Question

The figure shows triangle ABC with medians AF, BD, and CE. Segment AF is extended to H in such a way that segment GH is congruent to segment AG

Which conclusion can be made based on the given conditions?

Segment GD is congruent to segment GF.

Segment GD is parallel to segment HC.

Segment GF is parallel to segment EB.

Segment BH is congruent to segment HC

Answer 1

99
@tkhunny
Champion | Moderator
is just looking around
99
surjithayer
Champion
is looking at group Mathematics
92
gorv
Mentor
is just looking around
79
@camerondoherty
@sidsiddhartha

is just looking around
72
zpupster


jagr2713

@pottersheep
Learner
is just looking around
61
@nickmifsud1223

@meg_72

Answer 2

I attatched the picture

Answer 3

@camerondoherty @surjithayer @grray7 @jagr2713

Answer 4

@jagr2713 @camerondoherty @@surjithayer

Answer 5

@surjithayer

Answer 6

ok give me a sec

Answer 7

Have you thought of using
SAS Similarity Theorem
If an angle of one triangle is congruent to the corresponding angle of another triangle and the lengths of the sides including these angles are in proportion, the triangles are similar.

Answer 8

show triangle AGD is similar to the big triangle AHC
which means corresponding angles are congruent

that in turn, lets you concluded corresponding angles of a transversal are congruent.

Answer 9

So A or D???

Answer 10

#1 Rule. You are more likely to get a helpful and expedient repsonse if you SHOW YOUR WORK up front.

#2 Rule. Tagging the world fits the definition of spam. Don't do it.

#3 Rule. If we are listed as "just looking around", it is very unlikely that we are just watching the world go by. There is always stuff to do.

#4 Rule. No guessing. Prove it!

How did you rule out B and C? Think it through. Reason it out.

Answer 11

I'm on the same question and I need help :(

Answer 12

Great. Post the question and show your work.