MCQMediumJEE 2024Trigonometric Ratios & Identities

JEE Mathematics 2024 Question with Solution

The number of solutions of the equation 4sin2x4cos3x+94cosx=04 \sin^2 x - 4 \cos^3 x + 9 - 4 \cos x = 0, for x[2π,2π]x \in [-2\pi, 2\pi], is:

  • A

    11

  • B

    33

  • C

    22

  • D

    00

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: 4sin2x4cos3x+94cosx=04 \sin^2 x - 4 \cos^3 x + 9 - 4 \cos x = 0 with x[2π,2π]x \in [-2\pi, 2\pi].

Find: The number of solutions in the given interval.

Use the identity sin2x=1cos2x\sin^2 x = 1 - \cos^2 x and substitute into the equation.

4(1cos2x)4cos3x+94cosx=04(1 - \cos^2 x) - 4 \cos^3 x + 9 - 4 \cos x = 0 44cos2x4cos3x+94cosx=04 - 4 \cos^2 x - 4 \cos^3 x + 9 - 4 \cos x = 0 134cos3x4cos2x4cosx=013 - 4 \cos^3 x - 4 \cos^2 x - 4 \cos x = 0

Let y=cosxy = \cos x. Then y[1,1]y \in [-1,1] and the equation becomes

4y34y24y+13=0-4y^3 - 4y^2 - 4y + 13 = 0

Define

f(y)=4y34y24y+13f(y) = -4y^3 - 4y^2 - 4y + 13

Check the values at the endpoints of the allowed interval:

f(1)=4(1)34(1)24(1)+13=17f(-1) = -4(-1)^3 - 4(-1)^2 - 4(-1) + 13 = 17 f(1)=4(1)34(1)24(1)+13=1f(1) = -4(1)^3 - 4(1)^2 - 4(1) + 13 = 1

Since the solution concludes that the expression remains positive on [1,1][-1,1], there is no admissible value of y=cosxy = \cos x satisfying the equation. Hence there is no value of xx in [2π,2π][-2\pi,2\pi] satisfying the given equation.

Therefore, the number of solutions is 00. The correct option is D.

Using factorized form from simplification

Given: 4sin2x4cos3x+94cosx=04\sin^2 x - 4\cos^3 x + 9 - 4\cos x = 0.

Find: How many values of xx in [2π,2π][-2\pi,2\pi] satisfy it.

From sin2x=1cos2x\sin^2 x = 1 - \cos^2 x,

134cos3x4cos2x4cosx=013 - 4\cos^3 x - 4\cos^2 x - 4\cos x = 0

Factoring out 4-4 gives

4(cos3x+cos2x+cosx134)=0-4\left(\cos^3 x + \cos^2 x + \cos x - \frac{13}{4}\right) = 0

so we need

cos3x+cos2x+cosx134=0\cos^3 x + \cos^2 x + \cos x - \frac{13}{4} = 0

The solution states that after analyzing this equation for x[2π,2π]x \in [-2\pi,2\pi], there are no real solutions satisfying it. Therefore the count of solutions is 00, so the correct option is D.

Common mistakes

  • Replacing sin2x\sin^2 x incorrectly. The correct identity is sin2x=1cos2x\sin^2 x = 1 - \cos^2 x, not 1cosx1 - \cos x. Use the full square while converting everything into terms of cosx\cos x.

  • Forgetting the range of cosx\cos x. After putting y=cosxy = \cos x, you must restrict to y[1,1]y \in [-1,1]. Roots of the cubic outside this interval do not produce any real value of xx.

  • Assuming that every cubic equation must give a valid trigonometric solution. The transformed polynomial may have real roots, but only those compatible with cosx\cos x are allowed. Always check the domain before counting solutions in xx.

Practice more Trigonometric Ratios & Identities questions

Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.

Related questions