If `f:[2, oo)rarrB` defined by `f(x)=x^(2)-4x+5` is a bijection, then `B=`

If f: [2, oo) rarr B defined by f(x)=x^(2)-4x+5 is a bijection, then B=

If a functions f: [2,oo) rarr B defined by f(x) = x^2 - 4x + 5 is a bijection, then B is equal to a)R b) [1,oo) c) [4,oo) d) [5,oo)

If a funciton f:[2,oo] to B defined by f(x)=x^(2)-4x+5 is a bijection, then B=

If f: [2,infty) to B defined by f(x) =x^(2)-4x+5 is a bijection, then B=

The function f:[2,oo)rarr Y defined by f(x)=x^(2)-4x+5 is both one-one and onto if

If f: [(2,oo) rarr R be the function defined by f(x) =x^(2) - 4x +5 , then the range of f is ...........

Let f:[2, oo)rarrR be the function defined by f(x)=x^(2)-4x+5 , then the range of f is

f:(-1,1) to B defined by f(x)=tan^(-1)((2x)/(1-x^(2))) is bijection then B =

Let A=RR-{2} and B=RR-{1} . Show that, the function f:A rarr B defined by f(x)=(x-3)/(x-2) is bijective .

If f:R rarr R is defined by f(x)=2x-3 prove that f is a bijection and find its inverse.