Use the graph of f below to answer the question. Assume that the domain of f is (−∞,∞). Select all of the critical points of

Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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Use the graph of f below to answer the question. Assume that the domain of f is (−∞,∞).

Select all of the critical points of f.

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The graph displayed represents a function plotted on a Cartesian coordinate system. Here’s a detailed explanation:

- **Axes and Scale**: 
  - The horizontal axis is labeled as \(x\), ranging from \(-1\) to \(6\).
  - The vertical axis is labeled as \(y\), ranging from \(-1\) to \(6\).
  - Both axes are marked with small grid lines aiding in determining the function’s values more accurately.

- **Function Description**:
  - The function is depicted by a continuous blue curve.
  - Starting near the top left (approx. \(y = 5.5\)), the curve decreases and crosses the \(y\)-axis around \(y = 4\).
  - It reaches a minimum around \(x = 1.5, y = 1\).
  - The curve then increases, peaking slightly above \(y = 3\) around \(x = 3\).
  - It follows a downward trend again, hitting another local minimum near \(x = 5, y = 1.5\).
  - Lastly, the curve slightly ascends as it moves towards the right, ending near \(x = 6, y = 2\).

Overall, the graph demonstrates a wave-like pattern with alternating peaks and troughs, showing the dynamic changes in the function's values.
Transcribed Image Text:The graph displayed represents a function plotted on a Cartesian coordinate system. Here’s a detailed explanation: - **Axes and Scale**: - The horizontal axis is labeled as \(x\), ranging from \(-1\) to \(6\). - The vertical axis is labeled as \(y\), ranging from \(-1\) to \(6\). - Both axes are marked with small grid lines aiding in determining the function’s values more accurately. - **Function Description**: - The function is depicted by a continuous blue curve. - Starting near the top left (approx. \(y = 5.5\)), the curve decreases and crosses the \(y\)-axis around \(y = 4\). - It reaches a minimum around \(x = 1.5, y = 1\). - The curve then increases, peaking slightly above \(y = 3\) around \(x = 3\). - It follows a downward trend again, hitting another local minimum near \(x = 5, y = 1.5\). - Lastly, the curve slightly ascends as it moves towards the right, ending near \(x = 6, y = 2\). Overall, the graph demonstrates a wave-like pattern with alternating peaks and troughs, showing the dynamic changes in the function's values.
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