If the value of n = 1 ... The quantum number l can have values from ___to ___. ... The total number of orbitals possible at the n = 1 energy level is ____. If the value of l = 0 ... The quantum number ml can have values from ___ to ____. ... The total number of orbitals possible at the l = 0 sublevel is ____
The solution of the Schrödinger wave equation for the hydrogen atom results in a set of functions (orbitals) that describe the behavior of the electron. Each function is characterized by three quantum numbers: n, l, and ml.
If the value of n = 1
... The quantum number l can have values from ___to ___.
... The total number of orbitals possible at the n = 1 energy level is ____.
If the value of l = 0
... The quantum number ml can have values from ___ to ____.
... The total number of orbitals possible at the l = 0 sublevel is ____.
There are four sets of quantum numbers :-
n (principal quantum number)
l (azimuthal quantum number)
ml (magnetic quantum number)
ms (spin quantum number)
ms = ±1/2
Trending now
This is a popular solution!
Step by step
Solved in 2 steps
