`inte^(x)((x-1))/(x^(2))dx` is equal to

int e^(x)""((x-1)/(x^(2)))dx is equal to

int(e^(x)(x-1)(x-lnx))/(x^(2))dx is equal to

int e^(x)((x-2)/((x-1)^(2)))dx is equal to (i) (e^(x))/(x-1)+C (ii) (e^(x))/((x-1)^(2))+C( iii) (2e^(x))/((x-1)^(2))+C( iv )(e^(x)-1)/(x-1)+C

inte^(x)((x-1)(x-logx))/(x^(2))dx is equal to

int(x^(3)+x+1)/(x^(2)-1)dx is equal to f(x) and f(0)=4 then constant term in f(x) is equal to

int(x e^(x))/((1+x)^(2)) dx is equal to

int(x)/((x^(2)+1)(x^(2)+2))dx is equal to

int("In"((x-1)/(x+1)))/(x^(2)-1)dx is equal to

int(x^(2))/(x(x^(2)-1))dx is equal to

int(x^(4)+x+1)/(x^(2)-x+1)dx is equal to