If the value of the integral `I=int_((pi)/(4))^((pi)/(3))" max "(sinx, tanx)dx` is equal to ln k, then the value of `k^(2)` is equa to

If the value of the integral I=int_((pi)/(4))^((pi)/(3))" max "(sinx, tanx)dx is equal to ln k, then the value of k^(2) is equal to

The value of the integral int_((pi)/(6))^((pi)/(3))((sinx-xcosx))/(x(x+sinx))dx is equal to-

The value of the integral int_(pi//6)^(pi//2)((sinx-xcosx))/(x(x+sinx))dx is equal to

The value of the integral int_(0)^((pi)/(4))(sinx+cosx)/(3+sin2x)dx is equal to-

If the value of the integral I=int_(0)^(1)(dx)/(x+sqrt(1-x^(2))) is equal to (pi)/(k) , then the value of k is equal to

If the value of the integral I=int_(0)^(1)(dx)/(x+sqrt(1-x^(2))) is equal to (pi)/(k) , then the value of k is equal to

If the value of the integral I=int_(0)^(1)(dx)/(x+sqrt(1-x^(2))) is equal to (pi)/(k) , then the value of k is equal to

The value of the integral I=int_(0)^((pi)/(2))(cosx-sinx)/(10-x^(2)+(pix)/(2))dx is equal to

The value of the integral I=int_(0)^((pi)/(2))(cosx-sinx)/(10-x^(2)+(pix)/(2))dx is equal to

If the value of definite integral A=int_(0)^(10pi)[sinx]dx is equal to kpi , then the absolute value of k is equal to (where, [.] is the greatest integer function)