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| SSS, SAS, ASA, and ... (Posted on 2013-10-02) |
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Let ABC and DEF be triangles with
∠ABC = ∠DEF > 90°,
|BC| = |EF|, and
|CA| = |FD|.
Prove that ΔABC ≅ ΔDEF with a direct geometric proof.
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Submitted by Bractals
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Rating: 5.0000 (1 votes)
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Solution:
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(Hide)
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Let [B' | E'] be the foot of the perpendicular from [C | F] to
the extension of side [AB | DE].
∠B'BC = 180° - ∠ABC = 180° - ∠DEF = ∠E'EF
∴ ΔBB'C ≅ ΔEE'F by AAS
∴ |BB'| = |EE'| and |B'C| = |E'F|
|AB'|2 = |AC|2 - |B'C|2 = |DF|2 - |E'F|2 = |DE'|2
∴ |AB'| = |DE'|
∴ |AB| = |AB'| - |BB'| = |DE'| - |EE'| = |DE|
∴ ΔABC ≅ ΔDEF by SSS
QED
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