x + y = 9 ½ or 6x + 2y = 19

  1. q2 + (1/3)2 + (2/3)2 =1

q2 + 1/9 + 4/9              = 1

q2 + 5/9                        = 1

q2 = 4/9

\q = 2/3

  1. (a) OL = 3OA

= 3 ( 1, 6)

= 3, 18

ON = 2/3 OB

= 2/3 ( 15, 6)

= ( 10, 4)

\LN = 10       -3         =          7

4         18                   14

(b)       LM = 3/7 LN = 3/7 (7) = (3)

(-14)    (-6)

Let  co- ordinates of  M be ( x, y)

x          –           3          =          3

y                      18                    -6

x – 3 = 3          \x = 6

y – 18 =-6        \y = 12

Hence M (6 , 12)

 

(c)        (l) 6   OT  = OM

7

6          x          =          6

7          y                      12

6x = 6              \x = 7

7

6y = 12            \ y = 14

7

\OT = 7

14

 

(ii) LT =           7          –           3          =          4

14                    18                    -4

 

BT =                15        –           7          =          8

6                      14                    8

 

BT = 2 LT and they share point T

2007

  1. (a) (i) XR = r – 1q

3

(ii) YQ = q – 3 r

7

(b)        (i) OE = 1q  – 1 mq + mr

3      3

(ii) OE = 3 r – 3 nr + nq

7       7

(c)        OE = 1 q + m (r – 1)q

3                 3

= 3 r + n (q –  3r)

7                   7

11 m    q + mr = nq + (  3  – 3 n) r

3    3                                  7    7

 

1  – 1m = n

3    3

 

M= 3   – 3 n

7     7

 

 

M = 3   – 3       11    m

7     7       3   3

 

M = 31 + 1 m          m = 1

7    7      7                    3

 

N = 1 1x 1 = 2

3   3   3     9

 

  1. |P|= √32 + (-1)2 +  1 1 2       = 3.5

2

Q= 2p

Q = 6i – 2j + 3 k or 6i + 2j – 3 k

  1. 19i – 5j
  2. KL – 3NM = 3u

KL = KN – NM

3i = w + u + v

2u = w  + v

  1. (a) 4j – j + 7k

(b)        √66 = 8.124

  1. (-9.5, -4)
  2. (a) b – a- 2/3 b

(b)        (i)         k (a – 2/3 b)

(ii)        k = 2, m = 1

  1. (a) (i)         AC = a + b

(ii)        AC = a – 2/3 b

(b)        2/3a – 8/9b = 2/3 (a-4/3b)

(c)        k = 8, h = 22

PX: RX = 1:7

  1. I + j + k
  2. P = 19.7

 

 

TOPIC 11

BINOMIAL EXPRESSION

  1. 146 x 15 + 15x + 20x + 6x + x

1 + 6(0.03) + 15 (0.03) + 20(0.03)

= 1 + 0.18 + 0. 135 + 0.0054

= 1.19404

= 1.194

  1. 10(0.96) = (1-0.04)

= 1 + 5 (-0.04) +  10 (-0.04) + 10(-0.04)

= 1 – 0.2 + 0.016 – 0.00064 + 0.0000128 + 0.000001024

= 0.81536

(0.8153728 or 8153726976)

  1. (3x –y) 4 => (3x4 y0, (3x)3 y, (3x)3y, (3x)2y2

(3x)y3, (3x)0 y4

(3x-y)4 = 81x4 – 108x3 y + 54x2 y2 – 36xy3 + y4

X = 2 and y = 0.2

(6 – 0.2)4 = 81(2)4 – 108(2)3 x 0.2 + 54(2)2 x 0.22

162 – 43.2 + 86.4

= 205 . 2

  1. (a) C.d = 64800 – 60000 = 69600 – 64800 = 4800

A = 60000

Nth term = a + (n-1)d

= 60000 + (n-1) 4800

 

(b)        Common ration = 64800         =          69984  = 1.08

60000                     64800

 

Nth term = ar(n-1) where a = 60000

R = 1.08

= 60,000 (1.08)(n-1)

 

(c)        7th term

Andi = 60000 + (7-1) 4800

= 88800

Amoit = ar(n-1) = 60000 ( 1.08)6

= 95213

Difference = 95213 – 888000

Kshs 64.13

  1. Let  1 be a

√2

(2 + a) 5 + (2 –a) 5

(2 + a)5 = 25 + 5 (24a) + 10 (23 a2) + 10( 22 a3) + 5 (2a4) + a5

= 32 + 80a + 80a2 + 403 + 10a4 + a5

 

(2 +  1)5   = 32 + 80 + 40 +  20 +  5 +   1

√2                √2              √2    √2   4√2

 

(2 – a)5 = 32 – 80a + 80a2 – 40a3 + 10a4 – a5

(2 – 1)5  = 32 – 80  – 40 –  20 + 51

√2               √2            √2   √2  4√2

 

2 + 1    5 +   2  –  1  5   =      32  +    32    + 40  + 40  + 5/2 + 5/2

√2                √2

 

= 149

  1. (a) 1.15 1 x    + 5.14     1x      + 10.13             1x        + 10.12

2                    2                                2

 

 

 

1 x    2  + 1.10                 1x     5

2                         2

 

 

1 + 5/2 x + 5/2x2  + 5/4x3 + 5/16x4 + 1/32x5

 

 

(b)   1   1     5                = 1 + 5 x 1       5   x     1

20                             2   10      2          100

 

11   or 1.275

40

  1. (a) a6 – 6a5b + 15a4b2 – 20a3 b3 + 15a2 b4 – 6ab5 + b6

(b)        60.256

  1. 32 + 80x + 80x2 + 40x3 = 34.47
  2. (a) 1 + 5x + 10x2 + 10x3 + 5x4 + x5 = 0.8154

(b)        1.194

  1. 1-15x + 90x2 – 270x3 = 0.8587
  2. (a) 1 + 5a + 10a2 + 10a3 + 5a4 + a5

(b)        0.9040

 

 

TOPIC 12

PROBABILITY

  1. (a) p( both alive) = 0.7 x 0.9 = 0.63

(b)        p (neither alive ) = 0.3 x 0.1 = 0.03

(c)        p ( one live) = ( 0.7 x 0.1) + (0.9 x 0.3) = 0.34

(d)       p ( at least one alive)

= (0.7 x 0.01) + (0.9 x 0.3) + (0.7x 0.9)

= 0.7 + 0.27 + 0.63

= 0.97

  1. (a) (i) P(B) = 8/15

 

(ii) P (G or) = 7/15

(b)        (i)         P (1st 2 pens picked are both green)

= 2/15 x ¼ = 1/ 105 or 2/210

(ii)        P (only one of the 1st 2 pens picked is red)

= 8/15 x 5/14 + (2/15 x 5/14) + 5/15 x 8/14) + 5/15 x 2/14)

= 40 + 10 + 40 + 10 = 16

15 x 4             21

  1. (a) p(3 boys) = 1/22

(b)        p (2 girls) =

5/12 x 7/11 x 6/10 x 7/12 x 5/11 x 6/10 x 7/10 x 6/12 x 5/10

 

 

 

  1. (a)

 

 

 

 

 

(b)        p (orange) =( ½ x  2/3) + ( ½ x 6/11)

= 1/3 + 3/ 11

= 20/33

  1. (a) (i)         18/40 x 2/3 = 3/10

(ii)        (18/40 x 2/3) + (22/40 x 3/5) = 63/100

(b)        2/5 x 1/3 (18/40 x 22/39( + 2/5 x 1/3 ( 22/40 x 18/ 39)

= 22/325

  1. P (GGB) = 7/15 x 6/14 x 8/13

P( GBG) = 7/15 x 8/14 x  6/13

P ( BGG) = 8/15 x 7/14 x 6/13

P(2G + 1B) = (7/15 x 6/14 x 8/13) x 3)

= 24/65 = 0.3692

  1. 5/100 x 540 = 27

80/100 x 180 = 144

P(sick) = 171/720 = 19/80

= 0.2375

  1. (a)

 

 

 

 

 

 

 

 

 

 

(b)        (i)         0.2 x 0.3 x 0.15 = 0.009

(ii)        0.2 x 0.7 x 0.85 = 0.119

0.8 x 0.3 x 0.85 = 0.204

0.8 x 0.7 x 0.15 = 0.804

0.407

(iii)       HHM   0.2 x 0.3 x 0.85 = 0.051

HMH   0.2 x 0.7 x 0.15 = 0.021

MHH   0.8 x 0.3 x 0.15 = 0.036

HHH   0.2 x 0.3 x 0.15 = 0.009

0.117

  1. (a) HHH, HHt, HTH, HTT

TTT,TTh, THT, THH

(i)         p (at least two heads) = 4/8 or ½

(ii)        p ( only one tail) = 3/8

(b)        (i)

 

 

 

 

 

 

(ii)        (7/10 x 5/6 ) + (3/10 x 1/10)

35/60 + 3/100 = 46/75

(iii)       3/10 x 9/10 = 27/100

  1. Ratio 4:2:1

(a)        (A wins) = 4/7

(b)        P (either B or C wins)

= 2/7 + 1/7

= 3/7

  1. 30/100 x 1.8 x 106 = 540,000

120,000   x      540,000

1,000,000        1800000

1/50 pr 0.02 pr 2%

12.

  1. (a) P(RR) = 428

6    5    30

P(YY) = 2/6 x 3/5 = 6/30

P ( same colour) = 8/30 + 6/30

= 7/15

(b)        (i)         P(RA RA) = 4/6 x 3/5 = 2/5

P(RBRB) = 2/5 x ¼ =1/10 P (Both RED for A or B) = 2/5 + 1/10=½

(ii)        P (all RED) = 2/5 x 1/10

= 1/25

  1. (a) 3/14

(b) 41/56

  1. (a) 1/22

(b) 2/144

  1. 7/15
  2. 24/65
  3. 3/1024
  4. 51/60
  5. 20/33 or 260/429 or 780/1287

 

 

TOPIC 13

COMPOUND PROPORTION AND MIXTURES

  1. (4x 21) + (3 x 42) = 30

7

130 x 30 = 39

100

  1. Cap of the tank

= 2.4 x 2.8 x 3 x 1000

= 20, 160 litres

Amount needed

= 20, 160 – 3,600

= 16,560 litres

Time =     16560

0.5 x 60 x 60               = 9 hrs 12 mins

  1. (a) (i)         Vol = 135 x 0.15 = 20.25m2

(ii)        Mass = 2500 x 20.25

= 50625 kg (50630)

= mass of cement = 50625 x 1/9

= 5625 kg( 5625. 56)

(b)        Bags of cement = 5625

50

= 112. 5 or 113

(c)        No of lories of sand 506254

7000       9

= 3.214 = 4 lories

  1. (a) Mass of maize in A 5/8 x 72 = 45 kg

(b)        Beans in A and B

8/17 x 170 = 80 kg

Maize  in A and B

9/17 x 170 = 90 kg

Beans in B = 80 – 45

= 53 kg

Maize in B = 90 – 45

= 45 kg

Ratio 53.45                 Or 1.1778.:1

 

  1. (a) B.P per kg = 40 x 65 + 60 x 27 .50

100

= Kshs 42.50

 

(b)        (i)         S.P = 85 x 120

100

Kshs 102  per packet

 

(ii)        New  S.P = 102  x  90/ 100

Kshs 91.80

 

(iii)       Total realized  so far

(8 x 102) + (91.80 x 14)

= 816 + 1285. 20 = 2101. 20

Original total S.P = 102 x 50 = 5100

New  price  per packet

= 5100 – 2101 . 20

28

= 2998.80

28

Kshs 107.10

  1. Cost of beans in mixture = 3/5 x 2100

Cost of  maize in mixture = 2/5 x 1200

Cost  of mixture per bag = 3/5 x 2100 + 2/5 x 1200

  1. (a) Volume  = x. sec x  length

= ½ x 25 ( 1 + 2.8) x 10

= 475 m3

(b)        (i)         ½ x 25 x 1.8 x 10

= 225m2

(ii)        Taken time to fill the tank

9 x 475

225

= 19 hrs

\Time taken to fill remaining part

= 19 – 9

= 10 hrs

  1. (a) Initial volume of alcohol

= 60/ 100 x 80 = 48 lts

New volume of solution  = (80 + x)_ lts

   48     = 40

80 + x     100

 

4800 = 3200 + 40x

40x = 1600

X = 40 lts

(b)       New volume of  solution

= 80 + 40 + 30 = 150 lts

48/150 x 100 = 32

% age of alcohol = 32%

(c)       in lts

32% of 5 = 1.6 lts of alcohol

68% of 5 = 3.4 lts of water

In 2 lts 60% of 2         = 1.2  of alcohol

40% of 2         = 0.8 lts of water

In final solution (7lts)

2.9 lts are alcohol

4.2 lts are water

\Ratio of water to alcohol

= 4.2: 2.8 = 3: 2

Alternatively

(d)       5 lts     W:A                = 68:32            = 17:8

\Water           = 17/25 x 5      = 17/5

Alcohol           = 8/25 x 5        = 8/5

In 2 lts water   = 40/100 x 2    = 4/5

Alcohol           = 60/100 x 2    = 6/5

 

Final solution

Water: Alcohol

17/5 + 4/5: 8/5 + 6/5

21/5: 14/5

21: 14  = 3: 2

  1. (a) (i)         Fraction filled in hr (P & Q)

= 2/9 + 1/3 = 5/9

Time  taken to fill tank 1 4/5 hr

(ii)        Fraction filled in 1 hr (P, Q & R)

= 5/9 – ½ = 1/18

Time taken to fill tank = 18 hr

(b)        (i)         Fraction filled by 9.00 am

P – 2 x 1h = 2

9           9

Q- 1/3 x ¼ h = 1/12

P & Q – 2/9 + 1/12  = 11/36

(ii)        Fraction to be filled = 25/36

Time tank will fill up 0900 + 1230

= 2130j ( 9.30 pm)

  1. 2 11/12 hrs
  2. 10 days
  3. 3.5/ 100 x 50 = 1.75

(a)        (i)        Total = 3.175 kg

(ii)        3. 969%

(b)        A = 30kg

B= 20 kg

B ³ 20kg

  1. 3 ½ days
  2. (a) OT = 12/7p + 3/7 r

QT = 3/7r  – 9/7p

= 3/7 (r-3p)

(b)        (i)         QR = r – 3p

QT = 3/7 QR

\QT & QR are parallel and Q  is a common point

\Q, T and R lie on a straight line

(ii)        QT : TR = 3:4

 

 

TOPIC 14

GRAPHICAL METHODS

  1. (i) b – a = 35        ……. (i)

7b – 490a = 39 ……(ii)

A = 4.9 b = 40

(ii)        S =  4.9t2 + 40t + 10

t 0 1 2 3 4 5 6 7 8 9 10
s 10 70.4 85.9 91.6 87.5 73.6 16.4 -26.4

(b)        (i)         Suitable scale

Plotting

Curve

(ii)        Tangent at t = 5

Velocity = -9.0 ± 0.5 m/s

0.70 ± 0.1

  1. (a) (i)
x 1.1 1.2 1.3 1.4 1.5 1.6
y -0.3 0.5 1.4 2.5 3.8 5.2
X3 1.331 1.728 2.197 2.744 3.375 4.096

All values of x 3

All B1 for at least 4 or if  all values are correct to 1 or 2 d.p

(b)       (i)         Linear scale used

Line of  best fit drawn 4 of this points correctly plotted

Plotting points

a=2

b = -3

 

(ii)        y = 2x3 – 3

  1. (a) Log P = n log r + log K

(b)

P 1.2 1.5 2.0 2.5 3.5 4.5
Log P 0.08 0.18 0.30 0.40 0.54 0.64
R 1.58 2.25 3.39 4.74 7.86 11.5
Log r 0.20 0.35 0.53 0.68 0.90 1.06

Scale

Plotting

Line

Log k = 0.05

K = 2/3 = 0.6667

= 0.667 ± 0.0200

  1. Find midpoint (centre) = 5 + (-1) 5 + (-3)

2             2

(a)                    = (4/2, 2/2)

= (2, 1)

(b)        Vector of         (a, b) = (2, 1)

 

R = 5     –  2        = 3

5        1           4

 

 

\r = 32 + 42

 

= 5 units

 

(x – 2)2 + (y-1)2 = 55

 

X2– 4x + 4 + y2 – 2y + 1 = 25

X2 + y2 – 4x – 2y – 20                =    0

  1. n23/2x + (-3/4)2 + y2 + y + (1/2)2 = –1/4 + 9/16 + ¼

= 9/16

X – (¾)2   +  (y + ½)2 = 9/16

Radius = ¾

Centre ( ¾ , – ½)

  1. (a)
Log x -40 0.00 0.08 0.15 0.20
Log T 0.10 0.30 0.34 0.37 0.40

(b) (i)   For all pts plotted

Apply (Ö) if at least B1 earned on table line of  best fit drawn with at least 4 pts plotted.

 

(ii)        (a)        a= log-1 0.3 = 2.000

B = grad = 0.4  – 0.1 or equivalent

0.0 – (0.4)

(c)        Log T = b log x + log a

Log x = -0.3

0.5

X = 0.25

(d)      (ii)        Alternative

 

M log T = b x log a

 

Log T = b/m log x + 1/m log a

 

Intercept = 1/m log a = 0.3

=>a = log-1 0.3 m

 

Grad = b/m = 0.4 – 0.1

0.1- (0.4)

B = 0.5 m

(e)        mlog T = n log x + log a

0 = 0.5m log x + 0.3m

Log x = -0.3m

0.5m

X = 0.25

 

 

 

FORM 4

TOPIC 1

MATRICES AND TRANSFORMATIONS

  1. (a) ∆ = -3

P-1 = 1/3           8      -7

-5     4

 

(b)        (i)         8    14      b      = 47600

10   16     m        57400

 

 

(ii)  -8/3    7/3                  8   14               b          =          -8/3   7/3             47600

5/3   -4/3                  10  16              m                     5/3     -4/3           57400

 

 

2b        =          7000

2m                   2800

 

Beans Kshs 3500

Maize 1400

 

(c)        New price of beans  = 105/100 x 3500 x 5

Balance for maize = 47600 – 29400

= 18200

Bags  of maize = 18200 = 13

1400

New ratio = 8: 13

  1. A      B         C           A’      B’        C’

0    1       2       4          1     =     1        1         6

-1   0       1       1          6          -2        -4         -1

 

  1. (a) (i) Diagram

(ii) A” (1, 2) B (7, -2) C”(5, -4) D”(3, -4)

 

(b) A” (-1, 2) B” (-7, -2) C”(-5, -4) D”(-3, 4)

 

(c)        Half turn

Centre (0,0)

  1. (a) (i) a    b               2   5     =          -4   -1

c    d               3   3                 3     3

 

2a + 3b = 4      2c + 3d = 3

5a + 3b = -1     5c + 3d = 3

A = 1, b = -2   c = 0, d = 1

 

Therefore M =   1        -2

0       1

 

 

 

(ii)        1   -2    4   x     = 2

0    1    1   y         1

 

C1 = 2,1

 

(b)        0  1                 1   -2    =          0   1

1   0                 0    1                1   -2

 

  1. (a) PR = 0   -1                a    b    =    -c   -d

-1   0               c   d           -1    -b

 

-c   -d               2   2   4     =      0     -4    -4

-a    -b              0   4   4            -2  -10    -12

 

-2c = 0             =>c = 0

0 – 4d = -4      => d =1

-2a = -2            => a = 1

-2a – 4b = -10  => b = 2

 

\R      1          2

0          1

 

A   B   C         A’   B   C

(b) 1     2          2    2    4          2     10   12

0    1          0    4    4          0      4    4

 

(c) A sheer transformation

X – axis invariant and j(0, 1)  →  j (2, 1)

  1. (a) (i) Graph

(ii)        1          0

3          1

(b)        (i) Graph

  1. (a) A =      15/17      8/17

8/17       15/17

 

(b)        θ = 280 4’ ( 28.070)

(c)        (-3/17, 114/17)

 

TOPIC 2

STATISTICS

  1. 7.5 x 5/8 X 4

2.

 

Vel 19.5 39.5 59.5 79.5 99.5 119.5 139.5 159.5 179.5
Cf 9 28 50 68 81 92 97 99 100

(a)        Cumulative frequency

Linear scale

Plotting

Smoothing & complete of CF curve

(b)        (i)         Upper quartile = 90

Lower quartile = 36

Range  = 90 – 36 = 54

(ii)        No. of days = 100 – 93 = 7

  1. 25, 289, 4, 484, 4 806

 

 

J =       806

5

 

= 161.2

 

= 12.7

4.

mdx f fx Fx3
9 4 36 324
12 7 84 1008
15 11 165 2475
18 15 270 4860
21 8 168 3528
24 5 120 2880
                                                 S fx = 843 15075

Fx: 36, 84 165, 270, 168, 120

(a)        Mean = 843

50

= 16: 86

(b)        (i)         fx 2: 324, 1008, 2475, 4860, 3528, 2880

Variance = 15075 – 16.86

50

= 301.5 – 284.2

17.3 (17.24)

 

(ii)        S.D = Ö17: 3

= 4.159 or (4.159 or (4.152)

 

5.

Class 14.5 – 18.5 18.5 – 22.5 22.5 – 26.5 26.5 – 30.5 30.5 – 34.5 34.5 – 38.5 38.5 – 42.5
Frequency 2 3 10 14 13 6 2
C. freq 2 5 15 29 42 48 50

Cumulative frequencies

(a)        Linear scale used

Plotting of cf against upper class limit

Complete of cf curve drawn

(b)       (i)         Median = 29.5

(ii)        Reading at mass 25 – 28 = 11 and 20

Probability = 20. 11 = 0.8

50

  1. 3 x 125 + 4 x 164 + 2 x 140

3 + 4 + 2

= 1311

9                = 1452/3

  1. No of people = 360 x 1080

144

No  of children = 2700 – (510 + 1080)

= 1110

Angle of children      1110 x 360

2700

= 1480

  1. (a)
X 1.0 – 1.9 2.0 – 2.9 5.0-3.9 1.0-1.9 5.0-5.9 6.0-6.9
F 6 11 10 7 2 1
d 6 20 30 37 39 40

Lower quartile = 1.95 + 1x 4/14 = 2.236 (2.24)

Upper quartile = 2.95 + 1 x 10/10 = 3.95

Inter quartile range = 3.95 – 2.236 = 1.714

(b)        x          f           dx –a   fd        fd2

1.45     6          -2         -12       24

2.45     14        -1         -14       14

3.45     10        0          0          0

4.45     7          1          7          7

5.45     2          2          4          8

6.45     1          3          3          9

-12       62

 

 

 

Sd =    62(-12)2 = 1.55- 0.09

40       40

 

 

= 1.46

 

= 1.208

  1. (a)

 

Mass (g) 25 – 34 35 – 44 45 – 54 55 – 64 65 – 74 75 – 84 85 – 94
No. of potatoes 3 6 16 12 8 4 1
Cf 3 9 25 37 45 49 50
Upper class boundaries 34.5 44.5 54.5 64.5 74.5 84.5 94.5

(b)       (i)         Position of 60th percentile = 60 x 50

100

\Mass of 30th potato = 58.5g

60th percentile mass = 58.5g

(ii)        No. of potatoes with mass of 53g or less = 28

No of potatoes with mass of 68g of less = 40

\No. of potatoes with mass of 53 to 68g = 40 – 28 = 12

\age of potatoes with mass 53g to 68g

= 12 x 100 = 24%

50

  1. Area = A = 5 x 3.2

B= 10 x 1.2

16: 12 = f:6

12f = 96

F = 8

  1. (a) (i)
Marks 0-10 10-30 30-60 60-70 70-100
Frequency
Area of rect 60 200 40 120
Height of rect 6 10 4 4

(ii)

 

 

 

 

 

 

 

 

 

 

 

 

 

Histogram

(b)        (i) Median in group 30-60

(ii) 60 + 200 + 6x

= ½ (60 + 200 + 180 + 40 + 120)

260+ 6x = 300

X = 6 2/3

\Median = 30 + 6 2/3

= 36 2/3

  1. (a) 3rd day = 60

4th day = 61

(b)        M3 = 61

M5 = 64

  1. (a) Ans 16, 8, 6

(b)        (i)         17.3

(ii)        4.159

  1. M1 = 50.99

M2= 50.29

M3 = 50.65

 

  1. (a) Graph

(b)        (i)         29.5

(ii)        0.8

 

TOPIC 3

LOCI

  1. <ABC = 1050 or <BAD = 750

Complete// gram constructed

Const. of loci: AP£ 4 cm

BQ £ 6 cm

Area// gram = 7 x 10 sin 1050

= 7 x 10 x 0.9659

= 67.61 cm2

Total area of sectors

75 x 22 x 42 + 105 x 22 x 62

360  7              360    7

= 10.48 + 33 = 43.48

Required area = 67.61 – 43.48 = 24.13

  1. (a) Bisecting < BAD

(b)        Construction of 1 at B and at A construction of 450 or 1350 to get 67  ½ 0 at B construction of 1 Bisector of AB  identification of AB identification of Ä the centre O. Identification of the locus P

(c)       Size of the <ABC = 131 ± 10

  1. (a) Construction of 300

Check for construction marks

(b)        CD = 5.4 cm or 5.4 ± 0.1

(c)        DA = 4.5 or AA’ = 1.5

(d)       Line through parallel to BC

4.

 

 

 

 

 

 

 

 

 

  1. (a) Construction of 300

Completion of ∆ PQR

(b)        ^ Bisector of PR (must be seen)

Location of S, QS = 8 cm and drawing ∆ PRS

(c)        Construction of semi- circle with diameter SQ, Construction of parallel line to QS through R location of T1 and T2

6.

 

 

 

7.

 

 

 

 

 

 

 

8.

 

 

 

 

 

 

 

  1. (a) Diagram

(b)        (i)         73 ± 1km

(ii)        1020 + 10 or 5780 E + 10

10.

 

 

 

  1. (a) Const of ^ bisector of AB

(b)        Const of ^ bisector of AC or BC

< OAB = 120 ^ 10 or < OBA = 120 ± 10

Position of P on XY and AB

 

 

 

TOPIC 4

TRIGONOMETRY

  1. (a)
X 0 10 20 30 40 50 60 70 80 90 100 110 120
Sin 3x 0 0.500 0.8660 1.000 0.866 0.500 0.000 0.500 -866 -100 -0.866 -0.500 0.000
2 sin  3x 0 1.00 1.73 2.00 1.73 1.00 0.000 -1.00 -73 -2.00 -1.73 -1.00 0.00

(b)        Diagram on graph

(i)         Suitable linear scale

Plotting

Smooth sine curve

(ii)        x = 760 ± 10

X = 1040 ± 10

  1. (a)

 

X 30 60 90 120 150 180 210 240 270 300 330 360
Cos X 0.87 0 -0.5 -1.0 -0.5 0 0.5 0.87 1.0
2 cos ½ X 1.73 1.41 1.0 0 0.52 1.41 1.7 1.93

 

 

 

 

 

 

X 0 30 45 60 90 120 135 150 180 225 270 315 360
2 sin x 0 1 1.4 1.7 2 1.7 1.4 1 0 -1.4 -2 -1.4 0
Cos X 1 0.9 0.7 0.5 0 -0.5 -0.7 -0.9 -1 -0.7 0 0.7 1
Y 1 1.9 2.1 2.2 2 1.2 0.1 0.1 -1 -2.1 -2 -0.7 1

(b)       Scale used

Plotting

Smooth curve

(c)       1400 ± 30 < 140 ± 30

 

  1. (a)
X 0 10 20 30 40 50 60 70
Tan X 0 0.8 0.36 0.58 0.84 1.19 1.73 2.75
2x + 30 30 50 70 90 10 130 150 170
Sin (2x + 30) 0.50 0.77 0.94 1 0.94 0.77 0.50 0.17

 

5          (a)

X0 0 30 60 90 120 150 180
2 sin x0 0 1 1.73 2 17.3 1 0
1 cos x0 0 0.13 0.5 1 1.5 1.87 0

(b)       Graph

(c)       (i) 1260

(ii) 00 £ x £ 1260

6          (a)

X 300 1050
Y 1.7 -2.4

(b)

 

 

 

 

 

 

 

 

 

(c)        (i)         Maximum y = 4.1 ± 0.1

(ii)        8sin 2x – 6 cos x = 2

X = 31.5 ± 0.750

X = 78 ± 0.750

  1. x = 00, 1800, 3600
  2. x = 00. 1800
  3. 131, 790, 228.210
  4. 3 tan θ or 3 sec θ  tan θ

Cos θ

  1. Sin d = -4/5 or – 0.8

3rd quadrant 180 + 53.15 = 233.130

4th quadrant 360 – 53.15 = 306. 87

  1. Sin (90 x – x) = 8/10 = 4/5

 

 

 

Tan x = ¾

  1. (a)
X 20 40 80 120 140 160 180
-3cos 2x0 -2.30 -0.52 2.82 1.50 0.52 -2.30 -3.00
2b sin (3/2x0 + 300 1.73 2 1.00 -1.00 -1 -200 -1.73

(b)        Roots x = 62 ± 20

X = 156 ± 20

  1. 131.790, 228.210

 

  1. (a)
X 30 60 90 120 150 180 210 240 270 300 330 360
Cos X 0.87 0 -0.5 -1.0 -0.5 0 0.5 0.87 1.0
2 cos ½ X 1.73 1.41 1.0 0 0.52 1.41 1.73 1.93 1.0

 

 

 

(b)        Period = 7200

Amplitude = 2

(c)        Enlargement of 2 about the centre

 

 

TOPIC 5

THREE DIMENSIONAL GEOMETRY

  1. (a) (i)         OA = (Ö 32 + 42 ) ½

= 2.5

VA =  Ö62 + 2.52

= Ö42.25

= 6.5 cm

(ii)

 

 

 

1.5

(b) tan b = 3    = 1.333

2 ¼

b= 530 7’

θ = 750 58’ – 5307’

= 220 51’

 

2.

 

 

 

 

 

 

 

 

 

 

  1. (a) FH2 = 4.52 + 82 = 20.25 + 64

FH2 = 84.25

FC2 = 84.25 + 36 = 120.25

FC = Ö120.25 = 10.97 cm

(b)        (i)

 

 

 

 

 

 

θ = 33.160

 

(ii)        Tan θ = 4.5 = 0.5625

8

θ = 29.36

(c)

 

 

 

= 36.870

  1. (a) Sketch

(b)        θ = 610 53 ( 61.880)

  1. (a) (i)         BN = 8.65 cm

(ii)        EN = 13 cm

(b)        33040’ (33.670)

 

 

 

TOPIC 6

LATITUDES AND LONGITUDES

  1. (a) (i)         Lat of B = 43.750 (430, 45’)

(ii)        r = 6370 cos 53750

Angle between B and C = 600

BC = 60 x 2 x 22 x 6370 cos 43.75

360          7

= 60 x 2 x  22 x 6370 x 0.7224

360          7

= 4820.816 km

(b)        60 x 4 = 4 hrs

60

Local time at C is 2100 hrs or 9.00 P.m

  1. (a) Longitudinal difference = 70 – 10

(b)        Distance between x and y

(i)         60/ 360 x 22/7 x 2 x 6371 x cos 45

1/6 x 22/7 x 2 x 6371 x 0.7071

= 4718 km

(ii)        4919.45 = 2551.05 nm

1.85

(c)        Time difference = 60 x 4 = 240 min

= 4 hrs

Local time at x = 6. p.m

  1. (a) Angle change = 52 – 38.5

= 13.50

S = 2 x 22/7 x 6370 x 13.5/ 360

= 1501.5 km

(b)        θ/360 x 2 x 22/7 x 6370 cos 520

= 2400

θ = 2400 x 7 x 360

2 x 22 x 6370 cos 520

= 35.050

C = (520 21 W)

  1. (a) 60 x 60 = 3600 nm

(b)        ө = 310 x 130 or 180

Distance from town A to town B

= 60 x 18 cos 30

= 60 x 18 x 0. 8667

= 935. 28 nm

Total distance = 935.28 + 3600

= 4535.28 nm

Total time = 4535. 28 + 0.25

200

22.6764 + 0.25

22.926 h

Or 22 h  55.6 min

  1. (a) Difference in time = 3 hrs

\ Longitude difference = 3 x 150 = 450

Longitude of B = 150 + 450 = 600E

 

(b)        (i)         Distance traveled = 850 x 3 ½ km

= 2975 km

Arc AB = 2975

45/360 x 3142 x 2r = 2975

R = 3788 or 3787 or 3789

(ii)        6371 cos θ = 3788

Cos θ = 3788 = 0.594

6371

θ = 53.51

Latitude of the two towns is 53. 510N

  1. Longitude difference = 360 – ( 1330+ 1180 )= 1090

1090 x 60 cos x = 5422

Cos x = 0.8291

X = 33.990

Latitude of A and B is 340 N

  1. (a) = 13 347 km

(b)        16.68 hrs

  1. (i) = 7200 nm

(ii)        = 9353 nm

  1. (a) 250 km

(b)        1370 27’

 

 

TOPIC 7:

LINEAR PROGRAMMING

  1. (a) x ³ 0 and y ³ 0

X + Y  ³ 7

64x + 48y ³ 384 (4x + 3y ³ 24)

(b)        x + y = 7 drawn

64x + 48y = 484 drawn

Shading

(c)        No. of buses for minimum cost 3 type x and 4 type y or for x = 3 and y = 4

  1. (a) x + y £ 500

Y > x

X ³ 200

(b)        x + y £ 500 drawn and shaded

Y > x

X ³ 200

(c)        (i)         No enrolled in technical = 249

No enrolled in business = 251

(ii)        Max profit

249 x 2500 + 251 x 10000

= 873500

  1. (a) x + y £ 400, x > y, x £ 300, y ³ 80

(b)        All 4 inequalities Ö y drawn and shaded.

(c)        (i)         x = 300 and y = 100

(ii)        Max profit = 600 x 300 + 400 x 100

= 220,000

  1. (a) x ³ 0, y ³ 0, x + y £ 6

25x + 50 y ³ 175

30x + 45y ³ 180

(b)        x³ 0

X + y £ 6

25 x + 50y ³ 175         Correctly drawn and shaded

30x + 45y ³ 180

(c)        Minimum cost at x = 5 and y = 1

Minimum cost = 5 x 20 + 1 x 50 = 150

  1. (a) 300x + 180y  £1800

5x + 3y £ 300

X + y £ 80

X > 0, y> 0

(b) 5x + 3y £ 300

X + y £ 80       Correctly drawn and shaded

(c)        x = 30 y = 50

Maximum profit in Kshs = 50 x 4000 + 30 x 6000

= 380, 000

  1. 2x + 5y £ 40

5x + 8y £80

X ³3

Y > 1/3 x

 

 

(0, 8)  (10, 4)               All region correctly drawn and shaded

(0, 10) (8, 5)

 

Search line with gradient -3/5 drawn

Type A = 9

Type B = 4

 

 

 

TOPIC 8:

CALCULUS

  1. Area = 2( 8 + 6.5 +5.6+6+6.4 + 4.7( x 25

= 2 x 37.2 x 25 x 100 or equivalent

186000 ha

  1. Choose positive roots only

Integrate

Substitute numerals

Ans = 110. 38

Or

108 + 2 = 110

  1. Missing values of y; 26, 138

Area = ½ x 2 (10 + 230) + 2(6+26+70+138)

= 240 + 480

= 720

  1. 3.55 ± 0.05, 4.85 ± 0.05, 5.7, 6.3, 6.7 & 6.9

Area = ½ x 1 {0 +7 + 2 (3.6 + 4.9 + 5.7 + 6.3 + 6.7 + 6.9)}

= ½ x 1 {7 ± 68.2)

  1. (a) x2 – 2x – 3 = 0 <=>(x-3) (x+ 1) =0

X = 3 or x -1

(b)        (x2 – 2x -3) dx = x3/3 – x2 – 3x + c

(c)   x3/3 – x2 – 3x    3/2   =   27/3 – 9 – 9     –     8/3 – 4 – 6

 

= 1 2/3

 

X3/3 – x2 – 3x  4          =          64/3 – 16 – 12  –            -27/3 – 9 – 9

 

2 1/3

Sum of arcs = -1 2/3 + 2 1/3

= 12/3 + 2 1/3

= 4

  1. (a)
X 2 3 4 5 6 7 8
Y 3 5 9 15 23 33 45

 

(b)        A = ½ x 1 x {(3 + 45) + 2 (5 + 9 + 15 + 23 + 33)}

= ½ (48 + 170

= 109 (109. 25)

(c)        -8

ò(x2 – 3x + 5)dx

                2

= x3 3x2 + 5x

3       2

833 x 82 + 5 x 8) – 233 x 22+ 5 x 2

3        2                      3         2

= 108

 

(d)       It would give an underestimate  because the lines for the trapezia run below the curve in the region

  1. (x2 + 1) (x -2) = x3– 2x2 + x -2

dy = 3x2 – 4x + 1

dx

When x = 2     dy = 5

Dx

Y = 0

y- 0 = 5

x – 2

y = 5x – 10

  1. (a) V = ds = 3t2 – 5t + 2

dt

a = dv = 6t – 5

dt

(b)        6t – 5 = 0

T = 5/6

V = 3 ( 5/6)2 – 5(5/6) + 2

= 25/1225/ 6 + 2

= -1/12 ( 0.0833)

  1. (a) ò (2x +  3 x 2) dx = x2 + x3 + c

(b)        Area below x – axis

[X2 + x3 ] = 0 – [ (-2/3)2 + (-2/3)3]

= 0 – (4/9 – 8/27)

= 4/27

Area above x – axis

[x2 + x3] = [4 + 8] – 0 = 12

 

Total Area = 4/27 + 12

= 12 4/27

  1. Distance = 5/12 {2.6 + 2(2.1 + 5.3 + 5.1 + 6.8 + 6.7+4.7)}

= 5/2 ( 2.6 + 6.14)

= 160m

  1. (a) ò(2x2 – 5) dx = 2/3 x3 – 5x + c

Y = 2/3x3 – 5x + c

3 = 2/3 x 8 – 5 x 8 + c

C = 7 2/3 OR 23/3

Y = 2/3 x 3 – 5 x + 7 2/3

 

(b)        ò(2t3 + t2 – 1) dt = 2/4 t4 + m1/3 3– t + c

 

(2/4 t4 + t/33 – t + c)3 = (2/4 x 34 + 3/33 – 3) – (2/4 + 1/3 – 1)

 

= (8 ½ + 9 – 3) – ( ½ + 1/3 – 1)

= 46 ½ – (-1/6)

= 46 2/3

  1. (i) dy = 6x2 + x + -4

dx

 

When x = 1

Dy = 6 + 1 – 1

Dx

= 3

 

(ii)        y + ½ = 3 (x -1)

Y = 3x – 3 – ½

Y = 3x – 3 ½

  1. (a) Gradient = -1

Y = -x + 7

(b)        7 – x = (x-1)2 + 4

X2 – x – 2 = 0

(x-2) (x+1) = 0

X = 2, x = -1

X = 2 when y = 5

X = -1 when y = 8

Coordinates of P, Q are P (-1, 8), Q (2, 5)

  1. (a) a = 25 – at2

V = ò(a) dt

= ò(25 – at2) dt

= 25t – at3/ 3 + c

 

V = 25t – 3t3 + C

When t = 0 V = 4ms-1

\C = 4

V = 25t- 3t3 + 4

 

(b)        When t = 2

V = 25 x 2 – 3 x 8 + 4

= 50 – 24 + 4

= 30m/s

  1. (a) dy = x2 + 2x – 3

dx

 

(b)        x2 + 2x – 3 = 0

(x + 3) (x-1) = 0

X = -3 or x =1

When x = -3

Y = 11

When x -1

Y = 1/3

 

  1. (a)
X 0 0.4 0.8 1.2 1.6 2.0
Y 2.00 1.96 1.83 1.60 1.20 0
  1. (a) S = 53 – 5 (52) + 3 (5) + 4

= 125 – 125 + 15 + 4

= 19m

 

(b)        V = ds

Dt

= 3t2 – 10t + 3

= 3(5)2 – 10( 5) + 3

= 75 – 50 + 3

= 28ms-1

(c)        At rest V = 0

\3t2 – 10t + 3 = 0

(3t – 1) (t – 3) = 0

T = 1/3 seconds or t = 3 seconds

(d)       a = dv

Dt

= 6t – 10

= 6(2) -10

= 2 ms-2

18        (a)        P (1, 3), (4, -12)

(b)        (i)         102/3 sq units

(ii)        13 1/3 Sq. units

  1. dy = 3ax2 + b

dx

3a + b = -5

A + b = 1

A = -3

B = 4

20.

 

 

 

 

 

 

 

 

 

 

 

 

 

 

(a)        Curve y1 y drawn

Curve y2 y drawn

(b)        (i)         Area below upper curve

1 x 1 x             12 + 2 (4 + 5.7 + 6.9 + 8 + 9

2                      + 9.8 + 10.6 + 11.3

 

1 (12 + 130.6) = 71.3

2

Area below lower curve

 

 

1 x 1    12 + 2 (0.2 + 0.6 + 1.3 +)

2          24 + 3.7 + 5.3 + 7.3 + 9.5

 

= ½ (12 + 60.6) = 36.3

Area in dispute = 71.3 – 36.3 = 35

 

(ii)        Area in hectares = 35 x 400 = 1.4

10000

  1. (a) (i)         y = 2x2+ x + c

2

At x = -4, y= 6

6 = (-4)2 -4 + c

C = -6

Y = x2 + x -6

 

(ii)        x2 + x  -6 =0

(x-2) (x + 3) = 0

X = 2 or x =3

2

ò-3  (x2 + x -6) dx) =   x3 + x2 -6x    2

3      2           -3

 

 

= 8 + 4 – 12      –   -27  + 9  + 18

3     2                    3      2

 

– 7 1/3 – 13 ½  = – 20 5/6

Area = 20 5/6

  1. S = 2t – t2 + c

2

When S = s, t = 2

\5 = 2 x 2 – 22 + c

2

C = 3

Thus s = 2t ½ t2 + 3

  1. 110.sq unit
  2. Missing values of y 26, 138

Area = 720 sq units

  1. (a) x = 3 or -1

(b)        x3 – x2 – 3x + C

3

(c)        4 sq. units

  1. y = 5x – 10
  2. (a) a = 6t – 5

(b)        -1/12 m/s

  1. (a) x2 + x3 + C

(b)        124/27 sq units

  1. (a) Gradient = 4

(b)        y = 4x – 1

  1. (a) 4m/s

(b)        (i)         4 22/27

(ii)        4 m/s2

  1. (a) 3m/s2

(b)        (i) t =  1 second or ½ second

(ii) S = – 1 7/θ m

 

121/1 MATHEMATICS SAMPLE PAPER EXAMINATION

Section I (50 marks) Answer all the questions in this section

  1. Simplify without using a calculator

31/3 – 22/3 ¸ 15/9

3/7 of 32/3 – 34/7                                                                                                                        (3 marks)

  1. Solve the following equation

1/3(x +4) – 1/2 (2x – 4) = 2                                                                     (2marks)

  1. The sum of angles of a triangle is given by the expression (2a + b) 0, while that of a quadrilateral is given by (13a – b) 0. Calculate the values of a and b.   (3 marks)
  2. A plot of land is represented on a map whose scale is 1:5000. On the map the perimeter of the plot is 24.8 cm. Calculate in km, the- actual perimeter of the plot.

(2 marks)

  1. A tourist changes 1500 Euros into Kenya shillings at Euro = Kshs. 76.05. He spends Kshs. 79,389, then changes the remaining shillings back to Euro at 77.05 shillings to the Euro. How many Euros does he receive?                       (2 marks)
  2. Find all the integers satisfying the inequalities

3 – 2n < n – 3 £ 4;                                                                                (4 marks)

  1. The length of a room is 4 metres longer than its width. Find the length of the room if its area is 32 cm2.                                                                            (3 marks)
  2. The equation of a line is –3x/5 + 3y = 6

Find the

  1. i) Gradient of the line
  2. ii) Equation of a line passing through point (1, 2) perpendicular to the given line.                                                             (3 marks)
  3. If one root of the equation 12x2 + 9x + B = 0 is ¾, find B. Hence find the other root.                                                                                                        (4 marks)
  4. Solve for a if 3 x 2a + 5 = 768                                                       (3 marks)
  5. Point M (-3, 4) is the midpoint of point A and B. If the co-ordinates of A are (-5, 1) find the co-ordinates of B. (3 marks)
  6. The ratio of the cost of commodity X to that of commodity Y is 2:3 and the ratio of the cost of Y to the cost of a commodity Z is 6:1. If the total cost of the three commodities is sh. 1100, find the cost of X. Express the cost of Z as a percentage of the cost of Y. (4 marks)
  7. The length of an arc of a circle is 1/10 of the circumference of the circle. If the area of the circle is 13.86 cm2, find
  8. a) The angle subtended by the arc at the centre of the circle. (2 marks)
  9. b) The area of the sector enclosed by the arc (2 marks)
  10. A point x divides a line MN internally in the ratio 2:5. Given that M is (-4, 10) and N is (10, 3) find the co-ordinates of x. (3 marks)
  11. John spends 2/3 of his salary on food 1/3 of the remainder on rent and saved the rest. What fraction of his salary did he safe? If he spent sh. 1200 on food, how much did he spend on rent?                         (4 marks)

 

  1. In the figure below, O is the centre of the circle. Angle BAG = 50° and angle ABO = 20°. Determine the size of the angle ACB. (3 marks)

 

 

 

 

SECTION II (50 MARKS)

Answer any FIVE questions from this section

  1. Water flows from a cylindrical tank of diameter 140 cm through a circular opening of diameter 1.4 cm at rate of 75 cm per second into a rectangular tank of base area 2.25m2.
  2. a) Calculate the decrease in height of water level of the cylindrical tank after one hour                                                                                   (5 marks)
  3. b) Calculate the increase in height of water level in the rectangular tank. Give your answers in cm.                                                                (5 marks)
  4. The distance between two towns A and B is 360 km. A minibus left A at 8.15 a.m and traveled towards B at an average speed of 90 km/hr. A matatu left B at 10.35 a.m on the same day and traveled towards A at an average speed of 110 km/hr.
  5. a) i)          How far from A did they meet?                                 (4 marks)
  6. ii) At what time did the two vehicles meet?                   (2 marks)
  7. b) A motorist started from his home at 30 a.m on the same day and traveled at an average speed of 100 km/hr. He arrived at B at the same time as the minibus. Calculate the distance from B to his home. (4 marks)
  8. In an English test, 41 students scored the following marks:

72 50 43 58 62 49 69 60 84 62 55

89 67 92 81 75 63 77 95 65 54 35

45 73 41 56 50 36 49 58 61 85 54

38 64 76 86 51 43 72 37

  1. a) Using a class width of 11 and 35-45 as the first class, make a frequency table of the grouped data.                                                             (5 marks)
  2. b) Estimate
  3. i) The mean                                                                 (2 marks)
  4. ii) The median                                                               (3 marks)
  5. A1B1C1D1 is the image of a trapezium ABCD whose vertices are A(1, 2), B(7, 2), C(5, 4) and D(3, 4) under a rotation through 90° clockwise about the origin.
  6. a) i)          Draw ABCD and A1B1C1D1 on the graph paper provided.(2 marks)
  7. ii) Draw the image A11B11C11D11 of A1B1C1D1 under a reflection in the line Y = -x. State co-ordinates of A11B11C11D11 (3 marks)
  8. b) A1IIB1II|C1IID111 is the image of AIIBIICIIDII under the reflection in line x = 0. Draw the image A1IIB11IC11ID111 and state its co-ordinates. (3 marks)
  9. c) Describe a single transformation that maps A1IIB1IIC11lD111 onto ABCD.

(2marks)

  1. In the figure below point O and P are centres of intersecting circles ABD and BCD respectively. Line ABE is a tangent to circle BCD at B. Angle BCD = 420

 

 

 

 

 

 

 

  1. a) Stating reasons, determine the sizes of
  2. i) ÐCBD (3 marks)
  3. ii) Reflex ÐBOD (3 marks)
  4. b) Show that ∆ABD is isosceles.                                                (4 marks)
  5. Two business ladies, Jane and Janet contributed sh. 112,000 and sh. 128,000 respectively, to start a business. They agreed to share the profits as follows: 40% to be shared equally.

30% to be shared in the ratio of their contributions.

30% to be retained for the running of the business.

If their total profit for the year 2004 was sh. 86,400, calculate

  1. i) The amount received by each.                                              (7 marks)
  2. ii) The amount retained for the running of the business. (3 marks)

 

  1. The figure below is a triangle pyramid with a rectangular base ABCD and VO as the height. The vectors AD = a, AB = b and DV = c.

 

 

 

 

 

 

 

  1. a) Express
  2. i) AV in terms of a and c. (2 marks)
  3. ii) BV in terms of a, b and c.                                        (3 marks)
  4. b) M is a point OV such that OM: MV = 3:4. Express BM in terms of a, b and c.                                                                                            (5 marks)
  5. Using a ruler and compass only, construct an acute angled triangle ABC such that ÐABC = 45°, BC = 9 cm and AC = 7 cm. (4 marks)

Locate a point X in triangle ABC such that X is equidistant from A, B and C.                                                                                                                                (3 marks)

Measure AX, AB and ÐAXC.                                                           (3 marks)

 

ANSWERS TO MATHS SAMPLE PAPER

  1. 31/3 – 22/3 ¸ 15/9 =          10/38/3 x 9/14

3/7 of 32/3 – 34/7                        3/7 x 11/3 – 25/7

 

=          10/312/7           =          34/21 x –1/2

11/7 25/7

= –17/21

  1. 1/3(x-4)-1/2(2x-4) = 2

2(x – 4) – 3(2x – 4) = 2×6

2x + 8-6x + 12 = 12

-4x = -8

x = 2

3.

2a + b                          = 180

13a – b                                    = 360

15a                              = 540

a                              =   36

72 + b                          = 180

b                              = 108

 

  1. 1:5000

24.8 = 24.8 x 5000

=          124000         = 1.24 km

100,000

 

  1. 1500 x 76.05 – 79389

77.05

114075 – 79389      = 450.10

 

  1. 3-2n < n-3……….. (i)

n-3 ≤ 4 . …………. (ii)

(i)         6 < 3n

2 < n

(ii)        n < 7

2 < n = 7

{3, 4, 5, 6, 7}

 

  1. x(x + 4) = 32

x2 + 4x = 32 = 0

x(x + 8) – 4(x + 8) = 0

(x + 8)(x-4) = 0

x = 4,   x = 8

Length = 8 cm

 

 

 

  1. -3x + 3y = 6

5

3y = 3/5x 6      Grad = 1/5

y = 1/5 x 2

Point (1, 2) grad = -5

y = mx + c

2 = -5(1) + c

7 = c

y =-5x + 7

 

9          12x2 + 9x + B = 0

12(3/4)2 + 9(3/4) + B = 0    →   B=-27/2

48x2 + 36x – 54 = 0

8x2 + 6x – 9 = 0

(2x + 3) (4x – 3) = 0

x = 3/4

x = -3/2 other root = -3/2

 

  1. 3 x 2a + 5 = 768

2a + 5=256

2a + 5 = 28

a + 5 = 8

a =3

 

  1. B (-1, 7)

 

  1. x: y = z

(2:3)         (6: 1)

4:6:1 = 11 → 1100

X = 4/11 x 1100            =400

y = 6/11 x 1100             =600

z = 1/11 x 1100            =100

100 x 100                    =16.6%

600

  1. (a) ∆ = 1/10 x 360 = 36°

(b)        Sector area =   30 x 22 x 212 = 1.386

360   7

  1. ox=(0,8)

 

  1. Let total salary = x

Food = 2/3x

Remaining = 1/3x = 1/9x

Total used = 2/3x + 1/9x = 7/9x

Saved 2/9x

x = 1200 x 3/2 = 1800

Rent =1/9 x 1800 = 200/=

  1. AO = BO = CO

ÐABO = ÐBAO = 20

ÐOAC = 50 – 20 – 30°

ÐAOB = 180 – (20 + 20) = 140

ÐAOC = 180 – (30 + 30) = 120          B, both

\ÐBOG = 360 – (140 + 120) = 100

ÐOBC = ÐOCB = 180-100 = 40

2

ÐACB = ÐACO + ÐOCB

= 30 + 40        = 70°

 

  1. (a) Decrease =11. 5 cm2

(b)        Increase = 1.46 cm

 

  1. (a) (i)         Distance = 272 5 km

(ii)        Time     =11, 00 a.m

(b)        Distance = 175 km

 

  1. (i) Mean = 61.732

(ii)        Median = 60.78

 

  1. (a) (i)         CBD = 90.42 = 48°

(ii)        Reflex BCD = 360 – 138 = 222°

Angle at a point add up to 360°

(b)        ÐBAD = ÐBCD = 69°

ÐABC = ÐBCD = 40°

ÐADB = 180 – (69+ 42) = 69°

Hence ÐABD is isosceles.

 

  1. (a)        i)          25,920
  2. ii) Jane = 29,376, Janet = 31,104

iii)        Returned = 25,920

 

22        (a)        i)          Av = AD + Dv = a + c

  1. ii) BV = BA +Av

= b + a + c

= a – b + c

(b)        BM = 1/7 (5a – 5b + 3c)

 

  1. AX = 5 cm+ 0.1

BA = 9.4 + 0.1

ÐAXC       = 90°

 

121/1

MATHEMATICS

Paper 1

Oct/Nov. 2008

2 ½ hours.

SECTION 1 (50 MAKS)

Answer all questions in this section.

  1. Without using a calculator, evaluate –8+(-5)x(-8)-(-6)

-3+(-8) ¸ 2×4                                       (2mks)

  1. Simplify 272/3 ¸24

32-3/4                                                                                                                                 (3mks)

  1. Simplify the expression  a4  – b4

                                                                                  a3 – ab2                                                            (3mks)

  1. Mapesa traveled by train from Butere to Nairobi. The train left Butere on a Sunday at 23 50 hours and traveled for 7 hours 15 minutes to reach Nakuru.  After a 45 minutes stop in Nakuru, the train took 5 hours 40 minutes to reach Nairobi.

Find the time, in the 12 hours clock system and the day Mapesa arrived in Nairobi.                                                                                                            (2mks)

  1. The figure below shows a net of a solid

 

 

 

 

 

 

 

 

 

 

 

 

 

 

Below is a part of the sketch of the solid whose net is shown above.

Complete the sketch of the solid, showing the hidden edges with broken lines.       (3mks)

 

 

 

 

 

 

 

 

  1. A fuel dealer makes a profit of Kshs. 520 for every 1000 litres of petrol sold and Ksh. 480 for every 1000 litres of diesel sold.

In a certain month the dealer sold twice as much diesel as petrol.  If the total fuel sold that month was 900,000 litres, find the dealer’s profit for the month.            (3mks)

 

  1. A liquid spray of mass 384g is packed in a cylindrical container of internal radius 3.2cm. Given that the density of the liquid is 0.6g/cm3, calculate to 2 decimal places the height of the liquid in the container.                                     (3mks)
  2. Line BC below is a side of a triangle ABC and also a side of a parallelogram BCDE.

 

 

 

                                                                                                                                        

 

Using a ruler and a pair of compasses only construct:

(i)         The triangle ABC given that ÐABC = 1200 and AB= 6 cm              (1mk)

(ii)        The parallelogram BCDE whose area is equal to that of the triangle ABC and point E is on line AB                                                                      (3mks)

  1. A solid metal sphere of radius 4.2 cm was melted and the molten material used to make a cube. Find to 3 significant figures the length of the side of the cube.

(3mks)

  1. An angle 0f 1.8 radians at the centre of a circle subtends an area of length 23.4 cm

Find;

  1. a) The radius of the circle                                                                       (2mks)
  2. b) The area of the sector enclosed by the arc and the radii.                    (2mks)
  3. Three vertices of a rhombus ABCD are; A(-4,-3), B(1,-1) and c are constants.

(2mks)

  1. a) Draw the rhombus on the grid provided below.                                 (2mks)
  2. b) Find the equation of the line AD in the form y = mx + c, where and c are constants.                                                                         (2mks)

 

 

  1. Two matrices A and B are such that A= k    4                       1      2

and B =

3     2                        3     4

Given that the determinant of AB = 4, find the value of k.

  1. A rectangular and two circular cut-outs of metal sheet of negligible thickness are used to make a closed cylinder. The rectangular cut-out has a height of 18 cm. Each circular cu-out has a radius of 5.2 cm.  Calculate in terms of p, the surface area of the cylinder                                                                                            (3mks)

 

  1. Given that log 4=0.6021 and log 6=0.7782, without using mathematical tables or a calculator, evaluate log 0.096.                                     (3mks)
  2. The equation of line L1 is 2y-5x-8=0 and line L2 passes through the points (-5, 0) and (5,-4). Without drawing the lines L1 and L2 show that the two lines are perpendicular to each other.                         (3mks)

 

 

 

 

 

 

 

 

 

 

 

16        Solve the equation;

2 cos 2q =1 for 00 £ q  £3600                                                                          (4mks)

 

SECTION II (50 MKS)

Answer any five questions in this section.

17        a)         The ratio of Juma’s and Akinyi’s earnings was 5:3 Juma’s earnings rose

to Ksh 8400 after an increase of 12%.

Calculate the percentage increase in Akinyi’s earnings given that the sum of their new earnings was Ksh. 14100.                                         (6mks)

  1. b) Juma and Akinyi contributed all the new earnings to buy maize at Ksh 1175 per bag. The maize was then sold at Ksh 1762.50 per bag. The two shared all the money from the sales of the maize in the ratio of their contributions.

Calculate the amount that Akinyi got.                                                (4mks)

 

  1. The figure below is a sketch of the curve whose equation is y=x2+x+5.

It cuts the line y=11 at points P and Q.

  1. a) Find the area bounded by the curve =x2+x+5 and the line y=11 using the trapezium rule with 5 strips. (5mks)
  2. b) Calculate the difference in the area if the mid-ordinate rule with 5 ordinates was used instead of the trapezium rule. (5mks)

 

19        In the figure below AB=P, AD= q, DE= ½ AB and BC= 2/3 BD

 

 

 

 

 

 

 

 

 

 

  1. a) Find in terms of p arid q the vectors: (1mk)

(i)         BD;                                                                                         (1mk)

(ii)        BC;                                                                                          (1mk)

(iii)       CD;                                                                                         (1mk)

(iv)       AC.                                                                                         (2mks)

  1. b) Given that AC=KCE, where k is a scalar, find

(i)         The value of k                                                                         (4mks)

(ii)        The ratio in which C divides AE                                            (1mk)

 

  1. The diagram below represents two vertical watch-towers AB and CD on a level ground. P and Q are two points on a straight road BD.  The height of the tower AB is 20m road a BD is 200m.

 

 

 

 

 

 

 

  1. a) A car moves from B towards D. At point P, the angle of depression of the car from point A is 11.30. Calculate the distance BP to 4 significant figures.             (2mks)
  2. b) If the car takes 5 seconds to move from P to Q at an average speed of 36 km/h, calculate the angle of depression of Q from A to 2 decimal places

(3mks)

  1. c) Given that QC=50.9m, calculate;

(i)         The height of CD in meters to 2 decimal places;                    (2mks)

(ii)        The angle of elevation of A from C to the nearest degree.    (3mks)

  1. The diagram below shows a triangle ABC with A (3, 4), B (1, 3) and C (2, 1).

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

  1. a) Draw rA‘B’C’ the image of ABC under a rotation of +900+ about (0, 0).

(2mks)

  1. b) Drawn r A“B” the image of A “B’C” under a reflection in the line y=x.

(2mks)

  1. c) Draw r A“B” C. the image under a rotation of -900 about (0, 0)     (2mks)
  2. d) Describe a single transformation that maps rABC onto rA’’’B”’C’’’                                                                                                                                          (2mks)
  3. e) Write down the equations of the lines of symmetry of the quadrilateral

BB”A”’A’                                                                                          (2mks)

  1. The diagram below represents a conical vessel which stands vertically. The which stands vertically,. The vessels contains water to a depth of 30cm. The radius of the surface in the vessel is 21cm. (Take p=22/7).

 

 

 

 

 

 

 

 

 

 

  1. a) Calculate the volume of the water in the vessels in cm3
  2. b) When a metal sphere is completely submerged in the water, the level of the water in the vessels rises by 6cm.

Calculate:

(i)         The radius of the new water surface in the vessel;     (2mrks)

(ii)        The volume of the metal sphere in cm3                              (3mks)

(iii)       The radius of the sphere.                                             (3mks)

 

  1. A group of people planned to contribute equally towards a water project which needed Ksh 200 000 to complete, However, 40 members of the group without from the project.

As a result, each of the remaining members were to contribute Ksh 2500.

  1. a) Find the original number of members in the group.                            (5mks)
  2. b) Forty five percent of the value of the project was funded by Constituency Development Fund (CDF). Calculate the amount of contribution that would be made by each of the remaining members of the group. (3mks)
  3. c) Member’s contributions were in terms of labour provided and money contributed. If the ratio of the value of labour to the money contributed was 6:19; calculate the total amount of money contributed by the members.                                                                                              (2mks)

 

  1. The distance s metres from a fixed point O, covered by a particle after t seconds is given by the equation;

S =t3 -6t2 + 9t + 5.

  1. a) Calculate the gradient to the curve at t=0.5 seconds                          (3mks)
  2. b) Determine the values of s at the maximum and minimum turning points of the curve.                                                                         (4mks)
  3. c) On the space provided, sketch the curve of s= t3-6t2+9t + 5. (3mks)

 

121/2

MATHEMATICS

Paper 2

Oct/Nov 2008

2 ½ hours

SECTION I (50 MARKS)

Answer all the questions in this section in the spaces provided.

  1. In this question, show all the steps in your calculations, giving the answer each stage. Use logarithms correct to decimal places, to evaluate.

 

6.373 log 4.948

 

 

0.004636

(3mks)

  1. Make h the subject of the formula (3mks)

q = 1+rh

l-ht

  1. Line AB given below is one side of triangle ABC. Using a ruler and a pair of compasses only;

 

 

 

 

 

(i)         Complete the triangle ABC such that BC=5cm and ÐABC=450

(ii)        On the same diagram construct a circle touching sides AC,BA produced  and BC produced.

3                      8

  1. The position vectors of points A and B are -1        and       -6    respectively.                                                                                 -4                      6

A point P divides AB in   AB it he ratio 2:3.             Find the position Vector of point P.                                                                                                               (3mks)

5         The top of a table is a regular hexagon. Each side of the hexagon measures 50.0 cm. Find the maximum percentage error in calculating the perimeter of the top of the table.                                                                                     (3mks)

 

  1. A student at a certain college has a 60% chance of passing an examination at the first attempt. Each time a student fails and repeats the examination his chances of passing are increased by 15%

Calculate the probability that a student in the college passes an examination at the second or at the third attempt.                                                                                   (3mks)

 

  1. An aero plane flies at an average speed of 500 knots due East from a point p (53.40e) to another point Q. It takes 2 ¼ hours to reach point Q.

Calculate:

(i)         The distance in nautical miles it traveled;                                           (1mk)

(ii)        The longitude of point Q to 2 decimal places                                     (2mks)

  1. a) Expand and simplify the expression

5

10 + 2/x                                                                                                (2mks)

  1. b) Use the expansion in (a) above to find the value of 145                     (2mks)

 

  1. In the figure below, angles BAC and ADC are equal. Angle ACD is a right angle. The ratio of the sides AC: BC =4: 3

 

 

 

 

 

 

 

 

Given that the area of triangle ABC is 24cm2. Find the triangle ACD          (3mks)

 

  1. Points A(2,2)and B(4,3) are mapped onto A’(2,8) and b’ (4,15) respectively by a transformation T. Find the matrix of T. (4mks)

 

  1. The equation of a circle is given by 4x2 + 4y2– 8x + 20y – 7 = 0.

Determine the coordinates of the centre of the circle.                                    (3mks)

 

  1. Solve for y in the equation log10 (3y +2)-1=log10 (y – 4) (3mks)

 

  1. Without using a calculator or mathematical tables, express

Ö3              in surd form and simplify

1-cos 300                                                                                 (3mks)

 

  1. The figure below represents a triangular prism. The faces ABCD, ADEF and CBFE are rectangles.

AB=8cm, BC=14cm, BF=7cm and AF=7cm.

 

 

 

 

 

 

 

 

 

 

 

Calculate the angle between faces BCEF and ABCD.                                  (3mks)

  1. A particle moves in a straight line from a fixed point. Its velocity Vms-1 after t seconds is given by V=9t2 – 4t +1

Calculate the distance traveled by the particle during the third second.        (3mks)

  1. Find in radians, the values of x in the interval 00£ x £ 2pc for which 2 cos 2x – sin x = 1. (Leave the answers in terms of p)                                                  (4mks)

 

SECTION II (50MKS)

Answer any five questions in this section.

  1. a) A trader deals in two types of rice; type A and with 50 bags of type B. If

he sells the mixture at a profit of 20%, calculate the selling price of one bag of the mixture.                                                                                   (4mks)

  1. b) The trader now mixes type A with type B in the ratio x: y respectively. If the cost of the mixture is Ksh 383.50 per bag, find the ratio x: y. (4mks)
  2. c) The trader mixes one bag of the mixture in part (a) with one bag of the mixture in part (b). Calculate the ratio of type A rice to type B rice in this mixture.                         (2mks)

 

  1. Three variables p, q and r are such that p varies directly as q and inversely as the square of r.

(a)        When p=9, q12 and r = 2.

Find p when q= 15 and r =5                                                   (4mks)

(b)        Express q in terms of p and r.                                                 (1mks)

(c)        If p is increased by 10% and r is decreased by 10%, find;

(i)         A simplified expression for the change in q in terms of p and r

(3mks)

(ii)        The percentage change in q.                                        (2mks)

 

  1. a) complete the table below, giving the values correct to 2 decimal places.

 

x0 0 30 60 90 120 150 180 210 240 270 300 330 360
Sin 2x 0 0.87 -0.87 0 0.87 0.87 0
3cosx-2 1 0.60 -2 -3.5 -4.60 -0.5 1

 

  1. b) On the grid provided, draw the graphs of y =sin 2x and y=3cos x – 2 for

00 £ x £ 3600 on the same axes. Use a scale of 1 cm to represent 300 on the x-axis and 2cm to represent 1 unit on the y-axis.

  1. c) Use the graph in (b) above to solve the equation 3 Cos x – sin 2x = 2.

(2mks)

  1. d) State the amplitude of y=3cosx-2. (1mk)

 

 

  1. In the figure below DA is a diameter of the circle ABCD centre O, radius 10cm. TCS is a tangent to the circle at C, AB=BC and angle DAC= 380

 

 

 

 

 

 

 

 

 

 

 

  1. a) Find the size of the angle;

(i)         ACS;                                                                                       (2mks)

(ii)        BCA                                                                                        (2mks)

  1. b) Calculate the length of:

(i)         AC                                                                                          (2mks)

(ii)        AB                                                                                          (4mks)

 

  1. Two policemen were together at a road junction. Each had a walkie talkie. The maximum distance at which one could communicate with the other was 2.5 km.

One of the policemen walked due East at 3.2 km/h while the other walked due North at 2.4 km/h   the policeman who headed East traveled for x km while the one who headed North traveled for y km before they were unable to communicate.

(a)        Draw a sketch to represent the relative positions of the policemen.   (1mk)

(b)        (i)         From the information above form two simultaneous equations in x

and y.                                                                                      (2mks)

(ii)        Find the values of x and y                                                      (5mks)

(iii)       Calculate the time taken before the policemen were able to communicate                                                                            (2mks)

 

  1. The table below shows the distribution of marks scored by 60 pupils in a test.

 

Marks 11-20 21-30 31-40 41-50 51-60 61-70 71-80 81-90
Frequency 2 5 6 10 14 11 9 3

 

  1. a) On the grid provided, draw an ogive that represents the above information

(4mks)

Use the graph to estimate the interquartile range of this information.

(3mks)

  1. b) In order to pass the test, a pupil had to score more than 48 marks. Calculate the percentage of pupils who passed the test. (3mks)

 

  1. Halima deposited Ksh. 109375 in a financial institution which paid simple interest at the rate of 8% p.a. At the end of 2 years, she withdrew all the money. She then invested the money in share. The value of the shares depreciated at 4% p.a. during the first year of investment. In the next 3 years, the value of the shares appreciated at the rate of 6% every four months
  2. a) Calculate the amount Halima invested in shares.                   (3mks)
  3. b) Calculate the value of Halima’s shares.

(i)         At the end of the first year;                                        (2mks)

(ii)        At the end of the fourth year, to the nearest shilling. (3mks)

  1. c) Calculate Halima‘s gain from the share as a percentage.        (2mks)

 

  1. The table below shows values of x and some values of y for the curve

y = x +3+3x2+-4x-12 in the range -4 £  x   £ 2.

  1. a)         Complete the table by filling in the missing values of y.

 

X -4 -3.5 -3 -2.5 -2 -1.5 -1 -0.5 0 0.5 1 1.5 2.0
Y -4.1 -1.1 -9.4 -9.0 -13.1 -7.9
  1. b) On the grid provided, draw the graph y=x3 + 3x2+ -4x – 12 for -4£ x £

Use the scale. Horizontal axis 2cm for 1 unit and vertical axis 2cm for 5 units.                                                                                                        (3mks)

  1. c) By drawing a suitable straight line, on the same grid as(b) above, solve the equation: x3 + 3x2 – 5x -6 = 0             (5mks)

 

2008 KCSE MATHEMATICS

ANSWERS

PI 121/1 ANSWERS

SOLUTION

  1. -8+(-5)x(-8H-6) = – 8+40+5

-3+(-8)¸2X4                -3+”4X4

=          38

-19

=2

 

  1. (33)273 ¸ 24 =          32 ¸ 24

(25)-3/5                          2-3

   32   

24X2-3

= 9/2 =4 ½

OR 4.5

 

  1. a4-b4      =   (a2+b2) (a2-b2)

a3-ab2               a(a2-b2)

=a2+b2 or   a+b2

a              a

 

  1. 23.50 + (7h 15 min + 45 min + 5h 40 min).

= 1330 h.

=1.30 pm on Monday

 

 

 

 

 

 

 

 

 

 

2 Trapezoidal faces Bl

3 Rectangular faces Bl

Completion of sketch with hidden edges

dotted

  1. Sales: Petrol    –1/3 x 900 000

Diesel              –2/3 x 900 000

Profit: 1/3 x 900000 x 520 + 2/3 x 900000 x 480

1000                          1000

=156000+288000,

=444000

  1.  Volume of liquid 384

0.6

Height of liquid =       640     

ח x 3.22

=          19.89     2 dp

 

  1. <120°constructed at B and completion of ∆ Draping ^ar from A to CB produced

Bisection of height to determination of point D and completion of parallelogram BCDE.

 

  1. Volume of sphere =    4/3p x 4.23

\Side of cube =         3V4/3 p X 4.23

=6.77 3sf.

 

  1. Radius of circle = 23.4

1.8

= 13 cm

Area of sector =          1.8xpxl32

2p

=152.1cm2

 

 

 

Equation of line AD

y – 3 =  5

x – 4    2

y=5x+7

2

  1. AB= K   4    1   2 = k+12   2K+16

3   2     3   4     3+6     6+8

 

K+12   2K+ 16

9                  14

Det      AB = (K+12) x l4 – (2K+16) x 9 = 4

14K+168-18K-144 = 4

-4K = -20

K = 5

 

  1. Area of Rectangular part = 2 x 5.2 x p x l8

= 187.2p

Area of circular parts = 2 x 5.22 x p

= 54.08p

= 241.28p

 

 

  1. Log 0.096 = log (42 x 6 x l0-3)

=2(0.6021) +3.7782

 

=2.9824

(-1.0176)

 

  1. 2y = 5x +8

y = 5/2 x 4

Gradient of L1 = 5/2

Gradient L2    0 – 4 = 4 or 2

-5 -5   -10     5

5 x -2 = -1

2     5

:.L1 and L2 are perpendicular.

 

  1. 2cos 2Ө = 1

Cos 2 Ө = ½

\ 2 Ө = 600

2 Ө Ө
60° 30°
300° 150°
420° 210°
660° 330°

 

  1. (a) Oumas earnings before increase:

112% → 8400

100% → 8400x100/112

=7500

Akinyi’s earnings before increase;

3/5 x 7500

Increase in Akinyi’s earnings

= 14100-8400-4500

=1200

% increase in Akinyi’s earnings

=120/4500 x l00

= 26 2/3            = 26.67

(b)        No. of bags bought

14100/1175

= 12 bags

Profit = (1762.50 -1175) x l2

= 7050

Ratio 5700: 8400 = 19:28

Profit for Akinyi : 7050 x 19/47 =2850

Total earning for Akinyi:

5700 + 2850 = 8550

 

  1. (a)       (i)         BD = q – p

(ii)        BC = 2/3(q – P)

(iii)       CD = 1/3 (q – P)

(iv)       AC =P + 2/3q – 2/3P

= 1/3q + 2/3p

 

(b)        (i)         CE = CD + DE

= 1/3q – 1/3p + ½ p

= 1/3q + 1/6p

AC = K (1/3q + 1/6p)

1/3p + 2/3q = 1/3kq + 1/6kp

1/6k = 1/3 → x = 2

(ii)        AC = 2CE

AC:CE = 2:1

 

  1. (a) Trapezium Rule:
X -2 -1 0 1
y 7 5 5 7

 

Ac = ½ x 1 {(11+11) + 2(7+5+5+7) }

= ½ {22+48}

=35.

Ar = ll x 5 = 55

A = 55 -35

= 20 square units

 

(b)        Mid – ordinates

X 2.5 1.5 0.5 0.5 1.5
Y 8.75 5.75 4.75 5.75 8.75

AC = (8.75 + 5.75 + 4.75 + 5.75 + 8.75) x l

= 33.75

A = 55 -33.75

= 21.25

Difference = 21.25-20

= 1.25 sq units

 

  1. (a) tan 11.3° = 20/x → x = 20       

tan 11.3

 =         20        = 100.09022

0.1998197

≈100.1m

(b)        PQ = 36 x 1000 x 5

60 x60

= 50m

BQ = 100.1 +50 = 150.1m

tanӨ =    20     = 0.1332445

150.1

Ө = 7.5896426

Ө= 7.59°

 

(c)        (i)         QD = 200-150.1 =49.9

CD = √50.92 – 49.92

= 10.03992

≈10.04m

(ii)        AX = 20 -10.04 = 9.96

TanӨ = 9.96 = 0.0498

200

 

21.

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

∆A1B1C1       ly drawn

(a)        ∆A11B11C11 ly drawn

(b)        ∆A111B111C111 ly drawn

(c)        Reflection is athe line y = -x

(d)       X = -1.5

Y = 0

 

 

  1. (a) 1 x 22 x 21 x 21 x 30

3     7

=13860

(b)        (i)         r/21 = 36/30

r =   36×21

30

= 25.2

(ii)        1/3 x 22/7 x 25.2 x 25.2 x 36

23950.08-13860

= 10090.08cm3

Can be 100.90

(iii)       4/3 x 22/7 x r3 = 10090.08

r3= 10090.08 x 21

4 x 22

r = 3√2407.86

= 13.40 cm

 

  1. (a) Let the original number be n.

Amount per member originally = 2000000

n

2000000 – 2000000 = 2500

N-40 n             n

2000000n = (n-40) (2500n + 2000000)

2000000 = 2500n2 + 2000000n – 100000n – 80000000m l removal of denor (n-200) (n+160) =0

n = 200

(b)        New total contribution by members

= 55 x 2000000

100

Contribution per member

= 55 x 2000000

100       160

=6875

(c)        Actual cash contribution by members

= 55 x 2000000 x 19

100                     25

=836000

 

  1. (a) ds = 3t2-12t+9

dt

ds(0.5) = 3(0.5)2-12(0.5)+9

dt

=3.75

 

(b)        ds = 0 → 3t2-12t + 9=0

dt

t2-4t + 3 = 0

(t -3)(t -1) = 0

t = 3 or t = 1

When t = 3, s=33 – 6 x 32 + 9 x 3 + 5 = 5

When t = 1, s=13-6 x 1 + 9 x 1 + 5 = 9

(c)

 

 

 

 

 

 

 

ANSWERS MATHEMATICS PAPER 2 2008

  1. No. Log

6.373               0.8043

0.6944             T.8416

0.6459

√0.004636       3.6661¸ 2 –3.66670

2

2.8331        2.8335

1.8128         1.8124

64.98               64.92

 

  1. q – htq = 1+ rh

q – 1 = rh + htq

q – 1 = h (r + tq)

h = q – 1

r + tq

 

 

 

 

 

 

 

  1. AB = 8          3          5

-6    –    -1    =   -5

6          -4         10

OP =OA + AP

                   

3                      5

=          -1         + 2/5     -5

-4                     10

5

=          -3

0

 

  1. 0.05 x 6 = 0.3

% error = 0.3 x 100%

50×6

= 0.1%

 

 

 

 

 

P( passing in 2nd  attempt)

= 0.4 x 0.69

P ( passing in 3rd attempt)

= 0.4 x 0.31 x 0.7935

P passing in 2nd or 3rd attempt)

 

= 0.4 x 0.69 + 0.4 x 0.31 x 0.7935

0.374394

 

  1. (i) Distance = 500 x 9/4 = 1125 nm

 

(ii)        Ө x 60 cos 53.40 = 1125

Ө = 1125

60 cos 53.40

= 31.450

\Longitude = 71. 450 (E) of Q

 

  1. (10 + 2/x)5 = 105 + 5.104 (2/x) + 10.103 (2/x)2 + 10.102

 

 

2  3      +  5.10    2  4    +          2  5

X                        x                   x

 

 

10000 + 100000 + 40000 + 8000 + 800 + 32

X          x2         x2         x5      x5

 

(b) 145 = ( 10 + 2/ ½ )5

 

= 100000 + 100000 + 40000 + 8000 +   800 + 32

½         ( ½ )2     ( ½ )3      ( ½ )4 ( ½ )5

 

100000 + 200000 + 160000 + 64000 + 12800 + 1024

= 537824

  1. ∆ADC and ∆ BAC are similar

AC/BC = 4/3

Area scale factor = ( 4/3)2 = 16/9

Area of ∆ ADC = 16/9 x 24

= 42 2/3 cm2

 

  1. Let T = a          b

c          d

 

a          b          2          4          =          2          4

c          d          2          3                      8          15

 

 

2a + 2b = 2      2c + 2d = 8

4a + 3b = 4      4c + 3d = 15

 

4a + 4b = 4      OR      4c + 4d = 16

4a + 3b = 4                  4c + 3d = 15

B = 0, a = 1                 d = 1, c = 3

 

\T      =          1          0

3          1

 

  1. x2 + y2 + 5y = 7/4

X2—2x + 1 + y2 + 5y + 25/4 = 7/4 + 1 + 25/4

(x- 1)2 + (y + 5/2)2 = 9

Centre (1, -2 ½ )

 

  1. Log (3y + 2) = log ( y- 4)

10

3y + 2 = y -4

10

3y + 2 = 10 y – 40

Y = 6

  1. Ö3 =          √3

1 – cos 300    1 -√3/2

 

= 2√3(2 + √3

= (2 – √3) (2+ √3)

= 2 √3 ( 2 + √3)

4-3

= 4 √3 + 6

14.

 

 

 

 

 

Cos Ө = 4/7

Ө= 55. 15009540

= 55.150

 

  1. Distance traveled = (9/3t3 – 4/2 t2 + t)3/2

= 3 x 33 – 2 x 32 + 3) – (3 x 23 – 2 x22 + 2)

= 66 – 18

=48m

 

  1. 2(1 – Sin2 x) – sin x =1

2 sin2 x + sin x – 1 = 0

2 sin2 x + 2 sin x – sin x – 1 = 0

(2 sin x – 1) (Sin x + 1) = 0

Sin x = ½ or sin x = -1

X = 1/6 πc , 5/6 πc, 3/2 πc

 

  1. (a) CP = 400 x 30 + 350 x 50

= 29500

SP = 120 x 29500

100

= 35400

1 bag = 35400 ÷ 80

= Kshs 442. 50

 

(b)        = 400 x + 350 y

X + y

= 400 + 350 y = 383.50

X + y

 

400x + 350y = 383. 5 x + 383. 5 y

  • 5 x = 33.5y

X: y = 33.5 : 16.5

= 67:33

 

 

(c)        3   + 67            :           5       +  33     = 209; 191

8                                  100      8100

  1. (a) P = kq

R2

Q = k( 12)

22

K = 3

P = 3 (15)

52

= 1.8 ( 1 4/5)

 

(b)        q – pr2

3

 

(c)        (i)         q1 = 1.2p (0.9r)2

3

 

= 0.972  pr2

3

∆q = 0.972 pr2pr2

3        3

 

= 0.028 pr2

3

 

(ii)        % change = 0.028 pr 2/3  x 100%

 

 Pr2

3

= -2.8%

19.

x 300 600 900 1500 1800 2400 2700 3000 3300
Sin 2 0.87 0 0.87 0 -0.87 -0.87
3 cos x 0.5 4.60 -5 -3.5 -2 0.60

 

 

 

 

 

 

 

 

 

 

  1. (a) (i)         < ADC = 520 or <DCA

= 380 or < DCT = 380

<ACS = 520

 

(ii)        <CBA = 1280

<BCA = 260

 

(b)        (i)         AC  = 20 cos 38

= 15.76 cm

 

(ii)        AB =   15.76

Sin 260 Sin 1280

AB = 15.76 sin 260

Sin 1280

 

15.7880. 4384

0.7880

= 8.768 cm

  1. (a)

 

 

 

 

(b)        (i)         x2  + y2 = 2.52

Y    =  

2.4       3.2

 

(ii)        y = ¾ x

X2 + ( ¾ x)2 = 2.52

16x2 + 9x2 = 6.25 x 16

X2 = 6.25 x 16

25

X = 2 km

Y = ¾ x 2 = 1.5 km

 

(iii)       Time taken = 2 or 1.5

3.2    2.4

= 0.625 hrs

 

22.

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

 

  1. (a) Interest = 109375 x  8  x 2

100

= 17500

Amount = 109375 + 17500

Kshs 126875

 

(b)        (i)         1st year value = 96/ 100 x 126875

= Kshs 121800

 

(ii)        4th year vale

= 121800 ( 1 + 6/100)9

= kshs 205779

C = 205779 – 126875 x 100%

126875

= 62.19%

 

24.

x -4 -3 -2 -1 0 1 2
y -12 0 0 -6 -12 -12 0

 

 

 

 

 

 

 

 

 

 

 

 

Y= x3 + 3x2 – 4x – 12

O = x3 + 3x2 – 5x – 6

Y =                  x – 6

 

X = (-3.9, 0.9, 1.75) ± 0.05