Textbook Question
Find a. (fog) (x) b. (go f) (x). f(x) = √x, g(x) = x − 1
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3. Functions
Intro to Functions & Their Graphs
2:44 minutesProblem 77a
Textbook Question
Express the given function h as a composition of two functions ƒ and g so that h(x) = (fog) (x). h(x) = ∛(x² – 9)
Verified step by step guidance1
Step 1: Understand the problem. The goal is to express the given function h(x) = ∛(x² – 9) as a composition of two functions ƒ(x) and g(x) such that h(x) = (ƒ ∘ g)(x), which means h(x) = ƒ(g(x)).
Step 2: Identify the inner function g(x). Look at the expression inside the cube root, x² – 9. This suggests that g(x) = x² – 9.
Step 3: Identify the outer function ƒ(x). The outer function operates on the result of g(x). Since h(x) = ∛(x² – 9), the cube root operation applies to g(x). Therefore, ƒ(x) = ∛x or equivalently ƒ(x) = x^(1/3).
Step 4: Verify the composition. Substitute g(x) into ƒ(g(x)) to ensure it matches h(x). ƒ(g(x)) = ƒ(x² – 9) = ∛(x² – 9), which is the original h(x).
Step 5: Conclude that the functions are ƒ(x) = x^(1/3) and g(x) = x² – 9, and their composition satisfies h(x) = (ƒ ∘ g)(x).
Verified video answer for a similar problem:This video solution was recommended by our tutors as helpful for the problem above
Video duration:
2mKey Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Function Composition
Function composition involves combining two functions, where the output of one function becomes the input of another. In this context, if h(x) = (f o g)(x), it means h(x) can be expressed as f(g(x)). Understanding how to break down a function into simpler components is essential for solving the problem.
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Function Composition
Cube Root Function
The cube root function, denoted as ∛x, is the inverse of the cubic function x³. It is important to recognize how this function behaves, particularly its domain and range, as well as how it can be manipulated algebraically. In the given function h(x) = ∛(x² - 9), understanding the cube root will help in identifying suitable functions f and g.
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Quadratic Functions
Quadratic functions are polynomial functions of the form ax² + bx + c, where a, b, and c are constants. In the expression x² - 9, we see a difference of squares, which can be factored. Recognizing the structure of quadratic expressions is crucial for determining how to express h(x) as a composition of two simpler functions.
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