PQRS is a parallelogram. A is the midpoint of PQ and B is the midpoint of SR. Show that AQ BS is a AQ BS is a parallelogram Hint: Prove that TRIANGLE SAB≈TRIANGLE QBA
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Step-by-step explanation:
Given: PQRS is a parallelogram & A,B are the mid points on PQ and RS
To Prove : PARB is a parallelogram
Proof: As given A and B are the mid points , by the mid point theorem AB parallel to QS is parallel to PR
hence, PR parallel to AB ....( 1 )
And as give PQ equal to RS as it is a parallelogram and PA equal to QA ,RB equal to SB
therefore, PA parallel to RB as PQ parallel to RS ...( 2 )
By using (1) and (2) PA parallel to RB and PR parallel to AB
Therefore, PARB is a parallelogram
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