E,F,G and H respectively the mid-point of the sides AB,BC,CD and DA of a parallelogram ABCD. show that the quadrilateral EFGH is a parallelogram and its area is half the area of the parallelogram ABCD.
Answers
the quadrilateral EFGH is a parallelogram and its area is half the area of the parallelogram ABCD.hence proved.
Step-by-step explanation:
Given :-
→ ABCD is a ||gm .
→ E, F G and H are respectively the midpoints of the sides AB, BC, CD and AD of a ||gm ABCD .
▶ To Prove :-
→ ar(EFGH) = ½ ar(ABCD).
▶ Construction :-
→ Join FH , such that FH || AB || CD .
Since, FH || AB and AH || BF .
→ •°• ABFH is a ||gm .
∆EFH and ||gm ABFH are on same base FH and between the same parallel lines .
•°• ar( ∆ EFH ) = ½ ar( ||gm ABFH )............. (1) .
▶ Now,
Since, FH || CD and DH || FC .
→ •°• DCFH is a ||gm .
∆FGH and ||gm DCFH are on same base FH and between the same parallel lines .
•°• ar( ∆ FGH ) = ½ ar( ||gm DCFH )............. (2) .
▶ On adding equation (1) and (2), we get
==> ar( ∆ EFH ) + ar( ∆ FGH) = ½ ar( ||gm ABFH ) + ½ ar( ||gm DCFH ) .
==> ar( ∆ EFH ) + ar( ∆ FGH) = ½ [ ar( ||gm ABFH ) + ar( ||gm DCFH ) ] .
•°• ar(EFGH) = ½ ar(ABCD). ........
✔✔ Hence, it is proved ✅✅.
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