Question

How to evaluate the Trigonometric Integrals : ∫ sin^2(1/3 θ) dθ , the upper limit is 2π and the lower limit is 0 ?

Answer 1

Use the power reducing formula.

Explanation:

From `cos(2t) = 1-2sin^2t`, we get `sin^2t = 1/2(1-cos(2t))`.

`int sin^2t dt = 1/2 int (1-cos(2t)) dt`, which is straightforward to integrat by substitution.

In this question, `t = 1/3theta`, so we get

`int sin^2(1/3theta) d theta = 1/2 int (1-cos(2/3theta)) d theta`.

Integrate `1 d theta`, then `cos(2/3theta) d theta` by subsitution.

Note

We didn't need it here, but. also from `cos(2t) = 2cos^2t-1`, we get the power reduction for cosine.

`cos^2t = 1/2(cos(2t)-1)`