When written in the correct order, the two-column proof below describes the statements and justifications for proving the three medians of a triangle all intersect in one point. Which is the most logical order of statements and justifications I, II, III, and IV to complete the proof? III, IV, I, II III, IV, II, I IV, III, I, II IV, III, II, I
The answer I came up with isnt a answer choice idk what i did wrong II, IV, I,
Um, cool, where are the statements? xD
Statements Justifications Point F is a midpoint of Point E is a midpoint of Draw Draw by Construction Point G is the point of intersection between and Intersecting Lines Postulate Draw by Construction Point D is the point of intersection between and Intersecting Lines Postulate Point H lies on such that ≅ by Construction I BGCH is a parallelogram Properties of a Parallelogram (opposite sides are parallel) II ≅ Properties of a Parallelogram (diagonals bisect each other) III and Substitution IV and Midsegment Theorem is a median Definition of a Median
No idea :s @saifoo.khan @lgbasallote
Join our real-time social learning platform and learn together with your friends!