Find the integration of sinx cosx dx- - Maths Q - A

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Standard XII

Mathematics

Integration of Trigonometric Functions

Find the inte...

Question

Find the integration of $\sin x \cos x d x$ .

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Solution

Find the integration of the given function
Given function: $\sin x \cos x$
Let $u = \sin x$
By differentiating the both sides we get,
$d u = \cos x d x$
Now, by substituting these values in $\int \sin x \cos x d x$ , we get,
$\int \sin x \cos x d x = \int u d u$
$= \frac{u^{2}}{2} + C$ , where $C$ is the integration constant.
$= \frac{\sin^{2} x}{2} + C [∵ u = s i n x]$
Hence, the integration of $\sin x \cos x d x$ is $\frac{\sin^{2} x}{2} + C$ , where $C$ is the integration constant.

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Find the integration of sinxcosxdx.

Find the integration of $\sin x \cos x d x$ .