MCQEasyJEE 2026Nature of Roots & Formation of Equations

JEE Mathematics 2026 Question with Solution

Let α\alpha and β\beta be the roots of the equation x2+2ax+(3a+10)=0x^2 + 2ax + (3a + 10) = 0 such that α<1<β\alpha < 1 < \beta. Then the set of all possible values of aa is :

  • A

    (,115)(5,)(-\infty, -\frac{11}{5}) \cup (5, \infty)

  • B

    (,3)(-\infty, -3)

  • C

    (,2)(5,)(-\infty, -2) \cup (5, \infty)

  • D

    (,115)(-\infty, -\frac{11}{5})

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: The quadratic is f(x)=x2+2ax+(3a+10)f(x) = x^2 + 2ax + (3a + 10) and its roots α,β\alpha, \beta satisfy α<1<β\alpha < 1 < \beta.

Find: The set of all possible values of aa.

Since the coefficient of x2x^2 is positive, the parabola opens upward. If 11 lies between the two roots, then the value of the quadratic at x=1x = 1 must be negative.

f(1)<0f(1) < 0

Substituting x=1x = 1:

(1)2+2a(1)+3a+10<0(1)^2 + 2a(1) + 3a + 10 < 01+5a+10<01 + 5a + 10 < 05a+11<05a + 11 < 0a<115a < -\frac{11}{5}

Thus,

a(,115)a \in (-\infty, -\frac{11}{5})

The condition f(1)<0f(1) < 0 for an upward-opening parabola ensures that the roots are real and distinct, so the required condition is satisfied.

Therefore, the correct option is D.

Using the between-roots test

Given: f(x)=x2+2ax+(3a+10)f(x) = x^2 + 2ax + (3a + 10) and α<1<β\alpha < 1 < \beta.

Find: The permissible values of aa.

Use the standard result: if a number kk lies between the roots of a quadratic Ax2+Bx+CAx^2 + Bx + C, then

Af(k)<0A \cdot f(k) < 0

Here A=1>0A = 1 > 0 and k=1k = 1, so we only need

f(1)<0f(1) < 0

Now,

f(1)=1+2a+3a+10=5a+11f(1) = 1 + 2a + 3a + 10 = 5a + 11

Hence,

5a+11<0    a<1155a + 11 < 0 \implies a < -\frac{11}{5}

So the set of all possible values is (,115)(-\infty, -\frac{11}{5}), and the correct option is D.

Common mistakes

  • A common mistake is to check only the discriminant. While D>0D > 0 guarantees real distinct roots, it does not ensure that 11 lies between them. You must use the condition that for an upward-opening parabola, the quadratic is negative between its roots.

  • Another mistake is to substitute incorrectly in f(1)f(1) and write 1+2a+101 + 2a + 10, forgetting the term 3a3a. The correct substitution is f(1)=1+2a+3a+10=5a+11f(1) = 1 + 2a + 3a + 10 = 5a + 11.

  • Some students use the between-roots test as f(1)>0f(1) > 0. This is wrong because the leading coefficient is positive, so the parabola opens upward and values between the roots are negative. Therefore, the correct condition is f(1)<0f(1) < 0.

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