Given a function defined by y = f(x) = `sqrt(4- x^(2)) 0 lt= x lt= 2 , 0 lt= y lt=2.`
Show that f is bijective function .

If A = R -{3} and B = R -{1}. Consider the function f:A to B defined by f(x)=(x-2)/(x-3) , for all x in A . Then, show that f is bijective. Find f^(-1)(x) .

Let f : N rarr 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.

Let f be defined by f(x)=4x + 3 for all x""inR. Show that it is bijective and determine the inverse of f.

A differentiable function f defined for all x>0 satisfies f(x^(2)) = x^(3) for all x>0. what is f'(b)?

Let A = { x:x in R ,(-pi)/(2) lt= xlt= (pi)/(2)} and B = (y:y in R , -1 lt= y lt=1} . Show that the function f : A rarr B given by f(x) = sin x is invertible andc hence find f^(-1) .

Let f : R rarr R be the signum function defined as f(x)= {{:(1,x gt0),(0,x=0),(-1,x lt0):} and g :R rarr be the greatest integer function given by g(x) = [x] . Then prove that fog and gof coincide in [-1,0).

If f:R to R is the function defined by f(x)=4x^(3) +7 , then show that f is a bijection.

A function f(x) is defined as follows : f(x)={(x^(2)"sin"(1)/(x)", if "x!=0),(0", if "x=0):} show that f(x) is differentiable at x=0.

If f:X to Y is a function. Define a relation R on X given by R={(a, b): f(a)=f(b)}. Show that R is an equivalence relation on X.