Answer:
Based on the comparisons, option 3) "Of(2)= g(0) and f(4) = g(2)" represents where f(x) is equal to g(x).
Explanation:
To determine which option represents where f(x) is equal to g(x), we need to compare the values of f(x) and g(x) at specific points.
Let's evaluate each option:
f(0) = g(0) and f(2) = g(2)
Checking the values on the graph, we see that f(0) = 5 and g(0) = 2, which are not equal. Also, f(2) = 2, and g(2) = 3, which are also not equal. Therefore, this option is incorrect.
f(2) = g(0) and f(0) = g(4)
Checking the values on the graph, we find that f(2) = 2 and g(0) = 2, which are equal. However, f(0) = 5, and g(4) = 4, which are not equal. Therefore, this option is incorrect.
f(2) = g(0) and f(4) = g(2)
Checking the values on the graph, we see that f(2) = 2 and g(0) = 2, which are equal. Additionally, f(4) = 7, and g(2) = 7, which are also equal. Therefore, this option is correct.
f(2) = g(4) and f(1) = g(1)
Checking the values on the graph, we find that f(2) = 2, and g(4) = 4, which are not equal. Additionally, f(1) = 9, and g(1) = 2, which are also not equal. Therefore, this option is incorrect.