A particle is moving along a horizontal straight line. The graph of the position function (the distance to the right of a xed point as a function of time) is shown below. Answer the following questions only on the interval (0, 8).

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**Text Description:** A particle is moving along a horizontal straight line. The graph of the position function (the distance to the right of a fixed point as a function of time) is shown below. Answer the following questions only on the interval (0, 8). **Graph Analysis:** - **Axes:** The graph has a horizontal axis ranging from -1 to 8 and a vertical axis ranging from -1 to 8. - **Curve Description:** The blue curve represents the position function of a particle over time. It starts at (1, 0), moves upward to a peak, then descends, and slightly rises in the end. - **Key Points:** - At time \( t = 1 \), the position is indicated at approximately (1, 0). - The curve reaches a maximum between \( t = 2 \) and \( t = 4 \), showing the peak of the particle’s position. - The curve descends after the peak and has another minor rise near the end of the interval. - **Interval:** The focus for answering questions is only between the time interval \( t = 0 \) to \( t = 8 \).

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**Particle Motion Analysis** 1. **When is the particle moving toward the right?** *Answer (in interval notation):* [Input box] 2. **When is the particle moving toward the left?** *Answer (in interval notation):* [Input box] 3. **When does the particle have positive acceleration?** *Answer (in interval notation):* [Input box] 4. **When does the particle have negative acceleration?** *Answer (in interval notation):* [Input box] --- **Note:** You can click on the graph to enlarge the image. [This page is meant to help students understand the concepts of particle motion using interval notation to identify specific phases of motion and acceleration.]