Let `f(x) = (x^(2) + 2)/([x]), 1 le x le 3`, where `[*]` is the greatest integer function. Then the least value of f(x) is

Let f(x) = {{:(1+|x|, x lt -1),([x],x ge -1):} where [.] denote the greatest integer function . Then find the value of f{f(-2.3)}

If f(x) = (sin([x]pi))/(x^2+x+1) , where [ .] denotes the greatest integer function , then a)f is one-one b)f is not one-one and non-constant c)f is a constant function d)none of these

Let f: (2,4) rarr (1,3) where f(x) = x - [x//2] (where [ .] denotes the greatest integer function), then f^(-1)(x) 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 :

Period of f(x) = sgn ([x] + [-x]) is equal to (where [ .] denotes greatest integer function) a)1 b)2 c)3 d)does not exist