line segments and a semicircle,

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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The given function consists of line segments and a semicircle, as shown.

### Description of the Graph:

- **Function Components:**
  - **Line Segments:** 
    - From \((-4, -1)\) to \((-1, -1)\)
    - From \((1, 0)\) to \((3, 0)\)
    - From \((3, 0)\) to \((4, 2)\)
    - From \((4, 2)\) to \((6, 0)\)

  - **Semicircle:**
    - Centered at \( (0, 0) \) with a radius of 1, extending from \((-1, 0)\) to \( (1, 0) \).
    - Semicircle is beneath the x-axis, having a semicircular path dipping to \( (-1, \pi/2) \).

### Annotations:

- The point \((-4, -1)\) is labeled on the graph.
- The point \((4, 2)\) is labeled on the graph.

### Task:

Find 

\[
\int_{-4}^{6} [f(x) + 2] \, dx
\]

(approximated to 3 decimal places)
Transcribed Image Text:The given function consists of line segments and a semicircle, as shown. ### Description of the Graph: - **Function Components:** - **Line Segments:** - From \((-4, -1)\) to \((-1, -1)\) - From \((1, 0)\) to \((3, 0)\) - From \((3, 0)\) to \((4, 2)\) - From \((4, 2)\) to \((6, 0)\) - **Semicircle:** - Centered at \( (0, 0) \) with a radius of 1, extending from \((-1, 0)\) to \( (1, 0) \). - Semicircle is beneath the x-axis, having a semicircular path dipping to \( (-1, \pi/2) \). ### Annotations: - The point \((-4, -1)\) is labeled on the graph. - The point \((4, 2)\) is labeled on the graph. ### Task: Find \[ \int_{-4}^{6} [f(x) + 2] \, dx \] (approximated to 3 decimal places)
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