Asked by Natalie
In the exercise we want to use a substitution to integrate integral xsqrt(x+1)dx.
Find the substitution u to transform the integral into integral(u-1)u^(1/2)du. u=?
Find the substitution u to transform the integral into integral(u-1)u^(1/2)du. u=?
Answers
Answered by
Arora
If you take u = x + 1
Then, x + 1 = u => sqrt(x+1) = sqrt(u) = u^(1/2)
Then, x = (u - 1)
And, du/dx = 1 => du = dx
So,
x*sqrt(x+1)*dx
Becomes
(u-1)*sqrt(u)*du = (u-1)u^(1/2)du
With the substitution u = x + 1
Then, x + 1 = u => sqrt(x+1) = sqrt(u) = u^(1/2)
Then, x = (u - 1)
And, du/dx = 1 => du = dx
So,
x*sqrt(x+1)*dx
Becomes
(u-1)*sqrt(u)*du = (u-1)u^(1/2)du
With the substitution u = x + 1
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