Solving the Integral of csc^2(x): A Step-by-Step Guide

∫csc²xdx

To find the integral of csc^2(x)dx, we can use a trigonometric identity to simplify the expression

To find the integral of csc^2(x)dx, we can use a trigonometric identity to simplify the expression.

The trigonometric identity we will use is:

1 + cot^2(x) = csc^2(x)

Rearranging this identity, we get:

cot^2(x) = csc^2(x) – 1

Now, let’s rewrite the integral using this identity:

∫csc^2(x)dx = ∫(csc^2(x) – 1)dx

The first term ∫csc^2(x)dx can be easily found. It is equal to -cot(x):

∫csc^2(x)dx = -cot(x) + C

Where C is the constant of integration.

Therefore, the integral of csc^2(x)dx is -cot(x) + C.

More Answers:

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The Power Rule and Partial Fractions Method: Integrating ∫sec²xdx

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