Identify the corresponding cases in each of the following:- n=4,l=2

1.	Identify the corresponding cases in each of the following:- n=4,l=2
Answer» Answer: n=2, so that l can be either 0 or 1, according to the rule in L = √ l ( l + 1 ) h 2 π . Similarly, for n=3, l can be 0, 1, or 2. It is often most convenient to state the value of l, a SIMPLE integer, rather than calculating the value of L from L = √ l ( l + 1 ) h 2 π . For EXAMPLE, for l = 2, we see that L = √ 2 ( 2 + 1 ) h 2 π = √ 6 h 2 π = 0.390 h = 2.58 × 10 − 34 J ⋅ s It is much SIMPLER to state l = 2.

Answer»

Answer:

n=2, so that l can be either 0 or 1, according to the rule in

√

(

)

. Similarly, for n=3, l can be 0, 1, or 2. It is often most convenient to state the value of l, a SIMPLE integer, rather than calculating the value of L from

√

(

)

. For EXAMPLE, for l = 2, we see that

√

(

)

√

0.390

2.58

−

⋅

It is much SIMPLER to state l = 2.

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Identify the corresponding cases in each of the following:- n=4,l=2​

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Identify the corresponding cases in each of the following:- n=4,l=2