### Properties of the number 6667:

6667 = 59 × 113 is

semiprime and

squarefree.

6667 has 2 distinct prime factors, 4 divisors, 19

antidivisors and 6496

totatives.

6667 has a

semiprime digit sum 25 in base 10.

Reversing the decimal digits of 6667 results in an

emirpimes.

6667 = 3334

^{2} - 3333

^{2} = 86

^{2} - 27

^{2} is the difference of 2 nonnegative squares in 2 ways.

6667 is the sum of 2 positive

triangular numbers.

6667 is the difference of 2 positive

pentagonal numbers in 1 way.

6667 = 5

^{2} + 9

^{2} + 81

^{2} is the sum of 3 positive squares.

6667

^{2} = 885

^{2} + 6608

^{2} is the sum of 2 positive squares in 1 way.

6667

^{2} is the sum of 3 positive squares.

6667 is a divisor of 1061

^{8} - 1.

6667 = '6' + '667' is the concatenation of 2

semiprime numbers.

6667 is an

emirpimes in (at least) the following bases: 4, 5, 7, 9, 10, 11, 12, 13, 14, 15, 16, 21, 22, 24, 25, 31, 33, 35, 38, 43, 44, 46, 51, 52, 57, 58, 60, 61, 64, 70, 71, 72, 73, 74, 76, 77, 78, 79, 80, 81, 83, 85, 88, 91, 93, 95, 96, and 98.

6667 is

palindromic in (at least) the following bases: 2, 30, 66, -6, -49, and -56.

6667 consists of only the digits '6' and '7'.

6667 in base 29 = 7qq and consists of only the digits '7' and 'q'.

6667 in base 30 = 7c7 and consists of only the digits '7' and 'c'.

6667 in base 36 = 557 and consists of only the digits '5' and '7'.

6667 in base 57 = 22t and consists of only the digits '2' and 't'.

Sequence numbers and descriptions below are taken from

OEIS.

A035349: "DIK" (bracelet, indistinct, unlabeled) transform of

A000237.

A051003: Beastly (or hateful) numbers: numbers containing the string 666 in their decimal expansion.

A067275: Number of Fibonacci numbers

A000045(k), k <= 10^n, which end in 4.

A080859: a(n) = 6*n^2 + 4*n + 1.

A088797: Numbers n>2 such that n divides the concatenation of n-2 and n-1.

A147993: Sequence S such that 1 is in S and if x is in S, then 6x-1 and 6x+1 are in S.

A237424: Numbers of the form (10^a + 10^b + 1)/3.

A254143: Products of any two not necessarily distinct terms of

A237424.

A256292: Numbers which have only digits 6 and 7 in base 10.

A278784: Numbers n such that

A000041(n) is of the form 2^7 * k for odd k.