The integral `int(2x^(12)+5x^(9))/((x^(5)+x^(3)+1)^(3))dx` is equal to

int((2x^(12)+5x^(9))dx)/((x^(5)+x^(3)+1)^(3))

The value of the integral I=int(2x^(9)+x^(10))/((x^(2)+x^(3))^(3))dx is equal to (where, C is the constant of integration)

The value of the integral I=int(2x^(9)+x^(10))/((x^(2)+x^(3))^(3))dx is equal to (where, C is the constant of integration)

int(x^(3)-1)^(1//3)x^(5)dx is equal to

The integral int(1)/(4sqrt((x-1)^(3)(x+2)^(5)) dx is equal to (where c is a constant of integration)

Integrate : int (2x^(2)-3x+9)/(x^(2)+4x-5)

Integrate: int(2x^2 - 3x+9)/(x^2+4x-5)dx

Integrate: int((5x^(2)-12)dx)/((x^(2)-6x+13)^(2))

The integral int(2x^(3)-1)/(x^(4)+x)dx is equal to: (Here C is a constant of integration)

The integral int(2x^(3)-1)/(x^(4)+x)dx is equal to : (Here C is a constant of integration)