Cambridge Past Paper Questions

Given that OA = ( -17 / 25 ) and OB = ( 4 / 5 ) find

Variables x and y are such that, when y² is plotted against secx, a straight line graph passing through the points (2.4, 1.6) and (1.3, 3.8) is obt...

The diagram shows part of the curve y = 6 - 3/x which passes through the point A where x = 3. The normal to the curve at the point A meets the x-ax...

The table shows values of the variables p and v which are related by the equation p = kvⁿ, where k and n are constants. ν 10 50 110 230 p 1412 151 ...

Given that A = ( 4 3 / 1 2 ) and B = ( -2 0 / 1 4 ), find

The diagram shows a sector OXY of a circle centre O, radius 3cm and a sector OAB of a circle centre O, radius 8 cm. The point X lies on the line OA...

A music student needs to select 7 pieces of music from 6 classical pieces and 4 modern pieces. Find the number of different selections that she can...

A particle moves in a straight line such that its displacement, xm, from a fixed point O at time tseconds is given by x = 12{ln(2t+3)}. Find

Answer only one of the following two alternatives. EITHER The diagram shows part of a curve for which dy/dx = 8 cos 2x. The curve passes through th...

Answer only one of the following two alternatives. OR A curve is such that dy/dx = 6e³ˣ – 12. The curve passes through the point (0, 1).

The variables x and y are related so that, when y/x² is plotted against x³, a straight line graph passing through (3, 9) and (7, 1) is obtained. Ex...

In a singing competition there are 8 contestants. Each contestant sings in the first round of this competition.

It is given that x − 1 is a factor of f(x), where f(x) = x³ – 6x² + ax + b.

Given that a curve has equation y = x² + 64√x, find the coordinates of the point on the curve where d²y/dx² = 0.

The line y = x + 4 intersects the curve 2x² + 3xy − y² + 1 = 0 at the points A and B. Find the length of the line AB.

Solutions to this question by accurate drawing will not be accepted. [Figure showing quadrilateral ABCD with coordinates A(−1, 5), B(–2, 6), C(4, 1...

A particle starts from rest and moves in a straight line so that, t seconds after leaving a fixed point O, its velocity, v ms⁻¹, is given by v = 4 ...

In this question, (1 / 0) is a unit vector due east and (0 / 1) is a unit vector due north. A lighthouse has position vector (27 / 48) km relative ...

Answer only one of the following two alternatives.

Find ∫ (2+5x - 1/(x-2)²) dx.

The volume V cm³ of a spherical ball of radius r cm is given by V = (4/3)πr³. Given that the radius is increasing at a constant rate of 1/π cm s⁻¹,...

The diagram shows a right-angled triangle ABC in which the length of AB is 16/√2, the length of BC is 7√3 and angle BCA is θ. [Figure 4]

Solve the equation 2x³ - 3x² - 11x + 6 = 0.

The diagram shows part of the line y = 12 – 2x. The point Q(x, y) lies on this line and the points P and R lie on the coordinate axes such that OPQ...

Given that logₚ X = 6 and logₚ Y = 4, find the value of

Answer only one of the following two alternatives. EITHER It is given that f(x) = 4x² + kx + k.

Answer only one of the following two alternatives. OR The functions f, g and h are defined, for x ∈ R, by f(x) = x² + 1, g(x) = 2x - 5, h(x) = 2ˣ.

Show that (1 / (1 - cosθ)) + (1 / (1 + cosθ)) = 2cosec²θ.

Express lga + 3lgb – 3 as a single logarithm.

Shade the region corresponding to the set given below each Venn diagram.

The curves y = x² and 3y = −2x² + 20x – 20 meet at the point A. [Figure 6.1]

The points A and B have coordinates (–2, 15) and (3, 5) respectively. The perpendicular to the line AB at the point A (–2, 15) crosses the y-axis a...

A body moves in a straight line such that, t s after passing through a fixed point O, its displacement from O is s m. The velocity v ms⁻¹ of the bo...

(a) A curve is such that dy/dx = ae^(1-x) - 3x², where a is a constant. At the point (1, 4), the gradient of the curve is 2.

(a) The function f is such that f(x) = 2x² – 8x + 5.

Find the value of k for which the x-axis is a tangent to the curve y = x² + (2k + 10)x + k² + 5.

The coefficient of x³ in the expansion of (2 + ax)⁵ is 10 times the coefficient of x in the expansion of (1 + (ax/3))⁴. Find the value of a.

The figure shows the graph of y= k+ m sin px for 0 ≤ x ≤ π, where k, m and p are positive constants. [Figure 3.1]

You must not use a calculator in Question 4. In the triangle ABC, angle B = 90°, AB = 4+ 2√2 and BC = 1 + √2 .