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2. Isonics 1 8 1 4 In Fraction
3. Isonics 1 8 1 11 2 Low Fire

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• In fact, the latter series converges to 1, and it proves that one of the binary expansions of 1 is 0.111. Pairing up the terms of the series 1 / 2 − 1 / 4 + 1 / 8 − 1 / 16 + ⋯ results in another geometric series with the same sum, 1 / 4 + 1 / 16 + 1 / 64 + 1 / 256 + ⋯.

In mathematics, the infinite series1/2 − 1/4 + 1/8 − 1/16 + ⋯ is a simple example of an alternating series that converges absolutely.

It is a geometric series whose first term is 1/2 and whose common ratio is −1/2, so its sum is

${\displaystyle \sum _{n=1}^{\mathrm{\infty }}\frac{(-1{)}^{n+1}}{2^n}=\frac{1}{2}-\frac{1}{4}+\frac{1}{8}-\frac{1}{16}+\cdots =\frac{\frac{1}{2}}{1-(-\frac{1}{2})}=\frac{1}{3}.}$

Hackenbush and the surreals[edit]

A slight rearrangement of the series reads

${\displaystyle 1-\frac{1}{2}-\frac{1}{4}+\frac{1}{8}-\frac{1}{16}+\cdots =\frac{1}{3}.}$

The series has the form of a positive integer plus a series containing every negative power of two with either a positive or negative sign, so it can be translated into the infinite blue-red Hackenbush string that represents the surreal number1/3:

LRRLRLR… = 1/3.^[1]

A slightly simpler Hackenbush string eliminates the repeated R:

LRLRLRL… = 2/3.^[2]

In terms of the Hackenbush game structure, this equation means that the board depicted on the right has a value of 0; whichever player moves second has a winning strategy.

Related series[edit]

• The statement that 1/2 − 1/4 + 1/8 − 1/16 + ⋯ is absolutely convergent means that the series 1/2 + 1/4 + 1/8 + 1/16 + ⋯ is convergent. In fact, the latter series converges to 1, and it proves that one of the binary expansions of 1 is 0.111….
• Pairing up the terms of the series 1/2 − 1/4 + 1/8 − 1/16 + ⋯ results in another geometric series with the same sum, 1/4 + 1/16 + 1/64 + 1/256 + ⋯. This series is one of the first to be summed in the history of mathematics; it was used by Archimedes circa 250–200 BC.^[3]
• The Euler transform of the divergent series 1 − 2 + 4 − 8 + ⋯ is 1/2 − 1/4 + 1/8 − 1/16 + ⋯. Therefore, even though the former series does not have a sum in the usual sense, it is Euler summable to 1/3.^[4]

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Notes[edit]

1. ^Berkelamp et al. p. 79
2. ^Berkelamp et al. pp. 307–308
3. ^Shawyer and Watson p. 3
4. ^Korevaar p. 325

References[edit]

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• Berlekamp, E. R.; Conway, J. H.; Guy, R. K. (1982). Winning Ways for your Mathematical Plays. Academic Press. ISBN0-12-091101-9.
• Korevaar, Jacob (2004). Tauberian Theory: A Century of Developments. Springer. ISBN3-540-21058-X.
• Shawyer, Bruce; Watson, Bruce (1994). Borel's Methods of Summability: Theory and Applications. Oxford UP. ISBN0-19-853585-6.

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