Let f be an invertible function . Then prove that `(f^(-1))^(-1)` = f.

If f:X to Y and g:Y to Z be two bijective functions, then prove that (gof)^(-1) =f^(-1)og(-1) .

If f:R to R defined by f(x)=(3x+5)/(2) is an invertible function, then find f^(-1)(x) .

Let f be a real function. Prove that f(x)-f(-x) is an odd function and f(x)+f(-x) is an even function.

If f is an invertible function, defined as f(x)= (3x-4)/(5) then write f^(-1) (x).

Let f:XrightarrowY and g:YrightarrowZ . Prove that gof is bijective if both f and g are bijective. Also prove that (gof)^(-1)=f^(-1)og^(-1) .

Let f be a real function. Show that h(x) =f(x)=f(-x) is always an even function and g(x) = f(x) -f(-x) is always an odd fuction.

If the invertible function f is defined as f(X) = (3x-4)/5 , write f^(-1) (X) .

Consider f : (1,2,3) rarr {a,b,c) given by f(1) = a, f(2)=b, f(3) = c . Find f^(-1) . Show that (f^(-1))^(-1) = f.