View the step-by-step solution to:

Question

of a triangle proportionally is parallel to the third side. Be sure to createAnd name the appropriate geometric figures. (10 points)

2. (05.03 MC)
In the figure below, DEC . &lt;DCE, &lt;B - &lt;F, and DF = BD . Point C is the point of intersection between AG and BD while point E is the point of intersection between
AG and DF .
D
A
C
E
G
B
F
Prove AABC - AGFE. (10 points)

3. (05.03 MC)
Look at the figure below:
N
50'
M
T
50
P
Make a two-column proof showing statements and reasons to prove that triangle NMT is similar to triangle PMN. (10 points)

We have similarity and... View the full answer

Let me explain the... View the full answer

Triangle Proportionality
Think about a midsegment of a triangle. A
midsegment is parallel to one side of a
triangle and divides the other two sides into
congruent halves. The midsegment divides...

Triangle Proportionality Theorem: If a line
parallel to one side of a triangle intersects
the other two sides, then it divides those
sides proportionally.
Triangle Proportionality Theorem
Converse...

### Why Join Course Hero?

Course Hero has all the homework and study help you need to succeed! We’ve got course-specific notes, study guides, and practice tests along with expert tutors.

• ### -

Study Documents

Find the best study resources around, tagged to your specific courses. Share your own to gain free Course Hero access.

Browse Documents