You can
put this solution on YOUR website! a boat takes 2 hours longer to go 45 miles up a river than to return. If
the boat's speed in still water is 12 mph, what is the rate of the current
Let x = the rate of the current.
Therefore the boat's rate going against the current is slowed down by x mph
or 12-x
Similarly the boat's rate returning with the current is sped u by x mph
or 12+x
Make this chart
Distance | Rate | Time
_______________________|________|_____________
Going | | |
Returning | | |
Fill in the two rates, 12-x going and 12+x returning:
Distance | Rate | Time
_______________________|________|_____________
Going | | 12-x |
Returning | | 12+x |
Fill in the distances, both of which are 45 miles
Distance | Rate | Time
_______________________|________|_____________
Going | 45 | 12-x |
Returning | 45 | 12+x |
Now use TIME = DISTANCE/RATE to fill in the two times.
Distance | Rate | Time
_______________________|________|_____________
Going | 45 | 12-x | 45/(12-x)
Returning | 45 | 12+x | 45/(12+x)
Now use the part that we haven't yet used to make the equation:
>>...a boat takes 2 hours longer to go 45 miles up a river than to return...<<
Therefore
TIME GOING = TIME RETURNING + 2 HOURS
45/(12-x) = 45/(12+x) + 2
Can you solve that?
If not post again
Answers: x = 3 and x = -48
We discard the negative answer. The rate of the current is 3 mph.
Edwin
AnlytcPhil@aol.com
