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Simple Q about moments

The first question in the attachment.

Say I take the angle with horizontal to be theta, and the length of rod be 2L.

To find the moment about A,

Why can't I take the vertical component of the force of 4 N, i.e. 4 cos theta.

And then multiply it with the perpendicular distance from A, i.e.

2L sin (90-theta) x (4cos theta)

And equate it to 16 x L sin (90- theta)

to get the answer?

Untitled.png
Reply 1
I keep getting cos theta = 2
Reply 2
bump
Reply 3
If you split 4N into components then you have to take into account the fact that there will be two components that provide moments.

It is much simpler to multiply 4 by its perpendicular distance to A, 2l. Then you are dealing with two moments acting in different directions.
(edited 11 years ago)
Reply 4
Original post by Killjoy-
If you split 4N into components then you have to take into account the fact that there will be two components that provide moments.


thank you!!!!
Reply 5
Original post by Killjoy-
If you split 4N into components then you have to take into account the fact that there will be two components that provide moments.

It is much simpler to multiply 4 by its perpendicular distance to A, 2l. Then you are dealing with two moments acting in different directions.


Yup, was just wondering why that didn't work, whether it was because of a gap in understanding of the concept
Original post by bmqib
The first question in the attachment.

Say I take the angle with horizontal to be theta, and the length of rod be 2L.

To find the moment about A,

Why can't I take the vertical component of the force of 4 N, i.e. 4 cos theta.

And then multiply it with the perpendicular distance from A, i.e.

2L sin (90-theta) x (4cos theta)

And equate it to 16 x L sin (90- theta)

to get the answer?

Untitled.png


Hi :smile:

Part i) is only a two marker, so I don't even think you need to involve the length.
We know that for a system in equilibrium, the total upwards force = total downwards force.
So if you view the rod horizontally,
total upwards force (4N) = total downwards force (the vertical component of the weight, 16sin alpha N)
Alpha corresponds to the angle the rod makes with the vertical. So once you have that angle, it should be straightforward to work out the value for theta. When I did it, I got the value of theta to be 75.5 degrees :h:

ignore what's above :facepalm:
Take moments about A.
have the length of the rod be 2L.
Total Clockwise moments = Total Anti-Clockwise Moments
16cos theta L = 4 x 2L
Cancel the Ls to get
16cos theta = 8
so cos theta = 1/2
theta = 60
(edited 11 years ago)
Reply 7
Original post by magdaplaysbass
Hi :smile:

Part i) is only a two marker, so I don't even think you need to involve the length.
We know that for a system in equilibrium, the total upwards force = total downwards force.
So if you view the rod horizontally,
total upwards force (4N) = total downwards force (the vertical component of the weight, 16sin alpha N)
Alpha corresponds to the angle the rod makes with the vertical. So once you have that angle, it should be straightforward to work out the value for theta. When I did it, I got the value of theta to be 75.5 degrees :h:


hi! i think you made a mistake somewhere, the angle of the rod with the horizontal is 60 degrees

This is a moments question so you have to consider the lengths the forces are perpendicualrly from the pivot!
Reply 8
Or at least consider the forces at A
:facepalm: just realised where i went wrong. do you still need help with it?

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