Derivation of EMHD Equations
... vorticity. In the equation (9), the curl operation has eliminated the pressure ~ and ~ve , term for constant temperatures. Since equation (9) contains only B ...
... vorticity. In the equation (9), the curl operation has eliminated the pressure ~ and ~ve , term for constant temperatures. Since equation (9) contains only B ...
Schrödinger and Matter Waves
... To see or resolve an object, we need to use light of wavelength no larger than the object itself Since the wavelength of light is about 0.4 to 0.7 mm, ...
... To see or resolve an object, we need to use light of wavelength no larger than the object itself Since the wavelength of light is about 0.4 to 0.7 mm, ...
Super-Shell Structure in Two-Component Dilute Fermionic Gases
... atoms confined in H.O. potential, with repulsive interaction H.O. magic numbers – not square well numbers like in e.g. metall clusters. ...
... atoms confined in H.O. potential, with repulsive interaction H.O. magic numbers – not square well numbers like in e.g. metall clusters. ...
MODERN QUANTUM THEORY
... Heisenberg carried out a careful analysis, which showed that it is not possible to determine as electron’s momentum (mass x volume) and its position/location simultaneously. IF we know one we cannot know the other. This is known as the Heisenberg’s uncertainty principle: it is impossible to determin ...
... Heisenberg carried out a careful analysis, which showed that it is not possible to determine as electron’s momentum (mass x volume) and its position/location simultaneously. IF we know one we cannot know the other. This is known as the Heisenberg’s uncertainty principle: it is impossible to determin ...
PDF
... Canonical quantization is a method of relating, or associating, a classical system of the form (T ∗ X, ω, H), where X is a manifold, ω is the canonical symplectic form on T ∗ X, with a (more complex) quantum system represented by H ∈ C ∞ (X), where H is the Hamiltonian operator. Some of the early fo ...
... Canonical quantization is a method of relating, or associating, a classical system of the form (T ∗ X, ω, H), where X is a manifold, ω is the canonical symplectic form on T ∗ X, with a (more complex) quantum system represented by H ∈ C ∞ (X), where H is the Hamiltonian operator. Some of the early fo ...
Poster
... may want to use the bicycle wheel on turntable demonstration. Electron spin has no classical equivalent. To provide a classical analog to spin resonance mental model, a spinning ball with a central magnet is required. It is good to remind students that although there are similarities with electron s ...
... may want to use the bicycle wheel on turntable demonstration. Electron spin has no classical equivalent. To provide a classical analog to spin resonance mental model, a spinning ball with a central magnet is required. It is good to remind students that although there are similarities with electron s ...
4.5b.notes
... Eg. Plants convert carbon dioxide gas and water into glucose (C6H12O6) and oxygen ...
... Eg. Plants convert carbon dioxide gas and water into glucose (C6H12O6) and oxygen ...
LOW ENERGY NUCLEAR FUSION REACTIONS: QUANTUM
... relativistic quantum mechanics which can be derived straightforwardly from classical special relativity, a well defined limit ofECE theory. It is shown in Section 2 that the Einstein energy equation can be quantized directly into a new type of linear, relativistic Schroedinger equation which reduces ...
... relativistic quantum mechanics which can be derived straightforwardly from classical special relativity, a well defined limit ofECE theory. It is shown in Section 2 that the Einstein energy equation can be quantized directly into a new type of linear, relativistic Schroedinger equation which reduces ...
