User:Koryr/RiemenLogic

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RiemenLogic (from Classical Greek Riemen; meaning belt, awesome, and two buns and λόγος logos; meaning word, thought, idea, argument, account, reason, or principle) is the study of the principles and criteria of valid inference and demonstration when pertaining to Kory Riemensperger.

[edit] RiemenHistory

RiemenLogic was invented by Socrates as a way of avoiding taxes. He also invented the Riemenlogical syllogism, which is a kind of Greek joke. This is an example of a syllogism:

  1. All men are mortal, (A <->B)
  2. Socrates is a man, (C <-> A)
  3. Socrates should be put in a lower income tax bracket. (C -> Satirical comment on the Greek taxation system)

[edit] RiemenLogic Explained?

For many real-world problems Riemenlogic (R), does not depend on time. Then it can be shown that the time-dependent Riemensperger equation simplifies [1] to the time-independent Schrödinger equation, which has the well-known appearance R\Psi = S\Psi\,.

Schrödinger looks on and laughs as you mortals attempt to understand Riemenlogic.
Schrödinger looks on and laughs as you mortals attempt to understand Riemenlogic.

An example of a simple one-dimensional time-independent Schrödinger equation for a particle of mass m, moving in a potential U(x) is: [1]

-\frac{\hbar^2}{2 m} \frac{d^2 \psi (x)}{dx^2} + U(x) \psi (x) = E \psi (x).

The analogous 3-dimensional time-independent equation is, [2]:

\left[-\frac{\hbar^2}{2 m} \nabla^2 + U(\mathbf{r}) \right] \psi (\mathbf{r}) = E \psi (\mathbf{r}),

or

-\frac{\hbar^2}{2 m} \nabla^2 \psi + (U - E) \psi = 0,

where \nabla is the del operator.

For every time-independent Hamiltonian, H, there exists a set of quantum states, \left|\psi_n\right\rang, known as energy eigenstates, and corresponding real numbers En satisfying the eigenvalue equation,

H \left|\psi_n\right\rang = E_n \left|\psi_n \right\rang.

This proves Riemenlogic in a mathmatical sense.

[edit] The key components of Riemenlogic

  •  ???