> #THE NUMBER OF ATTENDANCE QUESTIONS WERE: 5
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> 
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> #Q1
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> #Is this ([3,4,8,16,32,64...]) in the OEIS (including the 3 at the beginning)? What is the A number? 
> #Without 3 it is, what is the A number?
> #Is the King Tours mentioned in the OEIS in our meaning? 
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> 
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> #Yes,A198633
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> #[4,8,16,32,64...]  A000079
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> #not mentioned
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> 
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> #Q2
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> #How many members of Cn(n) are there with an even number of 1's?
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> #How many are there with a number of 1's that is divisible by 4? 
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> 
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> #2^(n-1)
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> 
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> #Q3
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> #List of the neighbors of [1,1,1,1,1] in Bn(5)
> #How many neighbors does [1,1,1,1...., 1] (1 repeated to the 10^1000)in Bn(10^1000) have? 

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> # [1,1,1,1,0], [1,1,1,0,1], [1,1,0,1,1], [1,0,1,1,1], [0,1,1,1,1]
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> # 10^1000
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> 
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> #Q4
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> #Is [4,46,652,10186, 168304...] in the OEIS? 

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> #YES,  A318109
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> 
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> #Q5
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> #What is the A number of this sequence [2,10,56, 346, 2252 ...]? Is that the main reason why it is in the OEIS? Is the fact it is the diagonal sequence of 1/(1-x-y-z+4xyz) mentioned? 

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> #A000172
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> 	
> #Cusick gives a general method of deriving recurrences for the r-th order Franel numbers (this is the sequence of third-order Franel numbers), with floor((r+3)/2) terms.This is the Taylor expansion of a special point on a curve described by Beauville. - Matthijs Coster, Apr 28 2004
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> 
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