Answer:
The distance of the ship to the shoreline is 113 meters
Step-by-step explanation:
Here we have the following information
Location of lighthouse = 10 m back from the edge of the shoreline
Height of beacon above sea level = 52 m
Level of the eyes of Lucy above sea level = 12 m
Angle of elevation of the beacon from Lucy = 18°
Therefore, the beacon, the elevation of the eyes of Lucy and the base of the lighthouse at the same elevation with Lucy form a right triangle with opposite side to angle = 52 m and angle = 18 °
Therefore, from
[tex]Tan\theta =\frac{sin\theta }{cos\theta } = \frac{Opposite \, side \, to\, angle}{Adjacent\, side \, to\, angle}[/tex]
We have
[tex]Tan18 =\frac{52-12}{Adjacent } = \frac{40}{Adjacent}[/tex]
0.325 = [tex]\frac{40}{Adjacent}[/tex]
Where the adjacent side is the distance of the ship from the lighthouse
Adjacent side = 40/0.325 = 123.107 meters
We recall that the lighthouse is 10 m back from the edge of the shoreline, therefore the ship is 123.107 - 10 or 113.107 meters from the shore line which is 113 meters to the nearest meter.
