Strategy: Use Integration by Parts.
ln(x) dx
set
u = ln(x), dv = dx
then we find
du = (1/x) dx, v = x
substitute
ln(x) dx = u dv
and use integration by parts
= uv -v du
substitute u=ln(x), v=x, and du=(1/x)dx
= ln(x) x -x (1/x) dx
= ln(x) x -dx
= ln(x) x - x + C
= x ln(x) - x + C.
ln(x) dxset
u = ln(x), dv = dx
then we find
du = (1/x) dx, v = x
substitute
ln(x) dx = u dvand use integration by parts
= uv -
v dusubstitute u=ln(x), v=x, and du=(1/x)dx
= ln(x) x -
x (1/x) dx= ln(x) x -
dx= ln(x) x - x + C
= x ln(x) - x + C.
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