Answer:
1) 288.8 km due North
2) 144.9 km due East
3) 323.1 km
4) 207°
Step-by-step explanation:
Bearing: The angle (in degrees) measured clockwise from north.
Trigonometric ratios
[tex]\sf \sin(\theta)=\dfrac{O}{H}\quad\cos(\theta)=\dfrac{A}{H}\quad\tan(\theta)=\dfrac{O}{A}[/tex]
where:
- [tex]\theta[/tex] is the angle
- O is the side opposite the angle
- A is the side adjacent the angle
- H is the hypotenuse (the side opposite the right angle)
Cosine rule
[tex]c^2=a^2+b^2-2ab \cos C[/tex]
where a, b and c are the sides and C is the angle opposite side c
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Draw a diagram using the given information (see attached).
Create a right triangle (blue on attached diagram).
This right triangle can be used to calculate the additional vertical and horizontal distance the ship sailed after sailing north for 250 km.
Question 1
To find how far North the ship is now, find the measure of the short leg of the right triangle (labelled y on the attached diagram):
[tex]\implies \sf \cos(75^{\circ})=\dfrac{y}{150}[/tex]
[tex]\implies \sf y=150\cos(75^{\circ})[/tex]
[tex]\implies \sf y=38.92285677[/tex]
Then add it to the first portion of the journey:
⇒ 250 + 38.92285677... = 288.8 km
Therefore, the ship is now 288.8 km due North.
Question 2
To find how far East the ship is now, find the measure of the long leg of the right triangle (labelled x on the attached diagram):
[tex]\implies \sf \sin(75^{\circ})=\dfrac{x}{150}[/tex]
[tex]\implies \sf x=150\sin(75^{\circ})[/tex]
[tex]\implies \sf x=144.8888739[/tex]
Therefore, the ship is now 144.9 km due East.
Question 3
To find how far the ship is from its starting point (labelled in red as d on the attached diagram), use the cosine rule:
[tex]\sf \implies d^2=250^2+150^2-2(250)(150) \cos (180-75)[/tex]
[tex]\implies \sf d=\sqrt{250^2+150^2-2(250)(150) \cos (180-75)}[/tex]
[tex]\implies \sf d=323.1275729[/tex]
Therefore, the ship is 323.1 km from its starting point.
Question 4
To find the bearing that the ship is now from its original position, find the angle labelled green on the attached diagram.
Use the answers from part 1 and 2 to find the angle that needs to be added to 180°:
[tex]\implies \sf Bearing=180^{\circ}+\tan^{-1}\left(\dfrac{Total\:Eastern\:distance}{Total\:Northern\:distance}\right)[/tex]
[tex]\implies \sf Bearing=180^{\circ}+\tan^{-1}\left(\dfrac{150\sin(75^{\circ})}{250+150\cos(75^{\circ})}\right)[/tex]
[tex]\implies \sf Bearing=180^{\circ}+26.64077...^{\circ}[/tex]
[tex]\implies \sf Bearing=207^{\circ}[/tex]
Therefore, as bearings are usually given as a three-figure bearings, the bearing of the ship from its original position is 207°
