Mathematical coincidence
A mathematical coincidence is said to occur when two expressions with no direct relationship show a near-equality which has no apparent theoretical explanation.
For example, there is a near-equality close to the round number 1000 between powers of 2 and powers of 10:
Some mathematical coincidences are used in engineering when one expression is taken as an approximation of another.
Contents
IntroductionEdit
A mathematical coincidence often involves an integer, and the surprising feature is the fact that a real number arising in some context is considered by some standard as a "close" approximation to a small integer or to a multiple or power of ten, or more generally, to a rational number with a small denominator. Other kinds of mathematical coincidences, such as integers simultaneously satisfying multiple seemingly unrelated criteria or coincidences regarding units of measurement, may also be considered. In the class of those coincidences that are of a purely mathematical sort, some simply result from sometimes very deep mathematical facts, while others appear to come 'out of the blue'.
Given the countably infinite number of ways of forming mathematical expressions using a finite number of symbols, the number of symbols used and the precision of approximate equality might be the most obvious way to assess mathematical coincidences; but there is no standard, and the strong law of small numbers is the sort of thing one has to appeal to with no formal opposing mathematical guidance.^{[citation needed]} Beyond this, some sense of mathematical aesthetics could be invoked to adjudicate the value of a mathematical coincidence, and there are in fact exceptional cases of true mathematical significance (see Ramanujan's constant below, which made it into print some years ago as a scientific April Fools' joke^{[1]}). All in all, though, they are generally to be considered for their curiosity value or, perhaps, to encourage new mathematical learners at an elementary level.
Some examplesEdit
Rational approximantsEdit
Sometimes simple rational approximations are exceptionally close to interesting irrational values. These are explainable in terms of large terms in the continued fraction representation of the irrational value, but further insight into why such improbably large terms occur is often not available.
Rational approximants (convergents of continued fractions) to ratios of logs of different numbers are often invoked as well, making coincidences between the powers of those numbers.^{[2]}
Many other coincidences are combinations of numbers that put them into the form that such rational approximants provide close relationships.
Concerning πEdit
- The first convergent of π, [3; 7] = 22/7 = 3.1428..., was known to Archimedes,^{[3]} and is correct to about 0.04%. The third convergent of π, [3; 7, 15, 1] = 355/113 = 3.1415929..., found by Zu Chongzhi,^{[4]} is correct to six decimal places;^{[3]} this high accuracy comes about because π has an unusually large next term in its continued fraction representation: π = [3; 7, 15, 1, 292, ...].^{[5]}
- A coincidence involving π and the golden ratio φ is given by . This is related to Kepler triangles. Some believe one or the other of these coincidences is to be found in the Great Pyramid of Giza, but it is highly improbable that this was intentional.^{[6]}
- There is a sequence of six nines in pi that begins at the 762nd decimal place of the decimal representation of pi. For a randomly chosen normal number, the probability of any chosen number sequence of six digits (including 6 of a number, 658 020, or the like) occurring this early in the decimal representation is only 0.08%. Pi is conjectured, but not known, to be a normal number.
Concerning base 2Edit
- The coincidence , correct to 2.4%, relates to the rational approximation , or to within 0.3%. This relationship is used in engineering, for example to approximate a factor of two in power as 3 dB (actual is 3.0103 dB – see Half-power point), or to relate a kibibyte to a kilobyte; see binary prefix.^{[7]}^{[8]}
- This coincidence can also be expressed as (eliminating common factor of , so also correct to 2.4%), which corresponds to the rational approximation , or (also to within 0.3%). This is invoked for instance in shutter speed settings on cameras, as approximations to powers of two (128, 256, 512) in the sequence of speeds 125, 250, 500, etc.^{[2]}
Concerning musical intervalsEdit
- The coincidence , from leads to the observation commonly used in music to relate the tuning of 7 semitones of equal temperament to a perfect fifth of just intonation: , correct to about 0.1%. The just fifth is the basis of Pythagorean tuning and most known systems of music. From the consequent approximation it follows that the circle of fifths terminates seven octaves higher than the origin.^{[2]}
- The coincidence leads to the rational version of 12-TET, as noted by Johann Kirnberger.^{[citation needed]}
- The coincidence leads to the rational version of quarter-comma meantone temperament.^{[citation needed]}
- The coincidence leads to the very tiny interval of (about a millicent wide), which is the first 7-limit interval tempered out in 103169-TET.^{[citation needed]}
- The coincidence of powers of 2, above, leads to the approximation that three major thirds concatenate to an octave, . This and similar approximations in music are called dieses.
Numerical expressionsEdit
Concerning powers of πEdit
- correct to about 1.3%.^{[9]} This can be understood in terms of the formula for the zeta function ^{[10]} This coincidence was used in the design of slide rules, where the "folded" scales are folded on rather than because it is a more useful number and has the effect of folding the scales in about the same place.^{[citation needed]}
- correct to 0.0004%.^{[9]}
- If the quadrant arc is 10, the chord is 9, is known to the ancient Egyptians. A litre represented as a cylinder of 16 inches circumference and three inches high (48 Hoppus inches) is equal to a cylinder 0.3 feet in circumference and 6 inches high, (0.045 cyl. ft) are equal with this pi. The reflective cell of the symmetry of the [3,3,5] is equal to unity, when the radius of the 4-sphere is taken as 9.^{[clarification needed]}
- or ^{[11]} accurate to 8 decimal places (due to Ramanujan: Quarterly Journal of Mathematics, XLV, 1914, pp. 350–372). Ramanujan states that this "curious approximation" to was "obtained empirically" and has no connection with the theory developed in the remainder of the paper.
- Some plausible relations hold to a high degree of accuracy, but are nevertheless coincidental. One example is
- The two sides of this expression only differ after the 42nd decimal place.^{[12]}
Containing both π and eEdit
- , within 0.000 005%^{[11]}
- is also very close to 5, approximately 0.000 538% error (Joseph Clarke, 2015)
- is very close to 20 (Conway, Sloane, Plouffe, 1988); this is equivalent to ^{[11]}
- ^{[11]}
- . In fact, this generalizes to the approximate identity: which can be explained by the Jacobian theta functional identity.^{[13]}^{[14]}^{[15]}
Containing π or e and 163Edit
- , within 0.0005%^{[11]}
- , within 0.000004%^{[11]}
- Ramanujan's constant: , within , discovered in 1859 by Charles Hermite.^{[16]} This very close approximation is not a typical sort of accidental mathematical coincidence, where no mathematical explanation is known or expected to exist (as is the case for most others here). It is a consequence of the fact that 163 is a Heegner number.
Other numerical curiositiesEdit
- .^{[17]}
- and are the only non-trivial (i.e. at least square) consecutive powers of positive integers (Catalan's conjecture).
- is the only positive integer solution of , assuming that ^{[18]} (see Lambert's W function for a formal solution method)
- The Fibonacci number F_{296182} is (probably) a semiprime, since F_{296182} = F_{148091} × L_{148091} where F_{148091} (30949 digits) and the Lucas number L_{148091} (30950 digits) are simultaneously probable primes.^{[19]}
- In a discussion of the birthday problem, the number occurs, which is "amusingly" equal to to 4 digits.^{[20]}
Decimal coincidencesEdit
- . This makes 2592 a nice Friedman number.^{[21]}
- . This makes 3435 a base-10 Münchhausen number. In fact, other than 0 and 1, the number 3435 is the only base-10 Münchhausen number. However, if one is willing to, for these purposes, adopt the convention that , then 438579088 is another Münchhausen number. For a few months, the number 3435 was the favorite number of Matt Parker, a stand-up mathematician, but he soon "got bored" and switched his favorite number to other types of numbers, such as narcissistic numbers and perfect numbers. Parker vehemently disagrees with the notion that 438579088 is another Münchhausen number.^{[22]}^{[23]}
- . The only such factorions (in base 10) are 1, 2, 145, 40585.^{[24]}
- , , , (anomalous cancellation^{[25]}). Also, the product of these four fractions reduces to exactly 1/100.
- ; ; and .^{[26]}
- . This can also be written , making 127 the smallest nice Friedman number.^{[21]}
- ; ; ; — all narcissistic numbers^{[27]}
- ^{[28]}
- and also when rounded to 8 digits is 0.05882353. Mentioned by Gilbert Labelle in ~1980.^{[29]} 5882353 is also prime.
- . The largest such number is 12157692622039623539.^{[30]}
- , where is the golden ratio^{[31]} (an amusing equality with an angle expressed in degrees) (see Number of the Beast)
- , where is Euler's totient function^{[31]}
Numerical coincidences in numbers from the physical worldEdit
Speed of lightEdit
The speed of light is (by definition) exactly 299,792,458 m/s, very close to 300,000,000 m/s. This is a pure coincidence, as the meter was originally defined as 1/10,000,000 of the distance between the Earth's pole and equator along the surface at sea level, and the Earth's circumference just happens to be about 2/15 of a light-second.^{[32]} It is also roughly equal to one foot per nanosecond (the actual number is 0.9836 ft/ns).
Earth's diameterEdit
The polar diameter of the Earth is equal to half a billion inches, to within 0.1%.^{[33]}
Gravitational accelerationEdit
While not constant but varying depending on latitude and altitude, the numerical value of the acceleration caused by Earth's gravity on the surface lies between 9.74 and 9.87, which is quite close to 10. This means that as a result of Newton's second law, the weight of a kilogram of mass on Earth's surface corresponds roughly to 10 newtons of force exerted on an object.^{[34]}
This is related to the aforementioned coincidence that the square of pi is close to 10. One of the early definitions of the meter was the length of a pendulum whose half swing had a period equal to one second. Since the period of the full swing of a pendulum is approximated by the equation below, algebra shows that if this definition was maintained, gravitational acceleration measured in meters per second per second would be exactly equal to .^{[35]}
When it was discovered that the circumference of the earth was very close to 40,000,000 times this value, the meter was redefined to reflect this, as it was a more objective standard (because the gravitational acceleration varies over the surface of the Earth). This had the effect of increasing the length of the meter by less than 1%, which was within the experimental error of the time.^{[citation needed]}
Another coincidence related to the gravitational acceleration g is that its value of approximately 9.8 m/s^{2} is equal to 1.03 light-year/year^{2}, which numerical value is close to 1. This is related to the fact that g is close to 10 in SI units (m/s^{2}), as mentioned above, combined with the fact that the number of seconds per year happens to be close to the numerical value of c/10, with c the speed of light in m/s. In fact, it has nothing to do with SI as c/g = 354 days, nearly, and 365/354 = 1.03.
Rydberg constantEdit
The Rydberg constant, when multiplied by the speed of light and expressed as a frequency, is close to :^{[32]}
- ^{[36]}
US customary to metric conversionsEdit
As discovered by Randall Munroe, a cubic mile is close to cubic kilometers (within 0.5%). This means that a sphere with radius n kilometers has almost exactly the same volume as a cube with sides length n miles.^{[37]}^{[38]}
Fine-structure constantEdit
The fine-structure constant is close to and was once conjectured to be precisely .
Although this coincidence is not as strong as some of the others in this section, it is notable that is a dimensionless constant, so this coincidence is not an artifact of the system of units being used.
See alsoEdit
ReferencesEdit
- ^ Reprinted as Gardner, Martin (2001). "Six Sensational Discoveries". The Colossal Book of Mathematics. New York: W. W. Norton & Company. pp. 674–694. ISBN 0-393-02023-1.
- ^ ^{a} ^{b} ^{c} Manfred Robert Schroeder (2008). Number theory in science and communication (2nd ed.). Springer. pp. 26–28. ISBN 978-3-540-85297-1.
- ^ ^{a} ^{b} Petr Beckmann (1971). A History of Pi. Macmillan. pp. 101, 170. ISBN 978-0-312-38185-1.
- ^ Yoshio Mikami (1913). Development of Mathematics in China and Japan. B. G. Teubner. p. 135.
- ^ Eric W. Weisstein (2003). CRC concise encyclopedia of mathematics. CRC Press. p. 2232. ISBN 978-1-58488-347-0.
- ^ Roger Herz-Fischler (2000). The Shape of the Great Pyramid. Wilfrid Laurier University Press. p. 67. ISBN 978-0-889-20324-2.
- ^ Ottmar Beucher (2008). Matlab und Simulink. Pearson Education. p. 195. ISBN 978-3-8273-7340-3.
- ^ K. Ayob (2008). Digital Filters in Hardware: A Practical Guide for Firmware Engineers. Trafford Publishing. p. 278. ISBN 978-1-4251-4246-9.
- ^ ^{a} ^{b} Frank Rubin, The Contest Center – Pi.
- ^ Why is so close to 10?, Noam Elkies
- ^ ^{a} ^{b} ^{c} ^{d} ^{e} ^{f} Weisstein, Eric W. "Almost Integer". MathWorld.
- ^ http://crd.lbl.gov/~dhbailey/dhbpapers/math-future.pdf
- ^ "Curious relation between $e$ and $\pi$ that produces almost integers". math.stackexchange.com. Retrieved 2017-12-04.
- ^ Kothe, Jochen. "Göttinger Digitalisierungszentrum: Seitenansicht". gdz.sub.uni-goettingen.de (in German). Retrieved 2017-12-04.
- ^ "Proving the identity $\sum_{n=-\infty}^\infty e^{-\pi n^2x}=x^{-1/2}\sum_{n=-\infty}^\infty e^{-\pi n^2/x}.$". math.stackexchange.com. Retrieved 2017-12-04.
- ^ Barrow, John D (2002). The Constants of Nature. London: Jonathan Cape. ISBN 0-224-06135-6.
- ^ Harvey Heinz, Narcissistic Numbers.
- ^ Ask Dr. Math, "Solving the Equation x^y = y^x".
- ^ David Broadhurst, "Prime Curios!: 10660...49391 (61899-digits)".
- ^ Arratia, Richard; Goldstein, Larry; Gordon, Louis (1990). "Poisson approximation and the Chen-Stein method". Statistical Science. 5 (4): 403–434. doi:10.1214/ss/1177012015. JSTOR 2245366. MR 1092983.
- ^ ^{a} ^{b} Erich Friedman, Problem of the Month (August 2000).
- ^ Numberphile (2012-01-13), 3435 - Numberphile, retrieved 2017-12-04
- ^ W., Weisstein, Eric. "Münchhausen Number". mathworld.wolfram.com. Retrieved 2017-12-04.
- ^ (sequence A014080 in the OEIS)
- ^ Weisstein, Eric W. "Anomalous Cancellation". MathWorld.
- ^ (sequence A061209 in the OEIS)
- ^ (sequence A005188 in the OEIS)
- ^ Prime Curios!: 343.
- ^ Sloane, N. J. A. (ed.). "Sequence A064942 (Decimal numbers n such that after possibly prefixing leading 0's to n, the resulting number n' can be broken into 2 numbers of equal length, n' = xy, such that x^2+y^2 = n (y may also have leading zeros))". The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2017-12-04.
- ^ (sequence A032799 in the OEIS)
- ^ ^{a} ^{b} Weisstein, Eric W. "Beast Number". MathWorld.
- ^ ^{a} ^{b} Michon, Gérard P. "Numerical Coincidences in Man-Made Numbers". Mathematical Miracles. Retrieved 29 April 2011.
- ^ Smythe, Charles (2004). Our Inheritance in the Great Pyramid. Kessinger Publishing. p. 39. ISBN 1-4179-7429-X.
- ^ Cracking the AP Physics B & C Exam, 2004–2005 Edition. Princeton Review Publishing. 2003. p. 25. ISBN 0-375-76387-2.
- ^ "What Does Pi Have To Do With Gravity?". Wired. March 8, 2013. Retrieved October 15, 2015.
- ^ "Rydberg constant times c in Hz". Fundamental physical constants. NIST. Retrieved 25 July 2011.
- ^ Randall Munroe (2014). What If?. p. 49. ISBN 9781848549562.
- ^ "A Mole of Moles". what-if.xkcd.com. Retrieved 2018-09-12.
External linksEdit
- (in Russian) В. Левшин. – Магистр рассеянных наук. – Москва, Детская Литература 1970, 256 с.
- Hardy, G. H. – A Mathematician's Apology. – New York: Cambridge University Press, 1993, (ISBN 0-521-42706-1)
- Weisstein, Eric W. "Almost Integer". MathWorld.
- Various mathematical coincidences in the "Science & Math" section of futilitycloset.com
- Press, W. H., Seemingly Remarkable Mathematical Coincidences Are Easy to Generate