Solution:
There are multiple orbitals within an atom. Each has its own specific energy level and properties. Because each orbital is different, they are assigned specific quantum numbers: 1s, 2s, 2p 3s, 3p,4s, 3d, 4p, 5s, 4d, 5p, 6s, 4f, 5d, 6p, 7s, 5f, 6d, 7p. The numbers, (n=1,2,3, etc.) are called principal quantum numbers and can only be positive numbers. The letters (s,p,d,f) represent the orbital angular momentum quantum number (–!) and the orbital angular momentum quantum number may be 0 or a positive number, but can never be greater than n-1. Each letter is paired with a specific –! value:
● s: subshell = 0
● p: subshell = 1
● d: subshell = 2
● f: subshell = 3
There are two types of nodes, angular and radial nodes. Angular nodes are typically flat plane (at fixed angles). The –! quantum number determines the number of angular nodes in an orbital. Radial nodes are spheres (at fixed radius) that occurs as the principal quantum number increases. The total number of nodes present in any orbital is equal to n-1
Based on the given information in the question, n=4, –! =2
Thus, there are 2 angular nodes present. The total number of nodes in this orbital is: 4-1 = 3. So, there are 3 total nodes. The quantum number –! determines the number of angular nodes. Since there is 2 angular node, this means that one node is still left that should be radial node.
So 4d orbital has 2 angular and 1 radial node
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