question\na boat heading out to sea starts out at point $a$, at a horizontal distance of 1315 feet from a…

question\na boat heading out to sea starts out at point $a$, at a horizontal distance of 1315 feet from a lighthouse/the shore. from that point, the boats crew measures the angle of elevation to the lighthouses beacon-light from that point to be $12^{\\circ}$. at some later time, the crew measures the angle of elevation from point $b$ to be $8^{\\circ}$. find the distance from point $a$ to point $b$. round your answer to the nearest foot if necessary.\nanswer attempt 1 out of 2\nfeet
Answer
Explanation:
Step1: Find height of lighthouse
Let $h$ = height of lighthouse. Use $\tan(\theta)=\frac{\text{opposite}}{\text{adjacent}}$ for Point A. $\tan(12^\circ)=\frac{h}{1315}$ $h = 1315 \times \tan(12^\circ)$ Calculate: $h \approx 1315 \times 0.2126 = 279.569$ feet
Step2: Find distance from shore to Point B
Use the height $h$ to find horizontal distance $d_B$ from shore to B. $\tan(8^\circ)=\frac{h}{d_B}$ $d_B = \frac{h}{\tan(8^\circ)}$ Calculate: $d_B \approx \frac{279.569}{0.1405} = 1989.815$ feet
Step3: Find distance A to B
Subtract distance from shore to A from distance to B. $AB = d_B - 1315$ $AB \approx 1989.815 - 1315 = 674.815$
Step4: Round to nearest foot
Round the result to whole number. $AB \approx 675$
Answer:
675 feet