They require the use of power reduction formulas.

They cannot be separated into single factors.

They require the use of Pythagorean identities.

They cannot be integrated using standard techniques.

Sine squared of x equals 1 plus cosine of 2x over 2

Sine squared of x equals 1 minus cosine of 2x over 2

Cosine squared of x equals 1 plus sine of 2x over 2

Sine squared of x equals cosine squared of x

x over 2 plus sine of 2x over 4 plus c

x over 2 minus sine of 2x over 4 plus c

x over 2 minus cosine of 2x over 4 plus c

x over 2 plus cosine of 2x over 4 plus c

To halve the argument for sine

To double the argument for cosine

To simplify the integration process

To ensure the argument matches the original function

x over 2 minus sine of 6x over 12 plus c

x over 2 plus sine of 6x over 12 plus c

x over 2 minus cosine of 6x over 12 plus c

x over 2 plus cosine of 6x over 12 plus c

Pythagorean Identity

Double-Angle Identity

Half-Angle Identity

Sum-to-Product Identity

Use Pythagorean identities repeatedly

Use standard integration techniques

Convert to odd powers using Half-Angle identities

Separate into single factors