Answer:
Given Parallelogram EFGH
EG bisects HF and HF bisects EG, if and only if both the diagnols have same mid point.
Step-by-step explanation:
Step 01:
Let
E be the point (a,b)
F be the point (a',b)
G be the point (a',b')
H be the point (a,b')
Step 02:
Now find mid points of EG and HF
mid point of EG = ( [tex]\frac{a+a'}{2}[/tex], [tex]\frac{b+b'}{2}[/tex] ) and
mid point of HF = ( [tex]\frac{a'+a}{2}[/tex],[tex]\frac{b'+b}{2}[/tex] )
Since addition is commutative, and they have the same mid-point, so they bisect each other.
