ABCD is a parallelogram, if E is the mid point of BC and AE is bisector of angleA , prove that AB =1/2 AD
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let DE cut AB extended at F
We have BE=EC
angle (BEF)= angle (DEC)
∠(FBE)=∠(ECD)
so triangle CED congruent to BEF ( case ASA)
so EF= ED and CD=BF=AB
∴ inΔ ADF, AE is the median and angle bisector of angle A so triangle ADF is isoceles.
so AD= AF=2.AB => AB= 1/2 AD
HOPE IT HELP U DEAR THEN MARK AS BRAINLIEST PLS...
We have BE=EC
angle (BEF)= angle (DEC)
∠(FBE)=∠(ECD)
so triangle CED congruent to BEF ( case ASA)
so EF= ED and CD=BF=AB
∴ inΔ ADF, AE is the median and angle bisector of angle A so triangle ADF is isoceles.
so AD= AF=2.AB => AB= 1/2 AD
HOPE IT HELP U DEAR THEN MARK AS BRAINLIEST PLS...
mohitsingh2641:
my pleasure..
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