CREST Mathematics Olympiad Class 9 Sample Paper

Q.1

A rectangular box has dimensions x, y and z units, where x < y < z. If one dimension is increased by one unit, then the increase in volume is:

Q.2

If x = a(b - c), y = b(c - a) and z = c(a - b), then (x/a)³ + (y/b)³ + (z/c)³ = ?

Q.3

In the following figure, two isosceles right triangles, DEF and HGI are on the same base DH and DH are parallel to FI. If DE = GH = 9 cm and DH = 20 cm, then the area of the quadrilateral FEGI is ________.

Q.4

ABCD is a square of side 'a' cm. AB, BC, CD and AD are all chords of circles with equal radii. If the chords subtend an angle of 120⁰ at the centre of their respective circles, find the total area of the given figure, where arcs are a part of the circle:

Q.5

In the triangle ABC, AB = 2 cm, BC = 3 cm and AC = 4 cm. D is the middle-point of AC. If a square is constructed with BD as one of its sides, what is the area of the square?

Q.6

If (x + y + z) = 1, xy + yz + zx = -1, xyz = -1, then the value of x³ + y³ + z³ is:

Q.7

If x = 3 + 2√2, then what will be the value of x² + 1/x²?

Q.8

An urn contains 6 blue and 'P' green balls. If the probability of drawing a green ball is double that of drawing a blue ball, then 'P' is equal to:

Q.9

If we add 1 to the numerator and subtract 1 from the denominator the fraction becomes 1. It also becomes 1/2 if we add 1 to the denominator, then the sum of the numerator and the denominator of the fraction is:

Q.10

If (4 + 3√5)/(4 - 3√5) = a + b√5, then (a, b) = _______