A circular necklace contains
n beads. Each bead is black or white. How many
different necklaces can be made with
n beads?
There is no clasp to identify a specific point on the chain, and a flipped over necklace is still the same necklace.
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To get you started:
With 1 bead, the necklace can be either 1 black or 1 white bead.
With 2 beads, the necklace can be either 2 black, 2 white, or 1 black-1 white
With 3 beads, the necklace can be either 3 black, 3 white, 2 black-1 white, 2 white-1 black, etc...
# Beads Number of Necklaces
1 2
2 3
3 4
4 6
5 8
6 13
ID Number: A000029 (Formerly M0563 and N0202)
URL: http://www.research.att.com/projects/OEIS?Anum=A000029
Sequence: 1,2,3,4,6,8,13,18,30,46,78,126,224,380,687,1224,2250,4112,
7685,14310,27012,50964,96909,184410,352698,675188,1296858,
2493726,4806078,9272780,17920860,34669602,67159050,
130216124,252745368,490984488
Name: Number of necklaces with n beads of 2 colors, allowing turning over.
References N. J. Fine, Classes of periodic sequences, Illinois J. Math., 2 (1958),
285-302.
.............AND OTHERS
ady
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