Mathematics Olympiad (IMO) questions are designed to test deep mathematical understanding and problem-solving skills. Here are some sample questions that reflect the style and complexity of IMO problems:
Mathematics Olympiad Questions for Class 10
1. Algebra
1.1 Problem 1:
Solve the quadratic equation:
Solve the quadratic equation:
2x^2 - 5x + 3 = 01.2 Problem 2:
Find the value of
Find the value of
k for which the quadratic equation x^2 + (k-1)x + 2k = 0 has equal roots.1.3 Problem 3:
Solve the equation for
Solve the equation for
x:3x^2 - 7x + 2 = 01.4 Problem 4:
Solve for
Solve for
x in the equation:(2x + 3) / (x - 1) = 41.5 Problem 5:
If
If
x and y are the roots of the quadratic equation x^2 - 5x + 6 = 0, find the value of x^3 + y^3.1.6 Problem 6:
Determine the sum and product of the roots of the equation:
Determine the sum and product of the roots of the equation:
4x^2 + 7x - 3 = 01.7 Problem 7:
Find the roots of the quadratic equation:
Find the roots of the quadratic equation:
x^2 - 6x + 8 = 01.8 Problem 8:
Solve the equation:
Solve the equation:
x^2 + 4x + 4 = 02. Geometry
2.1 Problem 1:
In triangle
In triangle
ABC, if ∠A = 60°, AB = AC, and BC = 10 units, find the lengths of AB and AC.2.2 Problem 2:
In a right-angled triangle, where the hypotenuse is 13 units and one leg is 5 units, find the length of the other leg.
In a right-angled triangle, where the hypotenuse is 13 units and one leg is 5 units, find the length of the other leg.
2.3 Problem 3:
Find the area of a triangle with base 8 units and height 5 units.
Find the area of a triangle with base 8 units and height 5 units.
2.4 Problem 4:
In a circle with radius 7 units, find the length of the chord that is 5 units away from the center of the circle.
In a circle with radius 7 units, find the length of the chord that is 5 units away from the center of the circle.
2.5 Problem 5:
Calculate the circumference of a circle with a diameter of 10 units.
Calculate the circumference of a circle with a diameter of 10 units.
2.6 Problem 6:
In a rectangle, if the length is twice the width and the perimeter is 60 units, find the dimensions of the rectangle.
In a rectangle, if the length is twice the width and the perimeter is 60 units, find the dimensions of the rectangle.
2.7 Problem 7:
Find the area of a right-angled triangle where the legs are 9 units and 12 units long.
Find the area of a right-angled triangle where the legs are 9 units and 12 units long.
2.8 Problem 8:
In a parallelogram, if the base is 8 units and the height is 5 units, find the area of the parallelogram.
In a parallelogram, if the base is 8 units and the height is 5 units, find the area of the parallelogram.
3. Number Theory
3.1 Problem 1:
Find the greatest common divisor (GCD) of 56 and 98.
Find the greatest common divisor (GCD) of 56 and 98.
3.2 Problem 2:
Find the sum of all positive integer solutions of the equation:
Find the sum of all positive integer solutions of the equation:
x^2 - 4y^2 = 13.3 Problem 3:
Determine the least common multiple (LCM) of 12 and 18.
Determine the least common multiple (LCM) of 12 and 18.
3.4 Problem 4:
Find the number of positive divisors of 84.
Find the number of positive divisors of 84.
3.5 Problem 5:
If
If
a and b are two positive integers such that GCD(a, b) = 1 and LCM(a, b) = 60, find the possible pairs of (a, b).3.6 Problem 6:
Find the remainder when 123456 is divided by 7.
Find the remainder when 123456 is divided by 7.
3.7 Problem 7:
If
If
p is a prime number and 2p - 1 is also a prime number, find the value of p.3.8 Problem 8:
Determine whether 37 is a prime number and justify your answer.
Determine whether 37 is a prime number and justify your answer.
4. Combinatorics
4.1 Problem 1:
How many ways can you arrange the letters in the word "MATHEMATICS"?
How many ways can you arrange the letters in the word "MATHEMATICS"?
4.2 Problem 2:
In how many ways can 5 people be seated in a row?
In how many ways can 5 people be seated in a row?
4.3 Problem 3:
How many different 4-digit numbers can be formed using the digits 0, 1, 2, 3, and 4 if repetition is allowed?
How many different 4-digit numbers can be formed using the digits 0, 1, 2, 3, and 4 if repetition is allowed?
4.4 Problem 4:
From a group of 10 people, how many ways can you select a committee of 3 people?
From a group of 10 people, how many ways can you select a committee of 3 people?
4.5 Problem 5:
In how many ways can you distribute 10 identical candies among 4 children?
In how many ways can you distribute 10 identical candies among 4 children?
4.6 Problem 6:
Calculate the number of ways to arrange the letters in the word "BANANA".
Calculate the number of ways to arrange the letters in the word "BANANA".
4.7 Problem 7:
How many ways can you choose 2 cards from a standard deck of 52 cards?
How many ways can you choose 2 cards from a standard deck of 52 cards?
4.8 Problem 8:
If a password consists of 3 letters followed by 2 digits, how many possible passwords can be created if repetition is allowed?
If a password consists of 3 letters followed by 2 digits, how many possible passwords can be created if repetition is allowed?
Answers
1.1 Problem 1:
The solutions are:
The solutions are:
x = 1 and x = 1.51.2 Problem 2:
The value of
The value of
k is:k = 5 ± 2√61.3 Problem 3:
The roots are:
The roots are:
x = 2 and x = 1/31.4 Problem 4:
The solution is:
The solution is:
x = 2.51.5 Problem 5:
The value of
The value of
x^3 + y^3 is:631.6 Problem 6:
The sum is:
The sum is:
-7 and the product is:-31.7 Problem 7:
The roots are:
The roots are:
x = 2 and x = 41.8 Problem 8:
The root is:
The root is:
x = -22.1 Problem 1:
The lengths of
The lengths of
AB and AC are:10 units2.2 Problem 2:
The length of the other leg is:
The length of the other leg is:
12 units2.3 Problem 3:
The area is:
The area is:
20 square units2.4 Problem 4:
The length of the chord is:
The length of the chord is:
10 units2.5 Problem 5:
The circumference is:
The circumference is:
31.4 units2.6 Problem 6:
The dimensions are:
The dimensions are:
Length = 20 units and Width = 10 units2.7 Problem 7:
The area is:
The area is:
54 square units2.8 Problem 8:
The area is:
The area is:
40 square units3.1 Problem 1:
The GCD is:
The GCD is:
143.2 Problem 2:
The sum of all positive integer solutions is:
The sum of all positive integer solutions is:
63.3 Problem 3:
The LCM is:
The LCM is:
363.4 Problem 4:
The number of positive divisors is:
The number of positive divisors is:
123.5 Problem 5:
The possible pairs are:
The possible pairs are:
(1, 60), (2, 30), (3, 20), (4, 15), (5, 12), (6, 10)3.6 Problem 6:
The remainder is:
The remainder is:
23.7 Problem 7:
The value of
The value of
p is:23.8 Problem 8:
Yes, 37 is a prime number because it has no positive divisors other than 1 and itself.
Yes, 37 is a prime number because it has no positive divisors other than 1 and itself.
4.1 Problem 1:
The number of distinct arrangements is:
The number of distinct arrangements is:
8316004.2 Problem 2:
The number of ways is:
The number of ways is:
1204.3 Problem 3:
The number of different 4-digit numbers is:
The number of different 4-digit numbers is:
6254.4 Problem 4:
The number of ways is:
The number of ways is:
1204.5 Problem 5:
The number of ways is:
The number of ways is:
2864.6 Problem 6:
The number of distinct arrangements is:
The number of distinct arrangements is:
604.7 Problem 7:
The number of ways to choose 2 cards is:
The number of ways to choose 2 cards is:
13264.8 Problem 8:
The number of possible passwords is:
The number of possible passwords is:
17576000