If (5) ^ l = (7) ^ m = (35) ^ n then prove that
1/m + 1/l = 1/n
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If (5) ^ l = (7) ^ m = (35) ^ n then prove that
1/m + 1/l = 1/n
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Answer:
a) As zero value for n is not possible, this set of quantum numbers is not possible.
(b) This set of quantum numbers is possible.
(c) As l=1 is not possible for n=1 , this set of quantum numbers is not possible. For a given value of n, l can have values of 0,1,2...n−1 only.
(d) This set of quantum numbers is possible.
(e) As l=3 is not possible for n=3, this set of quantum numbers is not possible. For a given value of n, l can have values of 0,1,2...n−1 only.
(f)This set of quantum numbers is possible.
Answer:
Step-by-step explanation:
a) As zero value for n is not possible, this set of quantum numbers is not possible.
(b) This set of quantum numbers is possible.
(c) As l=1 is not possible for n=1 , this set of quantum numbers is not possible. For a given value of n, l can have values of 0,1,2...n−1 only.
(d) This set of quantum numbers is possible.
(e) As l=3 is not possible for n=3, this set of quantum numbers is not possible. For a given value of n, l can have values of 0,1,2...n−1 only.
(f)This set of quantum numbers is possible.
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