int(dx)/(x(x^(6)+1))=

Evaluate: int(dx)/(x^2(x^6+1)^(5/6))

Evaluate int(dx)/(x sqrt(x^(6)-1))

The value of int(dx)/(x^(13)(x^(6)-1)) is

"If"int(dx)/(x^(3)(1+x^(6))^(2/3))=xf(x)(1+x^(6))^(1/3)+C where, C is a constant of integration, then the function f(x) is equal to

If int(dx)/(x^(3)(1+x^(6))^(2/3))=xf(x)(1+x^(6))^(1/3)+C where, C is a constant of integration, then the function f(x) is equal to

If int(dx)/(x^(3)(1+x^(6))^(2//3)) = xf(x)(1+x^(6))^(1//3)+ C Where C is a constant of inergration, then the function f(x) is equal to :-

"If"int(dx)/(x^(3)(1+x^(6))^(2/3))=xf(x)(1+x^(6))^(1/3)+C where, C is a constant of integration, then the function f(x) is equal to

int(1)/(x^(4)+x^(6))*dx

int(x^(8))/(x^(6)+1)dx=

int(x^(5))/(x^(6)+1)dx