2014 = 2 x 19 x 53.
2013, 2014, and 2015 each have three distinct prime factors (A168626).
2014 = 133 - 132 - 131 - 130 (A083074).
2014 is 11111011110 in base 2 (binary). It is 133132 in base 4.
2014 is the sum of three distinct nonzero squares in exactly nine ways (A025347).
2014 divides 8312 - 1.
2014 is the International Year of Crystallography.
Source: On-Line Encyclopedia of Integer Sequences
Friday, December 20, 2013
Thursday, December 19, 2013
5714
5714 = 2 x 2857.
5714 is 42242 in base 6 and 22442 in base 7.
5714 is the number of rooted trees with 10 nodes and a single labeled node (A000107).
5714 has a representation as a sum of two squares: 5714 = 352 + 672.
5714 divides 397 - 1.
5714 is the number of intersections between a sphere inscribed in a cube and the 35 x 35 x 35 cubes resulting from a cubic lattice subdivision of the enclosing cube (A085690).
5714 is the number of stereoisomers of all hydrocarbons with 9 nodes (A036672).
Source: On-Line Encyclopedia of Integer Sequences
5714 is 42242 in base 6 and 22442 in base 7.
5714 is the number of rooted trees with 10 nodes and a single labeled node (A000107).
5714 has a representation as a sum of two squares: 5714 = 352 + 672.
5714 divides 397 - 1.
5714 is the number of intersections between a sphere inscribed in a cube and the 35 x 35 x 35 cubes resulting from a cubic lattice subdivision of the enclosing cube (A085690).
5714 is the number of stereoisomers of all hydrocarbons with 9 nodes (A036672).
Source: On-Line Encyclopedia of Integer Sequences
Wednesday, December 18, 2013
3388
3388 = 2 x 2 x 7 x 11 x 11.
3388 is 11122111 in base 3. It is 898 in base 20.
3388 and the sum of the digits of 3388 are both multiples of 11 (A216995).
3388 is a concentric heptagonal number (A195041).
3388 is the smallest number requiring 31 chisel strokes for its representation in Roman numerals, with "C" requiring 2 strokes (MMMCCCLXXXVIII) (A002964).
3388 is the sum of three consecutive hexagonal numbers (A129109).
Source: On-Line Encyclopedia of Integer Sequences
3388 is 11122111 in base 3. It is 898 in base 20.
3388 and the sum of the digits of 3388 are both multiples of 11 (A216995).
3388 is a concentric heptagonal number (A195041).
3388 is the smallest number requiring 31 chisel strokes for its representation in Roman numerals, with "C" requiring 2 strokes (MMMCCCLXXXVIII) (A002964).
3388 is the sum of three consecutive hexagonal numbers (A129109).
Source: On-Line Encyclopedia of Integer Sequences
Tuesday, December 17, 2013
2315
2315 = 5 x 463.
2315 divides 213 - 1.
2315 = 27 + 37 (A007689). It is the sum of the seventh powers of two consecutive primes (A133538).
2315 is a centered cube number (A036085).
2315 is a number n such that n, n + 2, n + 4, n + 6, and n + 8 are semiprimes (A092127).
2315 is the sum of five nonzero 6th powers (A003361).
Source: On-Line Encyclopedia of Integer Sequences
2315 divides 213 - 1.
2315 = 27 + 37 (A007689). It is the sum of the seventh powers of two consecutive primes (A133538).
2315 is a centered cube number (A036085).
2315 is a number n such that n, n + 2, n + 4, n + 6, and n + 8 are semiprimes (A092127).
2315 is the sum of five nonzero 6th powers (A003361).
Source: On-Line Encyclopedia of Integer Sequences
Monday, December 16, 2013
8400
8400 = 2 x 2 x 2 x 2 x 3 x 5 x 5 x 7.
8400 is a number with four distinct prime factors {2, 3, 5, 7} (A147571).
8400 is a pentagonal number (A000326).
8400 is the number of ways of writing 31 as the sum of seven triangular numbers (A226252).
8400 is 1100 in base 20.
8400 is a number that can be expressed as the difference of the squares of primes in just three distinct ways (A090782).
8400 divides 434 - 1.
8400 is the number of legal queen moves in chess.
Source: Number Gossip
8400 is a number with four distinct prime factors {2, 3, 5, 7} (A147571).
8400 is a pentagonal number (A000326).
8400 is the number of ways of writing 31 as the sum of seven triangular numbers (A226252).
8400 is 1100 in base 20.
8400 is a number that can be expressed as the difference of the squares of primes in just three distinct ways (A090782).
8400 divides 434 - 1.
8400 is the number of legal queen moves in chess.
Source: Number Gossip
Friday, December 13, 2013
8223
8223 = 3 x 2741.
8223 is the smallest number having exactly two odd prime factors that differ by 2 x n2, for n = 37 (A190052).
8223 has the representation 8223 = 213 + 31.
8223 divides 6520 - 1.
Source: On-Line Encyclopedia of Integer Sequences
8223 is the smallest number having exactly two odd prime factors that differ by 2 x n2, for n = 37 (A190052).
8223 has the representation 8223 = 213 + 31.
8223 divides 6520 - 1.
Source: On-Line Encyclopedia of Integer Sequences
Thursday, December 12, 2013
3183
3183 = 3 x 1061.
3183 is the next semiprime after the partial sum of the first 46 semiprimes (A182081).
3183 has the representation 55 + 58.
3183 divides 1420 - 1.
3183 is the smallest number having exactly two odd prime factors that differ by 2 x n2, for n = 23 (A190052).
3183 is the maximum number of different determinants that can be produced by permuting the elements of a 3 x 3 matrix with nonnegative entries less than or equal to 13 (A099834).
Source: On-Line Encyclopedia of Integer Sequences
3183 is the next semiprime after the partial sum of the first 46 semiprimes (A182081).
3183 has the representation 55 + 58.
3183 divides 1420 - 1.
3183 is the smallest number having exactly two odd prime factors that differ by 2 x n2, for n = 23 (A190052).
3183 is the maximum number of different determinants that can be produced by permuting the elements of a 3 x 3 matrix with nonnegative entries less than or equal to 13 (A099834).
Source: On-Line Encyclopedia of Integer Sequences
Wednesday, December 11, 2013
689
689 = 13 x 53.
689 is the smallest strobogrammatic brilliant number. Deleting the middle digit gives the smallest strobogrammatic semiprime (69).
689 is the sum of three consecutive primes and seven consecutive primes: 689 = 227 + 229 + 233 = 83 + 89 + 97 + 101 + 103 + 107 + 109.
689 has two representations as a sum of two squares: 689 = 82 + 252 = 172 + 202.
689 is the hypotenuse of two primitive Pythagorean triples: 6892 = 1112 + 6802 = 4002 + 5612.
689 is the smallest number that can be written as the sum of three distinct squares in nine ways.
689 is 373 in base 14.
Source: Prime Curios!
689 is the smallest strobogrammatic brilliant number. Deleting the middle digit gives the smallest strobogrammatic semiprime (69).
689 is the sum of three consecutive primes and seven consecutive primes: 689 = 227 + 229 + 233 = 83 + 89 + 97 + 101 + 103 + 107 + 109.
689 has two representations as a sum of two squares: 689 = 82 + 252 = 172 + 202.
689 is the hypotenuse of two primitive Pythagorean triples: 6892 = 1112 + 6802 = 4002 + 5612.
689 is the smallest number that can be written as the sum of three distinct squares in nine ways.
689 is 373 in base 14.
Source: Prime Curios!
Tuesday, December 10, 2013
897
897 = 3 x 13 x 23. It is the only sphenic number with prime factors of the form p(p + 10)(p + 20).
897 is divisible by the sum of its prime factors (A046346).
897 is a Cullen number; it has the form n x 2n + 1, for n = 7 (A002064).
897 is the sum of the first 34 nonprimes (A051349).
The sum of the digits of 897 is equal to 8 times the number of digits (A061425).
897 is the sum of three nonzero fourth powers (A003337).
897 divides 474 - 1.
Source: Prime Curios!
897 is divisible by the sum of its prime factors (A046346).
897 is a Cullen number; it has the form n x 2n + 1, for n = 7 (A002064).
897 is the sum of the first 34 nonprimes (A051349).
The sum of the digits of 897 is equal to 8 times the number of digits (A061425).
897 is the sum of three nonzero fourth powers (A003337).
897 divides 474 - 1.
Source: Prime Curios!
Monday, December 9, 2013
2005
2005 = 5 x 401.
2005 is a semiprime that is the sum of four successive semiprimes (A158339).
2005 = 1 + 2 x 31 + 3 x 32 + 4 x 33 + 5 x 34 + 6 x 35 (A113531).
2005 has two representations as a sum of two squares: 2005 = 182 + 412 = 222 + 392.
2005 is the hypotenuse of two primitive Pythagorean triples: 20052 = 10372 + 17162 = 13572 + 14762.
2005 is a divisor of 988 - 1.
2005 and the square of 2005 use only the digits 0, 2, 4, and 5 (A136897).
2005 is considered a vertically symmetric number (A053701).
Source: On-Line Encyclopedia of Integer Sequences
2005 is a semiprime that is the sum of four successive semiprimes (A158339).
2005 = 1 + 2 x 31 + 3 x 32 + 4 x 33 + 5 x 34 + 6 x 35 (A113531).
2005 has two representations as a sum of two squares: 2005 = 182 + 412 = 222 + 392.
2005 is the hypotenuse of two primitive Pythagorean triples: 20052 = 10372 + 17162 = 13572 + 14762.
2005 is a divisor of 988 - 1.
2005 and the square of 2005 use only the digits 0, 2, 4, and 5 (A136897).
2005 is considered a vertically symmetric number (A053701).
Source: On-Line Encyclopedia of Integer Sequences
Friday, December 6, 2013
637
637 = 7 x 7 x 13.
637 is a decagonal number.
637 is 777 in base 9. It is 212121 in base 3 and 1600 in base 7.
637 has a representation as a sum of two squares: 637 = 142 + 212.
6373 = 258,474,853 = (258 - 474 + 853)3.
Source: What's Special About This Number?
637 is a decagonal number.
637 is 777 in base 9. It is 212121 in base 3 and 1600 in base 7.
637 has a representation as a sum of two squares: 637 = 142 + 212.
6373 = 258,474,853 = (258 - 474 + 853)3.
Source: What's Special About This Number?
Thursday, December 5, 2013
5415
5415 = 3 x 5 x 19 x 19.
5415 is a number n such that n and its reversal (5145) are both multiples of 15 (A062905).
5415 is a number n such that the sum of the digits of n equals the squarefree part of n (A070274).
5415 is the smallest number n such that 2n + 1, 4n + 1, 6n + 1, 8n + 1, and 10n + 1 are all prime numbers (A124410).
5415 is a number that cannot be written as a sum of three squares.
5415 is a divisor of 6812 - 1.
Source: On-Line Encyclopedia of Integer Sequences
5415 is a number n such that n and its reversal (5145) are both multiples of 15 (A062905).
5415 is a number n such that the sum of the digits of n equals the squarefree part of n (A070274).
5415 is the smallest number n such that 2n + 1, 4n + 1, 6n + 1, 8n + 1, and 10n + 1 are all prime numbers (A124410).
5415 is a number that cannot be written as a sum of three squares.
5415 is a divisor of 6812 - 1.
Source: On-Line Encyclopedia of Integer Sequences
Wednesday, December 4, 2013
9595
9595 = 5 x 19 x 101.
9595 is the sum of seven distinct powers of 3 (A038469): 9595 = 38 + 37 + 36 + 34 + 33 + 32 + 30.
9595 is 14141 in base 9 (A032821).
9595 is a number whose consecutive digits differ by 4 (A048406).
9595 is a year mentioned in the 1969 song "In the Year 2525" by Denny Zager and Rick Evans (A111729).
Source: On-Line Encyclopedia of Integer Sequences
9595 is the sum of seven distinct powers of 3 (A038469): 9595 = 38 + 37 + 36 + 34 + 33 + 32 + 30.
9595 is 14141 in base 9 (A032821).
9595 is a number whose consecutive digits differ by 4 (A048406).
9595 is a year mentioned in the 1969 song "In the Year 2525" by Denny Zager and Rick Evans (A111729).
Source: On-Line Encyclopedia of Integer Sequences
Tuesday, December 3, 2013
5600
5600 = 2 x 2 x 2 x 2 x 2 x 5 x 5 x 7. It is the product of three distinct primes (A179691).
5600 is a number with 36 divisors (A175746).
5600 is a number such that the number itself and its square use only the digits 0, 1, 3, 5, and 6 (A136843).
5600 is the number of self-complementary graphs with 13 vertices or nodes (A000171).
5600 is a concentric tetradecagonal number (A195145).
5600 is the perimeter a Pythagorean triangle that can be constructed in exactly five different ways (A156687).
Source: What's Special About This Number?
5600 is a number with 36 divisors (A175746).
5600 is a number such that the number itself and its square use only the digits 0, 1, 3, 5, and 6 (A136843).
5600 is the number of self-complementary graphs with 13 vertices or nodes (A000171).
5600 is a concentric tetradecagonal number (A195145).
5600 is the perimeter a Pythagorean triangle that can be constructed in exactly five different ways (A156687).
Source: What's Special About This Number?
Monday, December 2, 2013
1794
1794 = 2 x 3 x 13 x 23.
1794 is a nonagonal number (A001106).
1794 is a cake number (A000125). 1794 is the number of pieces resulting from 22 planar cuts through a cube (or cake).
1794 is an octagonal pyramidal number (A002414).
1794 has a base 5 representation (24134) that begins with its base 9 representation (2413).
1794 divides 474 - 1.
Source: Number Gossip
1794 is a nonagonal number (A001106).
1794 is a cake number (A000125). 1794 is the number of pieces resulting from 22 planar cuts through a cube (or cake).
1794 is an octagonal pyramidal number (A002414).
1794 has a base 5 representation (24134) that begins with its base 9 representation (2413).
1794 divides 474 - 1.
Source: Number Gossip