Question 48323: Travelling at full speed agaist the current of a river, a
motorboat moves at the rate of 12 kilometers per hour relative
to the land. Travelling at half speed with the current, it
moves 8 kilometers per hour. find the maximum speed of the boat
in still water.
Answer by AnlytcPhil(1806)   (Show Source):
You can put this solution on YOUR website! Travelling at full speed agaist the current of a river, a
motorboat moves at the rate of 12 kilometers per hour relative
to the land. Travelling at half speed with the current, it
moves 8 kilometers per hour. find the maximum speed of the boat
in still water.
Let x = maximum speed in still water in k/h
Let y = speed of the river current in k/h.
The river current slows the boat down from speed x k/h
to x-y k/h, so
>>...travelling at full speed agaist the current of a river,
a motorboat moves at the rate of 12 kilometers per hour relative
to the land...<<
tells us
x - y = 12
When the boat travels at half speed with the current, the current
speeds up the boat from half speed (1/2)x k/h to (1/2)x+y k/h, so
>>...travelling at half speed with the current, it moves 8
kilometers per hour...<<
tells us
(1/2)x + y = 8
so we have this system of 2 equations in 2 unknowns:
x - y = 12
(1/2)x + y = 8
Can you solve that?
x = 40/3 k/h, y = 4/3 k/h
So the boat goes 13 1/3 k/h in still water, and the
current's speed is 1 1/3 k/h
Edwin
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