A segment that connects the midpoints of two segments of a triangle. A proof that uses geometric figures on the coordinate plane. parallel half
1/2 1/2 90 45in 2 2 45 90in G H GH = 1/2 DF = 1/2(45) = 22.5in
midpoint midpoint midsegment Midsegment Theorem If V is the midpoint of QR, then I'd know SV is parallel to PR and half the length of PR.
(0, 0) origin axis side length three
√(s - 0)2 + (s - 0)2 √s2 + s2 √2s2 s√2 s + 0 2 , 2 s ,
The length and midpoint of AC will be the same as BD (2√s and ) because the diagonals use the same horizontal and vertical values (s). 2 s ,