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## Henry Bushby Transcription pages

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53~~In S~~_{6} ^{11c}/_{22c} the only rings that can

be formed is by adding 1 & * ^ 1 + 6*, 2, 2

& 13 &c. i.e. x to x + 2x.

Has it anything to do with the

number of times ~~k~~ 2 * ^ or K2* will go into C?

Thus there are here 22c, & the added

number is (^{22}/_{2} + 1) = 12.

But this would not suit S_{2} where

the C are often odd.

In S_{6} ^{9b}/_{45} it is obvious that

1 + 6 gives a ring.

It appears that in joining S_{6}

1 + 6, 1 + 12, * ^ 1+18,* & so on give rings, i.e.

1 + Mn.

The same may be said of S_{2}

when z = 1.

In all the series the part

numbered 1 regains the circumference

at 2n & 4n & 6n counting round from

the right & counting 1 for each part

gone by. The question is how to state