Respuesta :
Answer:
Step-by-step explanation:
Given is a function
[tex]f(x) =(x-2)^2[/tex]
This function is a parabola with vertex at (2,0) and axis of symmetry is x=2
Hence for x<2 the curve would be reflection of x>2
To get inverse we must get one to one funciton only.
So restrict the domain of f(x) to [tex][2,∞)[/tex]
Then we have f(x) as one to one with domain x≥2 and range is R+
[tex]f^{-1} (x)=+\sqrt{x} +2[/tex]
For this inverse domain is R+ and range is [tex][2,∞)[/tex]
Answer:
restriction of domain is x>=2
[tex]f^{-1}=\sqrt{x}+2[/tex]
Step-by-step explanation:
Restrict the domain of the function [tex]f(x)=(x-2)^2[/tex] so it has an inverse
To restrict the domain we find the vertex
VErtex form of the equation is
[tex]y=(x-h)^2+k[/tex] vertex is (h,k). restriction of domain is x>=h
[tex]f(x)=(x-2)^2+0[/tex] , vertex is (2,0)
So restriction of domain is x>=2
now we find inverse function
[tex]f(x)=(x-2)^2[/tex]
Replace f(x) with y
[tex]y=(x-2)^2[/tex]
Replace x with y and y with x
[tex]x=(y-2)^2[/tex]
To remove square we take square root on both sides
[tex]\sqrt{x} =y-2[/tex]
Add 2 on both sides
[tex]\sqrt{x}+2 =y[/tex]
[tex]f^{-1}=\sqrt{x}+2[/tex]
