sketch a graph of $f(x) = \begin{cases} 2 & \text{if } x \leq -1 \\ -x + 1 & \text{if } -1 1 \end{cases}$ notes: only use dots if two parts of the function dont connect. question help: video 1 video 2 calculator submit question

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sketch a graph of $f(x) = \begin{cases} 2 & \text{if } x \leq -1 \\ -x + 1 & \text{if } -1 < x \leq 1 \\ 3 & \text{if } x > 1 \end{cases}$

notes: only use dots if two parts of the function dont connect.

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Accepted Answer

# Explanation: ## Step1: Analyze the first piece ($x \leq -1$) The first part of the function is $f(x) = 2$ when $x \leq -1$. This is a horizontal line. We can plot a closed dot (since $x = -1$ is included) at $(-1, 2)$ and draw a horizontal line to the left (for all $x$ values less than or equal to -1). ## Step2: Analyze the second piece ($-1 < x \leq 1$) The second part is $f(x) = -x + 1$ for $-1 < x \leq 1$. This is a linear function. Let's find two points: - When $x = -1$ (but not included, so open dot), $f(-1) = -(-1) + 1 = 2$. Wait, but at $x = -1$, the first piece is 2 (closed dot), and the second piece at $x = -1$ would be 2 (open dot). So at $x = -1$, the closed dot from the first piece is there. - When $x = 1$ (included, closed dot), $f(1) = -1 + 1 = 0$. So we have a closed dot at $(1, 0)$ and an open dot at $(-1, 2)$ (but the first piece already has a closed dot there, so the second piece starts with an open dot at $(-1, 2)$ and goes to $(1, 0)$. ## Step3: Analyze the third piece ($x > 1$) The third part is $f(x) = 3$ when $x > 1$. This is a horizontal line. We plot an open dot at $(1, 3)$ (since $x = 1$ is not included here) and draw a horizontal line to the right (for all $x$ values greater than 1). Now, to sketch the graph: - For $x \leq -1$: Horizontal line at $y = 2$, closed dot at $(-1, 2)$. - For $-1 < x \leq 1$: Line from open dot $(-1, 2)$ (but the first piece has a closed dot there, so the second piece starts with an open dot, but visually, since the first piece is already at $(-1, 2)$, we can draw the line from $(-1, 2)$ (treating it as an open dot for the second piece, but the first piece's closed dot is there) to $(1, 0)$ (closed dot). - For $x > 1$: Horizontal line at $y = 3$, open dot at $(1, 3)$. # Answer: The graph consists of: - A horizontal line segment at $y = 2$ for $x \leq -1$ (with a closed dot at $(-1, 2)$). - A line segment from $(-1, 2)$ (open dot, but the first segment has a closed dot there) to $(1, 0)$ (closed dot) for $-1 < x \leq 1$. - A horizontal line segment at $y = 3$ for $x > 1$ (with an open dot at $(1, 3)$). (Note: Since the question is to sketch the graph, the final answer is the graphical representation as described above. If you need to draw it, use the tools: for the first part, use the horizontal line tool from the left to $x = -1$ (closed dot at $(-1, 2)$); for the second part, use the line tool from $(-1, 2)$ (open dot) to $(1, 0)$ (closed dot); for the third part, use the horizontal line tool from $x = 1$ (open dot at $(1, 3)$) to the right.)

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sketch a graph of $f(x) = \\begin{cases} 2 & \\text{if } x \\leq -1 \\\…

Pregunta

Pasos de solución

Step1: Analyze the first piece ($x \leq -1$)

Step2: Analyze the second piece ($-1 < x \leq 1$)

Step3: Analyze the third piece ($x > 1$)

Respuesta

Explanation

Step1: Analyze the first piece ($x \leq -1$)

Step2: Analyze the second piece ($-1 < x \leq 1$)

Step3: Analyze the third piece ($x > 1$)

Answer

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