Continuing on the original problem
here, posted by Jer.
During a gale a maypole was broken in such a manner that it struck the ground at a distance twenty feet from the base of the pole.
It was repaired without any gain or loss in its length.
Later it broke a second time at a point below the earlier by an amount exactly equal to the difference in length of the two sections of the first break.
How far did it strike this time from the base?
Since the length of the top section (l) and the length of the bottom (b) section during the first break satisfyl^2 - b^2 = 400, it follows that:
l>w, so that the respective lengths of the top and bottom section
during the first break are (a+b) and (a-b) (say).
So, (a+b)^2 - (a-b)^2 = 400, giving:
ab = 100
By the problem, the respective lengths of the top and bottom section during the second break are (a+b)+2b and (a-b)-2b
Let the distance that the maypole will strike this time
from the base be S feet.
Then:
S^2
= ((a+b)+2b)^2 - ((a-b)-2b)^2
= (2a)*(6b)
= 12ab
= 12*100
= 1200, giving:
S = v(1200) = 34.641
Thus, the distance that the maypole will strike this time
from the base is 34.641 feet ( approx.).
Edited on May 11, 2007, 3:09 pm
Puzzle Solution
