Final answer:
To find the distance from the sailboat to the shoreline, we can use trigonometry to relate the angles and distances. By using the given angle values and rearranging the equations, we can calculate the distances to be approximately 12m and 6m.
Step-by-step explanation:
To solve this problem, we can use trigonometry. Let's label the distance from point A to C as x and the distance from point B to C as y. We can then use the cosine function to relate the angles and distances:
cos(A) = y / 18m
cos(B) = x / 18m
Now we can substitute the given angle values into the equations:
cos(65°) = y / 18m
cos(42°) = x / 18m
From here, we can rearrange the equations to solve for x and y:
x = 18m * cos(42°)
x ≈ 12.17m
y = 18m * cos(65°)
y ≈ 6.47m
Therefore, the distance from the sailboat (C) to the shoreline (AB) is approximately 12m and 6m, to the nearest metre.