Всего найдено: 56
Здравствуйте! В предложении «на ремонт выделено (или выделены) 34,4 млн. рублей…» глагол в каком числе стоит употребить?
Ответ справочной службы русского языка
Стилистически нейтральна форма ед. числа.
Здравствуйте! Хотела бы узнать, надо ли ставить точку после млн. и млрд. в тексте ВКР?
Ответ справочной службы русского языка
Эти сокращения пишутся без точек на конце в любых текстах.
на русском языке разговаривает 350 млн. человек или разговаривают 350 млн. человек. Как правильно?
Ответ справочной службы русского языка
Предпочтительно: …разговаривает 350 млн человек.
Как пишется сокращение «Миллион» млн или млн. Вопрос: ставится ли точка?
Ответ справочной службы русского языка
После сокращения млн точка не ставится.
Подскажите, пожалуйста: В предложении «Филиал имеет 4 коксовые батареи суммарной производственной мощности 2,2 млн.тн/год кокса валового 6% влажности.» как правильно сказать: «мощности» или «мощностью»?
Ответ справочной службы русского языка
Следует использовать форму мощностью: Филиал имеет четыре коксовые батареи суммарной производственной мощностью 2,2 млн т/год кокса валового 6% влажности.
Здравствуйте! Был уже здесь задан вопрос: нужно ли в официальных документах ставить точки после сокращенных числительных: млн(.), млрд(.)? Ответ справочной службы русского языка: «точку ставить не нужно, но на практике точка обычно ставится». В других ответах по вопросам о точке после млн, не касающихся официальных документов, точка также не ставится. У меня вопрос: разве грамотно и в официальных документах ставить точку, если есть правило, что она не нужна, почему «на практике обычно ставится» — это нормально? Даже в рекомендациях по написанию документов дочерним компаниям, головная организация ставит точку после млн. (не рекомендует ставить, а просто в тексте встречается млн с точкой, и это уже берут за пример). То есть безграмотность приходит к нам «сверху», получается. С уважением.
Ответ справочной службы русского языка
В некотором смысле Вы правы. Иногда в документах фиксируются ошибочные написания. Затем в документах, подчиненных первым, воспроизводят эти ошибки.
Добрый день. Как правильно писать (речь идёт о научной периодике) «миллион» сокращённо: «млн» или «млн.» Коллеги меня убеждают, что «млн» без точки — только в именительном падеже (неужели?) Спасибо, Марина Кнорре
Ответ справочной службы русского языка
После сокращения млн точка не ставится вне зависимости от падежа.
Скажите, пожалуйста, правильно ли в тексте употребляется слово «заём». Или надо все-таки «займ»? Микрозаём – это: от 30 тыс. руб. до 3 млн. руб. на срок от 3 мес. до 3 лет; погашение ежемесячными равными срочными уплатами (аннуитетными платежами) по ставке 10% годовых (по отдельным программам – 7%); отсутствие «комиссий» и «скрытых платежей»; предоставление льготного периода (только уплата процентов) на срок до 3 месяцев; возможность полного или частичного досрочного погашения задолженности уже после 3‑х месяцев со дня предоставления займа без дополнительных расходов заёмщика. Микрозаёмы в размере до 500 тыс. руб. включительно могут предоставляться без залога, под поручительства юридических или физических лиц. В Фонде действуют специальные программы предоставления микрозаёмов: для крестьянских (фермерских) хозяйств; для начинающих предпринимателей – победителей областного и муниципальных конкурсов на предоставление субсидий на начало собственного дела; «Тендерный заём» – для субъектов малого и среднего предпринимательства, участвующих в конкурсных процедурах по закупке товаров, работ и услуг для государственных и муниципальных нужд; совмещение микрозаёмов и лизинговых схем финансирования (по отдельным соглашениям с лизинговыми компаниями).
Ответ справочной службы русского языка
В именительном падеже ед. числа правильно только заём, все остальные падежные формы образуются от основы займ-: займа, займу и т. д.; во множественном числе: займы, займов, займам и т. д. Поэтому правильно: микрозаём, но микрозаймы.
Как сокращать слово «миллион» — с точкой или без точки: «млн» или «млн.«? Спасибо
Ответ справочной службы русского языка
После сокращения млн точка не ставится.
Добрый день! Подскажите млн. и млрд. пишется как? Ставим ли точку в конце или нет?
Ответ справочной службы русского языка
Сокращения млн, млрд пишутся без точек. Точки не ставят в конце сокращений, образованных путем удаления гласных.
Здравствуйте! Скажите пожалуйста, можно ли так сказать: «Выделенные средства из бюджета составили 8 млн. рублей.» Мне кажется «средства» не могут «составлять»
Ответ справочной службы русского языка
Предложение неудачно. Возможен такой вариант: Из бюджета выделено 8 млн рублей.
Приобретая на 1 млн. руб. оборудованиЕ(Я). Как правильно?
Ответ справочной службы русского языка
Лучше: приобретая оборудование на 1 млн руб.
Как написать цифрой «десятимиллионный пассажир», с наращением или без, с пробелами или без: 10 000 000-й пассажир ??????????????????
Ответ справочной службы русского языка
Если писать с цифрами, то так: 10-миллионный пассажир. При необходимости экономии печатного места: 10-млн. пассажир.
Как правильно: млн. и млрд. — или млн и млрд?
Ответ справочной службы русского языка
Точки в этих сокращениях не нужны.
прошу прокомментировать, есть ли у данного текста смысл(последнее предложение), если есть, то какой?
«отгрузка данного товара осуществляется в соответствии с договоренностью по лимиту на складе в размере 2 млн. рублей и графиком еженедельных платежей. На сегодняшний момент мы имеем право взять товар на сумму рублей. Просим рассмотреть нужность данного товара у Дилера!!!!»
Ответ справочной службы русского языка
Смысл есть: требуется ответить, нужен ли товар дилеру. Но формулировка неудачна.
Всего найдено: 19
Пожалуйста, подскажите прямую ссылку на электронную версию словаря «Русский орфографический словарь РАН / Под ред. В. В. Лопатина, О. Е. Ивановой. – 4-е изд., испр. и доп. – М., 2012.» (В частности по сокращению млн и млрд).
Ответ справочной службы русского языка
Этот словарь (именно 4-е издание) пока существует только в печатной версии. Вот ссылка на печатное издание: Русский орфографический словарь РАН / Под ред. В. В. Лопатина, О. Е. Ивановой. – 4-е изд., испр. и доп. – М., 2012. – С. 865.
Здравствуйте. Подскажите пожалйуста, на основании каких правил (источников) в таких сокращениях как МЛН и МЛРД не ставится точка
Ответ справочной службы русского языка
Правило таково: точки не ставят в конце сокращений, образованных путем удаления гласных. Сокращения млн, млрд (без точек) зафиксированы, например, здесь: Русский орфографический словарь РАН / Под ред. В. В. Лопатина, О. Е. Ивановой. – 4-е изд., испр. и доп. – М., 2012.
Нужна ли точка при сокращении млн и млрд?
Ответ справочной службы русского языка
Эти сокращения пишутся без точек.
Уважаемая справка! Меня интересует такой вопрос: следует ли ставить точку в сокращенных словах типа млн и млрд при использовании научного стиля речи. При обычном письме я, конечно, ставлю точки — без них слово мне кажется незавершенным, а вот при написании научной статьи, монографии и т.д. существуют свои правила. Что они гласят в этом случае?
Спасибо!
Ответ справочной службы русского языка
Сокращения млн, млрд пишутся без точек (во всех текстах). Точки не ставят в конце сокращений, образованных путем удаления гласных.
Как правильно: млн. и млрд. — или млн и млрд?
Ответ справочной службы русского языка
Точки в этих сокращениях не нужны.
Нужна ли точка после сокращений млн и млрд?
Ответ справочной службы русского языка
Эти сокращения пишутся без точек на конце.
Нужны ли точки после млн и млрд?
Ответ справочной службы русского языка
Эти сокращения пишутся без точек на конце.
Добрый день!
Подскажите, цитирую:
Вопрос № 244779
Как писать и в соответствии с какими правилами (где изложенными официально) — «млн» или «млн.»? «млрд» или «млрд.»?
Ответ справочной службы русского языка
Точка после этих сокращений не ставится. См. в «Русском орфографическом словаре РАН» (М., 2005).
Вопрос № 183286
Нужны ли точки после сокращений млн и млрд? какое есть правило и где его можно посмотреть?
Markevich Lidiya Alekseevna
Ответ справочной службы русского языка
«Русский орфографический словарь РАН» рекомендует ставить точки после сокращений млн. и млрд.
Так ставится точка или НЕ ставится?
СпасибоЕлена
Ответ справочной службы русского языка
Первое издание «Русского орфографического словаря» (1999) фиксировало сокращения млн, млрд с точками, во втором издании (2005) эта рекомендация была снята. Сегодня нормативно написание без точек.
Добрый день. Следует ли ставить точку в сокращениях млн и млрд? В пособиях и словарях нет однозначного ответа.
В каких случаях следует употреблять слово «истекший», а в каких «истёкший?
С уважением
Л.
Ответ справочной службы русского языка
Сокращения млн и млрд пишутся без точки. Слово истекший употребляется в значении «прошедший». Истёкший — причастие от глаг. истечь.
Здравствуйте! Подскажите, пожалуйста, надо ли ставить точку в конце сокращения МЛН и МЛРД, если в предложении указано число, например, 14 млн(.)?
Ответ справочной службы русского языка
В этом случае точка не нужна.
Нужно ли ставить точку после сокращений млн и млрд?
Ответ справочной службы русского языка
Точка не ставится.
Не подскажете ли, такие сокращения, как млн и млрд пишется с точкой или без?
Ответ справочной службы русского языка
Эти сокращения пишутся без точек.
Здравствуйте, подскажите, пожалуйста, правила сокращения. Млн и млрд правильно писать с точкой или нет?
Ответ справочной службы русского языка
Верно написание без точек.
Как правильно писать сокращения: млн, млрд, т, тыс., кг, км, г, м?
Вроде как млн и млрд пишутся точно без точки, но встречаются написания в авторитетных источниках с ТОЧКОЙ в конце!
Ответ справочной службы русского языка
Верно: _млн, млрд, тыс., кг, км, г, м, т (тонна)_.
Здравствуйте. Подскажите, пожалуйста, нужно ли ставить точку после млн и млрд?
Виталий
Ответ справочной службы русского языка
После этих сокращений точки не требуются.
(Redirected from 1000000)
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|---|---|---|---|
← 100 101 102 103 104 105 106 107 108 109 |
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| Cardinal | one million | ||
| Ordinal | 1000000th (one millionth) |
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| Factorization | 26 × 56 | ||
| Greek numeral |  |
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| Roman numeral | M | ||
| Binary | 111101000010010000002 | ||
| Ternary | 12122102020013 | ||
| Senary | 332333446 | ||
| Octal | 36411008 | ||
| Duodecimal | 40285412 | ||
| Hexadecimal | F424016 |
Look up million in Wiktionary, the free dictionary.
One million (1,000,000), or one thousand thousand, is the natural number following 999,999 and preceding 1,000,001. The word is derived from the early Italian millione (milione in modern Italian), from mille, «thousand», plus the augmentative suffix -one.[1]
It is commonly abbreviated in British English as m[2][3][4] (not to be confused with the metric prefix «m», milli, for 10−3), M,[5][6] MM («thousand thousands», from Latin «Mille»; not to be confused with the Roman numeral MM = 2,000), mm (not to be confused with millimetre), or mn in financial contexts.[7][better source needed]
In scientific notation, it is written as 1×106 or 106.[8] Physical quantities can also be expressed using the SI prefix mega (M), when dealing with SI units; for example, 1 megawatt (1 MW) equals 1,000,000 watts.
The meaning of the word «million» is common to the short scale and long scale numbering systems, unlike the larger numbers, which have different names in the two systems.
The million is sometimes used in the English language as a metaphor for a very large number, as in «Not in a million years» and «You’re one in a million», or a hyperbole, as in «I’ve walked a million miles» and «You’ve asked a million-dollar question».
1,000,000 is also the square of 1000 and also the cube of 100.
Visualisation of powers of ten from 1 to 1 million
Visualizing one million[edit]
Even though it is often stressed that counting to precisely a million would be an exceedingly tedious task due to the time and concentration required, there are many ways to bring the number «down to size» in approximate quantities, ignoring irregularities or packing effects.
- Information: Not counting spaces, the text printed on 136 pages of an Encyclopædia Britannica, or 600 pages of pulp paperback fiction contains approximately one million characters.
- Length: There are one million millimetres in a kilometre, and roughly a million sixteenths of an inch in a mile (1 sixteenth = 0.0625). A typical car tire might rotate a million times in a 1,900-kilometre (1,200 mi) trip, while the engine would do several times that number of revolutions.
- Fingers: If the width of a human finger is 22 mm (7⁄8 in), then a million fingers lined up would cover a distance of 22 km (14 mi). If a person walks at a speed of 4 km/h (2.5 mph), it would take them approximately five and a half hours to reach the end of the fingers.
- Area: A square a thousand objects or units on a side contains a million such objects or square units, so a million holes might be found in less than three square yards of window screen, or similarly, in about one half square foot (400–500 cm2) of bed sheet cloth. A city lot 70 by 100 feet is about a million square inches.
- Volume: The cube root of one million is one hundred, so a million objects or cubic units is contained in a cube a hundred objects or linear units on a side. A million grains of table salt or granulated sugar occupies about 64 mL (2.3 imp fl oz; 2.2 US fl oz), the volume of a cube one hundred grains on a side. One million cubic inches would be the volume of a small room 8+1⁄3 feet long by 8+1⁄3 feet wide by 8+1⁄3 feet high.
- Mass: A million cubic millimetres (small droplets) of water would have a volume of one litre and a mass of one kilogram. A million millilitres or cubic centimetres (one cubic metre) of water has a mass of a million grams or one tonne.
- Weight: A million 80-milligram (1.2 gr) honey bees would weigh the same as an 80 kg (180 lb) person.
- Landscape: A pyramidal hill 600 feet (180 m) wide at the base and 100 feet (30 m) high would weigh about a million short tons.
- Computer: A display resolution of 1,280 by 800 pixels contains 1,024,000 pixels.
- Money: A USD bill of any denomination weighs 1 gram (0.035 oz). There are 454 grams in a pound. One million USD bills would weigh 1 megagram (1,000 kg; 2,200 lb) or 1 tonne (just over 1 short ton).
- Time: A million seconds, 1 megasecond, is 11.57 days.
In Indian English and Pakistani English, it is also expressed as 10 lakh. Lakh is derived from lakṣa for 100,000 in Sanskrit.
One million black dots (pixels) – each tile with white or grey background contains 1000 dots (full image)
Selected 7-digit numbers (1,000,001–9,999,999)[edit]
1,000,001 to 1,999,999[edit]
- 1,000,003 = Smallest 7-digit prime number
- 1,000,405 = Smallest triangular number with 7 digits and the 1,414th triangular number
- 1,002,001 = 10012, palindromic square
- 1,006,301 = First number of the first pair of prime quadruplets occurring thirty apart ({1006301, 1006303, 1006307, 1006309} and {1006331, 1006333, 1006337, 1006339})[9]
- 1,024,000 = Sometimes, the number of bytes in a megabyte[10]
- 1,030,301 = 1013, palindromic cube
- 1,037,718 = Large Schröder number
- 1,048,576 = 10242 = 324 = 165 = 410 = 220, the number of bytes in a mebibyte (or often, a megabyte)
- 1,048,976 = smallest 7 digit Leyland number
- 1,058,576 = Leyland number
- 1,058,841 = 76 x 32
- 1,084,051 = fifth Keith prime[11]
- 1,089,270 = harmonic divisor number[12]
- 1,111,111 = repunit
- 1,112,083 = logarithmic number[13]
- 1,129,30832 + 1 is prime[14]
- 1,136,689 = Pell number,[15] Markov number
- 1,174,281 = Fine number[16]
- 1,185,921 = 10892 = 334
- 1,200,304 = 17 + 27 + 37 + 47 + 57 + 67 + 77 [17]
- 1,203,623 = smallest unprimeable number ending in 3[18][19]
- 1,234,321 = 11112, palindromic square
- 1,262,180 = number of triangle-free graphs on 12 vertices[20]
- 1,278,818 = Markov number
- 1,299,709 = 100,000th prime number
- 1,336,336 = 11562 = 344
- 1,346,269 = Fibonacci number,[21] Markov number
- 1,367,631 = 1113, palindromic cube
- 1,413,721 = square triangular number[22]
- 1,419,857 = 175
- 1,421,280 = harmonic divisor number[12]
- 1,441,440 = colossally abundant number,[23] superior highly composite number[24]
- 1,441,889 = Markov number
- 1,500,625 = 12252 = 354
- 1,539,720 = harmonic divisor number[12]
- 1,563,372 = Wedderburn-Etherington number[25]
- 1,594,323 = 313
- 1,596,520 = Leyland number
- 1,606,137 = number of ways to partition {1,2,3,4,5,6,7,8,9} and then partition each cell (block) into subcells.[26]
- 1,607,521/1,136,689 ≈ √2
- 1,647,086 = Leyland number
- 1,671,800 = Initial number of first century xx00 to xx99 consisting entirely of composite numbers[27]
- 1,679,616 = 12962 = 364 = 68
- 1,686,049 = Markov prime
- 1,687,989 = number of square (0,1)-matrices without zero rows and with exactly 7 entries equal to 1[28]
- 1,730,787 = Riordan number
- 1,741,725 = equal to the sum of the seventh power of its digits
- 1,771,561 = 13312 = 1213 = 116, also, Commander Spock’s estimate for the tribble population in the Star Trek episode «The Trouble with Tribbles»
- 1,864,637 = k such that the sum of the squares of the first k primes is divisible by k.[29]
- 1,874,161 = 13692 = 374
- 1,889,568 = 185
- 1,928,934 = 2 x 39 x 72
- 1,941,760 = Leyland number
- 1,953,125 = 1253 = 59
2,000,000 to 2,999,999[edit]
- 2,000,002 = number of surface-points of a tetrahedron with edge-length 1000[30]
- 2,000,376 = 1263
- 2,012,174 = Leyland number
- 2,012,674 = Markov number
- 2,085,136 = 14442 = 384
- 2,097,152 = 1283 = 87 = 221
- 2,097,593 = Leyland prime[31]
- 2,124,679 = largest known Wolstenholme prime[32]
- 2,178,309 = Fibonacci number[21]
- 2,222,222 = repdigit
- 2,313,441 = 15212 = 394
- 2,356,779 = Motzkin number[33]
- 2,423,525 = Markov number
- 2,476,099 = 195
- 2,560,000 = 16002 = 404
- 2,567,284 = number of partially ordered set with 10 unlabeled elements[34]
- 2,646,723 = little Schroeder number
- 2,674,440 = Catalan number[35]
- 2,692,537 = Leonardo prime
- 2,744,210 = Pell number[15]
- 2,796,203 = Wagstaff prime,[36] Jacobsthal prime
- 2,825,761 = 16812 = 414
- 2,890,625 = 1-automorphic number[37]
- 2,922,509 = Markov prime
- 2,985,984 = 17282 = 1443 = 126 = 1,000,00012 AKA a great-great-gross
3,000,000 to 3,999,999[edit]
- 3,111,696 = 17642 = 424
- 3,200,000 = 205
- 3,263,442 = product of the first five terms of Sylvester’s sequence
- 3,263,443 = sixth term of Sylvester’s sequence[38]
- 3,276,509 = Markov prime
- 3,301,819 = alternating factorial[39]
- 3,333,333 = repdigit
- 3,360,633 = palindromic in 3 consecutive bases: 62818269 = 336063310 = 199599111
- 3,418,801 = 18492 = 434
- 3,426,576 = number of free 15-ominoes
- 3,524,578 = Fibonacci number,[21] Markov number
- 3,554,688 = 2-automorphic number[40]
- 3,626,149 = Wedderburn–Etherington prime[25]
- 3,628,800 = 10!
- 3,748,096 = 19362 = 444
- 3,880,899/2,744,210 ≈ √2
4,000,000 to 4,999,999[edit]
- 4,008,004 = 20022, palindromic square
- 4,037,913 = sum of the first ten factorials
- 4,084,101 = 215
- 4,100,625 = 20252 = 454
- 4,194,304 = 20482 = 411 = 222
- 4,194,788 = Leyland number
- 4,208,945 = Leyland number
- 4,210,818 = equal to the sum of the seventh powers of its digits
- 4,213,597 = Bell number[41]
- 4,260,282 = Fine number[42]
- 4,297,512 = 12-th derivative of xx at x=1[43]
- 4,324,320 = colossally abundant number,[23] superior highly composite number,[24] pronic number
- 4,400,489 = Markov number
- 4,444,444 = repdigit
- 4,477,456 = 21162 = 464
- 4,782,969 = 21872 = 97 = 314
- 4,782,974 = n such that n | (3n + 5)[44]
- 4,785,713 = Leyland number
- 4,805,595 = Riordan number
- 4,826,809 = 21972 = 1693 = 136
- 4,879,681 = 22092 = 474
5,000,000 to 5,999,999[edit]
- 5,134,240 = the largest number that cannot be expressed as the sum of distinct fourth powers
- 5,153,632 = 225
- 5,221,225 = 22852, palindromic square
- 5,293,446 = Large Schröder number
- 5,308,416 = 23042 = 484
- 5,496,925 = first cyclic number in base 6
- 5,555,555 = repdigit
- 5,702,887 = Fibonacci number[21]
- 5,761,455 = The number of primes under 108
- 5,764,801 = 24012 = 494 = 78
- 5,882,353 = 5882 + 23532
6,000,000 to 6,999,999[edit]
- 6,250,000 = 25002 = 504
- 6,436,343 = 235
- 6,536,382 = Motzkin number[33]
- 6,625,109 = Pell number,[15] Markov number
- 6,666,666 = repdigit
- 6,765,201 = 26012 = 514
- 6,948,496 = 26362, palindromic square
7,000,000 to 7,999,999[edit]
- 7,109,376 = 1-automorphic number[37]
- 7,311,616 = 27042 = 524
- 7,453,378 = Markov number
- 7,529,536 = 27442 = 1963 = 146
- 7,652,413 = Largest n-digit pandigital prime
- 7,777,777 = repdigit
- 7,779,311 = A hit song written by Prince and released in 1982 by The Time
- 7,861,953 = Leyland number
- 7,890,481 = 28092 = 534
- 7,906,276 = pentagonal triangular number
- 7,913,837 = Keith number[11]
- 7,962,624 = 245
8,000,000 to 8,999,999[edit]
- 8,000,000 = Used to represent infinity in Japanese mythology
- 8,108,731 = repunit prime in base 14
- 8,388,607 = second composite Mersenne number with a prime exponent
- 8,388,608 = 223
- 8,389,137 = Leyland number
- 8,399,329 = Markov number
- 8,436,379 = Wedderburn-Etherington number[25]
- 8,503,056 = 29162 = 544
- 8,675,309 = A hit song for Tommy Tutone (also a twin prime with 8,675,311)
- 8,675,311 = Twin prime with 8,675,309
- 8,888,888 = repdigit
- 8,946,176 = self-descriptive number in base 8
9,000,000 to 9,999,999[edit]
- 9,150,625 = 30252 = 554
- 9,227,465 = Fibonacci number,[21] Markov number
- 9,369,319 = Newman–Shanks–Williams prime[45]
- 9,647,009 = Markov number
- 9,653,449 = square Stella octangula number
- 9,581,014 = n such that n | (3n + 5)[46]
- 9,663,500 = Initial number of first century xx00 to xx99 that possesses an identical prime pattern to any century with four or fewer digits: its prime pattern of {9663503, 9663523, 9663527, 9663539, 9663553, 9663581, 9663587} is identical to {5903, 5923, 5927, 5939, 5953, 5981, 5987}[47][48]
- 9,694,845 = Catalan number[35]
- 9,699,690 = eighth primorial
- 9,765,625 = 31252 = 255 = 510
- 9,800,817 = equal to the sum of the seventh powers of its digits
- 9,834,496 = 31362 = 564
- 9,865,625 = Leyland number
- 9,926,315 = equal to the sum of the seventh powers of its digits
- 9,938,375 = 2153, the largest 7-digit cube
- 9,997,156 = largest triangular number with 7 digits and the 4,471st triangular number
- 9,998,244 = 31622, the largest 7-digit square
- 9,999,991 = Largest 7-digit prime number
- 9,999,999 = repdigit
See also[edit]
- Huh (god), depictions of whom were also used in hieroglyphs to represent one million
- Megagon
- Millionaire
- Names of large numbers
- Orders of magnitude (numbers) to help compare dimensionless numbers between 1,000,000 and 10,000,000 (106 and 107)
.
References[edit]
- ^ «million». Dictionary.com Unabridged. Random House, Inc. Retrieved 4 October 2010.
- ^ «m». Oxford Dictionaries. Oxford University Press. Archived from the original on July 6, 2012. Retrieved 2015-06-30.
- ^ «figures». The Economist Style Guide (11th ed.). The Economist. 2015. ISBN 9781782830917.
- ^ «6.7 Abbreviating ‘million’ and ‘billion’«. English Style Guide. A handbook for authors and translators in the European Commission (PDF) (2019 ed.). 26 February 2019. p. 37.
- ^ «m». Merriam-Webster. Merriam-Webster Inc. Retrieved 2015-06-30.
- ^ «Definition of ‘M’«. Collins English Dictionary. HarperCollins Publishers. Retrieved 2015-06-30.
- ^ Averkamp, Harold. «Q&A: What Does M and MM Stand For?». AccountingCoach.com. AccountingCoach, LLC. Retrieved 25 June 2015.
- ^ David Wells (1987). The Penguin Dictionary of Curious and Interesting Numbers. London: Penguin Group. p. 185.
1,000,000 = 106
- ^ Sloane, N. J. A. (ed.). «Sequence A059925 (Initial members of two prime quadruples (A007530) with the smallest possible difference of 30.)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2019-01-27.
- ^ Tracing the History of the Computer — History of the Floppy Disk
- ^ a b «Sloane’s A007629 : Repfigit (REPetitive FIbonacci-like diGIT) numbers (or Keith numbers)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b c «Sloane’s A001599 : Harmonic or Ore numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A002104 (Logarithmic numbers)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Sloane, N. J. A. (ed.). «Sequence A006315 (Numbers n such that n^32 + 1 is prime)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ a b c «Sloane’s A000129 : Pell numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A000957». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2022-06-01.
- ^ Sloane, N. J. A. (ed.). «Sequence A031971». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Collins, Julia (2019). Numbers in Minutes. United Kingdom: Quercus. p. 140. ISBN 978-1635061772.
- ^ Sloane, N. J. A. (ed.). «Sequence A143641 (Odd prime-proof numbers not ending in 5)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Sloane, N. J. A. (ed.). «Sequence A006785 (Number of triangle-free graphs on n vertices)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ a b c d e «Sloane’s A000045 : Fibonacci numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ «Sloane’s A001110 : Square triangular numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b «Sloane’s A004490 : Colossally abundant numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b «Sloane’s A002201 : Superior highly composite numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b c «Sloane’s A001190 : Wedderburn-Etherington numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A000258 (Expansion of e.g.f. exp(exp(exp(x)-1)-1))». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Sloane, N. J. A. (ed.). «Sequence A181098 (Primefree centuries)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2019-01-27.
- ^ Sloane, N. J. A. (ed.). «Sequence A122400 (Number of square (0,1)-matrices without zero rows and with exactly n entries equal to 1)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Sloane, N. J. A. (ed.). «Sequence A111441 (Numbers k such that the sum of the squares of the first k primes is divisible by k)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2022-06-02.
- ^ Sloane, N. J. A. (ed.). «Sequence A005893 (Number of points on surface of tetrahedron)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ «Sloane’s A094133 : Leyland primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ «Wolstenholme primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b «Sloane’s A001006 : Motzkin numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A000112 (Number of partially ordered sets (posets) with n unlabeled elements)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ a b «Sloane’s A000108 : Catalan numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ «Sloane’s A000979 : Wagstaff primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b Sloane, N. J. A. (ed.). «Sequence A003226 (Automorphic numbers)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2019-04-06.
- ^ «Sloane’s A000058 : Sylvester’s sequence». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ «Sloane’s A005165 : Alternating factorials». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A030984 (2-automorphic numbers)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2021-09-01.
- ^ «Sloane’s A000110 : Bell or exponential numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A000957». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2022-06-01.
- ^ Sloane, N. J. A. (ed.). «Sequence A005727». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Sloane, N. J. A. (ed.). «Sequence A277288 (Positive integers n such that n)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ «Sloane’s A088165 : NSW primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A277288 (Positive integers n such that n)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ «First pair of primes (p1, p2) that begin centuries of primes having the same prime configuration, ordered by increasing p2. Each configuration is allowed only once». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2022-07-03.
- ^ Sloane, N. J. A. (ed.). «Sequence A258275 (Smallest number k > n such that the interval k*100 to k*100+99 has exactly the same prime pattern as the interval n*100 to n*100+99)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
(Redirected from 1000000)
|
|||
|---|---|---|---|
← 100 101 102 103 104 105 106 107 108 109 |
|||
| Cardinal | one million | ||
| Ordinal | 1000000th (one millionth) |
||
| Factorization | 26 × 56 | ||
| Greek numeral | |
||
| Roman numeral | M | ||
| Binary | 111101000010010000002 | ||
| Ternary | 12122102020013 | ||
| Senary | 332333446 | ||
| Octal | 36411008 | ||
| Duodecimal | 40285412 | ||
| Hexadecimal | F424016 |
Look up million in Wiktionary, the free dictionary.
One million (1,000,000), or one thousand thousand, is the natural number following 999,999 and preceding 1,000,001. The word is derived from the early Italian millione (milione in modern Italian), from mille, «thousand», plus the augmentative suffix -one.[1]
It is commonly abbreviated in British English as m[2][3][4] (not to be confused with the metric prefix «m», milli, for 10−3), M,[5][6] MM («thousand thousands», from Latin «Mille»; not to be confused with the Roman numeral MM = 2,000), mm (not to be confused with millimetre), or mn in financial contexts.[7][better source needed]
In scientific notation, it is written as 1×106 or 106.[8] Physical quantities can also be expressed using the SI prefix mega (M), when dealing with SI units; for example, 1 megawatt (1 MW) equals 1,000,000 watts.
The meaning of the word «million» is common to the short scale and long scale numbering systems, unlike the larger numbers, which have different names in the two systems.
The million is sometimes used in the English language as a metaphor for a very large number, as in «Not in a million years» and «You’re one in a million», or a hyperbole, as in «I’ve walked a million miles» and «You’ve asked a million-dollar question».
1,000,000 is also the square of 1000 and also the cube of 100.
Visualisation of powers of ten from 1 to 1 million
Visualizing one million[edit]
Even though it is often stressed that counting to precisely a million would be an exceedingly tedious task due to the time and concentration required, there are many ways to bring the number «down to size» in approximate quantities, ignoring irregularities or packing effects.
- Information: Not counting spaces, the text printed on 136 pages of an Encyclopædia Britannica, or 600 pages of pulp paperback fiction contains approximately one million characters.
- Length: There are one million millimetres in a kilometre, and roughly a million sixteenths of an inch in a mile (1 sixteenth = 0.0625). A typical car tire might rotate a million times in a 1,900-kilometre (1,200 mi) trip, while the engine would do several times that number of revolutions.
- Fingers: If the width of a human finger is 22 mm (7⁄8 in), then a million fingers lined up would cover a distance of 22 km (14 mi). If a person walks at a speed of 4 km/h (2.5 mph), it would take them approximately five and a half hours to reach the end of the fingers.
- Area: A square a thousand objects or units on a side contains a million such objects or square units, so a million holes might be found in less than three square yards of window screen, or similarly, in about one half square foot (400–500 cm2) of bed sheet cloth. A city lot 70 by 100 feet is about a million square inches.
- Volume: The cube root of one million is one hundred, so a million objects or cubic units is contained in a cube a hundred objects or linear units on a side. A million grains of table salt or granulated sugar occupies about 64 mL (2.3 imp fl oz; 2.2 US fl oz), the volume of a cube one hundred grains on a side. One million cubic inches would be the volume of a small room 8+1⁄3 feet long by 8+1⁄3 feet wide by 8+1⁄3 feet high.
- Mass: A million cubic millimetres (small droplets) of water would have a volume of one litre and a mass of one kilogram. A million millilitres or cubic centimetres (one cubic metre) of water has a mass of a million grams or one tonne.
- Weight: A million 80-milligram (1.2 gr) honey bees would weigh the same as an 80 kg (180 lb) person.
- Landscape: A pyramidal hill 600 feet (180 m) wide at the base and 100 feet (30 m) high would weigh about a million short tons.
- Computer: A display resolution of 1,280 by 800 pixels contains 1,024,000 pixels.
- Money: A USD bill of any denomination weighs 1 gram (0.035 oz). There are 454 grams in a pound. One million USD bills would weigh 1 megagram (1,000 kg; 2,200 lb) or 1 tonne (just over 1 short ton).
- Time: A million seconds, 1 megasecond, is 11.57 days.
In Indian English and Pakistani English, it is also expressed as 10 lakh. Lakh is derived from lakṣa for 100,000 in Sanskrit.
One million black dots (pixels) – each tile with white or grey background contains 1000 dots (full image)
Selected 7-digit numbers (1,000,001–9,999,999)[edit]
1,000,001 to 1,999,999[edit]
- 1,000,003 = Smallest 7-digit prime number
- 1,000,405 = Smallest triangular number with 7 digits and the 1,414th triangular number
- 1,002,001 = 10012, palindromic square
- 1,006,301 = First number of the first pair of prime quadruplets occurring thirty apart ({1006301, 1006303, 1006307, 1006309} and {1006331, 1006333, 1006337, 1006339})[9]
- 1,024,000 = Sometimes, the number of bytes in a megabyte[10]
- 1,030,301 = 1013, palindromic cube
- 1,037,718 = Large Schröder number
- 1,048,576 = 10242 = 324 = 165 = 410 = 220, the number of bytes in a mebibyte (or often, a megabyte)
- 1,048,976 = smallest 7 digit Leyland number
- 1,058,576 = Leyland number
- 1,058,841 = 76 x 32
- 1,084,051 = fifth Keith prime[11]
- 1,089,270 = harmonic divisor number[12]
- 1,111,111 = repunit
- 1,112,083 = logarithmic number[13]
- 1,129,30832 + 1 is prime[14]
- 1,136,689 = Pell number,[15] Markov number
- 1,174,281 = Fine number[16]
- 1,185,921 = 10892 = 334
- 1,200,304 = 17 + 27 + 37 + 47 + 57 + 67 + 77 [17]
- 1,203,623 = smallest unprimeable number ending in 3[18][19]
- 1,234,321 = 11112, palindromic square
- 1,262,180 = number of triangle-free graphs on 12 vertices[20]
- 1,278,818 = Markov number
- 1,299,709 = 100,000th prime number
- 1,336,336 = 11562 = 344
- 1,346,269 = Fibonacci number,[21] Markov number
- 1,367,631 = 1113, palindromic cube
- 1,413,721 = square triangular number[22]
- 1,419,857 = 175
- 1,421,280 = harmonic divisor number[12]
- 1,441,440 = colossally abundant number,[23] superior highly composite number[24]
- 1,441,889 = Markov number
- 1,500,625 = 12252 = 354
- 1,539,720 = harmonic divisor number[12]
- 1,563,372 = Wedderburn-Etherington number[25]
- 1,594,323 = 313
- 1,596,520 = Leyland number
- 1,606,137 = number of ways to partition {1,2,3,4,5,6,7,8,9} and then partition each cell (block) into subcells.[26]
- 1,607,521/1,136,689 ≈ √2
- 1,647,086 = Leyland number
- 1,671,800 = Initial number of first century xx00 to xx99 consisting entirely of composite numbers[27]
- 1,679,616 = 12962 = 364 = 68
- 1,686,049 = Markov prime
- 1,687,989 = number of square (0,1)-matrices without zero rows and with exactly 7 entries equal to 1[28]
- 1,730,787 = Riordan number
- 1,741,725 = equal to the sum of the seventh power of its digits
- 1,771,561 = 13312 = 1213 = 116, also, Commander Spock’s estimate for the tribble population in the Star Trek episode «The Trouble with Tribbles»
- 1,864,637 = k such that the sum of the squares of the first k primes is divisible by k.[29]
- 1,874,161 = 13692 = 374
- 1,889,568 = 185
- 1,928,934 = 2 x 39 x 72
- 1,941,760 = Leyland number
- 1,953,125 = 1253 = 59
2,000,000 to 2,999,999[edit]
- 2,000,002 = number of surface-points of a tetrahedron with edge-length 1000[30]
- 2,000,376 = 1263
- 2,012,174 = Leyland number
- 2,012,674 = Markov number
- 2,085,136 = 14442 = 384
- 2,097,152 = 1283 = 87 = 221
- 2,097,593 = Leyland prime[31]
- 2,124,679 = largest known Wolstenholme prime[32]
- 2,178,309 = Fibonacci number[21]
- 2,222,222 = repdigit
- 2,313,441 = 15212 = 394
- 2,356,779 = Motzkin number[33]
- 2,423,525 = Markov number
- 2,476,099 = 195
- 2,560,000 = 16002 = 404
- 2,567,284 = number of partially ordered set with 10 unlabeled elements[34]
- 2,646,723 = little Schroeder number
- 2,674,440 = Catalan number[35]
- 2,692,537 = Leonardo prime
- 2,744,210 = Pell number[15]
- 2,796,203 = Wagstaff prime,[36] Jacobsthal prime
- 2,825,761 = 16812 = 414
- 2,890,625 = 1-automorphic number[37]
- 2,922,509 = Markov prime
- 2,985,984 = 17282 = 1443 = 126 = 1,000,00012 AKA a great-great-gross
3,000,000 to 3,999,999[edit]
- 3,111,696 = 17642 = 424
- 3,200,000 = 205
- 3,263,442 = product of the first five terms of Sylvester’s sequence
- 3,263,443 = sixth term of Sylvester’s sequence[38]
- 3,276,509 = Markov prime
- 3,301,819 = alternating factorial[39]
- 3,333,333 = repdigit
- 3,360,633 = palindromic in 3 consecutive bases: 62818269 = 336063310 = 199599111
- 3,418,801 = 18492 = 434
- 3,426,576 = number of free 15-ominoes
- 3,524,578 = Fibonacci number,[21] Markov number
- 3,554,688 = 2-automorphic number[40]
- 3,626,149 = Wedderburn–Etherington prime[25]
- 3,628,800 = 10!
- 3,748,096 = 19362 = 444
- 3,880,899/2,744,210 ≈ √2
4,000,000 to 4,999,999[edit]
- 4,008,004 = 20022, palindromic square
- 4,037,913 = sum of the first ten factorials
- 4,084,101 = 215
- 4,100,625 = 20252 = 454
- 4,194,304 = 20482 = 411 = 222
- 4,194,788 = Leyland number
- 4,208,945 = Leyland number
- 4,210,818 = equal to the sum of the seventh powers of its digits
- 4,213,597 = Bell number[41]
- 4,260,282 = Fine number[42]
- 4,297,512 = 12-th derivative of xx at x=1[43]
- 4,324,320 = colossally abundant number,[23] superior highly composite number,[24] pronic number
- 4,400,489 = Markov number
- 4,444,444 = repdigit
- 4,477,456 = 21162 = 464
- 4,782,969 = 21872 = 97 = 314
- 4,782,974 = n such that n | (3n + 5)[44]
- 4,785,713 = Leyland number
- 4,805,595 = Riordan number
- 4,826,809 = 21972 = 1693 = 136
- 4,879,681 = 22092 = 474
5,000,000 to 5,999,999[edit]
- 5,134,240 = the largest number that cannot be expressed as the sum of distinct fourth powers
- 5,153,632 = 225
- 5,221,225 = 22852, palindromic square
- 5,293,446 = Large Schröder number
- 5,308,416 = 23042 = 484
- 5,496,925 = first cyclic number in base 6
- 5,555,555 = repdigit
- 5,702,887 = Fibonacci number[21]
- 5,761,455 = The number of primes under 108
- 5,764,801 = 24012 = 494 = 78
- 5,882,353 = 5882 + 23532
6,000,000 to 6,999,999[edit]
- 6,250,000 = 25002 = 504
- 6,436,343 = 235
- 6,536,382 = Motzkin number[33]
- 6,625,109 = Pell number,[15] Markov number
- 6,666,666 = repdigit
- 6,765,201 = 26012 = 514
- 6,948,496 = 26362, palindromic square
7,000,000 to 7,999,999[edit]
- 7,109,376 = 1-automorphic number[37]
- 7,311,616 = 27042 = 524
- 7,453,378 = Markov number
- 7,529,536 = 27442 = 1963 = 146
- 7,652,413 = Largest n-digit pandigital prime
- 7,777,777 = repdigit
- 7,779,311 = A hit song written by Prince and released in 1982 by The Time
- 7,861,953 = Leyland number
- 7,890,481 = 28092 = 534
- 7,906,276 = pentagonal triangular number
- 7,913,837 = Keith number[11]
- 7,962,624 = 245
8,000,000 to 8,999,999[edit]
- 8,000,000 = Used to represent infinity in Japanese mythology
- 8,108,731 = repunit prime in base 14
- 8,388,607 = second composite Mersenne number with a prime exponent
- 8,388,608 = 223
- 8,389,137 = Leyland number
- 8,399,329 = Markov number
- 8,436,379 = Wedderburn-Etherington number[25]
- 8,503,056 = 29162 = 544
- 8,675,309 = A hit song for Tommy Tutone (also a twin prime with 8,675,311)
- 8,675,311 = Twin prime with 8,675,309
- 8,888,888 = repdigit
- 8,946,176 = self-descriptive number in base 8
9,000,000 to 9,999,999[edit]
- 9,150,625 = 30252 = 554
- 9,227,465 = Fibonacci number,[21] Markov number
- 9,369,319 = Newman–Shanks–Williams prime[45]
- 9,647,009 = Markov number
- 9,653,449 = square Stella octangula number
- 9,581,014 = n such that n | (3n + 5)[46]
- 9,663,500 = Initial number of first century xx00 to xx99 that possesses an identical prime pattern to any century with four or fewer digits: its prime pattern of {9663503, 9663523, 9663527, 9663539, 9663553, 9663581, 9663587} is identical to {5903, 5923, 5927, 5939, 5953, 5981, 5987}[47][48]
- 9,694,845 = Catalan number[35]
- 9,699,690 = eighth primorial
- 9,765,625 = 31252 = 255 = 510
- 9,800,817 = equal to the sum of the seventh powers of its digits
- 9,834,496 = 31362 = 564
- 9,865,625 = Leyland number
- 9,926,315 = equal to the sum of the seventh powers of its digits
- 9,938,375 = 2153, the largest 7-digit cube
- 9,997,156 = largest triangular number with 7 digits and the 4,471st triangular number
- 9,998,244 = 31622, the largest 7-digit square
- 9,999,991 = Largest 7-digit prime number
- 9,999,999 = repdigit
See also[edit]
- Huh (god), depictions of whom were also used in hieroglyphs to represent one million
- Megagon
- Millionaire
- Names of large numbers
- Orders of magnitude (numbers) to help compare dimensionless numbers between 1,000,000 and 10,000,000 (106 and 107)
.
References[edit]
- ^ «million». Dictionary.com Unabridged. Random House, Inc. Retrieved 4 October 2010.
- ^ «m». Oxford Dictionaries. Oxford University Press. Archived from the original on July 6, 2012. Retrieved 2015-06-30.
- ^ «figures». The Economist Style Guide (11th ed.). The Economist. 2015. ISBN 9781782830917.
- ^ «6.7 Abbreviating ‘million’ and ‘billion’«. English Style Guide. A handbook for authors and translators in the European Commission (PDF) (2019 ed.). 26 February 2019. p. 37.
- ^ «m». Merriam-Webster. Merriam-Webster Inc. Retrieved 2015-06-30.
- ^ «Definition of ‘M’«. Collins English Dictionary. HarperCollins Publishers. Retrieved 2015-06-30.
- ^ Averkamp, Harold. «Q&A: What Does M and MM Stand For?». AccountingCoach.com. AccountingCoach, LLC. Retrieved 25 June 2015.
- ^ David Wells (1987). The Penguin Dictionary of Curious and Interesting Numbers. London: Penguin Group. p. 185.
1,000,000 = 106
- ^ Sloane, N. J. A. (ed.). «Sequence A059925 (Initial members of two prime quadruples (A007530) with the smallest possible difference of 30.)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2019-01-27.
- ^ Tracing the History of the Computer — History of the Floppy Disk
- ^ a b «Sloane’s A007629 : Repfigit (REPetitive FIbonacci-like diGIT) numbers (or Keith numbers)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b c «Sloane’s A001599 : Harmonic or Ore numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A002104 (Logarithmic numbers)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Sloane, N. J. A. (ed.). «Sequence A006315 (Numbers n such that n^32 + 1 is prime)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ a b c «Sloane’s A000129 : Pell numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A000957». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2022-06-01.
- ^ Sloane, N. J. A. (ed.). «Sequence A031971». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Collins, Julia (2019). Numbers in Minutes. United Kingdom: Quercus. p. 140. ISBN 978-1635061772.
- ^ Sloane, N. J. A. (ed.). «Sequence A143641 (Odd prime-proof numbers not ending in 5)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Sloane, N. J. A. (ed.). «Sequence A006785 (Number of triangle-free graphs on n vertices)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ a b c d e «Sloane’s A000045 : Fibonacci numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ «Sloane’s A001110 : Square triangular numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b «Sloane’s A004490 : Colossally abundant numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b «Sloane’s A002201 : Superior highly composite numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b c «Sloane’s A001190 : Wedderburn-Etherington numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A000258 (Expansion of e.g.f. exp(exp(exp(x)-1)-1))». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Sloane, N. J. A. (ed.). «Sequence A181098 (Primefree centuries)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2019-01-27.
- ^ Sloane, N. J. A. (ed.). «Sequence A122400 (Number of square (0,1)-matrices without zero rows and with exactly n entries equal to 1)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Sloane, N. J. A. (ed.). «Sequence A111441 (Numbers k such that the sum of the squares of the first k primes is divisible by k)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2022-06-02.
- ^ Sloane, N. J. A. (ed.). «Sequence A005893 (Number of points on surface of tetrahedron)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ «Sloane’s A094133 : Leyland primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ «Wolstenholme primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b «Sloane’s A001006 : Motzkin numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A000112 (Number of partially ordered sets (posets) with n unlabeled elements)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ a b «Sloane’s A000108 : Catalan numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ «Sloane’s A000979 : Wagstaff primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ a b Sloane, N. J. A. (ed.). «Sequence A003226 (Automorphic numbers)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2019-04-06.
- ^ «Sloane’s A000058 : Sylvester’s sequence». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ «Sloane’s A005165 : Alternating factorials». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A030984 (2-automorphic numbers)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2021-09-01.
- ^ «Sloane’s A000110 : Bell or exponential numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A000957». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2022-06-01.
- ^ Sloane, N. J. A. (ed.). «Sequence A005727». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ Sloane, N. J. A. (ed.). «Sequence A277288 (Positive integers n such that n)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ «Sloane’s A088165 : NSW primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-17.
- ^ Sloane, N. J. A. (ed.). «Sequence A277288 (Positive integers n such that n)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.
- ^ «First pair of primes (p1, p2) that begin centuries of primes having the same prime configuration, ordered by increasing p2. Each configuration is allowed only once». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2022-07-03.
- ^ Sloane, N. J. A. (ed.). «Sequence A258275 (Smallest number k > n such that the interval k*100 to k*100+99 has exactly the same prime pattern as the interval n*100 to n*100+99)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation.