Consider a right triangle with an inscribed circle. Let x and y be the lengths of the two line segments formed on the hypotenuse by the point of tangency with the circle. What interesting fact can you prove about x*y?
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E
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C
B
The
given right triangle is ACB, the center of the incircle is O. The
incircle is tangent to the hypotenuse at T. We wish to demonstrate that
the area x*y of the rectangle EOGD is equal to the area of ACB.
Observe that EOGD - FTO - HTO + AEF + HGB = ADB. But AEF = FTO
and HTO = HGB. Hence area EODG = area ADB. But ADB = ACB
and thus we have area EODG = area ACB as desired.
Edited on March 9, 2005, 12:36 am
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Posted by Richard
on 2005-03-01 00:48:56 |
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