(OEIS A060295), which is very close to an integer. Numbers such as the Ramanujan constant can
be found using the theory of modular functions.
In fact, the nine Heegner numbers (which include
163) share a deep number theoretic property related to some amazing properties of
the j-function that leads to this sort of near-identity.
Although Ramanujan (1913-1914) gave few rather spectacular examples of almost integers (such ),
he did not actually mention the particular near-identity given above. In fact, Hermite
(1859) observed this property of 163 long before Ramanujan's work. The name "Ramanujan's
constant" was coined by Simon Plouffe and derives from an April Fool's joke
played by Martin Gardner (Apr. 1975) on the readers of Scientific American.
In his column, Gardner claimed that was exactly an integer,
and that Ramanujan had conjectured this in his 1914 paper. Gardner admitted his hoax
a few months later (Gardner, July 1975).
The Ramanujan constant can be approximated to 14 digits by
Ball, W. W. R. and Coxeter, H. S. M. Mathematical
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D. "The Ubiquitous Pi. Part I." Math. Mag.61, 67-98, 1988.Gardner,
M. "Mathematical Games: Six Sensational Discoveries that Somehow or Another
have Escaped Public Attention." Sci. Amer.232, 127-131, Apr.
1975.Gardner, M. "Mathematical Games: On Tessellating the Plane
with Convex Polygons." Sci. Amer.232, 112-117, Jul. 1975.Good,
I. J. "What is the Most Amazing Approximate Integer in the Universe?"
Pi Mu Epsilon J.5, 314-315, 1972.Hermite, C. "Sur
la théorie des équations modulaires." Comptes Rendus Acad.
Sci. Paris49, 16-24, 110-118, and 141-144, 1859. Reprinted in Oeuvres
complètes, Tome II. Paris: Hermann, p. 61, 1912.Michon,
G. P. "Final Answers: Numerical Constants." http://home.att.net/~numericana/answer/constants.htm#ramanju.Piezas,
T. III "Ramanujan's Constant And Its Cousins." http://www.geocities.com/titus_piezas/Ramanujan_a.htm.Ramanujan,
S. "Modular Equations and Approximations to ." Quart. J. Pure Appl. Math.45, 350-372,
1913-1914.Sloane, N. J. A. Sequences A060295
and A102912 in "The On-Line Encyclopedia
of Integer Sequences."Wolfram, S. The
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