The angular momentum quantum number, denoted by $l$, determines the shape of an electron's orbital and its orbital angular momentum. It can take any integer value from 0 to $n-1$, where $n$ is the principal quantum number.
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The angular momentum quantum number $l$ can have integer values ranging from 0 to $n-1$.
For a given principal quantum number $n$, the possible values of $l$ are 0, 1, 2, ..., $(n-1)$.
$l=0$ corresponds to an s-orbital, $l=1$ to a p-orbital, $l=2$ to a d-orbital, and so on.
The total number of orbitals for a given energy level is determined by summing $(2l + 1)$ for all possible values of $l$.
The value of the angular momentum quantum number affects the magnetic quantum number ($m_l$), which ranges from $-l$ to $+l$.