`int(k^sqrtx)/sqrtx dx =`

int (a^sqrtx)/(sqrtx) dx equals

int (1/sqrtx-sqrtx)dx

int (1+x)^3/sqrtx dx

"int5sqrtx dx

The value of int e^sqrtx/sqrtx(sqrtx + x) dx is equal to

The value of int(e^(sqrtx))/(sqrtx(1+e^(2sqrtx)))dx is equal to (where, C is the constant of integration)

Let I =int _(0)^(1 ) sqrt((1+sqrtx)/(1-sqrtx)) dx then correct statement (s) is/are:

Evaluate : int( sqrtx)/sqrt( a^(3) - x^(3) ) dx

The integral I=int(e^(sqrtx)cos(e^(sqrtx)))/(sqrtx)dx=f(x)+c (where, c is the constant of integration) and f(ln((pi)/(4)))^(2)=sqrt2. Then, the number of solutions of f(x)=2e (AA x in R-{0}) is equal to

int(1+sqrtx)/(1+x)dx