Now that I'm caught up with the current New York State Regents exams, I'm revisiting some older ones.
More Regents problems.
Geometry Regents, June 2013
Part IV: A correct answer will receive 6 credits. Partial credit is possible.
Prove: ∠MBA ≅ ∠ATM
38. In the diagram of MAH below, MH ≅ AH and medians AB and MT are drawn.
Answer:
To prove that ∠MBA and ∠ATM are congruent, you may first wamt to prove that traingles MBA and ATM are congruent. However, you don't have enough information. I remember this problem first appearing, and I remember several math teachers trying to reason it out. When they got to around 11 steps, which they felt certain couldn't be the best approach, another teacher pointed out a different method.
A better approach is to show that triangle HTM ≅ triangle HBA.
We know that this is an isosceles triangle, which gives us a pair of sides. We have medians which give us a second side. And angle H is congruent to itself with the reflexive property.
| Statement | Reason |
| 1. MH ≅ AH, AB and MT are medians | Given |
| 2. B and T are midpoints | Definition of median |
| 3. BH ≅ TH | Division Property of Equality |
| 4. ∠H ≅ ∠H | Reflexive Property |
| 4. Triangle HTM ≅ triangle HBA | SAS |
| 5. ∠HBA ≅ ∠HTM | CPCTC |
| 6. ∠MBA ≅ ∠ATM | Angles supplementary to congruent angles are congruent. |
End of Exam.
More to come. Comments and questions welcome.
More Regents problems.
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