If |AH| = 12, what is the value of |MZ|?
Since A and H are midpoints, segment AH is the midsegment of ΔMTZ.
A midsegment in a triangle is half the length of the side it is parallel to.
∣
𝐴
𝐻
∣
=
1
2
∣
𝑀
𝑍
∣
∣AH∣=
2
1
∣MZ∣
Given |AH| = 12, solving for |MZ|:
∣
𝑀
𝑍
∣
=
2
×
∣
𝐴
𝐻
∣
∣MZ∣=2×∣AH∣
Mathbot Says...
I wasn't able to parse your question, but the HE.NET team is hard at work making me smarter.