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# ISI Entrance (B.Math-B.Stat)

Let $$ABC$$ be a right-angled triangle with $$BC = AC = 1$$. Let $$P$$ be any point on $$AB$$. Draw perpendiculars PQ and PR on AC and BC respectively from P. De fine M to be the maximum of the areas of BPR, APQ and PQCR. Find the minimum possible value of M.

Note by Subhasis Biswas
1 year, 2 months ago

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