1. The problem asks us to identify which scenario best matches a graph where the distance from home increases steeply, then remains constant, and finally decreases. 2. The graph's y-axis is "Distance from Home (miles)" and the x-axis is "Time (minutes)". 3. The steep rise from the origin indicates moving away from home quickly. 4. The flat section means the distance from home stays the same over time (no movement). 5. The downward slope means the distance from home decreases, so the person is returning home or moving closer. 6. Let's analyze each scenario: - A: Rashid drives to the store (distance increases), daughter gets in (distance constant), then drives to grandmother's house (distance changes but not necessarily back). - B: Pablo rides bike to park (distance increases), stays (distance constant), then rides to friend's house (distance changes but not necessarily back). - C: Mia drives to concert (distance increases), stays for hours (distance constant), then drives home (distance decreases). - D: Anton walks to library (distance increases), reads (distance constant), then walks further to park (distance increases more, no decrease). 7. The graph shows distance increasing, then constant, then decreasing. 8. Only scenario C matches this pattern: Mia drives to concert (distance up), stays (constant), then drives home (distance down). Final answer: Scenario C best represents the graph.