Question 14

MATRIX MATCHHARD

Match each entry in List-I to the correct entry in List-II and choose the correct option.

List - I

P

The number of elements in the set {x∈[βˆ’Ο€,Ο€]:sin⁑6x+cos⁑4x=1}\{x \in [-\pi, \pi] : \sin^6 x + \cos^4 x = 1\}

Q

The number of elements in the set {x∈[βˆ’Ο€2,Ο€2]:sin⁑2x+cos⁑6x=1}\{x \in [-\frac{\pi}{2}, \frac{\pi}{2}] : \sin^2 x + \cos^6 x = 1\}

R

The number of elements in the set {x∈[βˆ’Ο€,Ο€]:cos⁑2(x2)βˆ’sin⁑2x=12}\{x \in [-\pi, \pi] : \cos^2 (\frac{x}{2}) - \sin^2 x = \frac{1}{2} \}

S

The number of elements in the set {x∈[βˆ’2Ο€,2Ο€]:6sin⁑2(x2)βˆ’cos⁑3x=3}\{x \in [-2\pi, 2\pi] : 6 \sin^2 (\frac{x}{2}) - \cos 3x = 3\}

List-II

1

is 1

2

is 2

3

is 3

4

is 4

5

is 5

(A)

P-2, Q-5, R-3, S-4

(B)

P-5, Q-3, R-2, S-4

(C)

P-5, Q-4, R-1, S-3

(D)

P-4, Q-3, R-2, S-5

Detailed Solution

Step-by-step evaluation of List-I:

(P) sin⁑6x+cos⁑4x=1\sin^6 x + \cos^4 x = 1 in [βˆ’Ο€,Ο€][-\pi, \pi] Since sin⁑6x≀sin⁑2x\sin^6 x \le \sin^2 x and cos⁑4x≀cos⁑2x\cos^4 x \le \cos^2 x, then sin⁑6x+cos⁑4x≀sin⁑2x+cos⁑2x=1\sin^6 x + \cos^4 x \le \sin^2 x + \cos^2 x = 1. Equality holds when (sin⁑2x=0Β andΒ cos⁑2x=1)(\sin^2 x = 0 \text{ and } \cos^2 x = 1) or (sin⁑2x=1Β andΒ cos⁑2x=0)(\sin^2 x = 1 \text{ and } \cos^2 x = 0). For x∈[βˆ’Ο€,Ο€]x \in [-\pi, \pi], x∈{0,Ο€,βˆ’Ο€,Ο€/2,βˆ’Ο€/2}x \in \{0, \pi, -\pi, \pi/2, -\pi/2\}. Total = 5 elements. So, P β†’\rightarrow 5.

(Q) sin⁑2x+cos⁑6x=1\sin^2 x + \cos^6 x = 1 in [βˆ’Ο€/2,Ο€/2][-\pi/2, \pi/2] Similarly, equality holds when (sin⁑2x=0Β andΒ cos⁑2x=1)(\sin^2 x = 0 \text{ and } \cos^2 x = 1) or (sin⁑2x=1Β andΒ cos⁑2x=0)(\sin^2 x = 1 \text{ and } \cos^2 x = 0). For x∈[βˆ’Ο€/2,Ο€/2]x \in [-\pi/2, \pi/2], x∈{0,Ο€/2,βˆ’Ο€/2}x \in \{0, \pi/2, -\pi/2\}. Total = 3 elements. So, Q β†’\rightarrow 3.

(R) cos⁑2(x/2)βˆ’sin⁑2x=1/2\cos^2(x/2) - \sin^2 x = 1/2 in [βˆ’Ο€,Ο€][-\pi, \pi] 1+cos⁑x2βˆ’(1βˆ’cos⁑2x)=1/2β€…β€ŠβŸΉβ€…β€Š1+cos⁑xβˆ’2+2cos⁑2x=1β€…β€ŠβŸΉβ€…β€Š2cos⁑2x+cos⁑xβˆ’2=0\frac{1 + \cos x}{2} - (1 - \cos^2 x) = 1/2 \implies 1 + \cos x - 2 + 2\cos^2 x = 1 \implies 2\cos^2 x + \cos x - 2 = 0. cos⁑x=βˆ’1Β±174\cos x = \frac{-1 \pm \sqrt{17}}{4}. Only cos⁑x=βˆ’1+174β‰ˆ0.78\cos x = \frac{-1 + \sqrt{17}}{4} \approx 0.78 is possible. This gives 2 values in [βˆ’Ο€,Ο€][-\pi, \pi]. So, R β†’\rightarrow 2.

(S) 6sin⁑2(x/2)βˆ’cos⁑3x=36\sin^2(x/2) - \cos 3x = 3 in [βˆ’2Ο€,2Ο€][-2\pi, 2\pi] 3(1βˆ’cos⁑x)βˆ’cos⁑3x=3β€…β€ŠβŸΉβ€…β€Š3βˆ’3cos⁑xβˆ’(4cos⁑3xβˆ’3cos⁑x)=3β€…β€ŠβŸΉβ€…β€Šβˆ’4cos⁑3x=0β€…β€ŠβŸΉβ€…β€Šcos⁑x=03(1 - \cos x) - \cos 3x = 3 \implies 3 - 3\cos x - (4\cos^3 x - 3\cos x) = 3 \implies -4\cos^3 x = 0 \implies \cos x = 0. x∈{βˆ’3Ο€2,βˆ’Ο€2,Ο€2,3Ο€2}x \in \{-\frac{3\pi}{2}, -\frac{\pi}{2}, \frac{\pi}{2}, \frac{3\pi}{2}\}. Total = 4 elements. So, S β†’\rightarrow 4.

Matching: P-5, Q-3, R-2, S-4. Correct Option: B

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