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-

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

[x] denotes the greatest integer, less than or equal to x, then the value of the integral int_(0)^(2)x^(2)[x]dx equals

The value of the integral int_(1)^(5)[|x-3|+|1-x|]dx is equal to-

The value of the integral int_(1)^(5)[|x-3|+|1-x|]dx is equal to

The value of the integral int_(-1)^(1)x|x|dx is equal to -

The value of the integral int_(-2)^(2)(1+2 sinx)e^(|x|)dx is equal to

The value of integral int_(-1)^(1)(|x+2|)/(x+2)dx is

Let [a] denote the greatest integer which is less than or equal to a. Then the value of the integral int_(-pi/2)^(pi/2) [ sin x cos x] dx is

The value of the integral int_(-1)^(1){(x^(2015))/(x^2+cosx)}dx is equal to

int_(-1)^1(x-abs(2x))dx is equal to