1 + 2 + 4 + 8 + ⋯

In mathematics, 1 + 2 + 4 + 8 + ⋯ is the infinite series whose terms are the successive powers of two. As a geometric series, it is characterized by its first term, 1, and its common ratio, 2. As a series of real numbers it diverges to infinity, so the sum of this series is infinity.

The first four partial sums of 1 + 2 + 4 + 8 + ⋯.

However, it can be manipulated to yield a number of mathematically interesting results. For example, many summation methods are used in mathematics to assign numerical values even to a divergent series. For example, the Ramanujan summation of this series is −1, which is the limit of the series using the 2-adic metric.

Summation

The partial sums of ${\displaystyle 1+2+4+8+\cdots }$  are ${\displaystyle 1,3,7,15,\ldots ;}$  since these diverge to infinity, so does the series.

$${\displaystyle 2^{0}+2^{1}+\cdots +2^{k}=2^{k+1}-1}$$

 

It is written as :${\displaystyle \sum _{n=0}^{\infty }2^{n}}$ 

Therefore, any totally regular summation method gives a sum of infinity, including the Cesàro sum and Abel sum.^[1] On the other hand, there is at least one generally useful method that sums ${\displaystyle 1+2+4+8+\cdots }$  to the finite value of −1. The associated power series

$${\displaystyle f(x)=1+2x+4x^{2}+8x^{3}+\cdots +2^{n}{}x^{n}+\cdots ={\frac {1}{1-2x}}}$$

 

has a radius of convergence around 0 of only ${\displaystyle {\frac {1}{2}}}$  so it does not converge at ${\displaystyle x=1.}$  Nonetheless, the so-defined function ${\displaystyle f}$  has a unique analytic continuation to the complex plane with the point ${\displaystyle x={\frac {1}{2}}}$  deleted, and it is given by the same rule ${\displaystyle f(x)={\frac {1}{1-2x}}.}$  Since ${\displaystyle f(1)=-1,}$  the original series ${\displaystyle 1+2+4+8+\cdots }$  is said to be summable (E) to −1, and −1 is the (E) sum of the series. (The notation is due to G. H. Hardy in reference to Leonhard Euler's approach to divergent series).^[2]

An almost identical approach (the one taken by Euler himself) is to consider the power series whose coefficients are all 1, that is,

$${\displaystyle 1+y+y^{2}+y^{3}+\cdots ={\frac {1}{1-y}}}$$

 

and plugging in ${\displaystyle y=2.}$  These two series are related by the substitution ${\displaystyle y=2x.}$ 

The fact that (E) summation assigns a finite value to ${\displaystyle 1+2+4+8+\cdots }$  shows that the general method is not totally regular. On the other hand, it possesses some other desirable qualities for a summation method, including stability and linearity. These latter two axioms actually force the sum to be −1, since they make the following manipulation valid:

${\displaystyle {\begin{array}{rcl}s&=&\displaystyle 1+2+4+8+16+\cdots \\&=&\displaystyle 1+2(1+2+4+8+\cdots )\\&=&\displaystyle 1+2s\end{array}}}$ 

In a useful sense, ${\displaystyle s=\infty }$  is a root of the equation ${\displaystyle s=1+2s.}$  (For example, ${\displaystyle \infty }$  is one of the two fixed points of the Möbius transformation ${\displaystyle z\mapsto 1+2z}$  on the Riemann sphere). If some summation method is known to return an ordinary number for ${\displaystyle s}$ ; that is, not ${\displaystyle \infty ,}$  then it is easily determined. In this case ${\displaystyle s}$  may be subtracted from both sides of the equation, yielding ${\displaystyle 0=1+s,}$  so ${\displaystyle s=-1.}$ ^[3]

The above manipulation might be called on to produce −1 outside the context of a sufficiently powerful summation procedure. For the most well-known and straightforward sum concepts, including the fundamental convergent one, it is absurd that a series of positive terms could have a negative value. A similar phenomenon occurs with the divergent geometric series ${\displaystyle 1-1+1-1+\cdots }$  (Grandi's series), where a series of integers appears to have the non-integer sum ${\displaystyle {\frac {1}{2}}.}$  These examples illustrate the potential danger in applying similar arguments to the series implied by such recurring decimals as ${\displaystyle 0.111\ldots }$  and most notably ${\displaystyle 0.999\ldots }$ . The arguments are ultimately justified for these convergent series, implying that ${\displaystyle 0.111\ldots ={\frac {1}{9}}}$  and ${\displaystyle 0.999\ldots =1,}$  but the underlying proofs demand careful thinking about the interpretation of endless sums.^[4]

It is also possible to view this series as convergent in a number system different from the real numbers, namely, the 2-adic numbers. As a series of 2-adic numbers this series converges to the same sum, −1, as was derived above by analytic continuation.^[5]

See also

• 1 − 1 + 2 − 6 + 24 − 120 + ⋯
• 1 − 1 + 1 − 1 + ⋯ (Grandi's series)
• 1 + 1 + 1 + 1 + ⋯
• 1 − 2 + 3 − 4 + ⋯
• 1 + 2 + 3 + 4 + ⋯
• 1 − 2 + 4 − 8 + ⋯
• Two's complement, a data convention for representing negative numbers where −1 is represented as if it were 1 + 2 + 4 + ⋯ + 2ⁿ⁻¹.

Notes

1. Hardy p. 10
2. Hardy pp. 8, 10
3. The two roots of ${\displaystyle s=1+2s}$  are briefly touched on by Hardy p. 19.
4. Gardiner pp. 93–99; the argument on p. 95 for ${\displaystyle 1+2+4+8+\cdots }$  is slightly different but has the same spirit.
5. Koblitz, Neal (1984). p-adic Numbers, p-adic Analysis, and Zeta-Functions. Graduate Texts in Mathematics, vol. 58. Springer-Verlag. pp. chapter I, exercise 16, p. 20. ISBN 0-387-96017-1.

References

• Euler, Leonhard (1760). "De seriebus divergentibus". Novi Commentarii Academiae Scientiarum Petropolitanae. 5: 205–237.
• Gardiner, A. (2002) [1982]. Understanding infinity: the mathematics of infinite processes (Dover ed.). Dover. ISBN 0-486-42538-X.
• Hardy, G. H. (1949). Divergent Series. Clarendon Press. LCC QA295 .H29 1967.

Further reading

• Barbeau, E. J.; Leah, P. J. (May 1976). "Euler's 1760 paper on divergent series". Historia Mathematica. 3 (2): 141–160. doi:10.1016/0315-0860(76)90030-6.
• Ferraro, Giovanni (2002). "Convergence and Formal Manipulation of Series from the Origins of Calculus to About 1730". Annals of Science. 59 (2): 179–199. doi:10.1080/00033790010028179. S2CID 143992318.
• Kline, Morris (November 1983). "Euler and Infinite Series". Mathematics Magazine. 56 (5): 307–314. doi:10.2307/2690371. JSTOR 2690371.
• Sandifer, Ed (June 2006). "Divergent series" (PDF). How Euler Did It. MAA Online. Archived from the original (PDF) on 2013-03-20. Retrieved 2007-02-17.
• Sierpińska, Anna (November 1987). "Humanities students and epistemological obstacles related to limits". Educational Studies in Mathematics. 18 (4): 371–396. doi:10.1007/BF00240986. JSTOR 3482354. S2CID 144880659.