100,000

Terms for 100,000

In Bangladesh, India, Pakistan and South Asia, one hundred thousand is called a lakh, and is written as 1,00,000. The Thai, Lao, Khmer and Vietnamese languages also have separate words for this number: แสน, ແສນ, សែន (all saen), and ức respectively. The Malagasy word is hetsy.

In the Netherlands, a 'ton' is a colloquialism for a denomination of 100.000 monetary units. In the guilders period a ton would denote 100.000 guilders. With the introduction of the euro, a ton would come to mean 100.000 euros. The usage is mostly limited to the financial sphere and the buying and selling of houses. It is not used in official settings because of the ambiguity with commonly used metric tonne. While usage is common in the Netherlands, it sees almost no use in Belgium.

In Cyrillic numerals, it is known as the legion (): [[File:Legion-1000000-Cyrillic.svg|30px]] or [[File:Несведь.svg|25px]].

Values of 100,000

In astronomy, 100,000 metres, 100 kilometres, or 100 km (62 miles) is the altitude at which the Fédération Aéronautique Internationale (FAI) defines spaceflight to begin.

In paleoclimatology, the 100,000-year problem is a mismatch between the temperature record and the modeled incoming solar radiation.

In the Irish language, **** () is a popular greeting meaning "a hundred thousand welcomes".

Selected 6-digit numbers (100,001–999,999)

100,001 to 199,999

• 100,001 = second smallest 6-digit number

• 100,003 = smallest 6-digit prime number

• 100,128 = smallest triangular number with 6 digits and the 447th triangular number

• 100,151 = twin prime with 100,153

• 100,153 = twin prime with 100,151

• 100,255 = Friedman number

• 100,489 = 3172, the smallest 6-digit square

• 101,101 = smallest palindromic Carmichael number

• 101,723 = smallest prime number whose square is a pandigital number containing each digit from 0 to 9

• 102,564 = The smallest parasitic number

• 103,049 = Schröder–Hipparchus number

• 103,680 = highly totient number

• 103,769 = the number of combinatorial types of 5-dimensional parallelohedra

• 103,823 = 473, the smallest 6-digit cube and nice Friedman number (−1 + 0 + 3×8×2)3

• 104,480 = number of non-isomorphic set-systems of weight 14.

• 104,723 = the 9,999th prime number

• 104,729 = the 10,000th prime number

• 104,869 = the smallest prime number containing every non-prime digit

• 104,976 = 184, 3-smooth number

• 105,071 = number of triangle-free graphs on 11 vertices

• 105,558 = number of partitions of 46

• 105,664 = harmonic divisor number

• 108,968 = number of signed trees with 11 nodes

• 109,376 = automorphic number

• 110,880 = 30th highly composite number

• 111,111 = repunit

• 111,777 = smallest natural number requiring 17 syllables in American English, 19 in British English

• 113,634 = Motzkin number for n = 14

• 114,243/80,782 ≈ √2

• 114,689 = prime factor of F12

• 115,975 = Bell number

• 116,281 = 3412, square number, centered decagonal number, 18-gonal number

• 117,067 = first vampire prime

• 117,649 = 76

• 117,800 = harmonic divisor number

• 120,032 = number of primitive polynomials of degree 22 over GF(2)

• 120,284 = Keith number

• 120,960 = highly totient number

• 121,393 = Fibonacci number

• 123,717 = smallest digitally balanced number in base 7

• 123,867 = number of trees with 18 unlabeled nodes

• 124,754 = number of partitions of 47

• 125,673 = logarithmic number

• 127,777 = smallest natural number requiring 18 syllables in American English, 20 in British English

• 127,912 = Wedderburn–Etherington number

• 128,981 = Starts the first prime gap sequence of 2, 4, 6, 8, 10, 12, 14

• 129,106 = Keith number

• 130,321 = 194

• 131,071 = Mersenne prime

• 131,072 = 217, largest determinant of a (real) {0,1}-matrix of order 15.

• 131,361 = Leyland number

• 134,340 = Pluto's minor planet designation

• 135,135 = double factorial of 13

• 135,137 = Markov number

• 142,129 = 3772, square number, dodecagonal number

• 142,857 = Kaprekar number, smallest cyclic number in decimal.

• 144,000 = number with religious significance

• 147,273 = number of partitions of 48

• 147,640 = Keith number

• 148,149 = Kaprekar number

• 152,381 = unique prime in base 20

• 156,146 = Keith number

• 155,921 = smallest prime number being the only prime in an interval from 100n to 100n + 99

• 160,000 = 204

• 160,176 = number of reduced trees with 26 nodes

• 161,051 = 115

• 161,280 = highly totient number

• 166,320 = 31st highly composite number

• 167,400 = harmonic divisor number

• 167,894 = number of ways to partition {1,2,3,4,5,6,7,8} and then partition each cell (block) into subcells.

• 173,525 = number of partitions of 49

• 173,600 = harmonic divisor number

• 174,680 = Keith number

• 174,763 = Wagstaff prime

• 176,906 = number of 24-bead necklaces (turning over is allowed) where complements are equivalent

• 177,147 = 311

• 177,777 = smallest natural number requiring 19 syllables in American English, 21 in British English

• 178,478 = Leyland number

• 181,440 = highly totient number

• 181,819 = Kaprekar number

• 182,362 = number of 23-bead binary necklaces with beads of 2 colors where the colors may be swapped but turning over is not allowed

• 183,186 = Keith number

• 183,231 = number of partially ordered set with 9 unlabeled elements

• 187,110 = Kaprekar number

• 189,819 = number of letters in the longest English word, taking 3 hours to pronounce

• 194,481 = 214

• 195,025 = Pell number, Markov number

• 196,418 = Fibonacci number, Markov number

• 196,560 = the kissing number in 24 dimensions

• 196,883 = the dimension of the smallest nontrivial irreducible representation of the Monster group

• 196,884 = the coefficient of q in the Fourier series expansion of the j-invariant. The adjacency of 196883 and 196884 was important in suggesting monstrous moonshine.

• 199,999 = prime number

200,000 to 299,999

• 202,717 = k such that the sum of the squares of the first k primes is divisible by k.
• 206,098 – Large Schröder number
• 206,265 = rounded number of arc seconds in a radian (see also parsec), since = 206,264.806...
• 207,360 = highly totient number
• 208,012 = the Catalan number C12
• 208,335 = the largest number to be both triangular and square pyramidal
• 208,495 = Kaprekar number
• 212,159 = smallest unprimeable number ending in 1, 3, 7 or 9
• 221,760 = 32nd highly composite number
• 222,222 = repdigit
• 224,737 = the 20,000th prime number
• 227,475 = Riordan number
• 234,256 = 224
• 237,510 = harmonic divisor number
• 238,591 = number of free 13-ominoes
• 241,920 = highly totient number
• 242,060 = harmonic divisor number
• 248,832 = 125, 100,00012, AKA a gross-great-gross (10012 great-grosses); the smallest fifth power that can be represented as the sum of only 6 fifth powers: 125 = 45 + 55 + 65 + 75 + 95 + 115
• 253,293 = number of prime knots with 15 crossings
• 255,168 = number of ways to play tic tac toe
• 262,144 = 218; exponential factorial of 4; a superperfect number
• 262,468 = Leyland number
• 268,705 = Leyland number
• 271,129 – smallest known Sierpiński prime
• 274,177 = prime factor of the Fermat number F6
• 275,807/195,025 ≈ √2
• 276,480 = number of primitive polynomials of degree 24 over GF(2)
• 277,200 = 33rd highly composite number
• 279,841 = 234
• 279,936 = 67
• 280,859 = a prime number whose square 78881777881 is tridigital
• 283,086 = number of primes with distinct digits, the largest being 987,654,103
• 291,400 = number of non-equivalent ways of expressing 100,000,000 as the sum of two prime numbers
• 293,547 = Wedderburn–Etherington number
• 294,001 = smallest weakly prime number in base 10
• 294,685 = Markov number
• 298,320 = Keith number

300,000 to 399,999

• 310,572 = Motzkin number
• 314,159 = pi-prime
• 316,749 = number of reduced trees with 27 nodes
• 317,811 = Fibonacci number
• 317,955 = number of trees with 19 unlabeled nodes
• 318,682 = Kaprekar number
• 325,878 = Fine number
• 326,981 = alternating factorial
• 329,967 = Kaprekar number
• 331,776 = 244
• 332,640 = 34th highly composite number; harmonic divisor number
• 333,333 = repdigit
• 333,667 = sexy prime and unique prime
• 333,673 = sexy prime with 333,679
• 333,679 = sexy prime with 333,673
• 337,500 = 22 × 33 × 55
• 337,594 = number of 25-bead necklaces (turning over is allowed) where complements are equivalent
• 349,716 = number of 24-bead binary necklaces with beads of 2 colors where the colors may be swapped but turning over is not allowed
• 350,377 = the 30,000th prime number
• 351,351 = only known odd abundant number that is not the sum of some of its proper, nontrivial (i.e. 1) divisors .
• 351,352 = Kaprekar number
• 355,419 = Keith number
• 356,643 = Kaprekar number
• 356,960 = number of primitive polynomials of degree 23 over GF(2)
• 360,360 = harmonic divisor number; smallest number divisible by the numbers from 1 to 15 (there is no smaller number divisible by the numbers from 1 to 14 since any number divisible by 3 and 5 must be divisible by 15)
• 362,880 = 9!, highly totient number
• 369,119 = prime number which divides the sum of all primes less than or equal to it
• 369,293 = smallest prime with the property that inserting a digit anywhere in the number will always yield a composite
• 370,261 = first prime followed by a prime gap of over 100
• 371,293 = 135, palindromic in base 12 (15AA5112)
• 389,305 = self-descriptive number in base 7
• 390,313 = Kaprekar number
• 390,625 = 58
• 397,585 = Leyland number

400,000 to 499,999

• 409,113 = sum of the first nine factorials
• 422,481 = smallest number whose fourth power is the sum of three smaller fourth powers
• 423,393 = Leyland number
• 426,389 = Markov number
• 426,569 = cyclic number in base 12
• 437,760 to 440,319 = 440000any of these numbers will cause the Apple II+ and Apple IIe computers to crash to a monitor prompt when entered at the BASIC prompt, due to a short-cut in the Applesoft code programming of the overflow test when evaluating 16-bit numbers. Entering 440000 at the prompt has been used to hack games that are protected against entering commands at the prompt after the game is loaded.
• 444,444 = repdigit
• 456,976 = 264
• 461,539 = Kaprekar number
• 466,830 = Kaprekar number
• 470,832 = Pell number
• 479,909 = the 40,000th prime number
• 483,840 = highly totient number
• 492,638 = number of signed trees with 12 nodes
• 498,960 = 35th highly composite number
• 499,393 = Markov number
• 499,500 = Kaprekar number

500,000 to 599,999

• 500,500 = Kaprekar number, sum of first 1,000 integers
• 509,203 = Riesel prime
• 510,510 = the product of the first seven prime numbers, thus the seventh primorial. It is also the product of four consecutive Fibonacci numbers—13, 21, 34, 55, the largest such sequence of any length to be also a primorial. And it is a double triangular number, the sum of all even numbers from 0 to 1428.
• 514,229 = Fibonacci prime,
• 518,859 = Schröder–Hipparchus number
• 524,287 = Mersenne prime
• 524,288 = 219
• 524,649 = Leyland number
• 525,600 = minutes in a non-leap year
• 527,040 = minutes in a leap year
• 531,441 = 312
• 533,169 = Leyland number
• 533,170 = Kaprekar number
• 537,824 = 145
• 539,400 = harmonic divisor number
• 548,834 = equal to the sum of the sixth powers of its digits
• 554,400 = 36th highly composite number
• 555,555 = repdigit
• 586,081 = number of prime numbers having seven digits.
• 599,999 = prime number.

600,000 to 699,999

• 604,800 = number of seconds in a week
• 611,953 = the 50,000th prime number
• 614,656 = 284
• 625,992 = Riordan number
• 629,933 = number of reduced trees with 28 nodes
• 645,120 = double factorial of 14
• 646,018 = Markov number
• 649,532 = number of 26-bead necklaces (turning over is allowed) where complements are equivalent
• 664,579 = the number of primes under 10,000,000
• 665,280 = 37th highly composite number
• 665,857/470,832 ≈ √2
• 666,666 = repdigit
• 671,092 = number of 25-bead binary necklaces with beads of 2 colors where the colors may be swapped but turning over is not allowed
• 676,157 = Wedderburn–Etherington number
• 678,570 = Bell number
• 688,451 = alongside 688,453, the smallest pair of twin primes followed by a gap of at least 1,000 before the next twin prime pair [689,459 and 689,461]
• 694,280 = Keith number
• 695,520 = harmonic divisor number

700,000 to 799,999

• 700,001 = prime number.
• 707,281 = 294
• 711,569 = the 60,000th prime number
• 720,720 = 10th superior highly composite number; 10th colossally abundant number; 38th highly composite number, smallest number divisible by the numbers from 1 to 16
• 725,760 = highly totient number
• 726,180 = harmonic divisor number
• 729,000 = 903
• 739,397 = largest prime that is both right- and left-truncatable.
• 742,900 = Catalan number
• 753,480 = harmonic divisor number
• 759,375 = 155
• 762,701 – smallest known composite Riesel number
• 765,623 = emirp, Friedman prime 56 × 72 − 6 ÷ 3
• 777,777 = repdigit, smallest natural number requiring 20 syllables in American English, 22 in British English, largest number in English not containing the letter 'i' in its name
• 783,700 = initial number of third century xx00 to xx99 (after 400 and 1,400) containing seventeen prime numbers {783,701, 783,703, 783,707, 783,719, 783,721, 783,733, 783,737, 783,743, 783,749, 783,763, 783,767, 783,779, 783,781, 783,787, 783,791, 783,793, 783,799}
• 799,999 = prime number.

800,000 to 899,999

• 810,000 = 304
• 823,065 = number of trees with 20 unlabeled nodes
• 823,543 = 77
• 825,265 = smallest Carmichael number with 5 prime factors
• 832,040 = Fibonacci number
• 853,467 = Motzkin number
• 857,375 = 953
• 873,612 = 11 + 22 + 33 + 44 + 55 + 66 + 77
• 888,888 = repdigit
• 890,625 = automorphic number

900,000 to 999,999

• 900,001 = prime number
• 901,971 = number of free 14-ominoes
• 909,091 = unique prime in base 10
• 923,521 = 314
• 925,765 = Markov number
• 925,993 = Keith number
• 950,976 = harmonic divisor number
• 956,619: 956619^2=915119911161, and only the digits 1, 5, 6 and 9 are used in both this number and its square.
• 967,680 = highly totient number
• 970,299 = 993, the largest 6-digit cube
• 998,001 = 9992, the largest 6-digit square. The reciprocal of this number, in its expanded form, lists all three-digit numbers in order except 998.
• 998,991 = largest triangular number with 6 digits and the 1413th triangular number
• 999,983 = largest 6-digit prime number
• 999,999 = repdigit. Rational numbers with denominators 7 and 13 have 6-digit repetends when expressed in decimal form, because 999999 is the smallest number one less than a power of 10 that is divisible by 7 and by 13.

Prime numbers

There are 9,592 primes less than 105, where 99,991 is the largest prime number smaller than 100,000.

Increments of 105 from 100,000 through a one million have the following prime counts:

• 8,392 primes between 100,000 and 200,000.{{efn|content=Smallest p 100,000 is 100,003 (9,593rd); largest p
  • 104,729 is the 10,000th prime, which is in this range.
  • 199,999 is prime.
• 8,013 primes between 200,000 and 300,000.{{efn|content=Smallest p 200,000 is 200,003 (17,985th); largest p
  • 224,737 is the 20,000th prime.
• 7,863 primes between 300,000 and 400,000.{{efn|content=Smallest p 300,000 is 300,007 (25,998th); largest p
  • 350,377 is the 30,000th prime.
• 7,678 primes between 400,000 and 500,000.{{efn|content=Smallest p 400,000 is 400,009 (33,861st); largest p
  • 479,909 is the 40,000th prime.
• 7,560 primes between 500,000 and 600,000.{{efn|content=Smallest p 500,000 is 500,009 (41,539th); largest p
  • 7,560 is the twentieth highly composite number.
  • 599,999 is prime.
• 7,445 primes between 600,000 and 700,000.{{efn|content=Smallest p 600,000 is 600,011 (49,099th); largest p
  • 611,953 is the 50,000th prime.
• 7,408 primes between 700,000 and 800,000.{{efn|content=Smallest p 700,000 is 700,001 (56,544th); largest p
  • 700,001 and 799,999 are both prime.
  • 746,773 is the 60,000th prime.
• 7,323 primes between 800,000 and 900,000.{{efn|content=Smallest p 800,000 is 800,011 (63,952nd); largest p
  • 882,377 is the 70,000th prime.
• 7,224 primes between 900,000 and 1,000,000.{{efn|content=Smallest p 900,000 is 900,001 (71,275th); largest p
  • 900,001 is prime. In total, there are 68,906 prime numbers between 100,000 and 1,000,000.

Notes

References

References

1. (26 October 2017). "Malagasy Dictionary and Madagascar Encyclopedia : hetsy".
2. {{Cite OEIS. A003617. Smallest n-digit prime
3. "Problem of the Month (August 2000)".
4. {{Cite OEIS. A001003. Schroeder's second problem (generalized parentheses); also called super-Catalan numbers or little Schroeder numbers.
5. {{Cite OEIS. A097942. Highly totient numbers
6. {{cite OEIS. A006785. Number of triangle-free graphs on n vertices
7. {{cite OEIS. A000041. a(n) is the number of partitions of n (the partition numbers)
8. {{Cite OEIS. A001599. Harmonic or Ore numbers
9. {{cite OEIS. A000060. Number of signed trees with n nodes
10. {{Cite OEIS. A003226. Automorphic numbers: m^2 ends with m
11. {{Cite OEIS. A002182. Highly composite numbers
12. {{Cite OEIS. A001006. Motzkin numbers
13. {{Cite OEIS. A000110. Bell or exponential numbers
14. {{cite OEIS. A011260. Number of primitive polynomials of degree n over GF(2)
15. {{Cite OEIS. A007629. Repfigit (REPetitive FIbonacci-like diGIT) numbers (or Keith numbers)
16. {{Cite OEIS. A000045. Fibonacci numbers
17. {{Cite OEIS. A049363
18. {{cite OEIS. A000055. Number of trees with n unlabeled nodes
19. {{cite OEIS. A002104. Logarithmic numbers
20. {{Cite OEIS. A001190. Wedderburn-Etherington numbers
21. {{Cite OEIS. A000668. Mersenne primes (primes of the form 2^n - 1)
22. {{Cite OEIS. A003432. Hadamard maximal determinant problem
23. {{Cite OEIS. A076980. Leyland numbers
24. {{Cite OEIS. A002559. Markoff (or Markov) numbers
25. {{Cite OEIS. A006886. Kaprekar numbers
26. {{cite OEIS. A000014. Number of series-reduced trees with n nodes
27. {{cite OEIS. A000258. Expansion of e.g.f. exp(exp(exp(x)-1)-1)
28. {{Cite OEIS. A000979. Wagstaff primes
29. {{cite OEIS. A000011. Number of n-bead necklaces (turning over is allowed) where complements are equivalent
30. {{cite OEIS. A000013. Definition (1): Number of n-bead binary necklaces with beads of 2 colors where the colors may be swapped but turning over is not allowed
31. {{cite OEIS. A000112. Number of partially ordered sets (posets) with n unlabeled elements
32. "The longest word in English? Here are the top 15 biggest ones".
33. {{Cite OEIS. A000129. Pell numbers
34. {{cite OEIS. A111441. Numbers k such that the sum of the squares of the first k primes is divisible by k
35. {{Cite OEIS. A000108. Catalan numbers
36. {{Cite OEIS. A000330
37. Collins, Julia. (2019). "Numbers in Minutes". Quercus.
38. {{Cite OEIS. A143641. Odd prime-proof numbers not ending in 5
39. "How many Tic-Tac-Toe (Noughts and crosses) games?".
40. {{Cite OEIS. A049384
41. {{Cite OEIS. A019279. Superperfect numbers
42. {{Cite OEIS. A029743. Primes with distinct digits
43. {{Cite OEIS. A065577. Number of Goldbach partitions of 10^n
44. Weißstein, Eric W.. (25 December 2020). "Weakly Prime".
45. {{cite OEIS. A000957. Fine's sequence (or Fine numbers): number of relations of valence greater than or equal to 1 on an n-set; also number of ordered rooted trees with n edges having root of even degree
46. {{Cite OEIS. A005165. Alternating factorials
47. {{Cite OEIS. A040017. Unique period primes
48. {{Cite OEIS. A007506
49. {{Cite OEIS. A125001
50. "Applesoft Disassembly -- S.d912".
51. {{Cite OEIS. A101036. Riesel numbers
52. {{Cite OEIS. A002110. Primorial numbers
53. {{Cite OEIS. A005478. Prime Fibonacci numbers{{Cite OEIS. A178444. Markov numbers that are prime
54. {{Cite OEIS. A006879. Number of primes with n digits.
55. Kourbatov, Alexei. (16 September 2013). "Tables of record gaps between prime constellations".
56. {{Cite OEIS. A002201. Superior highly composite numbers
57. {{Cite OEIS. A004490. Colossally abundant numbers
58. "A002182 - OEIS".
59. {{Cite OEIS. A186509. Centuries containing 17 primes
60. {{Cite OEIS. A186311. Least century 100k to 100k+99 with exactly ''n'' primes
61. (23 January 2012). "Dividing one by 998001 produces list of three digit numbers".
62. "The Nth Prime Page".