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प्रश्न
In the following figure, D is the mid-point of BC, and PQ || BC. Prove that AD bisects PQ.
योग
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उत्तर
Let AD intersect PQ at R,
Since PQ || BC, consider triangles △APR and △ABD.
We get:
- ∠APR = ∠ABD because AP lies on AB and PR || BD.
- ∠ARP = ∠ADB because AR lies on AD and RP || DB.
So, △APR ∼ △ABD,
Hence,
`(PR)/(BD) = (AR)/(AD)`
Now consider triangles △ARQ and △ADC.
Similarly,
- ∠AQR = ∠ACD
- ∠ARQ = ∠ADC
Therefore, △ARQ ∼ △ADC
Hence, `(RQ)/(DC) = (AR)/(AD)`
So, `(PR)/(BD) = (RQ)/(DC)`
But D is the midpoint of BC, therefore BD = DC
Hence, PR = RQ
Therefore, R is the midpoint of PQ,
So, AD bisects PQ.
Hence proved.
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