None of the inputs in the table of f(x) appears in the table of g(x), then we can't write the product between these two functions.
<h3>
Why you can't find the product of the two given functions?</h3>
For two functions f(x) and g(x), the product is defined as:
(g*f)(x) = f(x)*g(x).
Now, if we define our functions by tables, like in this case, we only can write the product if in each table we have a coordinate pair with the same input value.
For example if in the table of f(x) we have the pair (a, b), then f(a) = b
If in the table of g(x) we have the pair (a, d), then: g(a) = d.
And the product evaluated in will be:
(g*f)(a) = f(a)*g(a) = b*d
Now let's look at our tables.
None of the inputs in the table of f(x) appears in the table of g(x), then we can't write the product between these two functions.
If you want to learn more about product between functions:
brainly.com/question/4854699
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