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35 votes
35 votes
Engineers and surveyors often determine distances that cannot be measureddirectly by using similar triangles like the ones shown below.30River42 ft80 ftUsing the information from the drawing, which of these is closest to the distancefrom Point Aon one bank to Point Eon the opposite bank?

User Alessionossa
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1 Answer

15 votes
15 votes

Answer:

102 feet

Step-by-step explanation:

First, find the length of AB:

In the larger triangle ADC:


\begin{gathered} \sin 30=(80)/(AB+42) \\ 0.5=(80)/(AB+42) \\ 0.5(AB+42)=80 \\ AB+42=(80)/(0.5) \\ AB=160-42 \\ AB=118 \end{gathered}

Since we already know the length of AB:


\begin{gathered} \cos 30=(AE)/(AB) \\ \cos 30=(AE)/(118) \\ AE=118*\cos 30 \\ AE=102.19 \\ AE\approx102\text{ f}eet \end{gathered}

The distance from Point A on one bank to Point E on the opposite bank is closest to 102 feet.

User Fkorsa
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