Textbook Question
Composition of even and odd functions from tables Assume ƒ is an even function, g is an odd function, and both are defined at 0. Use the (incomplete) table to evaluate the given compositions. <IMAGE>
i. g(g(g(-1)))
0. Functions
Combining Functions
3:29 minutesProblem 19b
Textbook Question
Composite functions
Let ƒ(x) = x³, g (x) = sin x and h(x) = √x .
Find h (ƒ (x)).
Verified step by step guidance1
Step 1: Understand the problem. We are asked to find the composite function h(ƒ(x)), which means we need to substitute ƒ(x) into h(x).
Step 2: Identify the given functions. We have ƒ(x) = x^3 and h(x) = \sqrt{x}.
Step 3: Substitute ƒ(x) into h(x). This means replacing the x in h(x) with ƒ(x).
Step 4: Write the expression for the composite function. h(ƒ(x)) becomes h(x^3).
Step 5: Simplify the expression. Since h(x) = \sqrt{x}, h(x^3) becomes \sqrt{x^3}.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Composite Functions
A composite function is formed when one function is applied to the result of another function. It is denoted as (f ∘ g)(x) = f(g(x)). Understanding how to combine functions is essential for evaluating expressions like h(f(x)), where the output of f(x) becomes the input for h.
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Function Notation
Function notation is a way to represent functions and their operations clearly. For example, f(x) represents the output of function f when x is the input. Recognizing how to read and interpret function notation is crucial for correctly applying functions in composite scenarios.
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Basic Functions and Their Properties
Familiarity with basic functions, such as polynomial functions (like f(x) = x³), trigonometric functions (like g(x) = sin x), and radical functions (like h(x) = √x), is vital. Each function has unique properties that affect how they interact in compositions, influencing the overall behavior of the composite function.
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