To determine which two points indicate a rate of change of 80 km per hour, we can use the formula for the slope of a line, which is:
\[ \text{slope} = \frac{\text{change in distance}}{\text{change in time}} \]
In this case, we want the slope to equal 80 km/h. This means:
\[ 80 = \frac{\Delta \text{distance}}{\Delta \text{time}} \]
Rearranging gives us:
\[ \Delta \text{distance} = 80 \times \Delta \text{time} \]
Now, let's analyze the choices in terms of changes in distance and time.
Choice 1: Points (5, 400) and (6, 560)
- Change in distance = 560 - 400 = 160 km
- Change in time = 6 - 5 = 1 hour
- Rate = \(\frac{160}{1} = 160\) km/h (not 80 km/h)
Choice 2: Points (4, 320) and (6, 480)
- Change in distance = 480 - 320 = 160 km
- Change in time = 6 - 4 = 2 hours
- Rate = \(\frac{160}{2} = 80\) km/h (this is 80 km/h)
Choice 3: Points (4, 400) and (6, 480)
- Change in distance = 480 - 400 = 80 km
- Change in time = 6 - 4 = 2 hours
- Rate = \(\frac{80}{2} = 40\) km/h (not 80 km/h)
Choice 4: Points (4, 480) and (6, 600)
- Change in distance = 600 - 480 = 120 km
- Change in time = 6 - 4 = 2 hours
- Rate = \(\frac{120}{2} = 60\) km/h (not 80 km/h)
From the analysis, the only pair that results in a rate of change of 80 km per hour is:
(4, 320) and (6, 480).
1 answer