What is the integral of (\cos x)^2?

Zerrilloh6

Zerrilloh6

Answered question

2021-12-16

What is the integral of (cosx)2?

Answer & Explanation

sirpsta3u

sirpsta3u

Beginner2021-12-17Added 42 answers

Explanation:
We will use the cosine double-angle identity in order to rewrite cos2x. (Note that cos2x=(cosx)2, they are different ways of writing the same thing.)
cos(2x)=2cos2x1
This can be solved for cos2x:
cos2x=cos(2x)+12
Thus,
cos2xdx=cos(2x)+12dx
Split up the integral:
=12cos(2x)dx+12dx
The second integral is the "perfect integral:" dx=x+C
=12cos(2x)dx+12x
The constant of integration will be added upon evaluating the remaining integral.
For the cosine integral, use substitution. Let u=2x, implying that du=2dx
Multiply the integrand 2 and the exterioe of the integral by 12.
=142cos(2x)dx+12x
Substiute in u and du:
=14cos(u)du+12x
Note that cos(u)dusin(u)+C
=14sin(u)+12x+C
Since u=2x:
=14sin(2x)+12x+C
Note that this can be many different ways, since sin(2x)=2sinxcosx.
einfachmoipf

einfachmoipf

Beginner2021-12-18Added 32 answers

Use the half angle formula to write cos2(x) as 1+cos(2x)2
1+cos(2x)2dx
Since 1/2 is constant with respect to x, take out 1/2 of the integral.
121+cos(2x)dx
We expand the integral into several integrals.
121dx+cos(2x)dx
Since 1 is constant with respect to x, move 1 out of the integral.
12(x+C+cos(2x)dx)
Let be u=2x. Then du=2dx, hence 12du=dx. Rewrite using u and du.
Combine cos(u) and 12.
12x+C+cos(u)2du
Insofar as 12 is constant with repect to u, take out 12 from the integral.
12(x+C+12cos(u)du)
12x+12sin(2x)+C
So,
12x+14sin(2x)+C
RizerMix

RizerMix

Expert2021-12-29Added 656 answers

It's so simple, cool

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