The general solution of the equation sin3x2-cos3x2-cosx-2-sinx3 is

We nbsp;are nbsp;given nbsp;that nbsp;sin3x2 cos3x2=cosx×2+sinx3,Now, nbsp;LHS can nbsp;be nbsp;written nbsp;as nbsp;sin3x2 cos3x2 nbsp;= ...

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General Solution of sin theta = sin alpha

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Question

The general solution of the equation ${sin}^{3} \frac{x}{2} - {cos}^{3} \frac{x}{2} = \frac{cos x \times (2 + sinx)}{3}$ is

2 nπ - \frac{π}{2}, n \in Z .

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2 nπ + \frac{π}{2}, n \in Z .

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2 nπ - \frac{π}{4}, n \in Z .

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2 nπ + \frac{π}{4}, n \in Z .

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{sin}^{3} \frac{x}{2} - {cos}^{3} \frac{x}{2} = \frac{cos x \times (2 + sinx)}{3}

y = \sqrt{(sin x + sin 2 x + sin 3 x)^{2} + (cos x + cos 2 x + cos 3 x)^{2}}

f (x) = \sqrt{{(cos x + cos 2 x + cos 3 x)}^{2} + {(sin x + sin 2 x + sin 3 x)}^{2}}

3^{(\frac{1}{2} + {log}_{3} (cos x + sin x))} - 2^{{log}_{2} (cos x + sin x)} = \sqrt{2}

(sin x - 1)^{3} + (cos x - 1)^{3} + (sin x)^{3} = (2 sin x + cos x - 2)^{3}

[0, 2 π]

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