`int x^(2) root(3)(x^(3)-5) dx` can be easily evaluated by the substitution-

int x^(3)root(3)(x^(4)-4)dx

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

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 .

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

int (x^(2)dx)/(x^(6)-5x^(3)+6)

int(x^(3)+5x^(2)-4)/(x^(2))dx

Evaluate : int x^(2) tan (x^(3))dx

int_(0)^(3)(2x^(2)+3x+5)dx

int(dx)/(sqrt(3x^(2)-5))

int(1-sinx )/(root(3)(x+cos x))dx