Let f(x) be a linear function which maps [-1, 1] onto [0, 2], then f(x) can be

Find a linear function f which maps [-1,1] onto [0,2] .

The distinct linear functions which map [-1,1] onto [0,2] are

The number of linear functions which map from [-1, 1] onto, [0, 2] is

The distinct linear functions which map [-1, 1] onto [0, 2] are f(x)=x+1,\ \ g(x)=-x+1 (b) f(x)=x-1,\ \ g(x)=x+1 (c) f(x)=-x-1,\ \ g(x)=x-1 (d) none of these

Let f = {(1, 1),(2,3),(0,-1), (-1,-3)} be a linear function from Z into Z, then f(x) =

If fa n dg are two distinct linear functions defined on R such that they map [-1,1] onto [0,2] and h : R-{-1,0,1}vecR defined by h(x)=(f(x))/(g(x)), then show that |h(h(x))+h(h(1/x))|> 2.

Let f {(1,1), (2,4), (0,-2), (-1,-5)} be a linear function from Z into Z. Then, f (x) is

Let f {(1,1), (2,4), (0,-2), (-1,-5)} be a linear function from Z into Z. Then, f (x) is

There are exactly two distinct linear functions, ______ and ______, which map [-1,1] onto [0,2].