Textbook Question
In Exercises 17–30, determine the amplitude, period, and phase shift of each function. Then graph one period of the function.y = −2 sin(2x + π/2)
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4. Graphing Trigonometric Functions
Graphs of the Sine and Cosine Functions
6:36 minutesProblem 31
Textbook Question
Graph each function. See Examples 1 and 2.ƒ(x) = -√-x
Verified step by step guidance1
Step 1: Recognize that the function \( f(x) = -\sqrt{-x} \) involves a square root and a negative sign inside the square root. This indicates that the function is defined only for non-positive values of \( x \) (i.e., \( x \leq 0 \)).
Step 2: Identify the domain of the function. Since the expression under the square root, \( -x \), must be non-negative, solve \( -x \geq 0 \) to find that \( x \leq 0 \). Thus, the domain is \( (-\infty, 0] \).
Step 3: Determine the range of the function. Since the square root function outputs non-negative values and the function \( f(x) = -\sqrt{-x} \) has a negative sign in front, the range will be non-positive values, \( (-\infty, 0] \).
Step 4: Consider the behavior of the function as \( x \) approaches 0 from the left. As \( x \to 0^- \), \( -x \to 0^+ \), and \( \sqrt{-x} \to 0 \), so \( f(x) \to 0 \). The graph will approach the origin from below.
Step 5: Sketch the graph by plotting a few key points. For example, calculate \( f(-1) = -\sqrt{1} = -1 \) and \( f(-4) = -\sqrt{4} = -2 \). Plot these points and draw a smooth curve that approaches the origin as \( x \to 0^- \). The graph will be a downward-opening curve in the second quadrant.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Square Root Function
The square root function, denoted as √x, is defined for non-negative values of x. It produces a value that, when squared, returns the original number. In the context of the function ƒ(x) = -√-x, understanding how the square root operates is crucial, especially since it involves a negative input, which requires careful consideration of the domain.
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Domain and Range
The domain of a function refers to the set of all possible input values (x-values) for which the function is defined. For ƒ(x) = -√-x, the domain is limited to x ≤ 0, as the expression under the square root must be non-negative. The range, on the other hand, describes the possible output values (y-values), which in this case will be non-positive due to the negative sign in front of the square root.
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Graphing Transformations
Graphing transformations involve altering the basic shape of a function's graph through shifts, reflections, and stretches. The function ƒ(x) = -√-x reflects the standard square root graph across the x-axis and shifts it horizontally. Understanding these transformations helps in accurately sketching the graph and predicting its behavior based on the original function.
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