Respuesta :
Time taken before they are 2640 feet is 146.67 seconds
Solution:
The distance is given by formula:
[tex]distance = speed \times time[/tex]
Ton travels at 8 feet per second
Let us assume, time taken = t
speed = 8 feet per second
Then, distance is given as:
Distance covered by Ton = 8t
Bob travels at 10 feet per second
Then, distance is given as:
Distance covered by Bob = 10t
How long will it take before they are 2640 feet
Which means,
Distance covered by Ton + Distance covered by Bob = 2640
[tex]8t + 10t = 2640\\\\18t = 2640\\\\Divide\ both\ sides\ of\ equation\ by\ 18\\\\t = 146.67[/tex]
Thus time taken before they are 2640 feet is 146.67 seconds
Method 2:
Since trains are moving in opposite directions, their speeds must be added
speed = 8 + 10 = 18 feet per second
Given distance = 2640 feet
Therefore, time taken is:
[tex]time = \frac{distance}{speed}\\\\time = \frac{2640}{18} = 146.67 \text{ second }[/tex]
Thus time taken before they are 2640 feet is 146.67 seconds
