In the below figure , a square ABCD of area 225, E is the intersection of BD and the semicircle of diameter AD, and CF is tangent to the semicircle. Then, what is the area of DEF?
S1 = S/10 = 225/10 = 22.5
Let FD, OC meet at X Then AFD, FXC,DXC are all congruent triangles and since each are similar to Tr.ODC, OC = sqrt5 a/ 2 where a = side of the square Hence XD = a^2/4 /((sqrt5 a/2)/2) = a/sqrt5 = AF S(AFD) = S(ODC) AF^2/OD ^2 = a^2/5 S(FCD) = 2a^2/5 So d the altitude from F in Tr. AFD = a^/5/(a/2) = 2a/5 So S(BFC) = (1/2)(3a/5)a = 3a^2/10 Hence S(BFD) = 2a^2/5+3a^2/10-a^2/2 = a^2/5 Therefore S(FED) = S(BFD)/2 = a^2/10 = S/10
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