Answer:
162 km
Explanation:
A diagram can be helpful.
Using the law of cosines, we can find the magnitude of the distance (c) to satisfy ...
c^2 = a^2 +b^2 -2ab·cos(C)
where C is the internal angle of the triangle of vectors and resultant. Its value is ...
180° -39.8° -59.9° = 80.3°
Filling in a=76 and b=156, we get ...
c^2 = 76^2 +156^2 -2·76·156·cos(80.3°) ≈ 26116.78
c ≈ √26116.78 ≈ 161.607
The magnitude of the total displacement is about 162 km.
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Please note that in the attached diagram North is to the right and East is up. That alteration of directions does not change the angles or the magnitude of the result.
Answer:
Magnitude of total displacement = 162.87 km
Explanation:
Let east be x axis and north be y axis.
The first is 76 km at 39.8◦ west of north.
Displacement 1 = 76 km at 39.8◦ west of north = 76 km at 129.8◦ north of east.
Displacement 1 = 76 cos129.8 i + 76 sin 129.8 j = -48.65 i + 58.39 j
The second is 156 km at 59.9◦ east of north.
Displacement 2 = 156 km at 59.9◦ east of north = 156 km at 31.1◦ north of east.
Displacement 2 = 156 cos31.1 i + 156 sin 31.1 j = 133.58 i + 80.58 j
Total displacement = Displacement 1 + Displacement 2
Total displacement = -48.65 i + 58.39 j + 133.58 i + 80.58 j = 84.93 i + 138.97 j
[tex]\texttt{Magnitude of total displacement =}\sqrt{84.93^2+138.97^2}=162.87km[/tex]
Magnitude of total displacement = 162.87 km
