MCQMediumJEE 2026Inverse Trigonometric Functions

JEE Mathematics 2026 Question with Solution

The number of solutions of tan1(4x)+tan1(6x)=π6\tan^{-1}(4x) + \tan^{-1}(6x) = \frac{\pi}{6}, where 126<x<126-\frac{1}{2\sqrt{6}} < x < \frac{1}{2\sqrt{6}}, is equal to

  • A

    11

  • B

    22

  • C

    00

  • D

    33

Answer

Correct answer:A

Step-by-step solution

Standard Method

Given: tan1(4x)+tan1(6x)=π6\tan^{-1}(4x) + \tan^{-1}(6x) = \frac{\pi}{6} with 126<x<126-\frac{1}{2\sqrt{6}} < x < \frac{1}{2\sqrt{6}}.

Find: The number of solutions in the given interval.

First verify the condition for applying the inverse tangent addition formula.

tan1a+tan1b=tan1 ⁣(a+b1ab)\tan^{-1} a + \tan^{-1} b = \tan^{-1}\!\left(\frac{a+b}{1-ab}\right)

This is valid here because

ab=(4x)(6x)=24x2ab = (4x)(6x) = 24x^2

and from 126<x<126-\frac{1}{2\sqrt{6}} < x < \frac{1}{2\sqrt{6}}, we get

24x2<124x^2 < 1

So the formula is applicable.

Now apply the identity:

tan1(4x)+tan1(6x)=tan1 ⁣(4x+6x124x2)=tan1 ⁣(10x124x2)\tan^{-1}(4x) + \tan^{-1}(6x) = \tan^{-1}\!\left(\frac{4x+6x}{1-24x^2}\right) = \tan^{-1}\!\left(\frac{10x}{1-24x^2}\right)

Hence,

tan1 ⁣(10x124x2)=π6\tan^{-1}\!\left(\frac{10x}{1-24x^2}\right) = \frac{\pi}{6}

Taking tangent on both sides,

10x124x2=tan ⁣(π6)=13\frac{10x}{1-24x^2} = \tan\!\left(\frac{\pi}{6}\right) = \frac{1}{\sqrt{3}}

Multiplying through,

103x=124x210\sqrt{3}x = 1 - 24x^2

So,

24x2+103x1=024x^2 + 10\sqrt{3}x - 1 = 0

Now solve the quadratic. Its discriminant is

D=(103)2+96=300+96=396=36×11D = (10\sqrt{3})^2 + 96 = 300 + 96 = 396 = 36 \times 11

Therefore,

x=103±61148x = \frac{-10\sqrt{3} \pm 6\sqrt{11}}{48}

On checking both roots in the interval 126<x<126-\frac{1}{2\sqrt{6}} < x < \frac{1}{2\sqrt{6}}, only one root satisfies the condition.

Therefore, the number of solutions is 11. The correct option is A.

Interval Check of the Roots

Given: The roots are

x=103±61148x = \frac{-10\sqrt{3} \pm 6\sqrt{11}}{48}

with interval

126<x<126-\frac{1}{2\sqrt{6}} < x < \frac{1}{2\sqrt{6}}

Find: How many of these roots lie inside the interval.

After forming the quadratic

24x2+103x1=024x^2 + 10\sqrt{3}x - 1 = 0

we obtain two roots. The solution working states that after checking both against the interval, only one of them lies in the admissible range.

Hence exactly one value of xx satisfies both the equation and the given interval restriction.

Therefore, the number of solutions is 11.

Common mistakes

  • Applying tan1a+tan1b=tan1 ⁣(a+b1ab)\tan^{-1} a + \tan^{-1} b = \tan^{-1}\!\left(\frac{a+b}{1-ab}\right) without checking the condition ab<1ab < 1. This is wrong because the inverse tangent addition formula needs the stated condition in this context. First verify 24x2<124x^2 < 1 from the given interval, then apply the identity.

  • Forgetting to check the roots of the quadratic in the given interval. This is wrong because solving the transformed equation may produce values not allowed by the domain restriction. After finding both roots, test each one against 126<x<126-\frac{1}{2\sqrt{6}} < x < \frac{1}{2\sqrt{6}}.

  • Taking tangent too early on the original equation without first combining the inverse tangent terms correctly. This is wrong because the left side is a sum of inverse trigonometric expressions, not a single tangent. First reduce the sum using the addition formula, then take tangent on both sides.

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