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Solve for x and y in the equation.
Date posted:
May 9, 2019
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A line P has its x and y intercept as -2 and -3 respectively.
a) Find the gradient of line P.
b) Line Q passes through (5, -2) and is parallel to line P. Write the equation of line Q in the form y = mx + c
Date posted:
May 9, 2019
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The figure below represents a swimming pool. Calculate the volume of the swimming pool in litres.
Date posted:
May 9, 2019
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Two types of coffee cost sh.250 per kg and sh.200 per kg are mixed so that their masses are in the ratio 3: 5
respectively. Otieno sold the mixture at sh.262.50. Calculate his percentage profit.
Date posted:
May 9, 2019
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Two towns A and B are 220km apart. A bus left town A at 11.00a.m and travelled towards town B at 60km/h. At the
same time, a matatu left town B for town A and travelled at 80km/h. The matatu stopped for 45 minutes on the way
before meeting the bus. Calculate the distance covered by the bus before meeting the matatu.
Date posted:
May 9, 2019
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Simplify the expression given below
Date posted:
May 9, 2019
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Evaluate the expression below
Date posted:
May 9, 2019
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The figure below represents a solid when is partly a cuboid and partly a right pyramid with rectangular base and
measurements as shown below.
a) Determine the length AF.
b) Find the vertical height of the pyramid part.
c) Find the angle:
i) HV makes with the base ABCD
ii) HEV makes with the base HGFE.
iii) AF makes with base ABCD
Date posted:
May 9, 2019
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The distance (s) moved by a particle after t (seconds) is given as S=6t² - t³+ 9t metres. Determine
i) Displacement after 2 seconds.
ii) The time when the particle is momentarily at rest.
iii) The velocity when t = 5 seconds
Date posted:
May 9, 2019
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The gradient of a curve is given as 6x² + 8x + 5. If the curve passes through (1, 28), determine the equation of the
curve.
Date posted:
May 9, 2019
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A triangle ABC has vertices A(2, 1), B(5, 1) and C(4, -2). A1 (4, 1) B1(10, 1) and C1(8, -2) is the image of triangle ABC
under a given transformation.
a) Determine a single matrix of transformation that maps ABC onto A1B1C1 hence describe fully the matrix of
transformation.
b) A²B²C² is the image of ABC under positive 90° about the origin. Determine the co-ordinates of vertices A²B²C² on the
grid provided.
c) A³B³C³ is the image of A1B1C1 under a transformation given by
. Determine the co-ordinates of the vertices
A³B³C³.
Date posted:
May 9, 2019
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a) Complete the table below for y = 2 Sin 2x and y = 3 Cos x.
b) Draw the graph y = 2 Sin 2x and y = 3 Cos x using 1cm to represent 30° horizontal axis and 2cm to represent unit
on the vertical axis.
c) Use the graph to
i) solve 2 Sin x - 3 Cos x = 0
ii) Find the amplitude and period of the curve y = 2 Sin 2x.
Date posted:
May 9, 2019
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A variable P varies as the square of R and inversely at T.
i) When R is increased by 20%, T is reduced by 10%. Find the percentage change in value of R.
ii) When P = 12, R = 6, T=9. Find the law connecting P, R and T.
Date posted:
May 9, 2019
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The first, the 7th and the 25th terms of an arithmetic progression are the first three consecutive terms of a geometrical progression. The 20th term of the arithmetic progression is 22. Find:
a) i) The first term and common difference of the arithmetic progression.
ii) The sum of the first 40 terms of the arithmetic progression.
b) i) The 10th term of the geometric progression.
ii) The sum of the first 10 terms of the geometric progression.
Date posted:
May 9, 2019
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Two businessmen P and Q invested shs 2,400,000 each in separate banks. P invested in a bank which paid an interest
of 12% p.a. compounded semi-annually. While Q invested in a bank which paid simple interest of 20% p.a.
a) Find:
i) the compound interest earned by P after 10 years to the nearest hundreds.
ii) the total interest earned by Q after 10 years to the nearest hundreds.
b) How long will it take P to get an amount equivalent to Kshs 6,000,000.
c) How long does it take Q to reach the amount of Kshs 6,000,000
Date posted:
May 9, 2019
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Income tax on all income earned were taxed as follows.
John earns a monthly salary of shs 62,400. He is entitled to a family relief of 1,056 p.m. Find his net tax p.m in kshs.
Date posted:
May 9, 2019
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On the line below, draw the locus of P on the upper side of AB such that angle APB is 65°
Date posted:
May 9, 2019
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The cost of two brands of coffee A and B are shs 120 and shs 150 per kg respectively. If A and B are mixed in ratio 3 : 7
respectively, and the selling price of the mixture is 30% above the cost, find the selling price per 500g packet of coffee.
Date posted:
May 9, 2019
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P(60°N, 32°E) and Q(60°N, 118°W). Find the shortest distance along parallel latitude PQ.
Date posted:
May 9, 2019
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Find the percentage error in calculating the volume of the cuboid whose dimensions are 8.2cm by 6.2cm by 5.7cm
Date posted:
May 9, 2019
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Solve the equation: 2 Cos 2x = √3 for 0° ≤ x ≤ 360°
Date posted:
May 9, 2019
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Expand and simplify (2 - x)5 hence evaluate 1.985 using the first 4 terms of the expansion.
Date posted:
May 9, 2019
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In the figure blow, DC is the tangent of the circle at D. BC = 8cm, AF = 6cm, DF=8cm and FE=3cm. Find the length FB
and DC.
Date posted:
May 9, 2019
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OA = 2i + 3j + 4k while OB = 5i + 9j - 2k. P divides AP externally in the ratio 2 : 1. Find he coordinates of P.
Date posted:
May 9, 2019
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Find the value of k if 4x² + 25x + 5 + k is a perfect square.
Date posted:
May 9, 2019
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Using mid-ordinate rule of 5 strips, determine the area under the curve y = 3x² + 10, the lines x = 1, x=6 and x-axis.
Date posted:
May 9, 2019
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The triangle ABC below is such that AB = b and AC=c. M is on AB such that 3AM = AB and N is on AC such that AC: NC= 4 : 1
a) Write the following in terms of b and c
i) BC
ii)MN
iii)BN
b) Given further that BC produced intersects MN produced at L and ML = hMN while BL = kBC where h and k are
constants write ML in two ways hence find the values of h and k.
c) Show the M, N and L are collinear.
Date posted:
May 9, 2019
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a) Sketch the curve y = -2x² - 4x + 6
b) Use trapezium rule taking intervals of 0.5 units to find the area under the curve.
y = -2x² - 4x + 6 within the range -2 ≤ x ≤ 4.
c) Obtain the exact area in (b) above hence calculate the percentage error introduced by using the Trapezium rule.
Date posted:
May 9, 2019
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A solid cylinder has a radius of 21cm and a height of 18cm. A conical hole of radius r is drilled in the cylinder on one
of the end faces. The conical hole is 12cm deep. If the material removed from the hole is 22/3 % of the volume of the
cylinder, find : (Use pi = 22/7)
a) the surface area of the hole.
b) the radius of a spherical balls made out of the material.
c) the surface area of the spherical ball.
Date posted:
May 9, 2019
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A bus left Nairobi at 7.00 am and travelled towards Eldoret at an average speed of 80km/hr. At 7.45am a car left
Eldoret towards Nairobi at an average speed of 120km/hr. The distance between Nairobi and Eldoret is 300km.
Calculate
a) the time the bus arrived at Eldoret.
b) the time of the day the two met
c) the distance from Nairobi where the two met.
d) the distance of the bus from Eldoret when the car arrived at Nairobi.
Date posted:
May 9, 2019