My kid was assigned this problem:

Given

$\overline{AC}\cong\overline{AB}$ and $\angle B\cong\angle C$.

Prove (a) $\overline{CE}\cong\overline{BD}$ and (b) $\overline{OB}\cong\overline{OC}$.

(I apologize for the ugly sketch. All lines that seem like they're meant to be straight are.)

The most direct way seems to be: Prove triangles $CAD$ and $BAE$ congruent (easy). Prove triangles $COE$ and $BOD$ similar (easy). Prove triangles $COE$ and $BOD$ congruent because they're similar and have the same area (by subtracting the common area of $ADOE$). The rest follows immediately.

The problem is — I don't recall ever seeing in a high-school geometry text the proposition "If two triangles are similar and have the same area, they're congruent". Or at least not as a method of proof for proving triangles congruent. So I guess my question is: Why not? It would certainly come in handy for cases like this. (Or am I wrong that it's correct in general?)

As a secondary question, is there a better way to do the problem above?

posted about 4 years ago

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msh210‭

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