If `f: [-2, 2] -> R` is defined by `f(x)={-1`,for `-2<=x<=0` , then `x-1`, for `0<=x<=2` `[x in [-2, 2] : x <= 0 and f(| x |) = x} =`

If f:[-2,2]rarr R is defined by f(x)={-1 for -2<=x<=0, then x-1, for 0<=x<=2[x in[-2,2]:x<=0 and f(|x|)=bar(x)}=

If f: R to R is defined by f(x)=x-[x]-(1)/(2) for all x in R , where [x] denotes the greatest integer function, then {x in R: f(x)=(1)/(2)} is equal to

If f: R->R is defined by f(x)=x^2 , write f^(-1)(25) .

If f:R rarr R is defined by f(x)=x-[x]-(1)/(2). for x in R, where [x]is the greatest integer exceeding x, then {x in R:f(x)=(1)/(2)}=

If f: R->R is defined by f(x)=3x+2 , find f(f(x)) .

f:[-2,2]rarr R is defined as f(x)={-1,-2<=x<=0x-1,0<=x<=2 then {x in[-2,2]:x<=0f(|x|)=x}=

f:R rarr R defined by f(x)=x^(2)+5

If f: R->R is defined by f(x)={(x+2)/(x^2+3x+2) if x in R-{-1,-2}, -1 if x = -2 and 0 if x=-1. ifx=-2 then is continuous on the set