Top CAT Quant Quadratic Equations Questions [Download PDF]

Naveen Neredimalli

305

Jun 05, 2024

Top CAT Quant Quadratic Equations Questions [Download PDF]

Check out the Top Quadratic Equations questions is one of the key topics in the CAT Quant Section (Algebra). The weightage for quadratic equations questions is lower. But these questions will help you boost your score in quant. It is advised to solve the questions that previously appeared in the CAT. To help the aspirants find the quadratic equations questions, we have compiled all the questions that appeared in the previous CAT papers and detailed video solutions explained by CAT experts. Keep practising free CAT mocks where you'll get a fair idea of how questions are asked, and type of questions asked of CAT Quadratic Equation Questions.  You can also download the PDF that contains all these questions with video solutions. And the best part is you can download the PDF for free without signing up.

Question 1

A quadratic function f(x) attains a maximum of 3 at x = 1. The value of the function at x = 0 is 1. What is the value of f (x) at x = 10?


Question 2

If the roots of the equation $$x^3 - ax^2 + bx - c = 0$$ are three consecutive integers, then what is the smallest possible value of b?

[CAT 2008]


Question 3

Let p and q be the roots of the quadratic equation $$x^2 - (\alpha - 2) x - \alpha -1= 0$$ . What is the minimum possible value of $$p^2 + q^2$$?


Question 4

For which value of k does the following pair of equations yield a unique solution for x such that the solution is positive?

$$x^2 - y^2 = 0$$

$$(x-k)^2 + y^2 = 1$$

Show Answer Explanation

Question 5

Ujakar and Keshab attempted to solve a quadratic equation. Ujakar made a mistake in writing down the constant term. He ended up with the roots (4, 3). Keshab made a mistake in writing down the coefficient of x. He got the roots as (3, 2). What will be the exact roots of the original quadratic equation?


Question 6

If the equation $$x^3 - ax^2 + bx - a = 0$$ has three real roots, then it must be the case that,

Show Answer Explanation

Question 7

The number of real roots of the equation $$A^2/x + B^2/(x-1) = 1$$ , where A and B are real numbers not equal to zero simultaneously, is

Show Answer Explanation

Question 8

Davji Shop sells samosas in boxes of different sizes. The samosas are priced at Rs. 2 per samosa up to 200 samosas. For every additional 20 samosas, the price of the whole lot goes down by 10 paise per samosa. What should be the maximum size of the box that would maximise the revenue?

Show Answer Explanation

Question 9

The value of $$\frac{(1-d^3)}{(1-d)}$$ is

Show Answer Explanation

Question 10

The roots of the equation $$ax^{2} + 3x + 6 = 0$$ will be reciprocal to each other if the value of a is

Show Answer Explanation

Question 11

If $$xy + yz + zx = 0$$, then $$(x + y + z)^2$$ equals

Show Answer Explanation

Question 12

Given the quadratic equation $$x^2 - (A - 3)x - (A - 2)$$, for what value of $$A$$ will the sum of the squares of the roots be zero?

Show Answer Explanation

Question 13

If the roots $$x_1$$ and $$x_2$$ are the roots of the quadratic equation $$x^2 -2x+c=0$$ also satisfy the equation $$7x_2 - 4x_1 = 47$$, then which of the following is true?


Question 14

If $$x+1=x^{2}$$ and $$x>0$$, then $$2x^{4}$$  is


Question 15

Consider a function $$f(x) = x^4 + x^3 + x^2 + x + 1$$, where x is a positive integer greater than 1. What will be the remainder if $$f(x^5)$$ is divided by f(x)?

Show Answer Explanation

Question 16

Two different quadratic equations have a common root. Let the three unique roots of the two equations be A, B and C - all of them are positive integers. If (A + B + C) = 41 and the product of the roots of one of the equations is 35, which of the following options is definitely correct?


Question 17

If $$U^{2}+(U-2V-1)^{2}$$= −$$4V(U+V)$$ , then what is the value of $$U+3V$$ ?


Question 18

If a and b are integers such that $$2x^2−ax+2>0$$ and $$x^2−bx+8≥0$$ for all real numbers $$x$$, then the largest possible value of $$2a−6b$$ is


Question 19

Given that a and b are integers and that $$5x+2\sqrt{7}$$ is a root of the polynomial $$x^2 - ax + b + 2\sqrt{7}$$ in $$x$$, what is the value of b?

Show Answer Explanation

Question 20

If $$x^2 + x + 1 = 0$$, then $$x^{2018} + x^{2019}$$ equals which of the following:


Question 21

Let A be a real number. Then the roots of the equation $$x^2 - 4x - log_{2}{A} = 0$$ are real and distinct if and only if


Question 22

The quadratic equation $$x^2 + bx + c = 0$$ has two roots 4a and 3a, where a is an integer. Which of the following is a possible value of $$b^2 + c$$?


Question 23

The product of the distinct roots of $$\mid x^2 - x - 6 \mid = x + 2$$ is


Question 24

The number of solutions to the equation $$\mid x \mid (6x^2 + 1) = 5x^2$$ is


Question 25

How many disticnt positive integer-valued solutions exist to the equation $$(x^{2}-7x+11)^{(x^{2}-13x+42)}=1$$ ?


Question 26

The number of distinct real roots of the equation $$(x+\frac{1}{x})^{2}-3(x+\frac{1}{x})+2=0$$ equals

Related Blogs