T(0) = 800 m, T(40) = 800 − 15×40 = 800 − 600 = 200 m - Crosslake

Understanding the Context

The Formula Explained

The equation T(t) = 800 − 15×t models a linear decrease in distance:

• At t = 0, the initial distance is T(0) = 800 m, meaning the object starts 800 meters from a reference point.
  
• The coefficient −15 represents a constant rate of reduction: the object loses 15 meters each second.
  
• At t = 40 seconds, computing T(40) = 800 − 15×40 = 800 − 600 = 200 m, we find the object has traveled 600 meters and now lies 200 meters away.

Key Insights

Calculating Distance and Speed

Let’s break down the timeline:

| Time (s) | Distance (m) — T(t) = 800 − 15t | Distance Traveled (m) | Constant Velocity (m/s) |
|----------|-------------------------------|-----------------------|-------------------------|
| 0 | 800 | — | — |
| 40 | 200 | 600 (800 − 200) | 15 |

The velocity (rate of change of distance) is constant at −15 m/s, indicating uniform deceleration or a controlled reduction in position over time.

Final Thoughts

Visual Representation: Distance vs. Time Graph

Plotting T(t) against time shows a downward-sloping straight line:

• X-axis: time in seconds
  
• Y-axis: distance in meters
  
• Start point (0, 800)
  
• End point (40, 200)

This linear graph visually confirms the constant withdrawal of 15 m per second.