Question

2. In the adjoining figure, E is midpoint of the median AD of AABC. Show that
ar (AABE) = ar (AACE)
D
​

Answer 1

Answer:

given AD is median

to prove ar(ABE) ar(ACE)

Step-by-step explanation:

in abe and ace

1. so you you can use the Pythagoras theorem for the Section formula Theorem by this you can send our answer to me and if any doubt is there you can compare with me I will send you the photo after 2 days ok thank you

Answer 2

Answer:

given that e is mid point and AD is median of ABC

• Step-by-step explanation:
• InABC AD is the median
• according to theorem median can divide two triangle at equal areas
• so ar(ABD=ACD)......eq. 1
• inEBD ED is the median
• according to the theorem median can divide to triangle at equal area
• so ar(EBD=ECD)......eq. 2
• now subtract eq. 2 from eq. 1
• ABD -EBD= ACD - ECD
• ar(ABE)=ar(ACE)
• hope it's help you