`int5^(x)((1+sin x*cos x*ln5)/(cos^(2)x))dx=`( where c is the constant of integration)

The integral int((x)/(x sin x+cos x))^(2)" dx is equal to (where C is a constant of integration )

The integral int((x)/(x sin x+cos x))^(2)dx is equal to (where "C" is a constant of integration

What is int (dx)/(sin^(2) x cos^(2) x) equal to ? where c is the constant of integration

What is int (e^(x) (1 + x))/(cos^(2) (xe^(x))) dx equal to ? where c is a constant of integration

Let f(x)=(2sin^(2)x-1)/(cos x)+cos x(2sin x+1)/(1+sin x)then int e^(x)(f(x)+f'(x))dx where c is the constant of integration

The integral I=int(sin(x^(2))+2x^(2)cos(x^(2)))dx (where =xh(x)+c , C is the constant of integration). If the range of H(x) is [a, b], then the value of a+2b is equal to

If int ( cos x - sin x )/( sqrt(8 - sin 2x ))dx = a sin^(-1) (( sin x + cos x )/(b)) +c , where c is a constant of integration, then the ordered pair (a, b) is equal to :

If int(x(sin x-cos x)-sin x)/(e^(x)+(sin x)x)dx=-ln(f(x))+g(x)+C where C is the constant of integration and f(x) is positive then f(x)+g(x) has the value equal to

What is int ((1)/(cos^(2)x) - (1)/(sin^(x)x))dx equal to ? where c is the constant of integration