Fletcher wrote:Mr V .. FWIW .. I think many of us agree that B's wheels must have accumulated momentum - Karl even says so etc etc.
Each of us rationalizes how this might happen, even when in conflict with standard physics arguments that we all know only too well.
Fortunately we all attack the 'excess momentum problem' and priority of the constituent elements differently else this entire quagmire of an argument would have dried up eons ago.
So I applaud anyone who continues to throw fresh light on the subject. I might not always agree or even follow, but I do read and try to digest all/your arguments. Hoping that someone will try a new approach or analysis that will be the insightful moment when the veil lifts and it becomes self-evident.
Just a side note - the pendulum drawings of B's wheels are/have been often discussed. Generally it is agreed that they were never observed in action and he said they were for speed regulation (inertial manipulation). Yet the Kassel (I think) wheel drawings show a strange connection from the crank to the cross bar. It limits the swing amplitude of the pendulum. IOW's unequal heights (GPE) achieved each swing left and right i.e. one side higher than the other.
I suggest this mechanical anomaly is not related to speed regulation (that's the mass distribution of the pendulum) but it is a visual metaphor for what we are attempting to find - Excess Momentum.
Tho clearly IMO using a pendulum as depicted is not the mechanical answer we seek. It is IMO however symbolism signaling of the correct direction to take.
Cheers Fletch, yes, all kinds of weird stuff going on in the Kassel prints - i've text-walled 'em enough already, but the drive directions of the mechanisms, if you follow them through carefully, also produce paradoxical results.
As for the pendulums, today i've been considering a more general point:
• As i've been relating, OU cannot arise unless rotor and 'stator' remain at equal velocity for each complete cycle as the machine accelerates. Obviously there must be some variation within a cycle, in order to apply a torque or other force between them and so generate this unilateral momentum required. But over each complete cycle, the two interacting inertias have to accelerate together. Everything must go around together. This really is a key condition for mechanical OU.
Whereas, when a motor torques a rotor against a
properly-stationary stator, the unit energy cost of momentum squares with velocity, if both can remain together at equal speed (implying that each asymmetric inertial interaction is consolidated by a subsequent inelastic impact), the input energy per cycle remains constant, speed-invariant, and we gain energy from generating momentum on the cheap.
• So then if a motor that fully rotates or counter-rotates is going to preclude success (as in my current scheme), what about an oscillating 'stator' - ie. something that alternates direction, so never gaining more displacement in either direction - would its energy cost thus remain constant despite rising RPM's?
For example, some kind of 'pendulum' (not necessarily swinging under gravity) pivoted at the rim and banging around at the axle or beyond it - could we somehow torque the wheel against its inertia, basically using it as a 'stator' even though the whole thing's rotating with the wheel?
..just loose unfinished thoughts, for now..
The most frustrating thing is my own density - on paper, it's trivially easy to plot up monstrous KE gains by invoking nothing more exotic than a gravity-assisted asymmetric inertial interaction - something i've now demonstrated in multiple iterations - however matching some kind of physical mechanism to these requisite conditions - generate unilateral momentum, consolidate and accumulate it - is really stretching my attention span.. It should be simple to design some mechanism that does what the maths do!? But converting the abstract into something physical is doing my nut in.. How hard can it be when we all but have the instructions laid out?
B. concluded in AP that no one else had found it because none but him had been diligent enough in the search. Yet we've already
found it, the gain principle at least... the remaining challenge isn't a search for a gain principle, but simply how to physically apply the guaranteed gains we know are available from accumulating reactionless angular momentum..
The deliberate occlusion errors in the Kassel engravings imply that either the stampers, or suspended box, must fall upwards. In a similar vein, MT 47 implies that the image frame should also be considered upside down. In either case, pointing to counter-momenta applied back to the 'stator' or Earth. Whatever these clues are hinting at seems directly related to harnessing counter-momentum, and the statorless requirement...
