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Almost integers that involve the mathematical constants [[pi|{{pi}}]] and [[E (mathematical constant)|e]] have often puzzled mathematicians. An example is: <math>e^\pi-\pi=19.999099979189\ldots</math>
Almost integers that involve the mathematical constants [[pi|{{pi}}]] and [[E (mathematical constant)|e]] have often puzzled mathematicians. An example is: <math>e^\pi-\pi=19.999099979189\ldots</math>
To date, no explanation has been given for why [[Gelfond's constant]] (<math>e^\pi</math>) is nearly identical to <math>\pi+20</math>,<ref name="MathWorld">[[Eric Weisstein]], [http://mathworld.wolfram.com/AlmostInteger.html "Almost Integer"] at [[MathWorld]]</ref> which is therefore considered a [[mathematical coincidence]].
To date, no explanation has been given for why [[Gelfond's constant]] (<math>e^\pi</math>) is nearly identical to <math>\pi+20</math>,<ref name="MathWorld">[[Eric Weisstein]], [http://mathworld.wolfram.com/AlmostInteger.html "Almost Integer"] at [[MathWorld]]</ref> which is therefore considered a [[mathematical coincidence]]{{efn|
It is no longer considered a coincidence.}}.
Another example involving these constants is: <math>e+\pi+e\pi+e^\pi+\pi^e=59.9994590558\ldots</math>
Another example involving these constants is: <math>e+\pi+e\pi+e^\pi+\pi^e=59.9994590558\ldots</math>


==See also==
==See also==
*[[Schizophrenic number]]
*[[Schizophrenic number]]

== Notes ==
{{notelist}}


== References ==
== References ==

Revision as of 10:48, 24 December 2023

Ed Pegg Jr. noted that the length d equals , which is very close to 7 (7.0000000857 ca.)[1]

In recreational mathematics, an almost integer (or near-integer) is any number that is not an integer but is very close to one. Almost integers are considered interesting when they arise in some context in which they are unexpected.

Almost integers relating to the golden ratio and Fibonacci numbers

Well-known examples of almost integers are high powers of the golden ratio , for example:

The fact that these powers approach integers is non-coincidental, because the golden ratio is a Pisot–Vijayaraghavan number.

The ratios of Fibonacci or Lucas numbers can also make almost integers, for instance:

The above examples can be generalized by the following sequences, which generate near-integers approaching Lucas numbers with increasing precision:

As n increases, the number of consecutive nines or zeros beginning at the tenths place of a(n) approaches infinity.

Almost integers relating to e and π

Other occurrences of non-coincidental near-integers involve the three largest Heegner numbers:

where the non-coincidence can be better appreciated when expressed in the common simple form:[2]

where

and the reason for the squares is due to certain Eisenstein series. The constant is sometimes referred to as Ramanujan's constant.

Almost integers that involve the mathematical constants π and e have often puzzled mathematicians. An example is: To date, no explanation has been given for why Gelfond's constant () is nearly identical to ,[1] which is therefore considered a mathematical coincidence[a]. Another example involving these constants is:

See also

Notes

  1. ^ It is no longer considered a coincidence.

References

  1. ^ a b Eric Weisstein, "Almost Integer" at MathWorld
  2. ^ "More on e^(pi*SQRT(163))".