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28 March, 23:30

Paddling with the current in a river, jake traveled 16 miles. Even though he paddled upstream for an hour longer than the amount of the time he paddled downstream jake could only travel 6 miles against the current. I'm still waterJake paddles at a rate of 5 mph. What is the speed of the current I the river

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  1. 28 March, 23:55
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    Answer: the rate of the current is 3 mph.

    Step-by-step explanation:

    Let x represent the rate of the current.

    In still water, Jake paddles at a rate of 5 mph. Paddling with the current in a river, Jake traveled 16 miles. It means that the speed with which she travelled downstream (with the current) is (5 + x) mph

    Time = distance/speed

    Time spent in paddling downstream is

    16 / (5 + x)

    While paddling upstream, it took an hour longer. The speed with which he paddled upstream is (5 - x) mph.

    Jake could only travel 6 miles against the current. It means that the time spent in travelling upstream us

    6 / (5 - x)

    Since it took 1 hour longer, then

    6 / (5 - x) = 16 / (5 + x) + 1

    Cross multiplying by (5 - x) (5 + x), it becomes

    6 (5 + x) = 16 (5 - x) + 1 (5 + x) (5 - x)

    30 + 6x = 80 - 16x + 25 - 5x + 5x - x²

    30 + 6x = - x² - 16x + 5x - 5x + 25 + 80

    30 + 6x = - x² - 16x + 105

    x² + 16x + 6x + 30 - 105 = 0

    x² + 22x - 75 = 0

    x² + 25x - 3x - 75 = 0

    x (x + 25) - 3 (x + 25) = 0

    x - 3 = 0 or x + 25 = 0

    x = 3 or x = - 25

    Since x cannot be negative, then x = 3 mph
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