Solve
Guides
0
You visited us 0 times! Enjoying our articles? Unlock Full Access!
Question

"I is equidistant from the vertices of the triangle.\n10. \\( A B C \\) is a triangle in which \\( D \\) is the midpoint of \\( A C \\) . \\( B D \\) is produced to \\( E \\) such that \\( B D = \\) DE.Prove\nthat \\( A E \\) is equal and parallel to \\( B C \\) ."

Open in App
Solution
Verified by Toppr


Was this answer helpful?
0
Similar Questions
Q1

In a Δ ABC, BD is the median to the side AC, BD is produced to E such that BD = DE.

Prove that : AE is parallel to BC.

View Solution
Q2
In a $$ \Delta ABC , BD $$ is the median to the side AC , BD is produce to E such that BD = DE
Prove that AE is parallel to BC.
View Solution
Q3

In a ΔABC, BD is the median to the side AC, BD is produced to E such that BD = DE.

Hence, AE parallel to BC.

State whether the above statement is true or false.


View Solution
Q4
In ABC,AB=AC. BC is a extended on both sides to E and D respectively such that VE=BD. Prove that AD=AE.
View Solution
Q5
In ABC, it is given that D is the midpoint of BC; E is the midpoint of BD and O is the midpoint of AE. Then, ar( BOE)=?

View Solution