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104,488

104,488 is a composite number, even.

This number doesn't have a permanent NumberWiki page yet — what you see below is computed live. Pages get added to the permanent index when they're notable (years, primes, curated, etc.).

104,488 (one hundred four thousand four hundred eighty-eight) is an even 6-digit number. It is a composite number with 16 divisors, and factors as 2³ × 37 × 353. Written other ways, in hexadecimal, 0x19828.

Deficient Number Evil Number Recamán's Sequence

Interestingness

Properties

Parity
Even
Digit count
6
Digit sum
25
Digit product
0
Digital root
7
Palindrome
No
Bit width
17 bits
Reversed
884,401
Recamán's sequence
a(92,215) = 104,488
Square (n²)
10,917,742,144
Cube (n³)
1,140,773,041,142,272
Divisor count
16
σ(n) — sum of divisors
201,780
φ(n) — Euler's totient
50,688
Sum of prime factors
396

Primality

Prime factorization: 2 3 × 37 × 353

Nearest primes: 104,479 (−9) · 104,491 (+3)

Divisors & multiples

All divisors (16)
1 · 2 · 4 · 8 · 37 · 74 · 148 · 296 · 353 · 706 · 1412 · 2824 · 13061 · 26122 · 52244 (half) · 104488
Aliquot sum (sum of proper divisors): 97,292
Factor pairs (a × b = 104,488)
1 × 104488
2 × 52244
4 × 26122
8 × 13061
37 × 2824
74 × 1412
148 × 706
296 × 353
First multiples
104,488 · 208,976 (double) · 313,464 · 417,952 · 522,440 · 626,928 · 731,416 · 835,904 · 940,392 · 1,044,880

Sums & aliquot sequence

As a sum of two squares: 58² + 318² = 158² + 282²
As consecutive integers: 6,523 + 6,524 + … + 6,538 2,806 + 2,807 + … + 2,842 120 + 121 + … + 472
Aliquot sequence: 104,488 97,292 86,164 76,320 189,036 302,364 486,060 875,076 1,166,796 1,782,696 2,674,104 4,115,016 7,316,184 11,069,736 16,604,664 25,050,456 43,956,144 — unresolved within range

Continued fraction of √n

√104,488 = [323; (4, 15, 1, 1, 13, 4, 5, 1, 1, 2, 1, 2, 17, 1, 1, 2, 3, 1, 2, 71, 2, 8, 2, 1, …)]

Representations

In words
one hundred four thousand four hundred eighty-eight
Ordinal
104488th
Binary
11001100000101000
Octal
314050
Hexadecimal
0x19828
Base64
AZgo
One's complement
4,294,862,807 (32-bit)
Scientific notation
1.04488 × 10⁵
As a duration
104,488 s = 1 day, 5 hours, 1 minute, 28 seconds
In other bases
ternary (3) 12022022221
quaternary (4) 121200220
quinary (5) 11320423
senary (6) 2123424
septenary (7) 613426
nonary (9) 168287
undecimal (11) 7155a
duodecimal (12) 50574
tridecimal (13) 38737
tetradecimal (14) 2a116
pentadecimal (15) 20e5d

As an angle

104,488° = 290 × 360° + 88°
88° ≈ 1.536 rad
Compass bearing: E (east)

Historical numeral systems

Babylonian (base 60)
𒌋𒌋𒁹𒁹𒁹𒁹𒁹𒁹𒁹𒁹𒁹 𒁹 𒌋𒌋𒁹𒁹𒁹𒁹𒁹𒁹𒁹𒁹
Egyptian hieroglyphic
𓆐𓆼𓆼𓆼𓆼𓍢𓍢𓍢𓍢𓎆𓎆𓎆𓎆𓎆𓎆𓎆𓎆𓏺𓏺𓏺𓏺𓏺𓏺𓏺𓏺
Greek (Milesian)
͵ρδυπηʹ
Mayan (base 20)
𝋭·𝋡·𝋤·𝋨
Chinese
一十萬四千四百八十八
Chinese (financial)
壹拾萬肆仟肆佰捌拾捌
In other modern scripts
Eastern Arabic ١٠٤٤٨٨ Devanagari १०४४८८ Bengali ১০৪৪৮৮ Tamil ௧௦௪௪௮௮ Thai ๑๐๔๔๘๘ Tibetan ༡༠༤༤༨༨ Khmer ១០៤៤៨៨ Lao ໑໐໔໔໘໘ Burmese ၁၀၄၄၈၈

Also seen as

Goldbach decomposition

Goldbach's conjecture says every even integer greater than 2 is the sum of two primes. For 104488, here are decompositions:

  • 17 + 104471 = 104488
  • 29 + 104459 = 104488
  • 71 + 104417 = 104488
  • 89 + 104399 = 104488
  • 107 + 104381 = 104488
  • 179 + 104309 = 104488
  • 191 + 104297 = 104488
  • 257 + 104231 = 104488

Showing the first eight; more decompositions exist.

Hex color
#019828
RGB(1, 152, 40)
IPv4 address

As an unsigned 32-bit integer, this is the IPv4 address 0.1.152.40.

Address
0.1.152.40
Class
reserved
IPv4-mapped IPv6
::ffff:0.1.152.40

Unspecified address (0.0.0.0/8) — "this network" placeholder.

Possible US patent number

This number falls in the range of US utility patent numbers. If it's a patent, it would be issued as US 104,488 and was likely granted around 1870.

Patent numbers below 100,000 are excluded as too ambiguous; modern numbering currently reaches roughly 12.5 million.

Position in π

The digit sequence 104488 first appears in π at position 446,197 of the decimal expansion (the 446,197ordinal-suffix:th digit after the integer 3).

Search range: the first 1,000,000 fractional digits of π. Any 6-digit-or-shorter string is virtually guaranteed to appear in there — the more interesting signal is the position.

Related reading