[r-t] Wraps of Rounds
mark at snowtiger.net
Wed Nov 10 19:43:33 UTC 2004
> OK - with out false ones, which would exclude having 23456781 and
> 81234567 twice, but can the others not be obtained in a true way?
> eg 76812345 H
> 67821435 B
> 68712345 B
> 67821354 H
Yes, but I don't understand why you'd want these across back/hand. Why not
have all 18 (well, 17) at hand/back?
> What, in fact, is the maximum number of occurances of wraps you
> can get in a peal of (spliced) major?
Given a choice of methods to provide the required range of place notations,
18 wraps are available on eight bells, as mentioned before. This includes
the trivial case of rounds itself. I doubt that there yet exists any peal
composition exploiting them all. A plain course of Rapid Wrap contains about
nine of them if I remember right.
On 2N bells, the number of wraps is 1+f(N)+2[f(1)+...+f(N-1)], where f(x) =
the number of possible place notations on x bells = fibonacci.
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