Let `f:(1,3)rarr R` be a function defined by `f(x)=(x[x])/(1+x^(2))`, where `[x]` denotes the greatest integer `<=x` .Then the range of `f` is

Let f:(1,3) to R be a function defined by f(x)=(x[x])/(1+x) , where [x] denotes the greatest integer le x . Then the range of f is :

Let f:(1,3) to R be a function defined by f(x)=(x[x])/(1+x) , where [x] denotes the greatest integer le x . Then the range of f is :

Let f : [2, 4) rarr [1, 3) be a function defined by f(x) = x - [(x)/(2)] (where [.] denotes the greatest integer function). Then f^(-1) equals

Let f:(6, 8)rarr (9, 11) be a function defined as f(x)=x+[(x)/(2)] (where [.] denotes the greatest integer function), then f^(-1)(x) is equal to

Let f:(6, 8)rarr (9, 11) be a function defined as f(x)=x+[(x)/(2)] (where [.] denotes the greatest integer function), then f^(-1)(x) is equal to

Let f :(4,6) uu (6,8) be a function defined by f(x) = x+[(x)/(2)] where [.] denotes the greatest integer function, then f^(-1)(x) is equal to

If f: R rarr R is a function defined by: f(x) = [x] cos((2x-1)/2)pi , where [x] denotes the greatest integer function, then 'f' is

If f: R rarr R is a function defined by f(x)=[x]cos((2x-1)/2)pi , where [x] denotes the greatest integer function, then f is

If f : R rarr R is a function defined by : f(x) = [x] c cos ((2x - 1)/(2))pi, where [x] denotes the greatest integer function, then 'f' is :