Calculus Examples

Popular Problems
Calculus
Find the Integral cos(2x)
cos(2x)
Step 1
Let u=2x. Then du=2dx, so 12du=dx. Rewrite using u and du.
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Step 1.1
Let u=2x. Find dudx.
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Step 1.1.1
Differentiate 2x.
ddx[2x]
Step 1.1.2
Since 2 is constant with respect to x, the derivative of 2x with respect to x is 2ddx[x].
2ddx[x]
Step 1.1.3
Differentiate using the Power Rule which states that ddx[xn] is nxn-1 where n=1.
21
Step 1.1.4
Multiply 2 by 1.
2
2
Step 1.2
Rewrite the problem using u and du.
cos(u)12du
cos(u)12du
Step 2
Combine cos(u) and 12.
cos(u)2du
Step 3
Since 12 is constant with respect to u, move 12 out of the integral.
12cos(u)du
Step 4
The integral of cos(u) with respect to u is sin(u).
12(sin(u)+C)
Step 5
Simplify.
12sin(u)+C
Step 6
Replace all occurrences of u with 2x.
12sin(2x)+C
cos2x
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