The value of the integral `int(dx)/(x(1+logx)^2)` is equal to

int(dx)/(x(logx)^(m)) is equal to then

int(dx)/(x(1+(logx)^(2))) equals

The value of the integral int(1+x^(2))/(1+x^(4))dx is equal to

By Simpson rule taking n=4, the value of the integral int _(0)^(1)(1)/(1+x^(2))dx is equal to

Let [x] denote the greatest integer less than or equal to x, then the value of the integral int_(-1)^(1)(|x|-2[x])dx is equal to

The value of the integral int_(-1)^(1) (x-[2x]) dx,is

The value of the integral int_(1//e)^(e) |logx|dx , is

The value of the integral int_(1)^(3)|(x-1)(x-2)|dx is

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