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(2) In \( \triangle A B C , A - P - B \) and \( A - Q - C \) such that \( \operatorname { seg } P Q \| \) side \( B C \) and \( \operatorname { seg } P Q \) divides \( \triangle A B C \) in two parts whose areas are equal. Find the value of \( \frac { B P } { A B } \)

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