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| An inscribed circle problem (Posted on 2006-12-31) |
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A circle is inscribed in a quadrilateral ABCD in such a manner that the circle is tangent to all the four sides of the quadrilateral. It is given that Angle BAD = 900= Angle CBA.
Find the radius of the circle given that: BC = 21 units and AD = 28 units.
What would be the radius of the inscribed circle if BC = 36 units and AD = 45 units?
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Submitted by K Sengupta
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Rating: 3.0000 (1 votes)
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Solution:
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Let r = radius of the circle inscribed in the trapezoid ABCD where:
Angle BAD = 90 degrees = Angle CBA
Therefore, AB = 2r
Let BC = b, AD = a
Now, we know that when a quadrilateral is circumscribed about a circle, so that the circle is tangent to all the four sides of the quadrilateral, then the sum of the lengths of opposite sides of the quadrilateral are equal.
(Reference:
http://www.artofproblemsolving.com/Books/IntroGeom/exc2.pdf; # 12.4.5)
Consequently, CD = a + b – 2r
Let us draw CK perpendicular to AD.
Then, CK = AB = 2r; KD = a-b.
Hence, from Triangle CKD:
CD^2 = CK^2 + KD^2
Or, (a+b-2r)^2 = 4*r^2 + (a-b)^2
Or, r = ab/(a+b)
For Part A:
Substituting a = 28; b = 21, we obtain:
r = 12.
For Part B:
Substituting a = 45; b = 36, we obtain:
r = 30.
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Also refer to the respective methodologies adopted by Charlie and Bractals, leading to the same solution, in the Comments section.
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Comments: (
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Subject |
Author |
Date |
 | solution | Charlie | 2006-12-31 12:52:35 |
| Solution | Bractals | 2006-12-31 12:23:31 |
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