To integrate polynomial functions

To solve exponential equations

To simplify logarithmic functions

To reduce the power of trigonometric functions

Sine x

Cosine x

Sine x raised to a power

A constant

By eliminating the need for integration

By reducing the degree of the polynomial

By converting sine to cosine

By expressing cosine squared in terms of sine squared

It becomes zero

It is replaced by one

It is expressed as one minus sine squared

It remains unchanged

It involves two different trigonometric functions

It requires two integration techniques

It reduces the power by two steps

It is solved in two separate equations

It utilizes straightforward trigonometric identities

It simplifies the process for polynomial integrals

It avoids the complexity of trigonometric identities

It can be applied to a wider range of functions

Applying the logarithmic rule

Using the sine identity

Pulling out two tan x

Pulling out one tan x