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JEE Mathematics 2025 Question with Solution

If θ[2π, 2π]\theta \in [-2\pi,\ 2\pi], then the number of solutions of 22cos2θ+(26)cosθ3=02\sqrt{2} \cos^2\theta + (2 - \sqrt{6}) \cos\theta - \sqrt{3} = 0 is:

  • A

    1212

  • B

    66

  • C

    88

  • D

    1010

Answer

Correct answer:C

Step-by-step solution

Standard Method

Given: θ[2π,2π]\theta \in [-2\pi, 2\pi] and

22cos2θ+(26)cosθ3=02\sqrt{2} \cos^2\theta + (2 - \sqrt{6}) \cos\theta - \sqrt{3} = 0

Find: The total number of solutions in the given interval.

Let x=cosθx = \cos\theta. Then the equation becomes

22x2+(26)x3=02\sqrt{2}x^2 + (2 - \sqrt{6})x - \sqrt{3} = 0

Using factorization shown in the solution,

(2x3)(2x+1)=0(2x - \sqrt{3})(\sqrt{2}x + 1) = 0

So,

x=32orx=12x = \frac{\sqrt{3}}{2} \quad \text{or} \quad x = -\frac{1}{\sqrt{2}}

Hence,

cosθ=32orcosθ=12\cos\theta = \frac{\sqrt{3}}{2} \quad \text{or} \quad \cos\theta = -\frac{1}{\sqrt{2}}

For cosθ=32\cos\theta = \frac{\sqrt{3}}{2}, the solutions in [2π,2π][-2\pi, 2\pi] are

θ=±π6, ±11π6\theta = \pm \frac{\pi}{6}, \ \pm \frac{11\pi}{6}

So this case gives 44 solutions.

For cosθ=12\cos\theta = -\frac{1}{\sqrt{2}}, the solutions in [2π,2π][-2\pi, 2\pi] are

θ=±3π4, ±5π4\theta = \pm \frac{3\pi}{4}, \ \pm \frac{5\pi}{4}

So this case also gives 44 solutions.

Therefore, the total number of solutions is

4+4=84 + 4 = 8

So, the correct option is C.

Direct Factorization

Given: The equation is quadratic in cosθ\cos\theta.

Find: The number of values of θ\theta in [2π,2π][-2\pi, 2\pi].

Instead of expanding the quadratic formula, observe that

22x2+(26)x3=(2x3)(2x+1)2\sqrt{2}x^2 + (2 - \sqrt{6})x - \sqrt{3} = (2x - \sqrt{3})(\sqrt{2}x + 1)

with x=cosθx = \cos\theta.

Thus,

cosθ=32orcosθ=12\cos\theta = \frac{\sqrt{3}}{2} \quad \text{or} \quad \cos\theta = -\frac{1}{\sqrt{2}}

Each cosine value gives exactly 44 solutions in the interval [2π,2π][-2\pi, 2\pi].

Hence total number of solutions is

88

Therefore, the correct option is C.

Common mistakes

  • Treating the interval [2π,2π][-2\pi, 2\pi] as only [0,2π][0, 2\pi]. This misses the negative-angle solutions. Always count solutions on the entire given interval.

  • Finding the correct values of cosθ\cos\theta but giving only two principal angles. For a trigonometric equation, all angles in the specified interval must be listed before counting.

  • Making an algebraic error while solving the quadratic in x=cosθx = \cos\theta. Rewrite it carefully as a quadratic in one variable and factorize or apply the quadratic formula correctly.

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