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प्रश्न
The diagonals of trapezium PQRS intersect each other at O. Prove that: `(PO)/(OR) = (QO)/(OS)`
योग
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उत्तर
Since PQ || SR, and the diagonals PR and QS intersect at O:
Consider triangles △POQ and △ROS.
We have:
- ∠POQ = ∠ROS because they are vertically opposite angles.
- ∠PQO = ∠RSO because PQ || SR, and QO and SO lie on the same line QS.
Therefore, △POQ ∼ △ROS by AA similarity.
So, the corresponding sides are proportional:
`(PO)/(OR) = (QO)/(OS) = (PQ)/(RS)`
Thus, `(PO)/(OR) = (QO)/(OS)`
Hence proved.
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