Textbook Question
In Exercises 41 and 42, (a) write formulas for ƒ ○ g and g ○ ƒ and find the (b) domain and (c) range of each.
ƒ(x) = 2 - x², g(x) = √ x + 2
0. Functions
Combining Functions
6:07 minutesProblem 51
Textbook Question
Graph ƒ₁ and ƒ₂ together. Then describe how applying the absolute value function in ƒ₂ affects the graph of ƒ₁.
ƒ₁(x) ƒ₂(x)
__ ___
√ x √ |x|
Verified step by step guidance1
Identify the functions: f₁(x) = √x and f₂(x) = √|x|. The function f₁(x) is defined for x ≥ 0, while f₂(x) is defined for all real numbers because the absolute value ensures the input to the square root is non-negative.
Graph f₁(x) = √x: This graph is a half-parabola starting at the origin (0,0) and extending to the right, increasing slowly as x increases.
Graph f₂(x) = √|x|: This graph is symmetric about the y-axis. For x ≥ 0, it matches f₁(x), and for x < 0, it mirrors the right side of the graph across the y-axis, forming a V-shape.
Compare the graphs: The graph of f₂(x) = √|x| includes both the positive and negative x-values, creating a reflection of f₁(x) across the y-axis. This is due to the absolute value, which makes the input to the square root non-negative, allowing the function to be defined for negative x-values as well.
Describe the effect of the absolute value: Applying the absolute value to the input of f₂(x) extends the domain of the function to include negative x-values, resulting in a graph that is symmetric about the y-axis, unlike f₁(x) which is only defined for non-negative x-values.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Absolute Value Function
The absolute value function, denoted as |x|, transforms any negative input into its positive counterpart while leaving positive inputs unchanged. This means that for any x, |x| = x if x ≥ 0 and |x| = -x if x < 0. When applied to a function, it reflects any portion of the graph that lies below the x-axis to above the x-axis, effectively altering the function's behavior in the negative domain.
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Graphing Functions
Graphing functions involves plotting points on a coordinate plane to visualize the relationship between the input (x-values) and output (y-values). The shape and position of the graph provide insights into the function's behavior, such as its intercepts, increasing or decreasing intervals, and overall trends. Understanding how to graph functions is essential for comparing different functions, like ƒ₁ and ƒ₂ in this case.
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Transformation of Functions
Transformations of functions refer to changes made to the original function that affect its graph. Common transformations include translations, reflections, stretches, and compressions. In the context of this question, applying the absolute value function to ƒ₁(x) = √x to create ƒ₂(x) = √|x| results in a reflection of the left side of the graph of ƒ₁ across the x-axis, thus modifying its overall shape and symmetry.
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