No, once more: a rolling circle does not trace a sine wave. A sine wave is produced by an oscillator moving directly up and down the y-axis while progressing with uniform velocity along the x-axis. A point on the edge of a rolling circle does not progress with uniform velocity along the x-axis. Did you look at the link I gave?
Here are a few links concerning the curves made by advancing rolling circles:
http://en.wikipedia.org/wiki/Trochoid
http://www.geom.uiuc.edu/docs/reference/CRC-formulas/node34.html
http://www.2dcurves.com/roulette/roulettec.html
http://www.xahlee.org/SpecialPlaneCurves_dir/Trochoid_dir/trochoid.html
If you still think a point on one of the circles will trace a sine wave, may I (once more) suggest that you make the cart and try it out?
Micheal_C,
You, Brian-M, and Myriad, seem more logical than those I refer to as the mice. However, you do appear to behave like them sometimes.
I don't just say stuff, in order to give you a hard time. Yes, I do know what a trochoid is, and yes I looked at the link, but you didn't take note of what I said. I said "rectified". Take a look at the two equations in the link Remove the constants. Guess what, it's a sine wave. If you turn an AC generator, then you get a sine wave.
When the dot is turning above the axis line, it creates, the top half of the sine wave. The next 180 degrees are in the opposite direction, so they are negative. The motion of the axis cancels out, because they are both doing that. They are joined together. It is the differential motion that counts.
I
did think that when I posted the graphs, someone might say that if I average the white trace, that too is zero, so no wheel can travel, and it appears that you did. No, the difference is that the "gain" has an average of zero. You need a constant change in velocity to support it
incrementally. Therefore, the difference can only "exist" when accelerating. No device can beat F=ma, wheels don't count.
Forget it then, it was a mistake to raise the possibility.
Whether you make a correct graph with trochoids or an incorrect graph with sine curves is unimportant here: it does not in any way prove that the cart won't work.
You raise a point, but put in a caveat of "unimportant", just in case,eh?
If you don't want to know, then don't pretend that you do.
You misunderstand, me. If you are right, I will agree.
I
did take the time to work out the graphs I suggested you do, because the idea is seductive. I can be fooled by my "intuition".
I don't think I have made a mistake, because I balanced not only the forces, but the energy. Perhaps I am wrong, you can do the same, and see.
If however, if you insist that forces are magical, then that is a problem.
Use models. A constant velocity 'puller' does so all the time. Load does not affect it.
A constant force 'puller', always maintains a constant force regardless of velocity. The other is a constant power, that adjusts the force and velocity, to maintain that same power.
Now, imagine pushing a load with a constant velocity device. The object must accelerate to that velocity instantaneously, correct? The pusher is relentless. On the other hand, in practice, that will take time.
If you don't follow through, you will see that bit, and not the final state that it must assume.
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