The integral of the from `int e^(x) [ phi (x)+phi' (x)]dx` is computed using the substitution-

The integral of the from int sin ^(m) x cos^(n) x dx can be evaluated by the substitution tan x = z if -

int' (e^(x))/(x) (x log x+1) dx can be obtained by the substitution-

Integrate : int x^(2)e^(ax)dx .

Integrate : int e^(2x) cos3x dx

Integrate : int e^(-2x) sin 3x sin 4x dx

Integrate : int xe^(x)cos x dx

Integrate : int x^(3)e^(ax)dx

Integrate : int e^(x^(3)).x^(5)dx

Statement-I: Integral of the form int (x^(2)+1)/(x^(4)+1)dx can be evaluated by substituting x-(1)/(x)=z . Statement II: Integral of the form int (x^(2)-1)/(x^(4)+1)dx can be evaluated by substituting x+(1)/(x)=z .

The value of the integral int_0^1e^(x^2)dx