Let f(x)x-[x], for every real number x, where [x] is integral part of x. Then, `int_(-1)^(1) f(x)dx`, is

Let f(x)=x-[x] , for every real x, where [x] is the greatest integer less than or equal to x. Then, int_(-1)^(1)f(x)dx is :

Let f(x)=x[x], for every real number x , where [x] is the greatest integer less than or equal to x. Then,evaluate int_(-1)^(1)f(x)dx

int_(-2)^(4) f[x]dx , where [x] is integral part of x.

Let f(x) = {x} , the fractional part of x then int_(-1)^(1) f(x) dx is equal to

Let f(x)=x-[x], for ever real number x ,w h e r e[x] is the greatest integer less than or equal to xdot Then, evaluate int_(-1)^1f(x)dx .

Let f(x)=x-[x], for ever real number x ,w h e r e[x] is the greatest integer less than or equal to xdot Then, evaluate int_(-1)^1f(x)dx .

Let f(x)=x-[x], for ever real number x ,w h e r e[x] is the greatest integer less than or equal to xdot Then, evaluate int_(-1)^1f(x)dx .

Let f(x)=min({x},{-x})AA epsilonR , where {.} denotes the fractional part of x . Then int_(-100)^(100) f(x)dx is equal to

Let h(x)=f(x)-[f(x)]^(2)+[f(x)]^(3) for every real number 'x' then