Composition of Functions with Graphs and Tables

The composition of functions is the process of applying one function to the results of another function. If f and g are two functions, the composition is denoted as (f ∘ g)(x) = f(g(x)).

To evaluate a composition of functions, substitute the input value into the innermost function and then use the result as the input for the outer function.

The notation for the composition of functions is f(g(x)), which means 'apply g to x, then apply f to the result of g(x)'.

f(g(4)) = f(4 - 1) = f(3) = 2(3) + 3 = 9.

h(g(-3)) = h(-3) = -3.

To find f(f(x)), substitute f(x) into itself. For example, if f(x) = 2x, then f(f(x)) = f(2x) = 2(2x) = 4x.

The order of functions in composition matters because (f ∘ g)(x) is generally not equal to (g ∘ f)(x). The output of one function becomes the input of the next.

First, find h(1) = -3(1) + 2 = -1. Then, substitute -1 into g: g(-1) = 4(-1) + 1 = -3.

g(f(2)) = g(2 + 3) = g(5) = 2(5) = 10.

The graph of the composition f(g(x)) can be visualized as applying the transformation of g first, followed by the transformation of f.