Answer: The distance from point E to the lighthouse = 250 feet
Step-by-step explanation:
Since, after making the diagram of this situation,
We get two triangles ABC and CED,
In which AB = 90 feet, BC = 36 feet and CE = 100 feet,
Now,
[tex]\angle ACB\cong \angle ECD[/tex] ( Vertically opposite angles )
[tex]\angle ABC\cong \angle DEC[/tex] ( Right angles )
By AA similarity postulate,
[tex]\triangle ABC\sim \triangle DEC[/tex]
By the property of similar triangles,
[tex]\frac{AB}{ED}=\frac{BC}{EC}[/tex]
[tex]\frac{90}{ED}=\frac{36}{100}[/tex]
[tex]9000=36DE[/tex]
[tex]250=DE[/tex]
Since, point D represents the lighthouse.
Hence, the distance from point E to the lighthouse = 250 feet
