MCQMediumJEE 2025Nature of Roots & Formation of Equations

JEE Mathematics 2025 Question with Solution

Let the set of all values of pRp \in \mathbb{R}, for which both the roots of the equation x2(p+2)x+(2p+9)=0x^2 - (p + 2)x + (2p + 9) = 0 are negative real numbers, be the interval (α,β)(\alpha, \beta). Then β2α\beta - 2\alpha is equal to:

  • A

    00

  • B

    99

  • C

    55

  • D

    2020

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: The quadratic equation is x2(p+2)x+(2p+9)=0x^2 - (p + 2)x + (2p + 9) = 0.

Find: The value of β2α\beta - 2\alpha when both roots are negative real numbers and the set of such values of pp is (α,β)(\alpha, \beta).

For both roots to be negative real numbers, we use the conditions on sum, product, and discriminant.

  1. Sum of roots:
α1+α2=p+2\alpha_1 + \alpha_2 = p + 2

For both roots to be negative,

p+2<0p + 2 < 0

So,

p<2p < -2
  1. Product of roots:
α1α2=2p+9\alpha_1 \alpha_2 = 2p + 9

For both roots to be negative, their product must be positive.

2p+9>02p + 9 > 0

So,

p>92p > -\frac{9}{2}
  1. Discriminant condition for real roots:
D=(p+2)24(2p+9)0D = (p + 2)^2 - 4(2p + 9) \ge 0 p2+4p+48p360p^2 + 4p + 4 - 8p - 36 \ge 0 p24p320p^2 - 4p - 32 \ge 0 (p8)(p+4)0(p - 8)(p + 4) \ge 0

Hence,

p(,4][8,)p \in (-\infty, -4] \cup [8, \infty)

Combining all conditions:

p<2,p>92,p(,4][8,)p < -2, \quad p > -\frac{9}{2}, \quad p \in (-\infty, -4] \cup [8, \infty)

We get,

p[92,4]p \in \left[-\frac{9}{2}, -4\right]

Thus,

α=92,β=4\alpha = -\frac{9}{2}, \quad \beta = -4

Now,

β2α=42(92)\beta - 2\alpha = -4 - 2\left(-\frac{9}{2}\right) =4+9=5= -4 + 9 = 5

Therefore, β2α=5\beta - 2\alpha = 5 and the correct option is C.](streamdown:incomplete-link)

Common mistakes

  • Using only the discriminant condition is incorrect. D0D \ge 0 ensures the roots are real, but it does not ensure that both roots are negative. Also check the sum and product of roots.

  • Taking p+2>0p + 2 > 0 for negative roots is wrong. Since the sum of two negative numbers must be negative, the correct condition is p+2<0p + 2 < 0.

  • Ignoring the product condition leads to incomplete reasoning. For two negative roots, the product must be positive, so 2p+9>02p + 9 > 0 must also be satisfied.

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