For this case we have the following functions:
[tex]f (x) = \frac {1} {2}\\g (x) = x-4[/tex]
We must find [tex](g_ {o} f) (x)[/tex]. For definition of composition of functions we have to:
[tex](g_ {o} f) (x) = g (f (x))[/tex]
So:
[tex]g (f (x)) = \frac {1} {2} -4 = \frac {1-8} {4} = \frac {-7} {4} = - \frac {7} {4}[/tex]
Then, for any value of "x", the composite function has a value of[tex]- \frac {7} {4}[/tex].
Thus,[tex](g_ {o} f) (0)[/tex]cannot be evaluated, it will always be obtained [tex]- \frac {7} {4}.[/tex]
ANswer:
For any value of "x", the composite function has a value of[tex]- \frac {7} {4}.[/tex]
Sample Response: To evaluate the composition, you need to find the value of function f first. But, f(0) is 1 over 0, and division by 0 is undefined. Therefore, you cannot find the value of the composition.
What did you include in your answer?
You must evaluate the function f first.
Division by 0 is undefined.
The composition cannot be evaluated.
