The integral `intcos(log_(e)x)dx` is equal to: (where 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 intergration)

int("sin"(5x)/(2))/("sin"(x)/(2))dx is equal to (where, C is a constant of integration)

The integral int sec^(2//3) "x cosec"^(4//3)"x dx" is equal to (here C is a constant of integration)

The integral int(1+x-1/x)e^(x+1/x)dx is equal to

intcos^(3)x.e^(logsinx)dx is equal to

If int(sqrt(1-x^2))/x^4dx=A(x) (sqrt(1-x^2))^m+C ,for a suitable chosen integer m and a function A(x), where C is a constant of integration, then (A(x))^m equals

If int (x^(6)+7x^(5)+6x^(4)+5x^(3)+4x^(2)+3x+1)e^(x)dx is equal to sum_(k=1)^(alpha) betax^(k).e^(x)+C (where C is constant of integration) then (alpha + beta) is

Let alpha in (0, pi//2) be fixed. If the integral int("tan x" + "tan" alpha)/("tan x" - "tan" alpha)dx = A(x)"cos 2 alpha+B(x) "sin" 2 alpha +C ,where C is a constant of integration, then the functions A(x) and B(x) are respectively.

Integrate: int(a^(logx))/x dx

If int (x+1)/(sqrt(2x-1))dx = f(x)sqrt(2x-1)+C , where C is a constant of integration, then f(x) is equal to