Horizontal circular motion problem, what am doing wrong?

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SherlockLCooper
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Homework Statement



The County Fair Swing carries the mass of riders and chairs in a circular path in a horizontal plane while suspended by cables or chains. Let's assume that:

Each chair with riders is supported by a single cable

The tension in the cable equals 2 x the total weight riders and chair

The speed of the center of mass at the end of the cable is 10 m/s.

Determine the radius of the circular path in meters.Selected Answer:
50

Homework Equations



T=mv^2/r

The Attempt at a Solution



T=mv^2/r
so r=10^2/2
100/2=50
50=r
 
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Hi Sherlock:

I am not sure I understand the problem statement correctly, but it seems to me you are assuming that the chains are horizontal. I visualize a different picture with the chains at an angle. If that is correct, then the tension has a horizontal and a vertical component.

Hope this helps.

Regards,
Buzz
 
this is all the information I was given, I imagine the angle too, but I have no value for theta. is that something I can solve for with the information given?
 
Hi Sherlock:

The vertical component of the tension balances what force? Visualize a right triangle with the chain as the hypotenuse.
SherlockLCooper said:
The tension in the cable equals 2 x the total weight riders and chair

Regards,
Buzz
 
SherlockLCooper said:
The tension in the cable equals 2 x the total weight riders and chair
What do you do with that information ?
SherlockLCooper said:
T=mv^2/r so r=10^2/2
Do I read T/m = 2 here ? I always thought weight = mg so I am missing a factor g -- not to mention the dimension of g !

Oh, and -- in your relevant equation -- what do you mean with ##\vec T## ?
 
t=tension. and I have drawn diagrams, and i just, tried v^2/2g, and it was also incorrect, am i using the right Equations?
 
BvU said:
Well now, all this response and not even one :welcome: -- let me make up for that: :welcome: ! :smile:
thanks!
 
Chestermiller said:
Have you drawn a free body diagram for the combination of rider and chair

It is always much easier to sort these types of problem out if there is something to look at .
pf01-jpg.95812.jpg


Mark in the forces which you think are acting and any other information you consider relevant .
 
does this help
 

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Hi Sherlock:

Your diagram is a good start, but you need to add the horizontal and vertical components of the tension.

Regards,
Buzz
 
I want to say
(T Cos(theta)i, T sin(theta)j) where the y component would be T Sin(theta)=mg..?
so t/mg= 2, so sine (0) =0, so it is in the horizontal plane, the alternative T Cos(0)= T*1= T.
 
so all the velocity would be in the horizontal plane?
 
Hi Sherlock:

If you visualize the right triangle, you are given the facts regarding the vertical component, and the tension is along the hypotenuse. You don't need the angle to calculate the horizontal component. You can use the Pythagorean theorem.

Regards,
Buzz
 
(2mg cos 30)/m=a=v^2/r
m cancels so v^2/2gcos30=r
 
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(100)/(2)(9.8)((3^(1/2))/2)=5.89 meters
 
ill try this and let you know! Thank you so much!