For nucleons we have that the maximum value of \( M_S=m_s=1/2 \), yielding
$$
(m_j)_{\mathrm{max}}=l+\frac{1}{2}.
$$
Using this and the fact that the maximum value of \( M_J=m_j \) is \( j \) we have
$$
j=l+\frac{1}{2}, l-\frac{1}{2}, l-\frac{3}{2}, l-\frac{5}{2}, \dots
$$
To decide where this series terminates, we use the vector inequality
$$
|\hat{L}+\hat{S}| \ge \left| |\hat{L}|-|\hat{S}|\right|.
$$