What is the component of a force of 200 N at a direction 60° to the force?

1 Answer
Jan 7, 2017

The parallel component is #vecF_(x)=100N#, the perpendicular component is #vecF_y=100sqrt(3)N#.

Explanation:

The force has both a parallel and perpendicular component. We can see that more clearly if we look at the force vector, #vecF#.

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The force has been broken down into its parallel (#x#, horizontal) and perpendicular (#y#, vertical) components.

We see that this forms a right triangle, and in this case, with an angle of #60^o#, we have a special #30^o-60^o-90^o# right triangle. This means we can calculate exact values for each component without using a calculator. I will not include a lesson on the unit circle in this answer, but would be happy to explain in a message if help is needed.

By basic trigonometry, we know that the sine of an angle of a right triangle is found by the ratio of the length of the opposite side to the length of the hypotenuse. In this case, the opposite side is #vecF_y# and the hypothenuse is #vecF#.

#sin(theta)=(vecF_y)/(vecF)#

We can rearrange to solve for #vecF_y#:

#vecF_y=vecFsin(theta)#

Similarly, we know that the cosine of the angle is found by the ratio of the length of the adjacent side to the length of the hypotenuse.

#cos(theta)=(vecF_x)/vecF#

We can rearrange to solve for #vecF_x#:

#vecF_x=vecFcos(theta)#

Using our known values, #vecF=200N# and #theta=60^o#, we can calculate the components:

#vecF_y=200*sin(60^o)=100sqrt(3)N# (#~~173N#)

#vecF_x=200*cos(60^o)=100N#

You can also check your answer using the Pythagorean theorem:

#(vecF_x)^2+(vecF_y)^2=(vecF)^2#

#sqrt((vecF_x)^2+(vecF_y)^2)=vecF#

#sqrt((100)^2+(100sqrt(3))^2)=200#

#sqrt(40000)=200#

#200=200#