ABCD is a parallelogram. X and Y are mid-points of BC and CD respectively.
Prove that ar (AXY) = a (3/8 ABCD).
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Answers
Answer:
Given that ABCD ia a //gm. X and Y are the mid points of BC and CD
Construction: Join BD
Since X and Y are the mid points of sides BC and CD respectively, therefore in triangle BCD, XY//BD and XY=1/2 BD
implies area of triangle CYX= 1/4 area of triangle DBC
{ In triangle BCD, if X is the mid point of BC and Y is the mid pt of CD then area triangle CYX=1/4 area triangle DBC}
IMPLIES AREA TRIANGLE CYX= 1/8 area //gm ABCD
[Area of//gm is twice the area of triangle made by the diagonal]
Since //gm ABCD and triangle ABX are between same // lines AB and BC and BX=1/2BC
Therefore, area triangle ABX= 1/4 area //gm ABCD
Similarly, area triangle AYD= 1/4 area //gm ABCD
Now, area triangle AXY= area//gm ABCD- {ar triangleABX + ar AYD + ar CYX}
= ar//gmABCD - {1/4 + 1/4 + 1/8} area //gmABCD
=area//gmABCD- 5/8 area //gmABCD
=3/8 area //gm ABCD.
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Step-by-step explanation: