Ask Question
8 September, 14:52

Nicholas paddles his canoe downstream from the lodge to the park in 44 hours and then back upstream to the lodge in 55 hrs. If the distance from the lodge to the park is 3030 miles, find Nicholas' speed in still water and the speed of the current.

+5
Answers (1)
  1. 8 September, 15:21
    0
    Nicholas' speed: 61.9772 miles/hour

    current's speed: 6.8864 miles/hour

    Explanation:

    Let's call Nicholas's speed "x", and the current speed "y".

    Going downstream, the total speed is x+y, and we can formulate the equation:

    (x+y) * 44 = 3030 - > x+y = 68.8636 miles/hour

    Going upstream, the total speed is x-y, and we can formulate the equation:

    (x-y) * 55 = 3030 - > x-y = 55.0909 miles/hour

    If we sum both equations, we have that:

    2x = 123.9545

    x = 61.9772 miles/hour

    Now, to know the current speed, we just apply "x" value in one of the equations:

    x+y = 68.8636 - > 61.9772 + y = 68.8636 - > y = 6.8864 miles/hour
Know the Answer?
Not Sure About the Answer?
Find an answer to your question 👍 “Nicholas paddles his canoe downstream from the lodge to the park in 44 hours and then back upstream to the lodge in 55 hrs. If the distance ...” in 📗 Physics if the answers seem to be not correct or there’s no answer. Try a smart search to find answers to similar questions.
Search for Other Answers