Use the product to sum identities

Apply a double angle identity for sine

Directly integrate using standard formulas

Use partial fraction decomposition

Simplifying the denominator

Isolating a single trigonometric factor

Using integration by parts

Applying the chain rule

Odd powers of sine or cosine

Even powers of sine and cosine

Products of secants and tangents

Integrals with no trigonometric functions

Use the Pythagorean identity to express sine in terms of cosine

Use partial fraction decomposition

Directly integrate using standard formulas

Apply the product to sum identities

Use partial fraction decomposition

Apply the chain rule

Use the product to sum identities

Multiply by the conjugate

It changes the integral into a product of secants and tangents

It complicates the integral further

It simplifies the integral into a standard form

It has no effect on the integral

Integrate term-by-term

Apply the chain rule

Use partial fraction decomposition

Perform a U-substitution