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