`intcos(logx)dx=F(x)+c`, where c is an arbitrary constant. Here F(x)=

intcos^-1(1/x)dx=

If int1/((1+x)sqrt(x))dx=f(x)+A , where A is any arbitrary constant, then the function f(x) is

inte^(sqrt(x) dx is equal to (A is an arbitrary constant)

Find the differential equation corresponding to y=cx+c-c^(3) , where c is arbitrary constant.

int(2x+3)/((x-1)(x^2+1))dx =log_e{(x-1)^(5/2)(x^2+1)^a}-1/2 tan^-1 x+C,x > 1 where C is any arbitrary constant, then the value of ' a' is

The integral intcos(log_(e)x)dx is equal to: (where C is a constant of integration)

If inte^(sinx)((xcos^(3)x-sinx)/(cos^(2)x))dx=e^(sinx)f(x)+c , where c is constant of integration, then f(x)=

If intxe^(2x)dx is equal to e^(2x)f(x)+c , where c is constant of integration, then f(x) is

The differential equation whose solution is y=c_1 cos ax+c_2 sin ax is (Where c_1,c_2 are arbitrary constants)