Recurrence Relations and Integration Techniques

The variable of integration

The limits of integration

The presence of an x^2 term in one integral

The power of the cosine function

Because the cosine function is always positive

Because the integrals are over a positive domain and involve even powers

Because they are evaluated from 0 to 2π

Because they are definite integrals

Differentiation

Integration by parts

Substitution

Partial fraction decomposition

x^2

sin(x)

cos^(2n-1)(x)

cos^2n(x)

Pythagorean identity

Half-angle identity

Double angle identity

Sum-to-product identity

They cancel each other out

They simplify to zero

They become undefined

They result in a constant

Re-evaluating the integral

Changing the limits of integration

Simplifying the algebraic expression

Substituting back into the original equation

It is ignored

It is factored out of the integral

It is added to both sides

It is divided by the integral

To check for errors

To solve for a specific term

To eliminate the variable

To simplify the expression

A relationship between a_n and a_n-1

A solution to the integral

A new integral to evaluate

A constant value