A helicopter flies 250 km on a straight path in a direction 60° south of east. The east component of the helicopter’s displacement is km.

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zainabekram2 zainabekram2 · Answer 1 · 2018-10-23T21:34:17+02:00

Given that,

Distance in south-west direction = 250 km

Projected angle to east = 60°

East component = ?

since,

cos ∅ = base/hypotenuse

base= hyp * cos ∅

East component = 250 * cos 60°

East component = 125 km

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rocioo rocioo · Answer 2 · 2020-04-15T02:26:45+02:00

Answer:

125km

Explanation:

the east component is given by the cosine function of the given angle.

because of the triangle that is formed between the east component end the south-east component

[tex]cos\theta=\frac{adjacent Leg}{hypotenuse}[/tex]

in this case the angle is: [tex]\theta =60[/tex]

the adyacent Leg is the east component [tex]Ec[/tex]

and the hypotenuse: [tex]d=250km[/tex]

so:

[tex]cos60=\frac{Ec}{250km}[/tex]

we clear for the east component:

[tex]Ec=(250km)(cos60)\\Ec=(250km)(0.5)\\Ec=125km[/tex]

you can see the the triangle in the attached image, where the blue line is the east component