Unbalanced wrote:It is also quite possible that these 4# weights were merely intended as a distraction. In that Bessler wouldn't allow the witnesses to feel the ends of the weights, it has been assumed here that perhaps they were bored through their length like beads on an abicus whose sole purpose was to produce the sound heard as eight weights falling on the descending side.
A reasonable exercise for those better versed in math than I, would be to calculate how much mass was necessary, at 26 RPM turning in a 12-foot diameter wheel, to lift an adult (say 200#) off his feet when this person attempted to stop the wheel by force.
Hey Unbalanced,
I thought I'd give your calculation a try and run a few numbers.
If we had eight 4 pound masses riding on the rim of a 12 foot diameter wheel that was turning at 26 RPM, that would be 32 pounds of mass or approximately 1 slug of mass moving at about 16.3 feet per second (12 ft * pi * 26 rot / min * 1 min / 60 sec).
If we use slugs and feet per second in the kinetic energy equation we get units of foot-pounds of energy.
So, 1/2 * 1 slug * ( 16.3 ft / sec )^2 is about 132 foot-pounds
We can then divide that by 200 pounds for your person and convert to inches.
132 foot-pounds / 200 pounds * 12 inches / foot = 7.9 inches
So, that means that just the 32 pounds of weights alone moving on the rim of the 12 foot diameter wheel rotating at 26 RPM would have enough kinetic energy to lift your 200 pound person about 8 inches into the air.
Of course, though, that would be IF you could transfer all that energy to your person.
If the person were to just suddenly latch onto the side of the rim, however, we would have to consider the conservation of momentum and could assume his attachment to the rim to be a perfectly inelastic collision.
Since the distances we are concerned with here are in inches and the wheel is a huge 12 feet in diameter, I'll just approximate things by treating it as a linear problem.
So, our slug - our 32 pounds of mass - times it's speed of 16.3 ft /sec is the momentum before the collision which must equal the momentum of the person and the weights after the collision.
Our person is about 6.2 slugs (200 lbs/32.17 lbs/slug), so...
16.3 slug - ft / sec = (1 slug + 6.2 slugs) * person's launch speed
launch speed = 2.26 ft / sec !
So, how high will our person fly off the ground?
Well, we have his weight decelerating him, but it is also decelerating the mass of the rim at the same time. So, he's not being decelerated at 1 g.
So, let's see what his deceleration rate is now.
F = m * a , a = F / m
a = 200 lbf / (1 slug + 6.2 slugs) = 28 ft / sec^2 ... 1 g = 32.17 ft /sec^2
Now, let's calculate how far the person moves upward before coming to a stop.
v = a * t, s = 1/2 * a * t^2 , s = 1/2 * v^2 / a
s = 1/2 * (2.26 ft / sec)^2 / 28 ft / sec^2 = 0.092 feet!!
0.092 ft * 12 inches / ft = 1.1 inches!
So, although the 32 pounds of mass on the rim would have enough kinetic energy to lift the 200 pound person about 8 inches into the air, the person would only be lifted about 1 inch by suddenly grabbing hold of the rim.
This, of course, was neglecting the mass of the wheel itself, which most likely would dominate when it comes to our person launching.
I'll spare you the details on this one, but using the moment of inertia equation for a solid disk, one in which there is a uniform mass distribution throughout the volume, I calculated the numbers for a 300 pound wheel of the same dimensions and speed as before.
A 300 pound, 12 foot diameter solid disk rotating at 26 RPM should, then, have enough kinetic energy to lift the 200 pound person 3 feet 1 inch into the air, but for the person grabbing onto the rim where we have to consider the conservation of momentum, the person would only be lifted 1 foot 1 inch.
These calculations, of course, don't take into account any extra drive force, but only the stored kinetic energy in the flywheel.
Now, if there was a little bit of swinging involved or the person were to use pequaide's tether so as to perhaps more efficiently transfer kinetic energy from the wheel to the person, one might be able to get more height. I've not done the experiment, though.
Dwayne
ETA: Thinking about this reminded me of a Wheel of Death video where a guy mounted the spinning "wheel" by grabbing the rim of the cage. This link should start 10 seconds before he grabs hold:
http://www.youtube.com/watch?feature=pl ... VAlNA#t=70
