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Evaluate the integral:

{eq}\displaystyle \int \dfrac {4 \sin x \cos x} {\sin 2x \cos 2x}\ dx {/eq}.

Question:

Evaluate the integral:

{eq}\displaystyle \int \dfrac {4 \sin x \cos x} {\sin 2x \cos 2x}\ dx {/eq}.

Indefinite Integral:

The indefinite integral is the type of integral in which the limits are undefined. The solution of the given indefinite integral can be obtained by using the trigonometric identities.

Answer and Explanation: 1

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The given integral is:

{eq}\displaystyle \int \dfrac{4 \sin x \cos x}{\sin 2x \cos 2x} \, dx {/eq}

Using the identity:

{eq}\sin 2A = 2\sin A \cos...

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Indefinite Integral: Definition, Rules & Examples

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Chapter 7 / Lesson 14
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Learn the concept and rules of indefinite and definite integrals, as well as how to find an indefinite integral through examples. View a table of integrals.


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