8666 = 2 x 7 x 619.
8666 has a 9th root whose decimal part starts with the digits 1 to 9 in some order.
8666 is a beastly number (A051003).
8666 is the number of permutations of length 21 that avoid the patterns 123 and 4312 (A116699).
8666 is a number n such that n, n + 1, n + 2, and n + 3 are not divisible by any of their nonzero digits (A244358).
8666 is a number n such that n ends with 6 and is the difference of cubes in at least one way (A038861).
Source: What's Special About This Number?
Friday, October 31, 2014
Thursday, October 30, 2014
2430
2430 = 2 x 3 x 3 x 3 x 3 x 3 x 5.
2430 is the number of unordered ways to write 1 as a sum of reciprocals of integers no larger than 18.
2430 is 3300 in base 9.
2430 is the sum of two powers of 3 (A055235).
2430 is the product of all distinct numbers formed by permuting digits of 2430 (A061147).
2430 is a number divisible by the square of the sum of its digits (A072081).
2430 divides 9127 - 1.
Source: What's Special About This Number
2430 is the number of unordered ways to write 1 as a sum of reciprocals of integers no larger than 18.
2430 is 3300 in base 9.
2430 is the sum of two powers of 3 (A055235).
2430 is the product of all distinct numbers formed by permuting digits of 2430 (A061147).
2430 is a number divisible by the square of the sum of its digits (A072081).
2430 divides 9127 - 1.
Source: What's Special About This Number
Wednesday, October 29, 2014
3564
3564 = 2 x 2 x 3 x 3 x 3 x 3 x 11.
3564 is 11220000 in base 3.
3564 is a concentric hendecagonal number (A195043).
3564 is both an abundant number and a Smith number (A098835).
3564 is a number n such that n together with its double and triple contain every digit (A120564).
3564 divides 8918 - 1.
3564 divides 11 + 22 + 33 + . . . + 35643564 (A135189).
Source: What's Special About This Number
3564 is 11220000 in base 3.
3564 is a concentric hendecagonal number (A195043).
3564 is both an abundant number and a Smith number (A098835).
3564 is a number n such that n together with its double and triple contain every digit (A120564).
3564 divides 8918 - 1.
3564 divides 11 + 22 + 33 + . . . + 35643564 (A135189).
Source: What's Special About This Number
Tuesday, October 28, 2014
5675
5675 = 5 x 5 x 227.
5675 is the number of monic polynomials of degree 13 with integer coefficients whose complex roots are all in the unit disk (A051894).
5675 is 2777 in base 13.
5675 is an alternating sum of decreasing powers (A083326).
Source: What's Special About This Number
5675 is the number of monic polynomials of degree 13 with integer coefficients whose complex roots are all in the unit disk (A051894).
5675 is 2777 in base 13.
5675 is an alternating sum of decreasing powers (A083326).
Source: What's Special About This Number
Monday, October 27, 2014
3387
3387 = 3 x 1129.
3387 is the largest of three consecutive semiprimes (A115393).
3387 is the number of different keys with 7 cuts, depths between 1 and 7 and depth difference at most 1 between adjacent cut depths (A002714).
3387 and 33387 end with the same two digits (A067749).
3387 divides 318 - 1.
Source: OEIS
3387 is the largest of three consecutive semiprimes (A115393).
3387 is the number of different keys with 7 cuts, depths between 1 and 7 and depth difference at most 1 between adjacent cut depths (A002714).
3387 and 33387 end with the same two digits (A067749).
3387 divides 318 - 1.
Source: OEIS
Friday, October 24, 2014
Thursday, October 23, 2014
1295
1295 = 5 x 7 x 37.
1295 is 5555 in base 6 (A097252).
1295 has the representation 64 - 1 (A123865 and A024062). It is a subperfect power (A045542).
1295 is the sum of consecutive cubes (A217843).
1295 is the difference of two positive fourth powers (A147857).
Every run of digits of 1295 in base 4 has length 2 (A033002): 110033.
Source: What's Special About This Number
1295 is 5555 in base 6 (A097252).
1295 has the representation 64 - 1 (A123865 and A024062). It is a subperfect power (A045542).
1295 is the sum of consecutive cubes (A217843).
1295 is the difference of two positive fourth powers (A147857).
Every run of digits of 1295 in base 4 has length 2 (A033002): 110033.
Source: What's Special About This Number
Wednesday, October 22, 2014
8123
8123 is a prime number.
8123 is a prime that can be written as a sum of 13 consecutive primes (A127341).
8123 is a prime p such that q - p = 24, where q is the next prime after p (A098974).
8123 represented in base 4 has 2 2s and 4 3s (A045147): 1332323.
8123 is a prime with an equal number of 0s, 1s, and 2s in its base three representation (A174976): 102010212.
8123 is a prime, as is 812318123281233812348123581236812378123881239 (A244271).
Source: OEIS
8123 is a prime that can be written as a sum of 13 consecutive primes (A127341).
8123 is a prime p such that q - p = 24, where q is the next prime after p (A098974).
8123 represented in base 4 has 2 2s and 4 3s (A045147): 1332323.
8123 is a prime with an equal number of 0s, 1s, and 2s in its base three representation (A174976): 102010212.
8123 is a prime, as is 812318123281233812348123581236812378123881239 (A244271).
Source: OEIS
Tuesday, October 21, 2014
1845
1845 = 3 x 3 x 5 x 41.
1845 is a number that can be expressed as the difference of the squares of primes in just one distinct way (A090781).
1845 is the number of ways to place three points on a triangular grid of side 7 so that no two of them are adjacent (A238569).
1845 is the sum of 11 nonzero 6th powers (A003367).
1845 has two representations as a sum of two squares: 1845 = 92 + 422 = 182 + 392.
1845 divides 734 - 1.
Source: OEIS
1845 is a number that can be expressed as the difference of the squares of primes in just one distinct way (A090781).
1845 is the number of ways to place three points on a triangular grid of side 7 so that no two of them are adjacent (A238569).
1845 is the sum of 11 nonzero 6th powers (A003367).
1845 has two representations as a sum of two squares: 1845 = 92 + 422 = 182 + 392.
1845 divides 734 - 1.
Source: OEIS
Monday, October 20, 2014
1837
1837 = 11 x 167.
1837 is a centered dodecagonal number (or a star number) (A003154).
1837 is a concentric hexagonal number (A032528).
1837 is a value of n for which 2n (3674) and 7n (12859) together use each of the digits 1 to 9 exactly once.
1837, 1838, and 1839 are consecutive semiprimes (A056809).
1837 is the number of intersections of diagonals in the interior of a regular 18-gon (A006561).
Source: What's Special About This Number?
1837 is a centered dodecagonal number (or a star number) (A003154).
1837 is a concentric hexagonal number (A032528).
1837 is a value of n for which 2n (3674) and 7n (12859) together use each of the digits 1 to 9 exactly once.
1837, 1838, and 1839 are consecutive semiprimes (A056809).
1837 is the number of intersections of diagonals in the interior of a regular 18-gon (A006561).
Source: What's Special About This Number?
Friday, October 17, 2014
3203
3203 is a prime number.
Reversing the digits of 3203 also produces a prime (A109309).
3203 has the property that if each digit is replaced by its square, the resulting number is a square.
3203 is a prime whose digit sum is 8 (A062343).
3203 is the smallest prime whose decimal expansion begins with concatenation of the first two primes in descending order (A171154).
Source: What's Special About This Number
Reversing the digits of 3203 also produces a prime (A109309).
3203 has the property that if each digit is replaced by its square, the resulting number is a square.
3203 is a prime whose digit sum is 8 (A062343).
3203 is the smallest prime whose decimal expansion begins with concatenation of the first two primes in descending order (A171154).
Source: What's Special About This Number
Thursday, October 16, 2014
9199
9199 is a prime number (A020457).
9199 is a prime whose digit sum is the perfect number 28 (A048517).
9199 is a prime number with every digit a perfect square (A061246).
9199 and the square of 9199 have the same digit sum (A058370).
9199 is the sum of 15 consecutive primes (A161612).
9199 is 243244 in base 5.
9199 divides 4021 - 1.
9199 is a number that cannot be written as a sum of three squares.
Source: OEIS
9199 is a prime whose digit sum is the perfect number 28 (A048517).
9199 is a prime number with every digit a perfect square (A061246).
9199 and the square of 9199 have the same digit sum (A058370).
9199 is the sum of 15 consecutive primes (A161612).
9199 is 243244 in base 5.
9199 divides 4021 - 1.
9199 is a number that cannot be written as a sum of three squares.
Source: OEIS
Wednesday, October 15, 2014
6488
6488 = 2 x 2 x 2 x 811.
6488 would be prime if preceded and followed by 1, 3, 7, or 9 (A059677).
6488 is the maximum number of regions into which 47 triangles divide the plane (A077588).
6488 is a number n such that n! has a square number of digits (A006488).
6488 divides 1518 - 1.
6488 is 22220022 in base 3. It is 8808 in base 9 (A097255 and A043487).
Source: What's Special About This Number?
6488 would be prime if preceded and followed by 1, 3, 7, or 9 (A059677).
6488 is the maximum number of regions into which 47 triangles divide the plane (A077588).
6488 is a number n such that n! has a square number of digits (A006488).
6488 divides 1518 - 1.
6488 is 22220022 in base 3. It is 8808 in base 9 (A097255 and A043487).
Source: What's Special About This Number?
Tuesday, October 14, 2014
2179
2179 is a prime number.
2179 is a lonely number; it sets a new record for the distance to the closest prime (A051650). It is the smallest number a distance 18 from the nearest prime (A051652).
2179 divides 6122 - 1.
2179 is a Wedderburn-Etherington number (A001190).
Source: What's Special About This Number?
2179 is a lonely number; it sets a new record for the distance to the closest prime (A051650). It is the smallest number a distance 18 from the nearest prime (A051652).
2179 divides 6122 - 1.
2179 is a Wedderburn-Etherington number (A001190).
Source: What's Special About This Number?
Friday, October 10, 2014
2854
2854 = 2 x 1427.
2854 is a semiprime with a prime sum of factors (A108605) and with a prime sum of decimal digits (A108610).
2854 is the smallest number that can be written as a sum of distinct Fibonacci numbers in 48 ways (A013583).
2854 is a semiprime s such that s + 3 and s - 3 are both primes (A176140).
Source: OEIS
2854 is a semiprime with a prime sum of factors (A108605) and with a prime sum of decimal digits (A108610).
2854 is the smallest number that can be written as a sum of distinct Fibonacci numbers in 48 ways (A013583).
2854 is a semiprime s such that s + 3 and s - 3 are both primes (A176140).
Source: OEIS
Thursday, October 9, 2014
Wednesday, October 8, 2014
Tuesday, October 7, 2014
7740
7740 = 2 x 2 x 3 x 3 x 5 x 43.
7740 is a pentagonal number (A049452). It is a pentagonal number that is not the difference of two larger pentagonal numbers (A136113), but it is the sum of two other positive pentagonal numbers (A136117).
7740 is 55500 in base 6 (A097252).
7740 is the number of primes less than 13! (A133228).
7740 is the sum of the interior angles of a 45-sided polygon in degrees (A066164).
7740 divides 496 - 1.
Source: Number Gossip
7740 is a pentagonal number (A049452). It is a pentagonal number that is not the difference of two larger pentagonal numbers (A136113), but it is the sum of two other positive pentagonal numbers (A136117).
7740 is 55500 in base 6 (A097252).
7740 is the number of primes less than 13! (A133228).
7740 is the sum of the interior angles of a 45-sided polygon in degrees (A066164).
7740 divides 496 - 1.
Source: Number Gossip
Monday, October 6, 2014
Friday, October 3, 2014
3839
3839 = 11 x 349.
3839 is 120210012 in base 3, the concatenation of three permutations of the digits 0, 1, 2.
3839 is the sum of 11 distinct powers of 2 (A038462).
3839 is the difference between two double factorials (A111300).
3839 is the concatenation of two consecutive numbers (A001704 and A127421).
3839 divides 6729 - 1.
3839 is a number that cannot be written as a sum of three squares.
Source: OEIS
3839 is 120210012 in base 3, the concatenation of three permutations of the digits 0, 1, 2.
3839 is the sum of 11 distinct powers of 2 (A038462).
3839 is the difference between two double factorials (A111300).
3839 is the concatenation of two consecutive numbers (A001704 and A127421).
3839 divides 6729 - 1.
3839 is a number that cannot be written as a sum of three squares.
Source: OEIS