Question

What is the integral of `cos(x)/(5+sin^2(x))dx`?

Answer 1

`int \frac{cos x}{5 + sin^2 x}\ d x = \frac{1}{\sqrt{5}} tan^{-1} \frac{sin x}{\sqrt{5}} + C`

Explanation:

The cosine in the enumerator almost urges us to view `sin x` as an inner function (with derivative `cos x`). Therefore we can write the integral as

`[ int \frac{1}{5 + t^2}\ d t ]_{t = sin x} =`

`= [ \frac{1}{5} int \frac{1}{1 + \frac{t^2}{5}}\ d t ]_{t = sin x} =`

`= [ \frac{1}{5} int \frac{1}{1 + ( \frac{t}{\sqrt{5}} )^2}\ d t ]_{t = sin x}`.

By viewing `t / \sqrt{5}` as yet another inner function, with derivative `1 / \sqrt{5}`, this is the same as

`= [ \frac{1}{\sqrt{5}} int \frac{1}{1 + u ^2}\ d u ]_{u = \frac{sin x}{\sqrt{5}}}`.

Now we are pretty much done, however, since the remaining integrand is the derivative of `tan^{-1}`. Therefore, we have

`[ \frac{1}{\sqrt{5}} \tan^{-1} u + C ]_{u = \frac{sin x}{\sqrt{5}}} =`

`= \frac{1}{\sqrt{5}} tan^{-1} \frac{sin x}{\sqrt{5}} + C`.

Answer 2

The answer is `=1/sqrt5arctan(sinx/sqrt5)+C`

Explanation:

We need

`int(dx)/(1+x^2)=arctanx+C`

Perform the substitution

`u=sinx/sqrt5`, `=>`, `du=(cosxdx)/sqrt5`

The integral is

`int(cosxdx)/(5+sin^2x)=1/5int(cosxdx)/(1+(sinx/sqrt5)^2)`

`=sqrt5/5int(du)/(1+u^2)`

`=1/sqrt5*arctanu`

`=1/sqrt5arctan(sinx/sqrt5)+C`