Bunuel wrote:
The figure above shows squares PQRS and TUVW, each with side of length 6, that lie on line n. If RM = MW, then RW =
(A) 2√3
(B) 6
(C) 4√3
(D) 6√2
(E) 10
[Reveal] Spoiler:
Need to find\(RW=2RM\)
In triangle QRM & TMW,\(QR=TW\) ,\(RM=MW\) and angle\(QRM=TWM=90°\) . Hence both the triangles are congruent
This implies angle\(QMR=TMW=60°\) . Hence triangle QRM is a\(30°-60°-90°\) triangle so the ratio of
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