User:Cloudy176/Department of bubbly negative numberbottles/Unnamed numbers with unrelated facts

This page contains unnamed numbers with two or more unrelated facts.

3 digits
104 is a number following 103 and preceding 105.

Its prime factorization is 23 × 13.

The constant term in the McKay-Thomson series \(T_{2A}\) is equal to 104.

It is part of a with 105.

It is also the number of s in a deck without.

105 is a number following 104 and preceding 106.

Its prime factorization is 3 × 5 × 7.

It is part of a Ruth–Aaron pair with 104.

It is the first.

The 105th is the first cyclotomic polynomial containing coefficients with absolute value larger than 1.

It is the smallest odd number, for which the is larger than the.

The number 108 is the third hyperfactorial number.

It is also considered sacred by the.

The ends at  in most countries (except Japan, where the frequency range 99-108 MHz is reserved for digital broadcasting), but in most cases, the last usable carrier frequency is.

And the starts at the same frequency.

It is the number of s in an, and the of the element , which had the  Uno.

113 is a number following 112 and preceding 114. This number is prime.

\(\frac{355}{113}\) is a famous approximation of \(\pi\) named. It's equal to 3.141592920...

113 is also the 11th Sophie Germain prime.

114 is a number following 113 and preceding 115. Its prime factorization is 2 × 3 × 19.

114 divides 372 - 1.

114 is a sum of the first 4 hyperfactorials, where \(H(n) = \prod^n_{k = 1} k^k = 1^1 \times 2^2 \times 3^{3}...\) So it's 1 + 1 + 4 + 108.

The contains 114 s.

It was also the PEGG value on May 20th, 2017.

The number 121 is the fourth largest undulating square number; this has been proved by David Moews.

According to the, the numbers 121 and 125 are the seventh largest s not separated by a.

Its prime factorization is 112.

In the association football, there are 32 teams playing eight four-team double s followed by a 16-team two-legged with a single-legged final, resulting in 125 matches.

According to the, the numbers 121 and 125 are the seventh largest s not separated by a.

126 is the lower bound for the in 7 dimensions.

It is also a in nuclear physics.

132 is a number following 131 and preceding 133.

132 is an even number, that has 12 divisors (1, 2, 3, 4, 6, 11, 12, 22, 33, 44, 66, 132).

132 is digit-reassembly number. It means that it is equal to the sum of all 2-digits numbers that can be made from the number itself (where the digits can't repeat in each 2-digits number): 12 + 13 + 21 + 23 + 31 + 32 = 132). It's also the smallest number with this property.

Its prime factorization is 22 × 3 × 11.

It is also the 6th.

In the Icelandic association football, there are 12 teams playing a double , resulting in 132 matches.

133 is a number following 132 and preceding 134. It's product of 2 primes (7 and 19), so it's semiprime.

133 is an odd number.

133 is square-free number.

133 is the 7th.

The  has  133.

In the association football, there are 10 teams playing a triple , resulting in 135 matches.

It is also the number of nominal frequencies (n × 9, where 17 <= n <= 31 or 59 <= n <= 178) in , and the bandwidth (in kHz) of the  band.

The reciprocal of the is approximately equal to 137.

It is also the upper edge of the (in ).

In the Australian soccer, there are 10 teams playing a triple followed by a six-team , resulting in 140 matches.

It was also the character limit in messages, but it has now been increased to 280, except for  languages.

145 is a number following 144 and preceding 146. It's the sum of the factorial numbers of the digits: 1! + 4! + 5!.

145 is the 10th.

Its prime factorization is 5 × 29.

146 is a number following 145 and preceding 147. Sum of its digits is prime.

146 is an even composite number.

146 is 6th octahedral number.

146 in base 8 is a repdigit (2228).

Its prime factorization is 2 × 73.

There are exactly 146 s without energetically allowed alpha or beta (including double beta and electron capture) decay modes.

And in some countries, such as Germany, the ends at 146.

The Book of contains 150 psalms.

It is also the number of species in the first list.

In Orthodox churches, the Book of contains 151 psalms.

It is also the number of species in the first generation.

In each regular season of the Mexican association football, there are 18 teams playing a single , resulting in 153 matches.

It is also the first carrier frequency (in ) in the band.

Furthermore, it is the number of fish in the second.

154 is a number following 153 and preceding 155. It's the 7th ennagonal number.

154 is a sum of first 6 factorial numbers (1 + 1 + 2 + 6 + 24 + 120 = 154).

154! + 1 is prime.

Its prime factorization is 2 × 7 × 11.

In the association football, there are 15 teams playing an eight-team double and a seven-team double round-robin tournament with single-legged  matches, resulting in 154 matches in the regular season.

155 is a number following 154 and preceding 156. It's a semiprime.

155 is an odd composite number.

Its prime factorization is 5 × 31.

In the Syriac Orthodox Church, the Book of contains 155 psalms.

Article 155 of the allows for suspension of ; it has recently been used by  against.

163 (one hundred sixty-three) is the number of white in a  set.

It is also the largest.

Furthermore, the McKay-Thompson series of span a 163-.

In the association football, there are 15 teams playing an eight-team double and a seven-team double round-robin tournament with single-legged  matches followed by a six-team , resulting in 164 matches.

The isotope -164 is the heaviest without energetically allowed alpha or beta (including double beta and electron capture) decay modes.

In each tournament of the Mexican association football, there are 18 teams playing a single followed by an eight-team two-legged , resulting in 167 matches.

In China, the starts at 167.

Furthermore, it is the number of hours in the spring transition.

168 (one hundred sixty-eight) is the number of in a double-six  set.

It is also the of the , which is isomorphic to GL(3,2).

Furthermore, it is also the number of s in a.

190 (one hundred ninety) is the 19th, and therefore the number of tiles in a double-18 set.

And the  has dimension 190.

There are 194 different s, for which the to   conversion, as used in, leads to.

It is also the number of es in the Monster group.

Furthermore, the, which is used for finding the largest known primes, gives 194 after two iterations.

In the association football, there are 48 teams playing 12 four-team double s followed by a 32-team two-legged with a single-legged final, resulting in 205 matches.

It is also the number of nominal CCIR frequencies (n × 0.1 MHz, where 875 <= n <= 1,079) in some countries, such as.

210 is the largest number that is both a and a.

It is also the product of the single-digit s.

Furthermore, the has a period of 210 days.

In each tournament of the Colombian association football, there are 20 teams playing a single with two-legged rivalries followed by an eight-team two-legged , resulting in 214 matches.

It is also the number of s.

There are exactly 220 s in a.

It is also approximately the number of imperial s in a.

Furthermore, it is the in many countries.

223 is the only nonnegative integer which cannot be written as a.

It is also the largest integer which cannot be written as a sum of 32, 33, 34 or 35 nonnegative fifth powers; there are only fifteen, ten, six and three nonnegative integers with this property, respectively.

Furthermore, in some countries, such as, the ends at 223.

Finally, there are 223 non-control 8-bit characters.

239 is the largest integer which cannot be written as a ; the only other nonnegative integer with this property is 23.

It is also one of only seven nonnegative integers which cannot be written as a sum of eighteen fourth powers; the largest integer with this property is 559.

Since 2392 + 1 = 2 × 134, it also appears in many e.

It was also the PEGG value on May 22nd, 2017.

The  has  240.

It is also the number of matches in the association football, which has a 16-team double , and the association football , which has a 14-team double round-robin tournament followed by a six-team double round-robin tournament and an eight-team single round-robin tournament.

Furthermore, it was the number of pre-decimal pence in a.

Finally, it is the in some countries.

The  has  248.

It is also the number of in.

Furthermore, it was the number of  during 1965–1990.

In the association football, there are 14 teams playing a double followed by a six-team double round-robin tournament and two four-team double round-robin tournaments, seven two-legged play-off ties, and a single-legged play-off tie, resulting in 251 matches.

It is also the number of species in the first two generations.

The isotope -257 is the heaviest that can be formed by  from naturally occuring.

The number 257 is also a \(2^{2^3}+1\).

In the association football, there are 12 teams playing two double s, resulting in 264 matches.

It is also approximately the number of U.S. s in a.

Furthermore, it is the highest possible game value (Grand ouvert with all four jacks) in the German card game of.

In the, there are 32 teams playing a 16-game season followed by a 12-team single-elimination tournament and the , resulting in 268 matches.

It is also the number of matches in the Romanian association football, which has a 14-team double round-robin tournament followed by a six-team double round-robin tournament and an eight-team double round-robin tournament.

And the -268 is the longest-lived.

In the German association football, there are 18 teams playing a double , resulting in 306 matches.

It is also the lower bound for the in 9 dimensions.

The number 343 is the largest known  with an exponent larger than 2.

The equation 169 + 343 = 512 is one of ten known solutions to the.

Some association football competitions, such as the, have five-team single s in the group stage. With, there are exactly 355 possible points columns in the final standings of a group.

The number is approximately equal to 355/113.

And some years in the Hebrew and Islamic calendars have 355 days.

360 is the of the alternating group of degree 6, which is isomorphic to the matrix group, and to. It is one of the few non-abelian simple groups with only three distinct prime factors in the order.

It is also the number of s in the.

And in the, one tun is equal to 360 k'in.

In, there are.

It is also the number of days in a.

383 is an interesting prime. It's palindromic prime, which is sum of the first 3-digit palindromic primes (101 + 131 + 151). It's also a prime number that can be get summing up a number n with a same reversed number, where the n is in this case equal to 241 (241 is also prime) (So it's 241 + 142).

And some years in the Hebrew calendar have 383 days.

In the association football, there are 12 teams playing three double s, resulting in 396 matches.

It is also the number of in.

The has 435 seats.

It was also the (in ), but it has been raised to 440.

454 is the largest integer which cannot be written as a ; there are only 17 nonnegative integers with this property.

It is also approximately the number of s in a.

Furthermore, it is (not considering myriad, lakh and -illiard) the number of numbers with an accepted English name.

In the Spanish association football, there are 22 teams playing a double , resulting in 462 matches.

It is also the fifth largest known squarefree number of the form 2n−1Cn.

495 (four hundred ninety-five) is the number of in a double-nine  set.

It is also the Kaprekar's constant for three-digit numbers.

496 (four hundred ninety-six) is the third perfect number. Its divisors are 1,2,4,8,16,31,62,124,248 and 496.

Furthermore, it was the nominal number of  during 1965–1990.

The is the  in the world. Its main service has a rise of 504.2 metres.

It is also the of the , which is isomorphic to PGL(2,8) and SL(2,8).

561 is a natural number that succeeds 560 and comes before 562.

561 is an interesting number primarily for the reason that \(561^2-561^1-561^0=314,159\). The resulting number 314159 contains the first six decimal digits of.

561 has 3, 11, and 17 as its prime factors, incidentally the sum of those prime factors is 31, which happens to be the first two decimal digits of pi.

It is also the first.

According to, there should be 614 commandments in.

It is also the number of grid points on a with a 10° net.

There are exactly 660 in a.

It is also the of the.

Furthermore, the of s is limited to 660.

In s, the month of February has 672 hours.

It is also the number of seats in the 14th, which was until 2017 the largest democratically elected national parliament house ever.

The number 676 is the second largest undulating square number; this has been proved by David Moews.

It is also the number of two-letter combinations formed from the.

676 is an even number.

It's a perfect square number (676 = 262).

Prime factorization of 676 is 22 × 132.

The 19th is the largest democratically elected national parliament house ever; it has 709 seats.

A method for generating a sequence of primes is to start with 1, then choosing the smallest prime successor of a multiple of the previous number in each step. The compositeness can be easily certified by or, and the primality by. The resulting sequence starts with 1, 2, 3, 7, 29, 59, 709, ….

719 is the natural number succeeding 718 and preceding 720.

It is the number of hours in a 30-day month (April, June, September or November) containing a spring transition.

It is a prime number. As 119, 121 and 721 are all composite, it is the only 3-digit factorial prime.

Some services have 720 visible s.

It is also the number of s in a scan line.

It is equal to 6!, the factorial of 6. Consequently, it is the order of the of degree 6, which is isomorphic to, and has an.

Finally, it is the number of hours in a 30-day month (April, June, September or November) not containing a transition.

721 is the natural number succeeding 720 and preceding 722.

It is the number of hours in a 30-day month (April, June, September or November) containing a fall transition.

It is also the number of species in the first six generations.

729 is the natural number succeeding 728 and preceding 730. It is also the square of 27, the cube of 9 and the sixth power of 3.

It is also the number of codewords in the, and the larger number in the first pair.

The constant term in the of the  is equal to 744.

It is also the number of hours in a 31-day month (January, March, May, July, August, October or December) not containing a transition.

748 is a number following 747 and preceding 749. A sum of the digits of this number is equal to prime.

748 is even abundant number.

Its prime factorization is 22 × 11 × 17.

Some association football competitions, such as the, have four-team double s in the group stage. With, there are exactly 748 possible points columns in the final standings of a group.

777 is a lucky number. For instance, the prize for 4 correct final digits in the German lottery  is equal to 777 euros, and there is a 777 jackpot line in many slot machines.

It is the 124th (in the mathematical sense).

Its prime factorization is 3 × 7 × 37.

There were 960 s in a.

It is also the number of starting positions in Fischer Random Chess, which is therefore also known as.

4-6 digits
Some services have 1,080 visible s.

It is also the bandwidth (in ) of the in most countries of the world.

Furthermore, it is the number of in an.

Finally, it is the of the  in s.

1,092 (one thousand ninety-two) is the number of in a double-12  set.

It is also the of the.

1,440 (one thousand four hundred forty) is the number of s in a. Consequently, it is also mentioned in 's famous book  in chapter 14, where the planet on which the lamplighter lives has 1,440 sunsets in the course of one Earth day.

It is also the order of the of the.

The prize for correctly answering the first two questions in the French game show ' was equal to 1,500''' s.

It is also one of the (in s).

The was founded in the year 1602.

For this reason, a video game has been named.

It is also the last carrier frequency (1,602 ) in the radio band in the.

Furthermore, the is approximately equal to 1.602 × 10−19 s.

The lasted from  to, for a total of 2,205 years.

For this reason, a video game has been named.

It is also approximately the number of in a.

2,520 is the smallest positive integer that can be divided with numbers from 1 to 10:


 * \(2,520 \div 1 = 2,520\)
 * \(2,520 \div 2 = 1,260\)
 * \(2,520 \div 3 = 840\)
 * \(2,520 \div 4 = 630\)
 * \(2,520 \div 5 = 504\)
 * \(2,520 \div 6 = 420\)
 * \(2,520 \div 7 = 360\)
 * \(2,520 \div 8 = 315\)
 * \(2,520 \div 9 = 280\)
 * \(2,520 \div 10 = 252\)

In other words, it's the weak factorial of 9 and 10.

2,520 is the of the. It is also the maximum possible cycle length of any given algorithm on the Rubik's cube (one such algorithm is "RL2U'F'd").

Its prime factorization is 23 × 32 × 5 × 7.

3,420 (three thousand four hundred twenty) is the number of in a double-18  set.

It is also the of the.

4,060 is the number of known nonnegative integers which cannot be written as a ; the largest of which is 1,290,740.

It is also the number of points in the smallest faithful permutation representation of the ; its one-point stabilizer is the automorphism group of the.

The number 5,040 is the largest known factorial number which is the predecessor of a square number: 7! = 5,040 = 5,041−1 = 712−1.

mentioned in his that 5,040 is a convenient number to use for dividing many things (including both the citizens and the land of a city-state or polis) into lesser parts, making it an ideal number for the number of citizens (heads of families) making up a polis. He remarks that this number can be divided by all the (natural) numbers from 1 to 12 with the single exception of 11 (however, it is not the smallest number to have this property; 2,520 is).

7,140 is the largest number that is both a and a.

It is also the area of a in s.

8,888 is the sum of all czech coins & banknotes.

1 + 2 + 5 + 10 + 20 + 50 + 100 + 200 + 500 + 1,000 + 2,000 + 5,000 = 8,888

It is also associated with good luck in.

The prize for correctly answering the first five questions in the French game show ' was equal to 12,000''' s.

In the, it is called “zwölftausend”. It is the largest number, whose German name.

The equation 243 + 14,641 = 14,884 is one of ten known solutions to the Fermat–Catalan conjecture.

The number 14,641 is also the first  with more than one digit.

When treated as consecutive single digits, it is also the fourth line of Pascal's triangle.

20,160 is the smallest with more than one.

One of them is the alternating group of degree 8, which is isomorphic to the matrix groups, PGL(4,2), PSL(4,2), and SL(4,2).

The other is the Mathieu group of degree 21, which is isomorphic to the matrix group PSL(3,4).

It is also the number of s in a.

25,920 is the of the , which is isomorphic to. It is one of the few non-abelian simple groups with only three distinct prime factors in the order.

It is also the number of in a.

The 3,999 undisputed use a total of 30,000 characters.

It was also the prize for correctly answering the first three questions in the Japanese game show  in.

The prize for correctly answering the first nine questions in the Indian game show ' is equal to 160,000''' s.

In the, one kalabtun is equal to 160,000 tun.

181,440 is the of the  of degree 9. It is the largest alternating group, for which the Sylow 2-subgroup is not the largest.

It is also the number of in a.

By fitting the least-degree polynomial to the first n odd primes, one can attempt to guess the (n + 1)-st odd prime, but this will give almost always incorrect results, which are always odd, but can be prime or composite, and positive or negative. The absolute value of the first negative prime obtained in this way is equal to 281,581.

It is also the number of on Friday, January 27, 1984 in.

Some s produced in the and, such as the  and the , have problems with their digital s, if they reach the number 300,000.

It is also used as an approximation for the, which is equal to 299,792.458 km/s or 299,792,458 m/s.

Furthermore, it was also the prize for correctly answering the first three questions in the Italian game show  in.

7-9 digits
1,250,000 (one million two hundred fifty thousand) is the number of for  in.

It is also the second prize in the in s.

It is also the prize for correctly answering the first twelve questions in the Indian game show  in s.

1,500,000 (one million five hundred thousand) is the number of for  in.

It was also the prize for correctly answering the first eleven questions in the Japanese game show  in.

2,500,000 (two million five hundred thousand) is the number of for  in.

It is also the prize for correctly answering the first thirteen questions in the Indian game show  in s.

Furthermore, it was also the prize for correctly answering the first twelve questions in the Japanese game show  in.

4,000,000 (four million) is the number of for  in.

It is also the first prize (El Gordo) in the in s.

It was also the prize for correctly answering the first seven questions in the Italian game show  in.

This number is equal to 2,0002.

The prize for correctly answering the first eleven questions in the Italian game show ' was equal to 64,000,000'''.

In the, one alautun is equal to 64,000,000 tun.

The prize for correctly answering all sixteen questions in the Indian game show ' is equal to 70,000,000''' s.

has proven that there are infinitely many s not larger than 70 million.

The number 300,000,000 is used as an approximation for the, which is equal to 299,792,458 m/s.

It was also the prize for correctly answering the first four questions in the Turkish game show  in first.

Approximations of these numbers
For 20,160:

For 25,920:

For 4,000,000: