Conference rusure::math

814.0. "<><><> The hat overboard problem ... <><><>" by KEEPER::KOSTAS (He is great who confers the most benefits.) Fri Jan 08 1988 12:05

    Hello,
    
         This is the "Hat overboard" problem:
    
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    In a straight stream are two stationary stakes visible above
    the sourface, a mile apart, one directly upstream from the
    other. A man is rowing a boat upstream, between the two stakes
    making some progress against the current, and consequently 
    approaching the upstream stake just as he passes it his hat blows
    off and goes flating downstream. He rows upstream for ten minutes
    more ans then turns and rows downstream. He overtakes his hat
    just as they pass the downstream stake.
    
    How fast is the current flowing in the river?
    _________________________________________________________________
    
    
    Enjoy,
    
    Kostas G.
    

     spoiler (?)


     approximately nine billionths of the speed of light :^)

    Consider the moving river as the frame of reference.  The man's hat goes
    into the water, he rows away from it for 10 minutes, then rows back toward
    it (and overtakes it in another 10 minutes, we conclude).

    The view from the bank shows that the hat (and hence the river current)
    moves 1 mile in these 20 minutes; 1 mile / 20 minutes = 3 miles / hour,
    and that's how fast the river flows.

    Oops.  Silly me.  I think I forgot to double the ten minutes.
    
    Dan