The reason I'm solving it here is simply to help those of you who will be homeschooling your child thru high school geometry. It helps enormously to be familiar with proofs and the type of reasoning before you actually need to write proofs yourself.
Problem:
80. Prove that if two sides and the median drawn to the first of them in one triangle are respectively congruent to two sides and the median drawn to the first of them in another triangle, then such triangles are congruent.
First draw a picture. We have two triangles with certain parts congruent, and we are supposed to prove that the triangles are congruent.
We know that AB = A'B', AC = A'C', and BM = B'M' (givens).
This proof in a nutshell is based on first proving that the two triangles AMB and A'M'B' and congruent (by SSS), from which follows that angle BAC = angle B'A'C'. Then the original triangles are congruent by SAS.
Consider now the two triangles AMB and A'M'B'. We already know two of their corresponding sides are congruent - AB = A'B', and BM = B'M'. But even their third sides are congruent, because by the fact M is a midpoint of AC, AM = 1/2AC and similarly A'M' = 1/2A'C'. Since AC and A'C' are congruent, it follows that half of those line segments, or AM and A'M' are congruent also.
By the SSS congruence theorem (or postulate; if your book calls it that) for triangles, the triangles AMB and A'M'B' are congruent.
Therefore their corresponding angles are congruent also. In particular, the angle BAC = angle B'A'C'.
So we have side AB, angle BAC, and side AC congruent to the side A'B', angle B'A'C', and side A'C', respectively, in the other triangle.
Now it follows by the SAS congruence theorem that the two triangles are congruent.
Tags: math, geometry, proof, triangles
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