Since powers of decrease when you take the derivative, let
u = x2 so du = 2xdx
dv = exx dx so v = exx
∫ u dv = uv = ∫ v du
= x2ex - ∫2xex dx
Now let u = x so du = dx
dv = exdx so v = ex
∫2xex dx = xex - ∫ex dx = xex - ex
So, ∫x2ex = x2ex - 2(xex - ex)
= ex(x2 - 2x + 2)
Evaluate the indefinite integral:
∫ from 1 to 2 of ln (x²e^x) dx
Thank you for your help!!
2 answers
I see there were some typos. In correct form,
u = x2 so du = 2xdx
dv = ex dx so v = ex
∫ u dv = uv = ∫ v du
= x2ex - ∫2xex dx
Now let u = x so du = dx
dv = exdx so v = ex
∫xex dx = xex - ∫ex dx = xex - ex
So, ∫x2ex = x2ex - 2(xex - ex)
= ex(x2 - 2x + 2)
u = x2 so du = 2xdx
dv = ex dx so v = ex
∫ u dv = uv = ∫ v du
= x2ex - ∫2xex dx
Now let u = x so du = dx
dv = exdx so v = ex
∫xex dx = xex - ∫ex dx = xex - ex
So, ∫x2ex = x2ex - 2(xex - ex)
= ex(x2 - 2x + 2)