Read the scenario. A car increases its position at a constant velocity for 5 s. Then, it stops for 5 s. Which option provides a true statement about a distance-time graph created to represent this motion?

The slope of the graph would be negative and constant for 5 s. Then, the slope would be 0 for 5 s because the slope represents velocity.

The slope of the graph would be increasing for 10 s because the slope represents the passing of time.

The slope of the graph would be positive and constant for 5 s. Then, the slope would be 0 for 5 s because the slope represents velocity.

The slope of the graph would be positive and increasing for 5 s. Then, the slope would be constant for 5 s because the slope represents velocity.

please help!

it was the third option

The slope of the graph would be positive and constant for 5 s. Then, the slope would be 0 for 5 s because the slope represents velocity.

Sure, I'd be happy to help! Based on the given scenario, the correct statement about the distance-time graph would be: The slope of the graph would be positive and constant for 5 seconds. Then, the slope would be 0 for 5 seconds because the slope represents velocity. So the correct option is: "The slope of the graph would be positive and constant for 5 s. Then, the slope would be 0 for 5 s because the slope represents velocity."

The correct option that provides a true statement about a distance-time graph created to represent this motion is:

The slope of the graph would be positive and constant for 5 s. Then, the slope would be 0 for 5 s because the slope represents velocity.

Since the car is increasing its position at a constant velocity for 5 s, the slope of the graph would be positive and constant. Then, when the car stops for 5 s, its velocity would be 0, resulting in a slope of 0 on the graph. The slope represents the velocity, and if the car is not moving, the slope would be 0.

To determine the correct option, let's consider the information provided in the scenario.

The car increases its position at a constant velocity for 5 seconds. This means that the car is moving in a straight line without changing its speed for 5 seconds.

Next, the car stops for 5 seconds, which means its position remains constant.

Based on this information, we can determine the correct option by considering the relationship between the slope of a distance-time graph and velocity.

The slope of a distance-time graph represents velocity, which is the rate of change of distance with respect to time.

For the first 5 seconds when the car is moving at a constant velocity, the slope of the graph would be zero. This is because the car is not changing its position during this time.

Then, during the next 5 seconds when the car stops, the slope of the graph would also be zero. This is because the car's position is not changing.

Therefore, the correct option is: The slope of the graph would be 0 for 5 s because the slope represents velocity.