Answer:
Explanation:
Sure, let's sketch a distance-time graph depicting uniform velocity.
In a distance-time graph with uniform velocity, the distance covered increases steadily over time at a constant rate. This results in a straight line with a constant slope.
Let's say the uniform velocity is \( v \) meters per second (m/s). We'll start at the origin (0,0) and draw a straight line with slope \( v \). The equation for this line can be written as:
\[ \text{Distance} = v \times \text{Time} \]
Here's the sketch:
```
| /
| /
Dist | /
| /
| /
| /
| /
| /
| /
| /
|/
-----------------
Time
```
Now, to find the distance covered from this graph, we can use the formula for distance:
\[ \text{Distance} = \text{Velocity} \times \text{Time} \]
Given that the velocity is uniform and equal to \( v \), and the time is \( t \), the distance covered would be:
\[ \text{Distance} = v \times t \]
So, to find the distance covered, we multiply the velocity by the time traveled.
