QUESTION IMAGE
Question
in the diagram of right triangle srq below, altitude \\(\overline{rp}\\) is drawn. which of the following ratios is equivalent to \\(\tan s\\)?
answer
\\(\frac{sr}{rq}\\) \\(\frac{rp}{rq}\\) \\(\frac{pr}{sp}\\) \\(\frac{pr}{sr}\\)
Step1: Define tan S in △SRQ
$\tan S = \frac{\text{opposite}}{\text{adjacent}} = \frac{RQ}{SR}$
Step2: Identify similar triangles
△SRP ~ △SQR (AA similarity: ∠S common, right angles)
Step3: Find equivalent ratio
From similarity: $\frac{PR}{RQ} = \frac{SP}{SR} \implies \frac{PR}{SP} = \frac{RQ}{SR} = \tan S$
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$\frac{PR}{SP}$