Respuesta :
Answer:
The distance between the ship at N 25°E and the lighthouse would be 7.26 miles.
Step-by-step explanation:
The question is incomplete. The complete question should be
The bearing of a lighthouse from a ship is N 37° E. The ship sails 2.5 miles further towards the south. The new bearing is N 25°E. What is the distance between the lighthouse and the ship at the new location?
Given the initial bearing of a lighthouse from the ship is N 37° E. So, [tex]\angle ABN[/tex] is 37°. We can see from the diagram that [tex]\angle ABC[/tex] would be [tex]180-37=[/tex] 143°.
Also, the new bearing is N 25°E. So, [tex]\angle BCA[/tex] would be 25°.
Now we can find [tex]\angle BAC[/tex]. As the sum of the internal angle of a triangle is 180°.
[tex]\angle ABC+\angle BCA+\angle BAC=180\\143+25+\angle BAC=180\\\angle BAC=180-143-25\\\angle BAC=12[/tex]
Also, it was given that ship sails 2.5 miles from N 37° E to N 25°E. We can see from the diagram that this distance would be our BC.
And let us assume the distance between the lighthouse and the ship at N 25°E is [tex]AC=x[/tex]
We can apply the sine rule now.
[tex]\frac{x}{sin(143)}=\frac{2.5}{sin(12)}\\ \\x=\frac{2.5}{sin(12)}\times sin(143)\\\\x=\frac{2.5}{0.207}\times 0.601\\ \\x=7.26\ miles[/tex]
So, the distance between the ship at N 25°E and the lighthouse is 7.26 miles.
