Physics Math, Lab Theory Question

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Discussion Overview

The discussion revolves around the relationship between radius, speed, mass, and frequency in the context of centripetal force, as explored through two equations: Fc = (mv^2)/r and Fc = m*4*pi^2*r*f^2. Participants are examining the implications of these equations on the proportionality of centripetal force with respect to the variables involved.

Discussion Character

  • Technical explanation
  • Conceptual clarification
  • Debate/contested

Main Points Raised

  • One participant suggests that centripetal force appears inversely related to speed in the equation Fc = (mv^2)/r, while directly related to radius in the equation Fc = m*4*pi^2*r*f^2.
  • Another participant points out that the second equation is derived from the first, questioning the differences in proportionality between the two equations.
  • A participant explains the derivation of the second equation from the first, indicating that the relationship between radius, speed, and frequency is crucial to understanding the equations.
  • There is a suggestion that the presence of radius in both the numerator and denominator in the derivation may imply direct proportionality to radius in the first equation as well.
  • Another participant emphasizes that radius, speed, and frequency are interdependent, which affects how they relate to centripetal force.
  • Discussion includes consideration of the dimensional analysis of the force expressions, highlighting different perspectives on how to interpret the equations.

Areas of Agreement / Disagreement

Participants express differing views on the nature of the relationships between the variables in the equations, with no consensus reached on whether centripetal force is inversely or directly proportional to radius and speed. The discussion remains unresolved regarding the implications of the two equations.

Contextual Notes

Participants note the importance of understanding the relationships between radius, speed, and frequency, as well as the dimensional analysis of the equations, which may influence interpretations of the proportionalities involved.

mike_302
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The lab we did today was to determine the relationship between radius, speed, mass, and frequency on the centripetal force in a given system. I am typing up my thesis now, and I am having trouble understanding something.

Fc=(mv^2)/r = m*4*pi^2*r*f^2 Given those two equal equations for centripetal force, I would be inclined to believe that centripetal force is INVERSELY related to centripetal force given the first equation, but at the same time, directly related to centripetal force, given the second equation.

So two questions here: Which one would it be, and why are there two equations providing different proportionalities?
 
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mike_302 said:
The lab we did today was to determine the relationship between radius, speed, mass, and frequency on the centripetal force in a given system. I am typing up my thesis now, and I am having trouble understanding something.

Fc=(mv^2)/r = m*4*pi^2*r*f^2 Given those two equal equations for centripetal force, I would be inclined to believe that centripetal force is INVERSELY related to centripetal force given the first equation, but at the same time, directly related to centripetal force, given the second equation.

So two questions here: Which one would it be, and why are there two equations providing different proportionalities?

v = R * omega

so omega = v/R

Is that what has you confused? Also, your question seems to have some typos in it ("centipital force is inversely related to centripetal force", rather that inversely related to ____ ?what?)
 
oops, sorry. centripetal force would be inversely proportional to speed in the mv^2 / r equation, while it is directly proportional to r in m4(pi^2)rf^2 (btw, we have not seen/used v*omega... We are just aware of these equations for Fc)

So yes, the question still stands... Why is the proportionality different between Fc and r in the two different equations?

that is:
m4(pi^2)rf^2 = Fc
and
mv^2 / r = Fc
 
mike_302 said:
oops, sorry. centripetal force would be inversely proportional to speed in the mv^2 / r equation, while it is directly proportional to r in m4(pi^2)rf^2 (btw, we have not seen/used v*omega... We are just aware of these equations for Fc)

So yes, the question still stands... Why is the proportionality different between Fc and r in the two different equations?

that is:
m4(pi^2)rf^2 = Fc
and
mv^2 / r = Fc

Actually the equation Fc = m*4*PI^2*r*f^2 is derived from the equation Fc = mv^2/r
Here is how the equation is derived:

Fc = mv^2/r

from the above equation we know that v = d/t. however since this is circular motion, we can say d = 2*PI*r. Hence subsituting (2*PI*r)/t for v:

Fc = m((2*PI*r)/t)^2/r

now expand and simpify:

Fc = (m*4*PI^2*r^2)/(t^2*r)

As you can see now that r can be canceled out from the equation. However since r in the numerator is squared there will be an r remaining in the numerator (This part should answer your question, no?):

Fc = m*4*PI^2*r/t^2

Now you will notice that there is t in the denominator. Since this is circular motion, it can be represented by a periodic function, thus the time can be represented as the Period of the motion:

Fc = m*4*PI^2*r/T^2

We know that the T = 1/f, thus f = 1/T, hence we can rewrite the equation as:

Fc = m*4*PI^2*r*f^2

Hopefully you noticed during that the r was canceled out from the denominator while the equation was derived, it is not so much a question of proportionality here but the method in which the equation was derived which produced the r variable to appear in both the numerator and the denominator.

Hopefully this helps...

Sekhar.B
 
okay. So, in summary, what I think you are saying is that in mv^2, it is possible to derive another 2 radii out of there, and so in reality, in the (mv^2) /r equation, there are really 2 r's in the top... so it IS directly proportional to r, even in the (mv^2) /r equation, but the r's in the numerator are just hidden.
 
Keep in mind that r, v, and f are not independent values. Yes, r appears in the numerator for one expression for centripetal force and in the denominator for the other. But that's only because of the relationship between r, v, and f. Make sure you can understand and write down the equation that relates these three quantities.

Another thing to consider is the dimensions of F. In one expression, the force looks like the kinetic energy divided by a distance r. In the other expression, it looks like a mass times a frequency squared times a distance r, which is a mass times an acceleration. With practice, both these ways of looking at the units for force should make sense to you.
 

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