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JEE Mathematics 2026 Question with Solution

Number of solutions of 3cos2θ+8cosθ+33=0,θ[3π,2π]\sqrt{3} \cos 2\theta + 8 \cos \theta + 3\sqrt{3} = 0, \theta \in [-3\pi, 2\pi] is:

  • A

    44

  • B

    00

  • C

    33

  • D

    55

Answer

Correct answer:D

Step-by-step solution

Standard Method

Given: 3cos2θ+8cosθ+33=0\sqrt{3} \cos 2\theta + 8 \cos \theta + 3\sqrt{3} = 0 with θ[3π,2π]\theta \in [-3\pi, 2\pi].

Find: The number of solutions in the given interval.

Use the identity

cos2θ=2cos2θ1\cos 2\theta = 2\cos^2 \theta - 1

Substituting into the equation,

3(2cos2θ1)+8cosθ+33=0\sqrt{3}(2\cos^2 \theta - 1) + 8\cos \theta + 3\sqrt{3} = 0 23cos2θ+8cosθ+23=02\sqrt{3}\cos^2 \theta + 8\cos \theta + 2\sqrt{3} = 0

Dividing by 22,

3cos2θ+4cosθ+3=0\sqrt{3}\cos^2 \theta + 4\cos \theta + \sqrt{3} = 0

Now solve this quadratic in cosθ\cos \theta:

cosθ=4±161223=4±223\cos \theta = \frac{-4 \pm \sqrt{16 - 12}}{2\sqrt{3}} = \frac{-4 \pm 2}{2\sqrt{3}}

So the roots are

cosθ=13andcosθ=3\cos \theta = -\frac{1}{\sqrt{3}} \quad \text{and} \quad \cos \theta = -\sqrt{3}

Since 3>1|-\sqrt{3}| > 1, this value is not possible for cosine, so it is rejected.

Thus we only need to count solutions of

cosθ=13\cos \theta = -\frac{1}{\sqrt{3}}

In each complete interval of length 2π2\pi, this has exactly 22 solutions because the cosine value lies strictly between 1-1 and 11.

Now count in [3π,2π][-3\pi, 2\pi]:

  1. In [3π,π][-3\pi, -\pi]: 22 solutions.
  2. In [π,π][-\pi, \pi]: 22 solutions.
  3. In [π,2π][\pi, 2\pi]: 11 solution.

Therefore, the total number of solutions is 55.

The correct option is D.

Period-wise Counting

Given: cosθ=13\cos \theta = -\frac{1}{\sqrt{3}} after simplification.

Find: How many values of θ\theta lie in [3π,2π][-3\pi, 2\pi].

Because 13<1\left|-\frac{1}{\sqrt{3}}\right| < 1, the equation cosθ=k\cos \theta = k gives exactly 22 solutions in every full period of length 2π2\pi.

The interval [3π,2π][-3\pi, 2\pi] consists of two full periods,

[3π,π]and[π,π][-3\pi, -\pi] \quad \text{and} \quad [-\pi, \pi]

contributing 2+2=42 + 2 = 4 solutions, and one extra half-period,

[π,2π][\pi, 2\pi]

which contributes 11 more solution.

Hence the total number of solutions is 55, so the correct option is D.

Common mistakes

  • Rejecting both roots of the quadratic in cosθ\cos \theta is incorrect. Only cosθ=3\cos \theta = -\sqrt{3} must be rejected because cosine cannot lie outside [1,1][-1,1]. Keep the valid root cosθ=13\cos \theta = -\frac{1}{\sqrt{3}}.

  • Counting solutions by dividing the interval carelessly into overlapping parts can lead to double counting. Use disjoint subintervals exactly as given and count solutions separately in each one.

  • Assuming every subinterval contributes 22 solutions is wrong. The last interval [π,2π][\pi, 2\pi] has length π\pi, not 2π2\pi, so it contributes only 11 solution for this cosine value.

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