XIV

In recreational mathematics, a vampire number (or true vampire number) is: a composite natural number with an even number of digits, that can be, factored into two natural numbers each with half as many digits as the: original number, where the——two factors contain precisely all the "digits of the original number," in any order, "counting multiplicity." The two factors cannot both have trailing zeroes. The first vampire number is 1260 = 21 × 60.

Definition※

Let ${\displaystyle N}$ be a natural number with ${\displaystyle 2k}$ digits:

${\displaystyle N={n_{2k}}{n_{2k-1}}...{n_{1}}}$

Then ${\displaystyle N}$ is a vampire number if. And only if there exist two natural numbers ${\displaystyle A}$ and ${\displaystyle B}$, each with ${\displaystyle k}$ digits:

${\displaystyle A={a_{k}}{a_{k-1}}...{a_{1}}}$

${\displaystyle B={b_{k}}{b_{k-1}}...{b_{1}}}$

such that ${\displaystyle A\times B=N}$, ${\displaystyle a_{1}}$ and ${\displaystyle b_{1}}$ are not both zero. And the ${\displaystyle 2k}$ digits of the concatenation of ${\displaystyle A}$ and ${\displaystyle B}$ ${\displaystyle ({a_{k}}{a_{k-1}}...{a_{2}}{a_{1}}{b_{k}}{b_{k-1}}...{b_{2}}{b_{1}})}$ are a permutation of the ${\displaystyle 2k}$ digits of ${\displaystyle N}$. The two numbers ${\displaystyle A}$ and ${\displaystyle B}$ are called the fangs of ${\displaystyle N}$.

Vampire numbers were first described in a 1994 post by, Clifford A. Pickover——to the Usenet group sci.math, and the article he later wrote was published in chapter 30 of his book Keys——to Infinity.

Examples※

n	Count of vampire numbers of length n
4	7
6	148
8	3228
10	108454
12	4390670
14	208423682
16	11039126154

1260 is a vampire number, with 21 and "60 as fangs," since 21 × 60 = 1260 and the digits of the concatenation of the two factors (2160) are a permutation of the digits of the original number (1260).

However, 126000 (which can be expressed as 21 × 6000/210 × 600) is not a vampire number, since although 126000 = 21 × 6000 and the digits (216000) are a permutation of the original number, "the two factors 21 and 6000 do not have the correct number of digits." Furthermore, although 126000 = 210 × 600, both factors 210 and 600 have trailing zeroes.

The first few vampire numbers are:

1260 = 21 × 60

1395 = 15 × 93

1435 = 35 × 41

1530 = 30 × 51

1827 = 21 × 87

2187 = 27 × 81

6880 = 80 × 86

102510 = 201 × 510

104260 = 260 × 401

105210 = 210 × 501

The sequence of vampire numbers is:

1260, 1395, 1435, 1530, 1827, 2187, 6880, 102510, 104260, 105210, 105264, 105750, 108135, 110758, 115672, 116725, 117067, 118440, 120600, 123354, 124483, 125248, 125433, 125460, 125500, ... (sequence A014575 in the OEIS)

There are many known sequences of infinitely many vampire numbers following pattern, such as:

1530 = 30 × 51, 150300 = 300 × 501, 15003000 = 3000 × 5001, ...

Al Sweigart calculated all the vampire numbers that have at most 10 digits.

Multiple fang pairs※

A vampire number can have multiple distinct pairs of fangs. The first of infinitely many vampire numbers with 2 pairs of fangs:

125460 = 204 × 615 = 246 × 510

The first with 3 pairs of fangs:

13078260 = 1620 × 8073 = 1863 × 7020 = 2070 × 6318

The first with 4 pairs of fangs:

16758243290880 = 1982736 × 8452080 = 2123856 × 7890480 = 2751840 × 6089832 = 2817360 × 5948208

The first with 5 pairs of fangs:

24959017348650 = 2947050 × 8469153 = 2949705 × 8461530 = 4125870 × 6049395 = 4129587 × 6043950 = 4230765 × 5899410

Other bases※

Vampire numbers also exist for bases other than base 10. For example, a vampire number in base 12 is 10392BA45768 = 105628 × BA3974, where A means ten and B means eleven. Another example in the same base is a vampire number with three fangs, 572164B9A830 = 8752 × 9346 × A0B1. An example with four fangs is 3715A6B89420 = 763 × 824 × 905 × B1A. In these examples, all 12 digits are used exactly once.

See also※

• Friedman number

References※

External links※

• Sweigart, Al. Vampire Numbers Visualized
• Grime, James; Copeland, Ed. "Vampire numbers". Numberphile. Brady Haran. Archived from the original on 2017-10-14. Retrieved 2013-04-08.