To find the equation: \int 2x\cos (3x)dx

Chardonnay Felix

Chardonnay Felix

Answered question

2021-02-09

To find the equation: 2xcos(3x)dx

Answer & Explanation

Ayesha Gomez

Ayesha Gomez

Skilled2021-02-10Added 104 answers

We have to find the value of the integral
2xcos(3x)dx
Note that
2xcos(3x)dx=2xcos(3x)dx
Substitute u=3x. Then we have du=3dx
=2(ucos(u)9)du [x=u3anddx=du3]
=219ucos(u)du
Recall: (Intergation By parts) f(x)g(x)dx=f(x)g(x)dx((dfdx)g(x)dx)dx
[Apply Integration By Parts: f(u)=u,g(u)=cos(u)

=219(usin(u)sin(u)du)

=219(usin(u)(cos(u)))

=219(3xsin(3x)+(cos(3x)))

=29(3xsin(3x)+cos(3x))+C.
Hence the final answer
2xcos(3x)dx=29(3xsin(3x)+cos(3x))+C

Do you have a similar question?

Recalculate according to your conditions!

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?