The integral `int_(2)^(4)(logx^(2))/(logx^(2)+log(36-12x+x^(2))) dx` is equal to

The integral int_(2)^(4)(log x^(2))/(log x^(2)+log(36-12x+x^(2)))dx is equal to: (1)2(2)4(3)1(4)6

The integral int_(2)^(4)(e^(x^(2)))/(e^(x^(2))+e^((36-12x+x^(2))))dx is equal to

int _(2) ^(4) (log x ^(2))/( log x ^(2) + log (36-12 x + x ^(2)) dx is

int_(1)^(e)((logx)^(2))/(x)dx=?

int_(1)^(2)(logx)/(x)dx

int_(1)^(2)(logx)/(x)dx

int_(1)^(x) (logx^(2))/x dx is equal to

int_(1)^(2)(dx)/(x(1+logx)^(2))

The value of the integral int(e^(5logx)-e^(4logx))/(e^(3logx)-e^(2logx))dx is equal to (A) x^2+c (B) x^3/3+c (C) x^2/2+c (D) none of these

int((logx)^(2))/(x)dx.