Let f: R-{-4/3}->Rbe a function as f(x)...

Let `f: R-{-4/3}->R`be a function as `f(x)=(4x)/(3x+4)`. The inverse of f is map, `g: R a ngef->R-{-4/3}`given by.(a) `g(y)=(3y)/(3-4y)` (b) `g(y)=(4y)/(4-3y)`(c) `g(y)=(4y)/(3-4y)` (d) `g(y)=(3y)/(4-3y)`

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Let f: R-{-4/3}->R be a function as f(x)=(4x)/(3x+4) . The inverse of f is map, g:" "R a nge""""""f->R-{-4/3} given by. (a) g(y)=(3y)/(3-4y) (b) g(y)=(4y)/(4-3y) (c) g(y)=(4y)/(3-4y) (d) g(y)=(3y)/(4-3y)

Let f: R-{-4/3}->R be a function as f(x)=(4x)/(3x+4) . The inverse of f is map, g:" Range "f->R-{-4/3} given by.(a) g(y)=(3y)/(3-4y) (b) g(y)=(4y)/(4-3y) (c) g(y)=(4y)/(3-4y) (d) g(y)=(3y)/(4-3y)

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Let `f: R-{-4/3}->R`be a function as `f(x)=(4x)/(3x+4)`. The inverse of f is map, `g: R a ngef->R-{-4/3}`given by.(a) `g(y)=(3y)/(3-4y)` (b) `g(y)=(4y)/(4-3y)`(c) `g(y)=(4y)/(3-4y)` (d) `g(y)=(3y)/(4-3y)`

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