- The cost of mass production of cars is partly constant and partly varies as the number of cars produced. The total cost of making 400...(Solved)
The cost of mass production of cars is partly constant and partly varies as the number of cars produced. The total cost of making 400 cars is sh 3,740,000 and that of making 1000 cars is sh 7,100,000. Find the cost of making 2500 cars.
Date posted: November 6, 2019. Answers (1)
- Solve the inequality below. Hence represent the solution on a number line.
x < 2x + 7 = - 1/3x + 14(Solved)
Solve the inequality below. Hence represent the solution on a number line.
x < 2x + 7 ≤ - 1/3x + 14
Date posted: November 6, 2019. Answers (1)
- Using logarithms tables: Evaluate.(Solved)
Using logarithms tables: Evaluate.
Date posted: November 6, 2019. Answers (1)
- A shopkeeper sells two types of chewing gum. Big G and Orbit. Each big G costs sh. 3 and each orbit costs sh. 4. The...(Solved)
A shopkeeper sells two types of chewing gum. Big G and Orbit. Each big G costs sh. 3 and each orbit costs sh. 4. The shopkeeper has put aside sh. 300 for the purchase of gums. He needs at least twice as many Big G as Orbit and there must be at least 50 Big G and at least 20 orbit. Let x represent the number of Big G and y the number of orbit the shopkeeper purchases.
(a) Write down all the inequalities representing the information
(b) Represents the inequalities in (a) graphically
(c) The shopkeeper makes a profit of sh. 1.00 on each big G and sh. 1.50 on each orbit.
(i) Find the number of gums of each type that would give him maximum profit
(ii) Hence find the maximum profit
Date posted: November 6, 2019. Answers (1)
- The table below shows income tax rates
Mr. Kiprono is employed and housed by a company. For which he pays a normal rent of Sh. 2000....(Solved)
The table below shows income tax rates
Mr. Kiprono is employed and housed by a company. For which he pays a normal rent of Sh. 2000. He earns a basic salary of Ksh. 32,000 pm. He is also given taxable allowances amounting to ksh. 8480.
(a) Calculate his taxable income in K£
(b) Determine his total income tax in Ksh.
(c) If he pays a monthly water bill of Ksh. 350, electricity bill of Ksh. 400 and is a member of a cooperative
and pays Ksh. 2500 pm. Determine his net monthly income.
Date posted: November 6, 2019. Answers (1)
- Mr. Karanja owns a bicycle which he sometimes rides to go to work. Out of the 21 working days in a
month, he only rides to...(Solved)
Mr. Karanja owns a bicycle which he sometimes rides to go to work. Out of the 21 working days in a
month, he only rides to work for 18 days. If he rides to work, the probability that he is bitten by a
rabid dog is 4/15 otherwise its only 1/13. When he is bitten by the dog, the probability that he will get
treatment is 4/5 and if he does not get treatment the probability that he will get rabies is 5/7.
(a) Draw a tree diagram to show the events
(b) Using the tree diagram in (a) above, determine the probability that
(i) Karanja will not be bitten by a rabid dog
(ii) He will get rabies
(iii) He will not get rabies if he does not get treatment
Date posted: November 6, 2019. Answers (1)
- Machine A can complete some work in 8 hours while machine B can complete the same work in 10 hours. The two machines were set...(Solved)
Machine A can complete some work in 8 hours while machine B can complete the same work in 10 hours. The two machines were set to do the work at the same time. After 3 hours, machine B broke down. Determine the time taken by machine A to complete the remaining piece of work.
Date posted: November 6, 2019. Answers (1)
- Solve for x in the equation.
6sin2 x - cos x – 5 = 0
for 00 = x = 360(Solved)
Solve for x in the equation.
6sin2 x - cos x – 5 = 0
for 00 ≤ x ≤ 360
Date posted: November 6, 2019. Answers (1)
- The third term and the sixth term of a geometric series are 3 1/3 and 11 1/4 respectively. Calculate the
(a) Common ratio
(b) First term(Solved)
The third term and the sixth term of a geometric series are 3 1/3 and 11 1/4 respectively. Calculate the
(a) Common ratio
(b) First term
Date posted: November 6, 2019. Answers (1)
- PQ is a diameter of a circle is such that the co-ordinates of P and Q are (-6, -2) and (4, -2)
respectively. Find the equation...(Solved)
PQ is a diameter of a circle is such that the co-ordinates of P and Q are (-6, -2) and (4, -2)
respectively. Find the equation of the circle in the form ax2 + by2 + cx + dy + e = 0 where a,b,c,d and
e are constants.
Date posted: November 6, 2019. Answers (1)
- Three variables P,Q and R are such that P varies directly as the cube of Q and inversely as the square root of R. If...(Solved)
Three variables P,Q and R are such that P varies directly as the cube of Q and inversely as the square root of R. If Q is increased by 20% and R is decreased by 10%, Find the percentage change in P.
Date posted: November 6, 2019. Answers (1)
- Point P(X0N, 300E) and Q(X0N, 500E) are 1935 km apart. Taking R = 6370km and ?? = 22/7,
Find the value of x.(Solved)
Point P(X0N, 300E) and Q(X0N, 500E) are 1935 km apart. Taking R = 6370km and 𝜋 = 22/7,
Find the value of x.
Date posted: November 6, 2019. Answers (1)
- Make T the subject of the formula(Solved)
Make T the subject of the formula
Date posted: November 5, 2019. Answers (1)
- Use complete square method to solve for x
8x2 + 6x – 9 = 0(Solved)
Use complete square method to solve for x
8x2 + 6x – 9 = 0
Date posted: November 5, 2019. Answers (1)
- Find the length of DP in the figure below(Solved)
Find the length of DP in the figure below
Date posted: November 5, 2019. Answers (1)
- (a) Find the expansion of (1 – x/3 )7 in ascending powers of x up to the term in x3.
(b) Use the expansion above to...(Solved)
(a) Find the expansion of (1 – x/3 )7 in ascending powers of x up to the term in x3.
(b) Use the expansion above to find, (0.99)7 to four significant figures.
Date posted: November 5, 2019. Answers (1)
- Solve for x
Log27 (x + 5) - log27 (x – 3) = 2/3(Solved)
Solve for x
Log27 (x + 5) - log27 (x – 3) = 2/3
Date posted: November 5, 2019. Answers (1)
- Given that A = 5i + 4j + K and B = 8i – 5j – 5k and P divides AB externally in the ratio...(Solved)
Given that A = 5i + 4j + K and B = 8i – 5j – 5k and P divides AB externally in the ratio 5:2. Find
the:-
(a) Position vector of P
(b) The magnitude of OP
Date posted: November 5, 2019. Answers (1)
- Town B is 180km on a bearing 0500 from town A. Another town C is on a bearing of 1100 from town A and on...(Solved)
Town B is 180km on a bearing 0500 from town A. Another town C is on a bearing of 1100 from town A and on a bearing of 1500 from town B. A fourth town D is 240 km on a bearing of 3200 from A. Using scale drawing, such that 1cm rep 30km,
(a) Show the relative position of the towns
(b) Using the diagram, find
(i) Distance AC
(ii) Distance CD
(iii) Compass bearing of C from D
Date posted: November 5, 2019. Answers (1)
- Nairobi and Eldoret are 600km apart. At 9.20a.m. a lorry leaves Eldoret for Nairobi at a speed of 60km/hr. At 10.00a.m. a car leaves Eldoret...(Solved)
Nairobi and Eldoret are 600km apart. At 9.20a.m. a lorry leaves Eldoret for Nairobi at a speed of 60km/hr. At 10.00a.m. a car leaves Eldoret for Nairobi at a speed of 120km/hr. After 20 minutes of travel, the car develops a mechanical problem which takes 20 minutes to repair. The car then proceeds with the journey at the same speed.
(a) Calculate the time the lorry arrived in Nairobi
(b) Find the time when the car overtakes the lorry
(c) Find the distance from Nairobi at the overtaking point
(d) Calculate how far the lorry was from Eldoret when the car reached Nairobi
Date posted: November 5, 2019. Answers (1)