JEE Maths DPP Location of Roots in Quadratic Equations

JEE Maths DPP – Location of Roots

SEO Keywords: Location of roots, Quadratic inequalities, Interval of roots, Vertex of parabola, JEE Advanced Maths, Parameter range

DPP Reference Key: QE-LOC-22-006

Part I: Multiple Choice Questions (Q1–Q13)

Question 1: The values of $a$ for which both roots of the equation $x^2 – ax + 1 = 0$ are less than 2 is:

Answer:

(a) $(- \infty, 2]$
(b) $[2, 5/2)$
(c) $(-\infty, -2] \cup [2, 5/2)$
(d) $(-2, 2)$

Question 2: If both roots of the equation $x^2 – 6ax + 2 – 2a + 9a^2 = 0$ are greater than 3, then $a$ lies in the interval:

Answer:

(a) $(11/9, \infty)$
(b) $(-\infty, 1)$
(c) $(1, \infty)$
(d) $(9/11, \infty)$

Question 3: If the roots of $x^2 – 2kx + k^2 + k – 5 = 0$ are less than 5, then $k$ lies in the interval:

Answer:

(a) $(-\infty, 4)$
(b) $(-\infty, 5]$
(c) $(4, 5]$
(d) $(-\infty, 2)$

Question 4: The value of $k$ for which one root of the equation $x^2 – (k+1)x + k^2 + k – 8 = 0$ is greater than 2 and the other is less than 2 is:

Answer:

(a) $k \in (-2, 3)$
(b) $k \in (-3, 2)$
(c) $k \in (2, \infty)$
(d) $k \in (-\infty, -2)$

Question 5: If $\alpha, \beta$ are the roots of $x^2 – 2ax + a^2 + a – 3 = 0$, then the values of $a$ for which $\alpha < 3 < \beta$ are:

Answer:

(a) $a < 2$
(b) $a > 3$
(c) $2 < a < 3$
(d) $a \in \emptyset$

Question 6: For the roots of $x^2 – (m-3)x + m = 0$ to be such that one root is smaller than 2 and the other root is greater than 2, $m$ must satisfy:

Answer:

(a) $m > 10$
(b) $m < 10$
(c) $m = 10$
(d) $m < 0$

Question 7: If both roots of the equation $x^2 + x + a = 0$ exceed $a$, then:

Answer:

(a) $a > 0$
(b) $a < -2$
(c) $a = -2$
(d) $a < -1$

Question 8: The set of values of $a$ for which both roots of $x^2 – 2ax + a^2 – 1 = 0$ lie in the interval $(-2, 4)$ is:

Answer:

(a) $(-1, 3)$
(b) $(1, 3)$
(c) $(-3, 1)$
(d) $(-2, 4)$

Question 9: If 2 and 3 lie between the roots of the equation $2x^2 – 2(m+n)x + mn = 0$, then:

Answer:

(a) $mn < 0$
(b) $m > 6, n > 6$
(c) $m < 2, n > 3$
(d) Information insufficient

Question 10: If the equation $x^2 – (k-1)x + (k+1) = 0$ has two roots between -1 and 3, then:

Answer:

(a) $k \in [-\infty, 1)$
(b) $k \in (-1, 15/4]$
(c) $k \in (1, \infty)$
(d) $k \in \emptyset$

Question 11: If $a < 0$, then both roots of the equation $x^2 - 2ax + a^2 - 1 = 0$ are:

Answer:

(a) Greater than $a-1$
(b) Less than $a+1$
(c) Both (a) and (b)
(d) None of these

Question 12: The values of $p$ for which the equation $x^2 – 2px + p^2 – 1 = 0$ has roots in the interval $(-1, 1)$ is:

Answer:

(a) $p \in (0, 1)$
(b) $p = 0$
(c) $p \in (-1, 1)$
(d) No such $p$ exists

Question 13: If the roots of the equation $x^2 – 2mx + m^2 – 1 = 0$ lie in the interval $(-2, 4)$, then $m$ belongs to:

Answer:

(a) $(-1, 3)$
(b) $(-3, 5)$
(c) $(1, 3)$
(d) $(-1, 1)$

Part II: Subjective (Q14–Q15)

Question 14: Find all the values of the parameter $a$ for which the quadratic equation $(a+1)x^2 – 3ax + 4a = 0$ has at least one root greater than 1.

Answer:

[Enter solution here]

Question 15: Determine the range of $k$ for which both roots of the equation $x^2 – 2kx + k^2 – 1 = 0$ lie between -2 and 4.

Answer:

[Enter solution here]

Part III: Integer Answer Type (Q16–Q20)

Question 16: Find the number of integral values of $m$ for which exactly one root of $x^2 – (m+1)x + m^2 + m – 8 = 0$ lies in $(1, 2)$.

Answer:

Question 17: If both roots of $x^2 – kx + 4 = 0$ are real and distinct and lie in $(1, 5)$, find the number of possible integral values of $k$.

Answer:

Question 18: If the roots of $x^2 – 4x + a = 0$ are real and at least one root is greater than 3, find the maximum integer value of $a$.

Answer:

Question 19: If roots of $x^2 – 2mx + m^2 – 1 = 0$ are $\alpha, \beta$ and $-2 < \alpha < \beta < 4$, find the number of integers in the range of $m$.

Answer:

Question 20: If $f(x) = x^2 + 2(k-1)x + k+5 = 0$ has roots of opposite signs, find the largest negative integer value of $k$.

Answer:

Part IV: Assertion Reason (Q21–Q22)

Question 21:

Assertion: If $f(k_1) \cdot f(k_2) < 0$ for a quadratic $f(x)$, then exactly one root lies in $(k_1, k_2)$.

Reason: For any continuous function, if the signs at the endpoints of an interval are different, there is at least one root in that interval.

Answer:

(a) Both A and R are true and R is the correct explanation of A.
(b) Both A and R are true but R is not the correct explanation of A.
(c) A is true but R is false.
(d) A is false but R is true.

Question 22:

Assertion: The roots of $x^2 – 2ax + a^2 = 0$ are always equal and equal to $a$.

Reason: If the discriminant of a quadratic equation is zero, the roots are $x = -b/2a$.

Answer:

(a) Both A and R are true and R is the correct explanation of A.
(b) Both A and R are true but R is not the correct explanation of A.
(c) A is true but R is false.
(d) A is false but R is true.

Answer Key

Question	Answer	Question	Answer
Q1	C	Q2	A
Q3	A	Q4	B
Q5	D	Q6	B
Q7	B	Q8	A
Q9	D	Q10	D
Q11	C	Q12	B
Q13	A	Q14	See Sol
Q15	See Sol	Q16	0
Q17	0	Q18	3
Q19	3	Q20	-6
Q21	A	Q22	A