Answer:
B. 1 2/3 h
Explanation:
Let t represent the time since the canoe left the campsite. The distance it covers is ...
distance = rate · time
distance = 8t
The time the motorboat travels is t-1 (1 hour less time than the canoe). The distance it covers is ...
distance = 20(t -1)
The two distances are equal at the time of interest, so we have ...
20(t -1) = 8t
20t -20 = 8t . . . . . eliminate parentheses
12t = 20 . . . . . . . . . add 20-8t to both sides
t = 20/12 = 5/3 = 1 2/3 . . . . hours after the canoe left
The motorboat overtakes the canoe 1 2/3 hours after the canoe left.
_____
Additional comment
The domain of the motorboat's distance function is t ≥ 1. It doesn't start moving until after the canoe has been gone for an hour.
The time after the motorboat starts is 2/3 hour. That is the time it takes to cover the initial difference in distance at a speed that is the difference in speeds: 8 km/(12 km/h) = 2/3 h. This problem asks for the time since the canoe started, so we need to add an hour to that.