" Consider "f:R,rarr[-5,oo)" given by "f(x)=9x^(2)+6x-5" .Show that "f" is bijective."

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

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

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

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

Consider f: Rrarr [- 5, ∞) given by f(x) = 9x^2 + 6x- 5 . Show that f is invertible. Find the inverse of f.

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)

Consider f:R^(+) rarr [-5, oo] given by f (x) = 9x^(2) + 6x - 5 show that 'f' is invertible. Find the inverse of f .

Consider f:R_+ 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)

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)) . Hence. Find (i) f^(-1)(10)" " (ii) y" if "f^(-1)(y)=(4)/(3) where R_(+) is the set of all non-negative real numbers.