Part A The quantum state of a particle can be specified by giving a complete set
ID: 1304987 • Letter: P
Question
Part A
The quantum state of a particle can be specified by giving a complete set of quantum numbers (n,l, ml,ms). How many different quantum states are possible if the principal quantum number is n = 2?
To find the total number of allowed states, first write down the allowed orbital quantum numbers l, and then write down the number of allowed values of ml for each orbital quantum number. Sum these quantities, and then multiply by 2 to account for the two possible orientations of spin.
Express your answer as an integer.
Part B
Is the state n=3, l=3, ml=?2, ms=1/2 an allowable state? If not, why not?
Is the state , , , an allowable state? If not, why not?
Explanation / Answer
Quantum states for n=2
l......ml
0 , 0................................1
1 , -1, 0, +1................................ 3
2*(1+3)=
2*2^2 = 8allowed states
b)
No: The orbital quantum number cannot equal the principal quantum number.