Centripetal force lab: meaning of slope of radius vs Fc graph

[5.98e24]

Homework Statement

I have a graph with the radius on the x-axis and Fc on the y axis. I had to then calculate the slope of this linear relationship. I did that, and I got 0.17.

The problem is that I don't know what this represents. mass? acceleration??

Homework Equations

Fc = m4π^2rf^2

btw π = pi = 3.14

The Attempt at a Solution

I tried to isolate for the slope of the line, which would be making the left side equal to Fc/r.
This is what I got:

Fc/r = m4πf^2

I know that [STRIKE]Fc[/STRIKE] mass is kept constant.. then I have no idea where to go from there :S

 

[cupid.callin]

i don't think it represents something in general,
its just like change in Fc with unit change in radius ...

 

[gdbb]

How can F_c be kept constant if you got a slope of 0.17 for an F_c vs. r graph?

 

[5.98e24]

Ah whoops! I made a mistake; Fc isn't constant. I was looking at a graph I extrapolated from. Apologies!

I mean that mass is constant.

So does it really not represent anything significant?

 

[cupid.callin]

How can F_c be kept constant if you got a slope of 0.17 for an F_c vs. r graph?

Oh! I didnt notice OP wrote Fc is constant.
I Need lenses now ...

 

[gdbb]

Well, force divided by radius gives units of \frac{kg}{s^2}, which, technically, is the unit for surface tension. However, I don't think you wanted to find that surface tension is equal to 0.17 \frac{kg}{s^2}.

You could just note that, as the radius increased from r = a to r = b meters, the centripetal force increase by 0.17 Newtons per meter.

 

[cupid.callin]

you mean \frac{kg}{m^2}.

 

[gdbb]

I'm talking about surface tension in fluid dynamics. I was just trying to give an extreme example of how little "kilograms per second squared" means in a Circular Motion context, as \frac{kg}{s^2} is also the unit of k, the spring constant, which is much more likely to be the case in the Introductory Physics sub-forum.

 

[RTW69]

What is "f" in your equation, is it angular velocity? Is it 2*pi or 2*pi^2, you show it both ways? Does your graph have a "y' intercept? What is it? You say the slope is .17 what is the rest of the equation in the form Y=mx+b? Y is Fc, x is the radius in meters, the slope has units of Newtons/meters or kg/s^2. I am guessing the slope is mass* angular velocity^2

 

[cupid.callin]

I'm talking about surface tension in fluid dynamics. I was just trying to give an extreme example of how little "kilograms per second squared" means in a Circular Motion context, as \frac{kg}{s^2} is also the unit of k, the spring constant, which is much more likely to be the case in the Introductory Physics sub-forum.

Oh yes ... i got a bit confused :shy:

 

[5.98e24]

The y-intercept is 0.

f is the frequency.

The only thing is that we didn't learn about angular velocity. Is that the only thing that it can represent?

 

[Redbelly98]

Welcome back to PF.

The Attempt at a Solution

I tried to isolate for the slope of the line, which would be making the left side equal to Fc/r.
This is what I got:

Fc/r = m4πf^2

I know that mass is kept constant.. then I have no idea where to go from there :S

Okay, so the slope equals 4 \pi^2 m f^2. If you know m and the value of the slope, you can calculate what the constant f is. Or, if you know f and the slope, you can calculate what m is. But -- was frequency f really a constant throughout your experiment?

By the way, does your lab apparatus resemble something like the following?

 

[5.98e24]

Welcome back to PF.Okay, so the slope equals 4 \pi^2 m f^2. If you know m and the value of the slope, you can calculate what the constant f is. Or, if you know f and the slope, you can calculate what m is. But -- was frequency f really a constant throughout your experiment?

By the way, does your lab apparatus resemble something like the following?

frequency f was not constant. The only constant values were Fc (centripetal force), which was 0.5N, and mass, which was 0.03kg.

are you saying that I can't use the equation if f isn't constant?

Yes, it is similar.

 

[Redbelly98]

frequency f was not constant. The only constant values were Fc (centripetal force), which was 0.5N, and mass, which was 0.03kg.

are you saying that I can't use the equation if f isn't constant?

Yes, it is similar.

Thanks, that helps explain better what is going on.

Something is wrong here. If Fc is constant, and you plot it on the y-axis, you should get a horizontal line, so slope=0.

It looks like the variables here are f and r, so the graph should involve those quantities instead. But, just graphing f vs. r will not give a straight line. Did you get any instruction in what you are supposed to actually graph?

 

[5.98e24]

Thanks, that helps explain better what is going on.

Something is wrong here. If Fc is constant, and you plot it on the y-axis, you should get a horizontal line, so slope=0.

It looks like the variables here are f and r, so the graph should involve those quantities instead. But, just graphing f vs. r will not give a straight line. Did you get any instruction in what you are supposed to actually graph?

This was similar to our procedure starting on page 4: http://schools.hwdsb.on.ca/highland/files/2011/01/centripetal_force.pdf

So basically the question I'm trying to answer now is #23.

The graph of radius and Fc was made after doing #20 and #21 in the PDF. The values of Fc were extrapolated from a graph of f^2 on the x-axis and Fc on the y axis, seen in #20.

 

[Redbelly98]

Got it.

Looks like you have already seen that the graph is linear or a direct proportion, and that the slope should equal 4 \pi^2 m f^2. You can measure the slope from your graph and, since you know m and f, compare the measured-from-the-graph slope value with what you get by calculating 4 \pi^2 m f^2.