Answer :
Answer: The boat moved 768.51 feet in that time .
Step-by-step explanation:
Since we have given that
Height of the lighthouse = 1000 feet
Angle depression to boat 'a' = 29°
Angle of depression to shore 'b' = 44°
Consider ΔABC,
[tex]\tan 44\textdegree=\frac{AB}{BC}\\\\\tan 44\textdegree=\frac{1000}{BC}\\\\BC=\frac{1000}{\tan 44\textdegree}\\\\BC=1035.53\ feet[/tex]
Now, Consider, ΔABD,
[tex]\tan 29\textdegree=\frac{AB}{BD}\\\\\tan 29\textdegree=\frac{1000}{BD}\\\\BD=\frac{1000}{\tan 29\textdegree}\\\\BD=1804.04\ feet[/tex]
We need to find the distance that the boat moved in that time i.e. BC
so,
[tex]DC=BD-BC\\\\CD=1804.04-1035.53\\\\CD=768.51\ feet[/tex]
Hence, the boat moved 768.51 feet in that time .
