Answer:
Hence, the domain of the function is:
{4,7}
Step-by-step explanation:
We are given the range of the function:
[tex]f(k)=k^2+2k+1[/tex] as {25,16}
The function f(k) could also be written as:
[tex]f(k)=k^2+2k+1=k^2+k+k+1\\\\f(k)=k(k+1)+1(k+1)\\\\f(k)=(k+1)(k+1)\\\\f(k)=(k+1)^2[/tex]
The range is the value of the function at some k.
1)
if f(k)=25 then we have to find the value of k.
[tex]f(k)=25=5^2=(k+1)^2[/tex]
on taking square root on both side we have:
[tex]k+1=5\\\\k=5-1\\\\k=4[/tex]
2)
if f(k)=64 then we have to find the value of k.
[tex]f(k)=64=8^2=(k+1)^2[/tex]
on taking square root on both side we have:
[tex]k+1=8\\\\k=8-1\\\\k=7[/tex]
Hence, the domain of the function is:
{4,7}
