Superlativity,
I am going to answer your questions, but you must follow along with the scenario uintil a thread is completed. The matter of "angular momentum" and "spin" is presently described in a mathematical ad hoc form. It does what it does, yet the model is certainly limited.
First of all the question of why silver havng only two possibilities? The answer given by James R focused on 'outer electron spin' being that electron providing various aspects supporting the qm notion. The 'moving electron' generating the "magnetic angular momentum' is the basic standard structure. Well, to me James R did not explain to my satisfaction of any underlying physical dynamics. Maintaining the scrutiny to models that expressly limit scrutiny is not a direction of research likely to return much in the way of physical dynamics in the "small world".
Try this.
A particle enters a magnetic field pointing with the field/gradient "up". Of 1,000,000 particles entering iit is 50/50 whether the particle state is 'up' or 'down'. It sure seems like a coin flip, but is this all the options open? Certainly not.
Let us allow the experiment to carry us through.
Bare bones data says a particle will go up, or down, in a magnetic field/gradient. What can this mean, physiocally? The up down line is certainly set by the Stern_Gerlach field/gradient, but the up or down
motion? This must be set by the particle, or the particle determines 'up' or 'down' along the Z-axis with respect to the lab frame. So the definiiton of the state of the particle is, xS, where S is the direction of the experimental apparatus along the z-axis of the lab and segment mfg.
x is the +, or - direction of motion along S or the change in motion from the straightline trajectory. +S says, oriented with respect to the magnetic field/gradient, the particle goes 'up' where the field and gradient are both "up", where for the field direction, up is "south to north", floor to ceiling", pick a standard, and for the gradient, low energy density to high energy density of the magnetic field.The inverted peaked roof SG arrrangement will develop a gradient up from flat floor to peaked ceiling.
I think the next is critical. The spin element of the particle navigates as easily in an increasing energey density field as in a decreasing energy density field. It is magnetic, to be sure, and it has the identical physical quality of sailing against the wind, as with the wind, or without the wind, i.e straightline motion for the 010 or +/- state..
The current model has the state of the particle established in the "heat of the tungsten filament". Unfortunaltely this can not be determined directly by experiment. If we limit ourselves to observation, before imposing physical assumptions, we see the particle exhibits a 50/50 distribution of motion when entering the mfg. Limiting ourselves to data and events, the very first thing we notice is that the particle is affected by a magnetic field. A polarization state has been imposed on the particle. If you confine your thinking to boiling quantum states off tungsten filaments then go for it, I suppose.
There is a more drect approach; more supported by exparimental results. To assume the particle is generating the states as, for instance in time,
100 010 001 100 010 001 100 010 001 100 010 001
etc, The sequence is for a spin-1 particle having three possible states. This will not harm the generality of the thread, that instead of assuming a random generated sequence, we will simply go with the data and our model and assume the states are generated 123 123 123 and so on. Any other mathematicakl model is unnecessarily burdensome.Everyone knows what the answer is: 50/50 or 1/3, 1/3, 1/3.
The particle is moving along in a Y(000f) state meaning any appearing "1" indicates the current observed state; this is all it says. There are no physical assumptions at this point regarding the "unobserved states".
How can the particle magnetic polarization vector (mpv) always line up with the Z-axis of SG mag field/gradient direction? The simplest is with a magnetic monopole consfigured in a 'spherical' mode. A magnetic monopole' that will take the direction of the observed state when coming into contact with the mfg of the SG segment is the polarized state. If we assume the particle is virgin, unpolarized and hot off the tungstaen filament then our perfect model would hold and the current observed state would be manifest by the direction of motion. The symbol, +S tells us only which one oif the two or three state the particle is in, when measured.
The next logical step to take is determine what happens to the known state of a particle under various segment conditions?
Easy enough to do. Simply block all but one possible trajectory and the particle exiting is proved to be in one state only, that of the unblocked channel. Obstructiing the middle and lower channels in the spin-1 case, or the lower or - channel in the spin1/2 case, the exiting particle is a +S base state particle, with 100% confidence assuming a perfect gas and apparatus etc. In the spin-1 case 2/3 of the beam are lost to collisions with obstructions as are 1/2 of the particles lost to obstructed spin-1/2.
We have two options now open. Direct the +S particle into SG segments where one segment is unobstructed and the other wide open. We define a T segment as identical to an S segment but rotated around the axis of travel. Obstructions are not segment tyope diferentiating. Likewise, an S => T transition is defined as an alien-to-domestic transition (atd); an S-> S a domestic-to-domestic transition, (dtd). Some experimental gospel must now be imposed:
any atd transition will always result in the S -> T transition upon entering the SG field/gradient region. If we write the transition as S ->T -> S this describes the transiton of an S particle through a wide open T segment. With one open channel only the particles exit the obstructed segment in the state they were polarized to when entering the magnetic field/gradient (mfg). This transiton then would read, S -> T + b -> T. Putting these two togethjer,
S -> T -> S
S -> b + T -> T
S -> b + S ->S
The third transition was added for instructional purposes. The blocking function (B) represneted by the "b" in the transition description is the only observed difference in the physics. The 2nd and 3rd expression give iidenticakl results as shown by application of the polarization rule. In the 2nd S is polarized to T in the atd transition. In the 3rd, the S state particle will always take the poalrized channel + her, and will not be subjected to state changes when transitioning through an exact replica of the particle's orgonal state. Block both middle and lower channels in the S segment and 100% of the +S particles will transition through, unscathed.
The 2nd sells us that the polarized state is interferrred with as the particle passes though the plane of the obstructions in the channels. The 1st expression says the particle is piolarized T until the trainsition T -> S occurs, which from he physical apparatus, can only be when the particle transitions fronm a mfg+ to a mfg0 or field to no field..
Furhter, there must be some elements of the +S state that are not expressed in the simple "+S" base statement. It will do no damage to add to the description the recognition of the application of forces through "unobserved" elements (we will refer to the elements as unobserved until such time they are observed). Unobserved at this point, 00[+S] added to the +S, would look like Y(1 00[+S]), where "1" referes to the "+" state, and the 00[+S] refer to those elements
guaranteeing the reformation of the +S state. Spin-1 and spin-1/2 particles always survive the unobstructed and temporarily polarized state. What would a polarization process look like?
Y(000f) (f is the frequency of virgin observed state generation), any way,
(P)Y(1 00[+S]) -> Y( _ 00[+S] ---) -> Y(1 00[+S] 00[+T]), which describes an unambiguous hybrid, mixed state of he particle, which as we shall see is stable only in the presence of the mfg. The "_" are used to emphacize the noninstantaneous nature of physiocal proceses, and to emphacize the observation that the 00{+S] elements were unperturbed in the pol;arization and depolarization priocess. From the expression we see both entry and exit provideing exact replicas of each other, with one slight difference: Polarization goes from S -> T and depolarization goes from T -> S.
This state of the particle in the _ 00[+S] _ _ , nonlocal, or unobserved state, state is suffiecient to reform the original +S state of the aprticle. What are the elements, part of a spring loaded snapping back to exactly the +S state gizmo? S is respect to the particle's polarizing segment Z-axis which must be recovered in order to return to the observed +S state.
Magnetic compasses are directed north when released from any force perturbing thje equilibrium state of "north". The spin particles return north in tehe absence of an external field, which reads suscpiciously like some nonlocal force channels are at work or working together with mainatining the correct deviation from the +S direction fof the mpv..
In the second amd third expressions, the poalrized state sirvives, meaning that the obstructions are interferring with the 00{+S] and the 00[+T] when processing through obstructed segments; where are the obstructions? The obstrucitons are in the channels of the nonobserved elements defined at the event of polarization.
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In the 2nd the obstructions perturbed equally the uunobserved elements of both possibe states, with, bingo, +T surviving or any possible xT, ( using +T does not harm generality). In the 3rd, the
(P)Y = Y(1 00[+S] 00[+S]) are perturbed, but any compoetition is detemined by the two headed coin. In the 2nd the 00[+T] always win over the competing 00[+S]), why?, because the
00[+T] retains the mpv direction for the T state when the particle state was determined by the force and drection of the mfg of the SG segment
The particles are inertial gyroscopic entities that have this complex mpv state generating system The pertubations are located many orders of magnitude away from the transitioning particle, which is observavbkly not affected by the obstructions. The exiting and entering states are the same in dtd transitions. In dtd transition we should assume that some hiccup, not amounting to a change of state, not observed state anyway , as the particle always takes the polarized channel.
I am dione fir now. If this is of any interest I will continue, If you have any question or discussion please feel free to say what you will. I will not be responding to claims such as, "'Quantum mechanisc' "does not allow this or that" replies.
This is not a dialogue on qm, this is not qm. If you respond to this quantum mechanically in opposition you are not just in the wrong pew you are in the wrong church. I say this from teh understanding that what I just said is the truth, the above is not qm; Anyione disputing this can of course do whay they will, but I am not in thsio for the debate.
I recognize parallels and similarities, but the foregoing was excluded from scrutuiny by the historical "fathers of quantum mechanics".
The previous state from whatever the mpv state was is completely erased from memory in transitions where only one channel is open. The exception bening thatg a polsrized particle will always take the channel of it origin when transitioning through the twin segment.
The polarized hybrid mixed state exists by virtue of he magnetic field alone. Remove the ecxternal field and the state either reformws in wide opnme transitions, or remains in the opolarixed state, noiw statble after excluding teh 00[+S] elements form the state structure
In the depolarization process Y(_ 00[+S] _ _) it is the unobserved elements 00[+S] that maintan the guaranatess for the reformation of the prepolarized state. The inclusion of the 00[+T] is to remanin consistent with the defintion of Y(000f), meaning only one observed lement is allowed at a time. a delta t~(1/2f). The state zipping through the channel is a, ]
(P)Y = Y(1 00[+S] 00[+T]), and the only other event is the depolarization process.
What happens? The +S paericle passing through the wide open segment exits that segment in the +S state, as if the segment wasn't there. The particles exiting the obstructed segment exit only in the state of polarization when entering the mfg of the SG segment.
geistkiesel
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