`int_(0)^(alpha)(1)/(cosx+cosalpha)dx` is equal to

int(1)/(cosx-sinx)dx is equal to

Given int_(0)^(pi//2)(dx)/(1+sinx+cosx)=A . Then the value of the definite integral int_(0)^(pi//2)(sinx)/(1+sinx+cosx)dx is equal to

int(x+sinx)/(1+cosx) dx is equal to

int(In(tanx))/(sinx cosx)dx " is equal to "

int(cosalpha)/(a^2+sin^2alpha)d alpha is equal to

int(dx)/(cosx+sinx) is equal to

The value of int_(0)^(pi//2)(cosxdx)/(1+cosx+sinx) is equal to

Let I_(1)=int_(0)^(alpha)(1+2cosx)/(1+e^(x))dx and I_(2)=int_(0)^(alpha)(1+e^(x))/(1+2cosx)dx , where alpha is the root of the equation 2 cos x - e^(x)=0 . and alpha is positive Then,

int_(0)^(pi//2) cosx\ e^(sinx)\ dx is equal to

int_(pi //4)^(3pi//4) (dx)/( 1+ cosx) is equal to