CREST Mathematics Olympiad Class 10 Sample Paper

Q.1

Ken and Paul can complete a job in 40 days and 50 days, respectively. They worked on alternative days to complete it. Find the minimum possible time in which they could have completed it.

Q.2

The average mark obtained by the students in a class is 43. If the average marks obtained by 25 boys are 40 and the average marks obtained by the girl students are 48, then what is the number of girl students in the class?

Q.3

Find the quadratic equation whose roots are reciprocal of the roots of the equation 3x² - 20x + 17 = 0.

Q.4

A square is drawn by joining midpoints of the sides of a square. Another square is drawn inside the second square in the same way and the process is continued indefinitely. If, the side of the first square is 16 cm, then what is the sum of the areas of all the squares?

Q.5

In the adjoining figure, the bottom of the glass has a hemispherical raised portion. If the glass is filled with orange juice, then find the quantity of juice which a person will get:

Q.6

In the binomial expansion of (a - b)ⁿ, n ≥ 5 the sum of the 5^th and 6^th terms is zero. Find the value of a/b.

Q.7

Inside a triangular park, there is a flower bed forming a similar triangle. Around the flower bed runs a uniform path of such a width that the sides of the park are exactly double the corresponding sides of the flower bed. Find the ratio of the area of the path to the flower bed.

Q.8

If 1/(a + b), 1/(b + c), and 1/(c + a) are in AP, then which of the following is true?

Q.9

Simplify the following expression:
[(a - b)³ - (a + b)³ ]/2 + a(a² + 3b²) 

Q.10

The areas of two similar triangles are 81 cm² and 49 cm², respectively, then what will be the ratio of their corresponding medians?