If N coins are tossed, the number of ways to obtain H headscan be calculated as N!/(H!(N − H)!). This result fromprobability theory, called the binomial distribution, can confirm thevalues given in the table below.Multiplicities of the five possible macrostates when fourcoins are tossedMacrostateH = 0H = 1H = 2H = 3H = 4Multiplicity (2)14641Part AFor N = 12, what is the multiplicity of the macrostates H = 0?Ως =SubmitPart BN3 =SubmitFor N = 12, what is the multiplicity of the macrostates H = 3?Part CVE ΑΣΦRequest Answer6 =ΑΣΦRequest AnswerB) ?For N = 12, what is the multiplicity of the macrostates H = 6?Π ΑΣΦ?1 ?

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For N = 12, what is the multiplicity of the macrostates H = 0?

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Question

If N coins are tossed, the number of ways to obtain H heads
can be calculated as N!/(H!(N − H)!). This result from
probability theory, called the binomial distribution, can confirm the
values given in the table below.
Multiplicities of the five possible macrostates when four
coins are tossed
Macrostate
H = 0
H = 1
H = 2
H = 3
H = 4
Multiplicity (2)
1
4
6
4
1
Part A
For N = 12, what is the multiplicity of the macrostates H = 0?
Ως =
Submit
Part B
N3 =
Submit
For N = 12, what is the multiplicity of the macrostates H = 3?
Part C
VE ΑΣΦ
Request Answer
6 =
ΑΣΦ
Request Answer
B) ?
For N = 12, what is the multiplicity of the macrostates H = 6?
Π ΑΣΦ
?
1 ?

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