Consider `f: R to R` given by `f (x) = 4x + 3.` Show that f is invertible. Find the inverse of f.

Consider f: R _+ to [4, oo) given by f (x) = x ^(2) + 4. Show that f is invertible with the inverse f ^(-1) given by f ^(-1) (y) = sqrt (y -4), where R _(+) is the set of all non-negative real numbers.

Let Y = {n^(2) : n in N} sub N. Consider f:N to Y as f (n) = n ^(2). Show that f is invertible. Find the inverse of f.

Consider f: R _(+) to [-5, oo) given by f (x) = 9x ^(2) + 6x -5. Show that f is invertible with f ^(-1) (y) = ((sqrt(y +6) -1)/(3)).

Let f:N to Y be a function defined as f (x) =4x +3, where, Y = {y in N : y = 4x +3 for some x in N }. Show that f is invertible. Find the inverse.

Consider f:RR_(+) rarr [-5, infty) given by f(x)=9x^(2)+6x-5 . Show that f is invertible with f^(-1) (y) =(sqrt(y+6)-1)/(3)

Let the function f: QQ be defined by f(x)=4x-5 for all x in QQ . Show that f is invertible and hence find f^(-1)

Let f:R to R where f(x) =sin x. Show that f is into. Also find the codomain if f is onto.

Let f:R to R be given by f(x) =|x^(2)-1|, x in R . Then

Show that f: [-1, 1] to R, given by f (x) = (x)/((x +2)) is one-one. Find the inverse of the function f : [-1, 1] to Rangle f.