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In triangle RTS △RTS shown below, point U is on ST, and point V is on RT so that angle RST UVT∠RST≅∠UVT. If ST=13 VT=5, and RV=13.2, find the length of TU. Figures are not necessarily drawn to scale.
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In triangle RTS △RTS shown below, point U is on

ST, and point V is on RT so that angle RST UVT∠RST≅∠UVT. If ST=13 VT=5, and RV=13.2, find the length of TU. Figures are not necessarily drawn to scale.

In triangle RTS △RTS shown below, point U is on ST, and point V is on RT so that angle-example-1
User Awei
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1 Answer

12 votes

Answer: 7

Explanation:

As
\angle T \cong \angle T by the reflexive property, we know that
\triangle RST \sim \triangle UVT by AA.

Since corresponding sides of similar triangles are proportional,


(UT)/(5)=(13.2+5)/(13)\\UT=(5)\left((13.2+5)/(13) \right)=\boxed{7}

In triangle RTS △RTS shown below, point U is on ST, and point V is on RT so that angle-example-1
User Antoin
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5.9k points
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