Answer:
- Option A): Due to the constraints upton the angular momentum quantum number, the subshell 2d does not exist.
Step-by-step explanation:
The angular momentum quantum number, identified with the letter l (lowercase L), number is the second quantum number.
This number identifies the shape of the orbital or kind of subshell.
The possible values of the angular momentum quantum number, l, are constrained by the value of the principal quantum number n: l can take values from 0 to n - 1.
So, you can use this guide:
Principal quantum Angular momentum Shape of the orbital
number, n quantum number, l
1 0 s
2 0, 1 s, p
3 0, 1, 2 s, p, d
Hence,
- the subshell 2d (n = 2, l = 2) is not feasible.
- 2s (option B) is possible: n = 2, l = 0
- 2p (option C) is possible: n = 2, l = 1