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A Friedman number is an integer, which represented in a given numeral system, is the result of a non-trivial expression using all its own digits in combination with any of the four basic arithmetic operators (+, −, ×, ÷),
additive inverse In mathematics, the additive inverse of a number is the number that, when added to , yields zero. This number is also known as the opposite (number), sign change, and negation. For a real number, it reverses its sign: the additive inverse (opp ...
s, parentheses, exponentiation, and concatenation. Here, non-trivial means that at least one operation besides concatenation is used. Leading zeros cannot be used, since that would also result in trivial Friedman numbers, such as 024 = 20 + 4. For example, 347 is a Friedman number in the
decimal numeral system The decimal numeral system (also called the base-ten positional numeral system and denary or decanary) is the standard system for denoting integer and non-integer numbers. It is the extension to non-integer numbers of the Hindu–Arabic numeral ...
, since 347 = 73 + 4. The decimal Friedman numbers are: :25, 121, 125, 126, 127, 128, 153, 216, 289, 343, 347, 625, 688, 736, 1022, 1024, 1206, 1255, 1260, 1285, 1296, 1395, 1435, 1503, 1530, 1792, 1827, 2048, 2187, 2349, 2500, 2501, 2502, 2503, 2504, 2505, 2506, 2507, 2508, 2509, 2592, 2737, 2916, ... . Friedman numbers are named after
Erich Friedman A Friedman number is an integer, which represented in a given numeral system, is the result of a non-trivial expression using all its own digits in combination with any of the four basic arithmetic operators (+, −, ×, ÷), additive inverses, ...
, a now-retired mathematics professor at Stetson University, located in DeLand, Florida. A Friedman prime is a Friedman number that is also prime. The decimal Friedman primes are: :127, 347, 2503, 12101, 12107, 12109, 15629, 15641, 15661, 15667, 15679, 16381, 16447, 16759, 16879, 19739, 21943, 27653, 28547, 28559, 29527, 29531, 32771, 32783, 35933, 36457, 39313, 39343, 43691, 45361, 46619, 46633, 46643, 46649, 46663, 46691, 48751, 48757, 49277, 58921, 59051, 59053, 59263, 59273, 64513, 74353, 74897, 78163, 83357, ... .


Results in base 10

The expressions of the first few Friedman numbers are: A nice Friedman number is a Friedman number where the digits in the expression can be arranged to be in the same order as in the number itself. For example, we can arrange 127 = 27 − 1 as 127 = −1 + 27. The first nice Friedman numbers are: :127, 343, 736, 1285, 2187, 2502, 2592, 2737, 3125, 3685, 3864, 3972, 4096, 6455, 11264, 11664, 12850, 13825, 14641, 15552, 15585, 15612, 15613, 15617, 15618, 15621, 15622, 15623, 15624, 15626, 15632, 15633, 15642, 15645, 15655, 15656, 15662, 15667, 15688, 16377, 16384, 16447, 16875, 17536, 18432, 19453, 19683, 19739 . A nice Friedman prime is a nice Friedman number that's also prime. The first nice Friedman primes are: :127, 15667, 16447, 19739, 28559, 32771, 39343, 46633, 46663, 117619, 117643, 117763, 125003, 131071, 137791, 147419, 156253, 156257, 156259, 229373, 248839, 262139, 262147, 279967, 294829, 295247, 326617, 466553, 466561, 466567, 585643, 592763, 649529, 728993, 759359, 786433, 937577 . Friedman's website shows around 100 zeroless
pandigital In mathematics, a pandigital number is an integer that in a given base has among its significant digits each digit used in the base at least once. For example, 1234567890 (one billion two hundred thirty four million five hundred sixty seven tho ...
Friedman numbers . Two of them are: 123456789 = ((86 + 2 × 7)5 − 91) / 34, and 987654321 = (8 × (97 + 6/2)5 + 1) / 34. Only one of them is nice: 268435179 = −268 + 4(3×5 − 17) − 9. Michael Brand proved that the density of Friedman numbers among the naturals is 1, which is to say that the probability of a number chosen randomly and uniformly between 1 and ''n'' to be a Friedman number tends to 1 as ''n'' tends to infinity. This result extends to Friedman numbers under any base of representation. He also proved that the same is true also for binary, ternary and quaternary nice Friedman numbers.Michael Brand, "On the Density of Nice Friedmans", Oct 2013, https://arxiv.org/abs/1310.2390. The case of base-10 nice Friedman numbers is still open.
Vampire number In number theory, 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 conta ...
s are a subset of Friedman numbers where the only operation is a multiplication of two numbers with the same number of digits, for example 1260 = 21 × 60.


Finding 2-digit Friedman numbers

There usually are fewer 2-digit Friedman numbers than 3-digit and more in any given base, but the 2-digit ones are easier to find. If we represent a 2-digit number as ''mb'' + ''n'', where ''b'' is the base and ''m'', ''n'' are integers from 0 to ''b''−1, we need only check each possible combination of ''m'' and ''n'' against the equalities ''mb'' + ''n'' = ''m''''n'', and ''mb'' + ''n'' = ''n''''m'' to see which ones are true. We need not concern ourselves with ''m'' + ''n'' or ''m'' × ''n'', since these will always be smaller than ''mb'' + ''n'' when ''n'' < ''b''. The same clearly holds for ''m'' − ''n'' and ''m'' / ''n''.


Other bases


General results

In base b = mk - m, : b^2 + mb + k = (mk - m + m)b + k = mbk + k = k(mb + 1) is a Friedman number (written in base b as 1''mk'' = ''k'' × ''m''1). In base b > 2, : ^2 = b^ + 2 + 1 is a Friedman number (written in base b as 100...00200...001 = 100..0012, with n - 1 zeroes between each nonzero number). In base b = \frac, : 2b + k = 2\left(\frac\right) + k = k^2 - k + k = k^2 is a Friedman number (written in base b as 2''k'' = ''k''2). From the observation that all numbers of the form 2''k'' × b2''n'' can be written as ''k''000...0002 with ''n'' 0's, we can find sequences of consecutive Friedman numbers which are arbitrarily long. For example, for k = 5, or in base 10, 250068 = 5002 + 68, from which we can easily deduce the range of consecutive Friedman numbers from 250000 to 250099 in base 10. Repdigit Friedman numbers: * The smallest repdigit in base 8 that is a Friedman number is 33 = 33. * The smallest repdigit in base 10 that is thought to be a Friedman number is 99999999 = (9 + 9/9)9−9/9 − 9/9. * It has been proven that repdigits with at least 22 digits are nice Friedman numbers. There are an infinite number of prime Friedman numbers in all bases, because for base 2 \leq b \leq 6 the numbers : n \times 10^ + 11111111 = n \times 10^ + 10^ - 1 + 0 + 0 in base 2 : n \times 10^ + 1101221 = n \times 10^ + 2^ + 0 + 0 in base 3 : n \times 10^ + 310233 = n \times 10^ + 33^ + 0 in base 4 : n \times 10^ + 2443111 = n \times 10^ + (2 \times 3)^ in base 5 : n \times 10^ + 25352411 = n \times 10^ + (5 + 2)^ in base 6 for base 7 \leq b \leq 10 the numbers : n \times 10^ + 164351 = n \times 10^ + (10 + 4 - 3)^5 + 0 + 0 + \ldots in base 7, : n \times 10^ + 163251 = n \times 10^ + (10 + 3 - 2)^5 + 0 + 0 + \ldots in base 8, : n \times 10^ + 162151 = n \times 10^ + (10 + 2 - 1)^5 + 0 + 0 + \ldots in base 9, : n \times 10^ + 161051 = n \times 10^ + (10 + 1 - 0)^5 + 0 + 0 + \ldots in base 10, and for base b > 10 : n \times 10^ + \text = n \times 10^ + (10 + \text/\text)^5 + 0 + 0 + \ldots are Friedman numbers for all n. The numbers of this form are an arithmetic sequence pn + q, where p and q are relatively prime regardless of base as b and b + 1 are always relatively prime, and therefore, by
Dirichlet's theorem on arithmetic progressions In number theory, Dirichlet's theorem, also called the Dirichlet prime number theorem, states that for any two positive coprime integers ''a'' and ''d'', there are infinitely many primes of the form ''a'' + ''nd'', where ''n'' is als ...
, the sequence contains an infinite number of primes.


Duodecimal

In base 12, the Friedman numbers less than 1000 are:


Using Roman numerals

In a trivial sense, all Roman numerals with more than one symbol are Friedman numbers. The expression is created by simply inserting + signs into the numeral, and occasionally the − sign with slight rearrangement of the order of the symbols. Some research into Roman numeral Friedman numbers for which the expression uses some of the other operators has been done. The first such nice Roman numeral Friedman number discovered was 8, since VIII = (V - I) × II. Other such nontrivial examples have been found. The difficulty of finding nontrivial Friedman numbers in Roman numerals increases not with the size of the number (as is the case with
positional notation Positional notation (or place-value notation, or positional numeral system) usually denotes the extension to any base of the Hindu–Arabic numeral system (or decimal system). More generally, a positional system is a numeral system in which the ...
numbering systems) but with the numbers of symbols it has. For example, it is much tougher to figure out whether 147 (CXLVII) is a Friedman number in Roman numerals than it is to make the same determination for 1001 (MI). With Roman numerals, one can at least derive quite a few Friedman expressions from any new expression one discovers. Since 8 is a nice nontrivial nice Roman numeral Friedman number, it follows that any number ending in VIII is also such a Friedman number.


References


External links


Home page for Friedman numbers

Friedman numbers
The On-Line Encyclopedia of Integer Sequences The On-Line Encyclopedia of Integer Sequences (OEIS) is an online database of integer sequences. It was created and maintained by Neil Sloane while researching at AT&T Labs. He transferred the intellectual property and hosting of the OEIS to the ...

Friedman numbers have density 1
Discrete Applied Mathematics, Vol 161, Issues 16–17, Nov 2013, pp 2389–2395
Pretty wild narcissistic numbers - numbers that pwn
{{Classes of natural numbers Base-dependent integer sequences