Q_Goest said:
pervect, thanks for the comments. Again, I want to emphasize I have no expertise in this, but it's a curious question. Perhaps you can help clarify a few things.
First, if we consider translational motion, including acceleration of this ball in any linear direction, I think we all agree there's no affect from the gyroscopes. What I'm confused on is strictly the rotational acceleration.
To clarify this discussion, let's define a coordinate system as is used conventionally, with the X axis being horizontal, Y vertical, Z into/out of the page. Now we put identical gyroscopes on a common axle at X1 and X-1 rotating in opposite directions on the X axis. If we put a moment on this pair of gyroscopes which is around the Z axis, one thing that happens is each gyroscope wants to precess in opposite directions. That is, they put a moment on the axle around the Y axis in opposite directions. These moments are equal and opposite, so they cancel. Is that correct?
I assume you mean you are applying a torque around the z, axis, i.e. by pushing "down" on the leftmost gyroscope and pushing "up" on the rightmost gyroscope.
Now if I'm not mistaken, they also both put a moment around the Z axis, but I'm not sure that one is equal and opposite. Isn't there a moment created around the Z axis? Isn't that moment equal and in the same direction?
I think you are confused here. Consider representing angular momentum as a vector. I assume you know how to do this?
The rightmost gyroscope, rotating around the x axis, will have an angular momentum vector that points along the x axis. For definiteness, say that it points to the right. The leftmost gyroscope, rotating around the x axis, then has an angular momentum vector that points to the left.
Now, when we apply a torque to rotate the assembly around the z axis, the system rotates just the same when the gryos are spinning as when they are not.
We can see that the spin of the gyroscopes has no effect, because the angular momentum vectors of the two gyroscpes cancel each other out, so the angular momentum of the entire system, whichis the sum of the angular momentum of all its parts. is not affected by whether or not the gyroscopes are spinning
The angular acceleration of the assembly is thus equal to the moment of inertia of the system around the z axis divided by the torque, independntly of whether or not the gyroscpes are spinning or not.
However, there will be large stresses on the joining rod. These stresses are due to the fact that we must apply a large torque represented as a vector in the 'y' direction on the rightmost gyroscope, and a counterbalancing torque represented by a vector in the 'minus-y' direction on the leftmost gyroscope, in order to shift their axes of rotation. We can see this by drawing the state of the system after it has rotated along the z axis.
Note that the total torque is zero. However, because the two torques are applied at different postions along the rod, there is quite a bit of stress on the rod that joins the two gyroscpes. The faster the system rotates around the z axis, the larger the stress gets. The greater the angular momentum stored in the gyroscoples, the larger the stress gets. I haven't worked out what happens when the bar starts to bend, but as long as it is rigid, there are no oppositional torques generated, so a small torque along the z axis will cause the angular velocity about the z axis to accelerate, meaning that the stress will increase linearly with the amount of time the torque is applied.
