Practice Test: Quadratic Equations - Class 10 MCQ

Solve for y : (√7) y² – 6y –13 (√7) = 0

Solve for x : 6x² + 40 = 31x

Determine k such that the quadratic equation x² + 7(3 + 2k) – 2x (1 + 3k) = 0 has equal roots :

Discriminant of the equation – 3x² + 2x – 8 = 0 is

The nature of the roots of the equation x² – 5x + 7 = 0 is –

The roots of a²x² + abx = b², a = 0 are :

The equation x² – px + q = 0 p, q ε R has no real roots if :

Determine the value of k for which the quadratic equation 4x² – 3kx + 1 = 0 has equal roots :

Find the value of k such that the sum of the squares of the roots of the quadratic equation x² – 8x + k = 0 is 40:

Find the value of p for which the quadratic equation x² + p(4x + p – 1) + 2 = 0 has equal roots :

The length of a hypotenuse of a right triangle exceeds the length of its base by 2 cm and exceeds twice the length of the altitude by 1 cm. Find the length of each side of the triangle (in cm) :

A two digit number is such that the product of it's digits is 12. When 9 is added to the number, the digits interchange their places, find the number :

A plane left 40 minutes late due to bad weather and in order to reach it's destination, 1600 km away in time,it had to increase it's speed by 400 km/h from it's usual speed. Find the usual speed of the plane :

The sum of the squares of two consecutive positive odd numbers is 290. Find the sum of the numbers :

A shopkeeper buys a number of books for Rs. 80. If he had bought 4 more for the same amount, each book would have cost Re. 1 less. How many books did he buy?

Two squares have sides x cm and (x + 4) cm. The sum of their areas is 656 cm². Find the sides of the square.

The real values of a for which the quadratic equation 2x² – (a³ + 8a – 1) x + a² – 4a = 0 possesses roots of opposite signs are given by :

The number of real solutions of the equation is :

If the equation (3x)² + (27 × 3^1/k  – 15) x + 4 = 0 has equal roots, then k =

If x = 

Equation ax² + 2x + 1 has one double root if :

Solve for x : (x + 2) (x – 5) (x – 6) (x + 1) = 144 :