angular momentum quantum numberの例文

• Here L is the total orbital angular momentum quantum number.
• Where \ mathit l is the angular momentum quantum number.
• These are the principal quantum number, the orbital angular momentum quantum number and the magnetic quantum number.
• So as l is the angular momentum quantum number, l = 0 corresponds to an s shell.
• Here the italicized denote integer or half-integer angular momentum quantum numbers of a particle or of a system.
• :: : To understand the angular momentum quantum numbers it may be helpful to look at the hydrogen atom orbitals.
• A spin-particle is characterized by an angular momentum quantum number for spin "'s "'of.
• The angular momentum quantum number, "  ! ", governs the number of planar nodes going through the nucleus.
• The Dirac equation relativistic spectrum is, however, easily recovered if the orbital momentum quantum number is replaced by total angular momentum quantum number.
• Where is the total angular momentum quantum number, is the Land?" g "-factor, and is the Bohr magneton.
• A typical rotational spectrum consists of a series of peaks that correspond to transitions between levels with different values of the angular momentum quantum number ( \ ell ).
• The antiproton's orbit, which has a large principal quantum number and angular momentum quantum number of around 38, lies far away from the surface of the helium nucleus.
• It is essentially a proportionality constant that relates the observed magnetic moment " ? " of a particle to its angular momentum quantum number and a unit of magnetic moment, usually the Bohr magneton or nuclear magneton.
• For example, when dealing with the energy spectrum of the electron in a hydrogen atom, the relevant state vectors are identified by the principal quantum number, the angular momentum quantum number, the magnetic quantum number, and the spin z-component.
• Electronic theory calculations agree with this result and point out that the weaker interaction of the open-shell 5f orbitals with the ligand orbitals determines | M J |, the magnitude of the angular momentum quantum number along the 8-fold symmetry axis of the ground state.
• The dimension of these matrix equations is technically infinite, but by ignoring all contributions that correspond to an angular momentum quantum number l greater than { l _ { \ max } }, they have dimension { \ left ( + 1 } \ right ) ^ 2 }.
• Where N is the number of magnetic atoms ( or molecules ) per unit volume, g is the Land?g-factor, \ mu _ B ( 9.27400915e-24 J / T or A穖 2 ) is the Bohr magneton, J is the angular momentum quantum number and k _ B is Boltzmann's constant.
• The triplet consists of three states with spin components + 1, 0 and  1 along the direction of the total orbital angular momentum, which is also 1 as indicated by the letter P . The total angular momentum quantum number J can vary from L + S = 2 to L S = 0 in integer steps, so that J = 2, 1 or 0.
• The eigenfunctions of the Hamiltonian, which means functions with a definite energy ( and which therefore do not evolve except for a phase shift ), are characterized not by the quantum number " n " only ( as for the Schr鰀inger equation ), but by " n " and a quantum number " j ", the total angular momentum quantum number.