QUESTION IMAGE
Question
3 numeric 1 point
if $f(x)=j\circ h$ then $f(1)=?$
answer
4 numeric 1 point
if $f(x)=h\circ g$ then $f(2)=?$
answer
To solve these problems, we need the definitions of the functions \( j \), \( h \), and \( g \). Since they are not provided in the image, we cannot calculate the values of \( f(1) \) and \( f(2) \) directly.
For Problem 3:
If \( f(x) = j \circ h \), this means \( f(x) = j(h(x)) \). To find \( f(1) \), we would first need to know \( h(1) \), and then use that result as the input for \( j \).
For Problem 4:
If \( f(x) = h \circ g \), this means \( f(x) = h(g(x)) \). To find \( f(2) \), we would first need to know \( g(2) \), and then use that result as the input for \( h \).
Since the necessary function definitions (e.g., what \( j \), \( h \), and \( g \) do to their inputs) are missing, we cannot provide numerical answers without additional information.
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To solve these problems, we need the definitions of the functions \( j \), \( h \), and \( g \). Since they are not provided in the image, we cannot calculate the values of \( f(1) \) and \( f(2) \) directly.
For Problem 3:
If \( f(x) = j \circ h \), this means \( f(x) = j(h(x)) \). To find \( f(1) \), we would first need to know \( h(1) \), and then use that result as the input for \( j \).
For Problem 4:
If \( f(x) = h \circ g \), this means \( f(x) = h(g(x)) \). To find \( f(2) \), we would first need to know \( g(2) \), and then use that result as the input for \( h \).
Since the necessary function definitions (e.g., what \( j \), \( h \), and \( g \) do to their inputs) are missing, we cannot provide numerical answers without additional information.