58 (number)

58 (fifty-eight) is the natural number following 57 and preceding 59.

58 is a semiprime because it can be formed by the multiplication of two primes 2 and 29 (number).^[1] It is the ninth with 2 as the lowest non-unitary divisor; thus of the form ${\displaystyle 2\times q}$, where ${\displaystyle q}$ is a higher prime (29).

58 is equal to the sum of the first seven consecutive prime numbers:^[2]

${\displaystyle 2+3+5+7+11+13+17=58.}$

This is a difference of 1 from the seventeenth prime number and seventh super-prime, 59.^[3][4] 58 has an aliquot sum of 32^[5] within an aliquot sequence of two composite numbers (58, 32, 13, 1, 0) in the 13-aliquot tree.^[6] There is no solution to the equation ${\displaystyle x-\varphi (x)=58}$, making fifty-eight the sixth noncototient;^[7] however, the totient summatory function over the first thirteen integers is 58.^[8][a]

On the other hand, the Euler totient of 58 is the second perfect number (28),^[10] where the sum-of-divisors of 58 is the third unitary perfect number (90).

58 is also the second non-trivial 11-gonal number, after 30.^[11]

58 is the second member of the fifth cluster of two semiprimes or biprimes (57, 58), following (25, 26) and preceding (118, 119).^[12] More specifically, 58 is the eleventh member in the sequence of consecutive discrete semiprimes that begins,^[13]

58 represents twice the sum between the first two discrete biprimes 14 + 15 = 29, with the first two members of the first such triplet 33 and 34 (or twice 17, the fourth super-prime) respectively the twenty-first and twenty-second composite numbers,^[14] and 22 itself the thirteenth composite.^[14] (Where also, 58 is the sum of all primes between 2 and 17.) The first triplet is the only triplet in the sequence of consecutive discrete biprimes whose members collectively have prime factorizations that nearly span a set of consecutive prime numbers.

${\displaystyle 58^{17}+1}$ is also semiprime (the second such number ${\displaystyle n}$ for ${\displaystyle n^{17}+1,}$ after 2).^[15]

The fifth repdigit is the product between the thirteenth and fifty-eighth primes,

${\displaystyle 41\times 271=11111.}$

58 is also the smallest integer in decimal whose square root has a continued fraction with period 7.^[16] It is the fourth Smith number whose sum of its digits is equal to the sum of the digits in its prime factorization (13).^[17]

Given 58, the Mertens function returns ${\displaystyle 0}$, the fourth such number to do so.^[18] The sum of the first three numbers to return zero (2, 39, 40) sum to 81 = 9², which is the fifty-eighth composite number.^[14]

• The atomic number of cerium (Ce).

58 is the number of usable cells on a Hexxagon game board.