Make a graph on a sheet of paper. Then answer the question.

To analyze the function \( d = |400 - 40t| \), let's start by understanding its key features:

1. Distance Interpretation: The equation models the distance \( d \) from you at the start (when \( t = 0 \)) with the car initially 400 feet away from you, traveling towards you at a speed of 40 feet per second.

2. Finding the Vertex: The expression inside the absolute value, \( 400 - 40t \), becomes zero when you set it equal to zero: \[ 400 - 40t = 0 \ 40t = 400 \ t = 10 \] Therefore, the vertex of the function occurs at \( (10, 0) \). This means that 10 seconds after starting, the car will be at your location (distance \( d = 0 \)).

3. Behavior of the Function:

   • For \( t < 10 \), the distance \( d \) is decreasing as the car approaches you.
   • For \( t > 10 \), the distance \( d \) increases again as the car moves past you.

4. Domain and Range:

   • Domain (t): Since time cannot take negative values in this context, the domain is \( t \geq 0 \).
   • Range (d): The distance can never be negative, so the range is \( d \geq 0 \).

5. Graph Behavior: The graph is a V-shaped function due to the absolute value, with the vertex at \( (10, 0) \) representing the point where the car meets you.

Conclusion of Key Features:

From the given options, the correct interpretation of the key features of the function \( d = |400 - 40t| \) is:

There is a vertex at (10, 0) which indicates that after 10 seconds the car is at the same location as you.

Correct answer choice: "There is a vertex at (10, 0) which indicates that after 10 seconds the car is at the same location as you."