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The term "azimuthal quantum number" was introduced by Arnold Sommerfeld in 1915 [1]: II:132 as part of an ad hoc description of the energy structure of atomic spectra. . Only later with the quantum model of the atom was it understood that this number, ℓ, arises from quantization of orbital angular moment
In chemistry, this quantum number is very important, since it specifies the shape of an atomic orbital and strongly influences chemical bonds and bond angles. The azimuthal quantum number can also denote the number of angular nodes present in an orbital. For example, for p orbitals, ℓ = 1 and thus the amount of angular nodes in a p orbital is 1.
In quantum mechanics, the angular momentum operator is one of several related operators analogous to classical angular momentum.The angular momentum operator plays a central role in the theory of atomic and molecular physics and other quantum problems involving rotational symmetry.
The associated quantum number is the main total angular momentum quantum number j. It can take the following range of values, jumping only in integer steps: [ 1 ] | ℓ − s | ≤ j ≤ ℓ + s {\displaystyle \vert \ell -s\vert \leq j\leq \ell +s} where ℓ is the azimuthal quantum number (parameterizing the orbital angular momentum) and s is ...
m ℓ = azimuthal magnetic quantum number; j = total angular momentum quantum number; ... The Cambridge Handbook of Physics Formulas. Cambridge University Press.
In atomic physics, a magnetic quantum number is a quantum number used to distinguish quantum states of an electron or other particle according to its angular momentum along a given axis in space. The orbital magnetic quantum number ( m l or m [ a ] ) distinguishes the orbitals available within a given subshell of an atom.
This notation is used to specify electron configurations and to create the term symbol for the electron states in a multi-electron atom. When writing a term symbol, the above scheme for a single electron's orbital quantum number is applied to the total orbital angular momentum associated to an electron state.
The total effect, obtained by summing the three components up, is given by the following expression: [5] = (+), where is the total angular momentum quantum number (= / if = and = / otherwise). It is worth noting that this expression was first obtained by Sommerfeld based on the old Bohr theory ; i.e., before the modern quantum mechanics was ...