Question

Use ΔABC to answer the question that follows:

Given: ΔABC

Prove: The three medians of ΔABC intersect at a common point.

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:

Answer 1

Which is the most logical order of statements and justifications I, II, III, and IV to complete the proof?
II, III, I, IV
III, II, I, IV
II, III, IV, I
III, II, IV, I

Answer 2

please help?

Answer 3

the second attachement not can open it - sorry

Answer 4

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 ≅ Properties of a Parallelogram (diagonals bisect each other)
II and Midsegment Theorem
III and Substitution
IV BGCH is a parallelogram Properties of a Parallelogram (opposite sides are parallel)
is a median Definition of a Median

Answer 5

@brayden1

Answer 6

PLEase?

Answer 7

do you know what mean median og a triangle ?

Answer 8

what make a median inside a traingle ?

Answer 9

than you see this attached image - the median from angle C what make with opposite side AB ?

Answer 10

halfed it - yes ?

Answer 11

i kinda dont get it still. @jhonyy9

Answer 12

would you mind helping me with the answer. @jhonyy9

Answer 13

sorry but directly answer we here in openstudy dont giving never - so you need understanding what mean a median line and than you write inside a traingle these 3 medians you need to know what - where intersect these line

Answer 14

the answer that i think it is is the first one? @jhonyy9

Answer 15

@Photon336 could u help me plsss?