Как пишется правильно цифра семь - Правописание и грамматика

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Источник

семь

На этой странице мы собрали информацию о том, как пишется число 7 прописью.
Число 7 правильно пишется — семь

С помощью нашего сервиса, Вы сможете узнать как пишется любое число словами. Просто введите число в форму и получите результат.

Посмотрите как пишутся другие чифры прописью 22, 35, 89, 73, 216, 176, 612, 990, 580, 2014, 4641

Источник

Число	Прописью
Число 7 дробное прописью	семь
Число 7 округленное прописью	семь
Число 7 в рублях. с копейками	семь рублей 00 копеек
Число 7 на английском языке	seven
Число 7 на немецком	sieben
Число 7 на итальянском	sette

Источник

Склонение числительных по падежам,
запись целых и дробных чисел словами

Число 7 прописью: семь.

Количественное числительное 7

Падеж	Вопрос	7
Именительный	есть что?	семь рублей
Родительный	нет чего?	семи рублей
Дательный	рад чему?	семи рублям
Винительный	вижу что?	семь рублей
Творительный	оплачу чем?	семью рублями
Предложный	думаю о чём?	о семи рублях

Порядковое числительное 7

Падеж	Вопрос	мужской род	женский род	средний род	мн.число
Именительный	какой?	седьмой	седьмая	седьмое	седьмые
Родительный	какого?	седьмого	седьмой	седьмого	седьмых
Дательный	какому?	седьмому	седьмой	седьмому	седьмым
Винительный	какой?	седьмой	седьмую	седьмое	седьмые
Творительный	каким?	седьмым	седьмой	седьмым	седьмыми
Предложный	о каком?	седьмом	седьмой	седьмом	седьмых

Примечание. В винительном падеже окончание зависит от одушевлённости/неодушевлённости объекта. В мужском роде используется седьмой для неодушевлённых и седьмого для одушевлённых. Во множественном числе используется седьмые для неодушевлённых и седьмых для одушевлённых.

Собирательное числительное семеро

Падеж	Вопрос	7
Именительный	сколько?	семеро
Родительный	нет скольких?	семерых
Дательный	к скольким?	семерым
Винительный	скольких?	семерых
Творительный	сколькими?	семерыми
Предложный	о скольких?	о семерых

Источник

Прописи цифр

Большое значение при обучении письму цифр имеет определение правильного наклона. При письме в клетке наклон определяется отрезком, соединяющим правый верхний угол клетки с серединой её нижней стороны. Прежде чем приступить к объяснинию написания цифры, необходимо показать ребёнку её образец и проанализировать, из каких элементов состоит цифра (палочка, волнистая линия, овал, полуовал). Показ написания цифры должен сопровождаться краткими пояснениями о том, где начинается линия, в каком направлении ведётся, где заканчивается, в каком месте ручка должна быть оторвана от бумаги и какой будет следующая линия. Первые цифры, написанные ребёнком самостоятельно, должны быть просмотрены взрослым, который делает необходимые замечания.

Особенности написания цифр и образцы цифры

Прописная цифра один (1)

Начинают писать маленькую палочку немного выше и правее центра клетки, ведут линию вверх к правому верхнему углу клетки. Затем пишут большую палочку от верхнего правого угла почти до середины нижней стороны клетки.

Прописная цифра два (2)

Начинают писать немного ниже середины верхней стороны клетки. Ведут линию вверх, закругляя в правом верхнем углу клетки. Затем ведут линию вниз к середине нижней стороны клетки. Вдоль нижней стороны клетки. Вдоль нижней стороны клетки пишут волнистую линию, ведя руку к правому нижнему углу клетки.

Прописная цифра три (3)

Начинают писать немного ниже середины верхней стороны клетки. Ведут линию вверх, закругляя в правом верхнем углу клетки. Затем ведут линию вниз, немного не доводят до середины клетки и пишут нижний полуовал.

Прописная цифра четыре (4)

Начинают писать немного правее середины верхней стороны клетки. Ведут прямую линию почти к центру клетки, затем ведут палочку вправо и немного не доводят до правой стороны клетки. Пишут длинную палочку, начиная выше середины правой стороны клетки и доводя её до нижней стороны клетки.

Прописная цифра пять (5)

Начинают писать наклонную палочку немного правее середины верхней стороны клетки и ведут её почти до центра клетки. Затем пишут полуовал. Сверху от палочки пишут вправо волнистую линию.

Прописная цифра шесть (6)

Начинают писать полуовал немного ниже верхнего правого угла клетки, закругляют, касаясь верхней стороны клетки, и ведут руку вниз. Закругляют линию, касаясь нижней стороны клетки и ведут руку вверх. Затем закругляют линию влево немного выше центра клетки.

Прописная цифра семь (7)

Начинают писать волнистую линию немного ниже середины верхней стороны клетки и доводят её до правого верхнего угла клетки. Потом пишут большую палочку, доводя её почти до середины нижней стороны клетки, а затем перечёркивают её маленькой палочкой посередине.

Прописная цифра восемь (8)

Начинают писать немного ниже и правее середины верхней стороны клетки. Ведут линию вверх и вправо, закругляют, касаясь верхней и правой сторон клетки. Затем ведут руку вниз, закругляют линию, касаясь нижней стороны клетки. Далее, закругляясь, линия идёт вверх к начальной точке.

Прописная цифра девять (9)

Начинают писать немного ниже правого верхнего угла клетки. В правом верхнем углу клетки линию закругляют и ведут руку вниз, к центру клетки. Здесь линию вновь закругляют и ведут вверх к началу овала. Затем ведут руку вниз, закругляя у середины нижней стороны клетки.

Прописная цифра ноль (0)

Овал начинают писать немного левее правого верхнего угла клетки. Ведут линию вниз, закругляя на середине нижней стороны клетки. Затем ведут руку вверх к началу овала.

Источник

From Wikipedia, the free encyclopedia

← 6

8 →

−1 0 1 2 3 4 5 6 7 8 9 →

List of numbers
Integers

← 0 10 20 30 40 50 60 70 80 90 →

Cardinal

seven

Ordinal

7th
(seventh)

Numeral system

septenary

Factorization

prime

Prime

4th

Divisors

1, 7

Greek numeral

Ζ´

Roman numeral

VII, vii

Greek prefix

hepta-/hept-

Latin prefix

septua-

Binary

111₂

Ternary

21₃

Senary

11₆

Octal

7₈

Duodecimal

7₁₂

Hexadecimal

7₁₆

Greek numeral

Z, ζ

Amharic

፯

Arabic, Kurdish, Persian

Sindhi, Urdu

Bengali

৭

Chinese numeral

七, 柒

Devanāgarī

७

Telugu

౭

Tamil

௭

Hebrew

Khmer

៧

Thai

๗

Kannada

೭

Malayalam

൭

7 (seven) is the natural number following 6 and preceding 8. It is the only prime number preceding a cube.

As an early prime number in the series of positive integers, the number seven has greatly symbolic associations in religion, mythology, superstition and philosophy. The seven Classical planets resulted in seven being the number of days in a week.^{[citation needed]} It is often considered lucky in Western culture and is often seen as highly symbolic. Unlike Western culture, in Vietnamese culture, the number seven is sometimes considered unlucky.^{[citation needed]}

In English, it is the first natural number whose pronunciation contains more than one syllable.

Evolution of the Arabic digit[edit]

In the beginning, Indians wrote 7 more or less in one stroke as a curve that looks like an uppercase ⟨J⟩ vertically inverted (ᒉ). The western Ghubar Arabs’ main contribution was to make the longer line diagonal rather than straight, though they showed some tendencies to making the digit more rectilinear. The eastern Arabs developed the digit from a form that looked something like our 6 to one that looked like an uppercase V. Both modern Arab forms influenced the European form, a two-stroke form consisting of a horizontal upper stroke joined at its right to a stroke going down to the bottom left corner, a line that is slightly curved in some font variants. As is the case with the European digit, the Cham and Khmer digit for 7 also evolved to look like their digit 1, though in a different way, so they were also concerned with making their 7 more different. For the Khmer this often involved adding a horizontal line to the top of the digit.^[1] This is analogous to the horizontal stroke through the middle that is sometimes used in handwriting in the Western world but which is almost never used in computer fonts. This horizontal stroke is, however, important to distinguish the glyph for seven from the glyph for one in writing that uses a long upstroke in the glyph for 1. In some Greek dialects of the early 12th century the longer line diagonal was drawn in a rather semicircular transverse line.

On the seven-segment displays of pocket calculators and digital watches, 7 is the digit with the most common graphic variation (1, 6 and 9 also have variant glyphs). Most calculators use three line segments, but on Sharp, Casio, and a few other brands of calculators, 7 is written with four line segments because in Japan, Korea and Taiwan 7 is written with a «hook» on the left, as ① in the following illustration.

While the shape of the character for the digit 7 has an ascender in most modern typefaces, in typefaces with text figures the character usually has a descender (⁊), as, for example, in .

Most people in Continental Europe,^[2] and some in Britain and Ireland as well as Latin America, write 7 with a line in the middle («7«), sometimes with the top line crooked. The line through the middle is useful to clearly differentiate the digit from the digit one, as the two can appear similar when written in certain styles of handwriting. This form is used in official handwriting rules for primary school in Russia, Ukraine, Bulgaria, Poland, other Slavic countries,^[3] France,^[4] Italy, Belgium, the Netherlands, Finland,^[5] Romania, Germany, Greece,^[6] and Hungary.^{[citation needed]}

Mathematics[edit]

Seven, the fourth prime number, is not only a Mersenne prime (since 2³ − 1 = 7) but also a double Mersenne prime since the exponent, 3, is itself a Mersenne prime.^[7] It is also a Newman–Shanks–Williams prime,^[8] a Woodall prime,^[9] a factorial prime,^[10] a Harshad number, a lucky prime,^[11] a happy number (happy prime),^[12] a safe prime (the only Mersenne safe prime), a Leyland prime of the second kind and the fourth Heegner number.^[13]

Seven is the lowest natural number that cannot be represented as the sum of the squares of three integers. (See Lagrange’s four-square theorem#Historical development.)

Seven is the aliquot sum of one number, the cubic number 8 and is the base of the 7-aliquot tree.

7 is the only number D for which the equation 2ⁿ − D = x² has more than two solutions for n and x natural. In particular, the equation 2ⁿ − 7 = x² is known as the Ramanujan–Nagell equation.

There are 7 frieze groups in two dimensions, consisting of symmetries of the plane whose group of translations is isomorphic to the group of integers.^[14] These are related to the 17 wallpaper groups whose transformations and isometries repeat two-dimensional patterns in the plane.^[15]^[16] The seventh indexed prime number is seventeen.^[17]

A seven-sided shape is a heptagon.^[18] The regular n-gons for n ⩽ 6 can be constructed by compass and straightedge alone, which makes the heptagon the first regular polygon that cannot be directly constructed with these simple tools.^[19] Figurate numbers representing heptagons are called heptagonal numbers.^[20] 7 is also a centered hexagonal number.^[21]

A heptagon in Euclidean space is unable to generate uniform tilings alongside other polygons, like the regular pentagon. However, it is one of fourteen polygons that can fill a plane-vertex tiling, in its case only alongside a regular triangle and a 42-sided polygon (3.7.42).^[22]^[23] This is also one of twenty-one such configurations from seventeen combinations of polygons, that features the largest and smallest polygons possible.^[24]^[25]

Wythoff’s kaleidoscopic constructions use seven distinct generator points that lie on mirror edges of a three-sided Schwarz triangle to create most uniform tilings and polyhedra; an eighth point lying on all three mirrors is technically degenerate, reserved to represent snub forms only.^[26]

Seven of eight semiregular tilings are Wythoffian, the only exception is the elongated triangular tiling.^[27] Seven of nine uniform colorings of the square tiling are also Wythoffian, and between the triangular tiling and square tiling, there are seven non-Wythoffian uniform colorings of a total twenty-one that belong to regular tilings (all hexagonal tiling uniform colorings are Wythoffian).^[28]

In two dimensions, there are precisely seven 7-uniform Krotenheerdt tilings, with no other such k-uniform tilings for k > 7, and it is also the only k for which the count of Krotenheerdt tilings agrees with k.^[29]^[30]

The Fano plane is the smallest possible finite projective plane with 7 points and 7 lines such that every line contains 3 points and 3 lines cross every point.^[31] With group order 168 = 2³·3·7, this plane holds 35 total triples of points where 7 are collinear and another 28 are non-collinear, whose incidence graph is the 3-regular bipartate Heawood graph with 14 vertices and 21 edges.^[32] This graph embeds in three dimensions as the Szilassi polyhedron, the simplest toroidal polyhedron alongside its dual with 7 vertices, the Császár polyhedron.^[33]^[34]

In three-dimensional space there are seven crystal systems and fourteen Bravais lattices which classify under seven lattice systems, six of which are shared with the seven crystal systems.^[35]^[36]^[37] There are also collectively seventy-seven Wythoff symbols that represent all uniform figures in three dimensions.^[38]

Graph of the probability distribution of the sum of two six-sided dice

The seventh dimension is the only dimension aside from the familiar three where a vector cross product can be defined.^[39] This is related to the octonions over the imaginary subspace Im(O) in 7-space whose commutator between two octonions defines this vector product, wherein the Fano plane describes the multiplicative algebraic structure of the unit octonions {e₀, e₁, e₂, …, e₇}, with e₀ an identity element.^[40]

Also, the lowest known dimension for an exotic sphere is the seventh dimension, with a total of 28 differentiable structures; there may exist exotic smooth structures on the four-dimensional sphere.^[41]^[42]

In hyperbolic space, 7 is the highest dimension for non-simplex hypercompact Vinberg polytopes of rank n + 4 mirrors, where there is one unique figure with eleven facets.^[43] On the other hand, such figures with rank n + 3 mirrors exist in dimensions 4, 5, 6 and 8; not in 7.^[44] Hypercompact polytopes with lowest possible rank of n + 2 mirrors exist up through the 17th dimension, where there is a single solution as well.^[45]

There are seven fundamental types of catastrophes.^[46]

When rolling two standard six-sided dice, seven has a 6 in 6² (or 1/6) probability of being rolled (1–6, 6–1, 2–5, 5–2, 3–4, or 4–3), the greatest of any number.^[47] The opposite sides of a standard six-sided dice always add to 7.

The Millennium Prize Problems are seven problems in mathematics that were stated by the Clay Mathematics Institute in 2000.^[48] Currently, six of the problems remain unsolved.^[49]

Basic calculations[edit]

Multiplication	1	2	3	4	5	6	7	8	9	10	11	12	13	14	15	16	17	18	19	20	21	22	23	24	25	50	100	1000
7 × x	7	14	21	28	35	42	49	56	63	70	77	84	91	98	105	112	119	126	133	140	147	154	161	168	175	350	700	7000

Division	1	2	3	4	5	6	7	8	9	10	11	12	13	14	15
7 ÷ x	7	3.5	2.3	1.75	1.4	1.16	1	0.875	0.7	0.7	0.63	0.583	0.538461	0.5	0.46
x ÷ 7	0.142857	0.285714	0.428571	0.571428	0.714285	0.857142	1.142857	1.285714	1.428571	1.571428	1.714285	1.857142	2	2.142857

Exponentiation	1	2	3	4	5	6	7	8	9	10	11	12	13
7^x	7	49	343	2401	16807	117649	823543	5764801	40353607	282475249	1977326743	13841287201	96889010407
x⁷	1	128	2187	16384	78125	279936	823543	2097152	4782969	10000000	19487171	35831808	62748517

Radix	1	5	10	15	20	25	50	75	100	125	150	200	250	500	1000	10000	100000	1000000
x₇	1	5	13₇	21₇	26₇	34₇	101₇	135₇	202₇	236₇	303₇	404₇	505₇	1313₇	2626₇	41104₇	564355₇	11333311₇

In decimal[edit]

999,999 divided by 7 is exactly 142,857. Therefore, when a vulgar fraction with 7 in the denominator is converted to a decimal expansion, the result has the same six-digit repeating sequence after the decimal point, but the sequence can start with any of those six digits.^[50] For example, 1/7 = 0.142857 142857… and 2/7 = 0.285714 285714….

In fact, if one sorts the digits in the number 142,857 in ascending order, 124578, it is possible to know from which of the digits the decimal part of the number is going to begin with. The remainder of dividing any number by 7 will give the position in the sequence 124578 that the decimal part of the resulting number will start. For example, 628 ÷ 7 = 89+5/7; here 5 is the remainder, and would correspond to number 7 in the ranking of the ascending sequence. So in this case, 628 ÷ 7 = 89.714285. Another example, 5238 ÷ 7 = 748+2/7, hence the remainder is 2, and this corresponds to number 2 in the sequence. In this case, 5238 ÷ 7 = 748.285714.

In science[edit]

Seven colors in a rainbow: ROYGBIV
Seven Continents
Seven Seas
Seven climes
The neutral pH balance
Number of music notes in a scale
Number of spots most commonly found on ladybugs
Atomic number for nitrogen

In psychology[edit]

Seven, plus or minus two as a model of working memory.
Seven psychological types called the Seven Rays in the teachings of Alice A. Bailey
In Western culture, Seven is consistently listed as people’s favorite number.^[51]^[52]
When guessing numbers 1-10 the number 7 is most likely to be picked.^[53]
Seven-year itch: happiness in marriage said to decline after 7 years

Classical antiquity[edit]

The Pythagoreans invested particular numbers with unique spiritual properties. The number seven was considered to be particularly interesting because it consisted of the union of the physical (number 4) with the spiritual (number 3).^[54] In Pythagorean numerology the number 7 means spirituality.

References from classical antiquity to the number seven include:

Seven Classical planets and the derivative Seven Heavens
Seven Wonders of the Ancient World
Seven metals of antiquity
Seven days in the week
Seven Seas
Seven Sages
Seven champions that fought Thebes
Seven hills of Rome and Seven Kings of Rome
Seven Sisters, the daughters of Atlas also known as the Pleiades

Religion and mythology[edit]

Judaism[edit]

The number seven forms a widespread typological pattern within Hebrew scripture, including:

Seven days (more precisely yom) of Creation, leading to the seventh day or Sabbath (Genesis 1)
Seven-fold vengeance visited on upon Cain for the killing of Abel (Genesis 4:15)
Seven pairs of every clean animal loaded onto the ark by Noah (Genesis 7:2)
Seven years of plenty and seven years of famine in Pharaoh’s dream (Genesis 41)
Seventh son of Jacob, Gad, whose name means good luck (Genesis 46:16)
Seven times bullock’s blood is sprinkled before God (Leviticus 4:6)
Seven nations God told the Israelites they would displace when they entered the land of Israel (Deuteronomy 7:1)
Seven days of the Passover feast (Exodus 13:3–10)
Seven-branched candelabrum or Menorah (Exodus 25)
Seven trumpets played by seven priests for seven days to bring down the walls of Jericho (Joshua 6:8)
Seven things that are detestable to God (Proverbs 6:16–19)
Seven Pillars of the House of Wisdom (Proverbs 9:1)
Seven archangels in the deuterocanonical Book of Tobit (12:15)

References to the number seven in Jewish knowledge and practice include:

Seven divisions of the weekly readings or aliyah of the Torah
Seven Jewish men (over the age of 13) called to read aliyahs in Shabbat morning services
Seven blessings recited under the chuppah during a Jewish wedding ceremony
Seven days of festive meals for a Jewish bride and groom after their wedding, known as Sheva Berachot or Seven Blessings
Seven Ushpizzin prayers to the Jewish patriarchs during the holiday of Sukkot

Christianity[edit]

Following the traditional of the Hebrew Bible, the New Testament likewise uses the number seven as part of a typological pattern:

Seven loaves multiplied into seven basketfuls of surplus (Matthew 15:32–37)
Seven demons were driven out of Mary Magdalene (Luke 8:2)
Seven last sayings of Jesus on the cross
Seven men of honest report, full of the Holy Ghost and wisdom (Acts 6:3)
Seven Spirits of God, Seven Churches and Seven Seals in the Book of Revelation

References to the number seven in Christian knowledge and practice include:

Seven Gifts of the Holy Spirit
Seven Corporal Acts of Mercy and Seven Spiritual Acts of Mercy
Seven deadly sins: lust, gluttony, greed, sloth, wrath, envy, and pride, and seven terraces of Mount Purgatory
Seven Virtues: chastity, temperance, charity, diligence, kindness, patience, and humility
Seven Joys and Seven Sorrows of the Virgin Mary
Seven Sleepers of Christian myth
Seven Sacraments in the Catholic Church (though some traditions assign a different number)

Islam[edit]

References to the number seven in Islamic knowledge and practice include:

Seven ayat in surat al-Fatiha, the first book of the holy Qur’an
Seven circumambulations of Muslim pilgrims around the Kaaba in Mecca during the Hajj and the Umrah
Seven walks between Al-Safa and Al-Marwah performed Muslim pilgrims during the Hajj and the Umrah
Seven doors to hell (for heaven the number of doors is eight)
Seven Earths and seven Heavens (plural of sky) mentioned in Qur’an (S. 65:12)
Night Journey to the Seventh Heaven, (reported ascension to heaven to meet God) Isra’ and Mi’raj of the Qur’an and surah Al-Isra’.
Seventh day naming ceremony held for babies
Seven enunciators of divine revelation (nāṭiqs) according to the celebrated Fatimid Ismaili dignitary Nasir Khusraw^[55]
Circle Seven Koran, the holy scripture of the Moorish Science Temple of America

Hinduism[edit]

References to the number seven in Hindu knowledge and practice include:

Seven worlds in the universe and seven seas in the world in Hindu cosmology
Seven sages or Saptarishi and their seven wives or Sapta Matrka in Hindu mythology
Seven Chakras in eastern philosophy
Seven stars in a constellation called «Saptharishi Mandalam» in Indian astronomy
Seven promises, or Saptapadi, and seven circumambulations around a fire at Hindu weddings
Seven virgin goddesses or Saptha Kannimar worshipped in temples in Tamil Nadu, India^[56]^[57]
Seven hills at Tirumala known as Yedu Kondalavadu in Telugu, or ezhu malaiyan in Tamil, meaning «Sevenhills God»
Seven steps taken by the Buddha at birth
Seven divine ancestresses of humankind in Khasi mythology
Seven octets or Saptak Swaras in Indian Music as the basis for Ragas compositions
Seven Social Sins listed by Mahatma Gandhi

Eastern tradition[edit]

Other references to the number seven in Eastern traditions include:

Seven Lucky Gods or gods of good fortune in Japanese mythology
Seven-Branched Sword in Japanese mythology
Seven Sages of the Bamboo Grove in China
Seven minor symbols of yang in Taoist yin-yang

Other references[edit]

Other references to the number seven in traditions from around the world include:

Seven palms in an Egyptian Sacred Cubit
Seven ranks in Mithraism
Seven hills of Istanbul
Seven islands of Atlantis
Seven Cherokee clans
Seven lives of cats in Iran and German and Romance language-speaking cultures^[58]
Seven fingers on each hand, seven toes on each foot and seven pupils in each eye of the Irish epic hero Cúchulainn
Seventh sons will be werewolves in Galician folklore, or the son of a woman and a werewolf in other European folklores
Seventh sons of a seventh son will be magicians with special powers of healing and clairvoyance in some cultures, or vampires in others
Seven prominent legendary monsters in Guaraní mythology
Seven gateways traversed by Inanna during her descent into the underworld
Seven Wise Masters, a cycle of medieval stories
Seven sister goddesses or fates in Baltic mythology called the Deivės Valdytojos.^[59]
Seven legendary Cities of Gold, such as Cibola, that the Spanish thought existed in South America
Seven years spent by Thomas the Rhymer in the faerie kingdom in the eponymous British folk tale
Seven-year cycle in which the Queen of the Fairies pays a tithe to Hell (or possibly Hel) in the tale of Tam Lin
Seven Valleys, a text by the Prophet-Founder Bahá’u’lláh in the Bahá’í faith
Seven superuniverses in the cosmology of Urantia^[60]
Seven psychological types called the Seven Rays in the teachings of Alice A. Bailey
Seven, the sacred number of Yemaya^[61]

In culture[edit]

In literature[edit]

Seven Dwarfs
The Seven Brothers, a 1870 novel by Aleksis Kivi
Seven features prominently in A Song of Ice and Fire by George R. R. Martin, namely, the Seven Kingdoms and the Faith of the Seven

In visual art[edit]

The Group of Seven Canadian landscape painters

In sports[edit]

Sports with seven players per side
- Kabaddi
- Rugby sevens
- Water Polo
- Netball
- Handball
- Flag Football
- Ultimate Frisbee
Seven is the least number of players a soccer team must have on the field in order for a match to start and continue.
A touchdown plus an extra point is worth seven points.

Notes[edit]

^ Georges Ifrah, The Universal History of Numbers: From Prehistory to the Invention of the Computer transl. David Bellos et al. London: The Harvill Press (1998): 395, Fig. 24.67
^ Eeva Törmänen (September 8, 2011). «Aamulehti: Opetushallitus harkitsee numero 7 viivan palauttamista». Tekniikka & Talous (in Finnish). Archived from the original on September 17, 2011. Retrieved September 9, 2011.
^ «Education writing numerals in grade 1.» Archived 2008-10-02 at the Wayback Machine(Russian)
^ «Example of teaching materials for pre-schoolers»(French)
^ Elli Harju (August 6, 2015). ««Nenosen seiska» teki paluun: Tiesitkö, mistä poikkiviiva on peräisin?». Iltalehti (in Finnish).
^ «Μαθηματικά Α’ Δημοτικού» [Mathematics for the First Grade] (PDF) (in Greek). Ministry of Education, Research, and Religions. p. 33. Retrieved May 7, 2018.
^ Weisstein, Eric W. «Double Mersenne Number». mathworld.wolfram.com. Retrieved 2020-08-06.
^ «Sloane’s A088165 : NSW primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-01.
^ «Sloane’s A050918 : Woodall primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-01.
^ «Sloane’s A088054 : Factorial primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-01.
^ «Sloane’s A031157 : Numbers that are both lucky and prime». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-01.
^ «Sloane’s A035497 : Happy primes». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-01.
^ «Sloane’s A003173 : Heegner numbers». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-01.
^ Heyden, Anders; Sparr, Gunnar; Nielsen, Mads; Johansen, Peter (2003-08-02). Computer Vision — ECCV 2002: 7th European Conference on Computer Vision, Copenhagen, Denmark, May 28-31, 2002. Proceedings. Part II. Springer. p. 661. ISBN 978-3-540-47967-3. A frieze pattern can be classified into one of the 7 frieze groups…
^ Grünbaum, Branko; Shephard, G. C. (1987). «Section 1.4 Symmetry Groups of Tilings». Tilings and Patterns. New York: W. H. Freeman and Company. pp. 40–45. doi:10.2307/2323457. ISBN 0-7167-1193-1. JSTOR 2323457. OCLC 13092426. S2CID 119730123.
^ Sloane, N. J. A. (ed.). «Sequence A004029 (Number of n-dimensional space groups.)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2023-01-30.
^ Sloane, N. J. A. (ed.). «Sequence A000040 (The prime numbers)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2023-02-01.
^ Weisstein, Eric W. «Heptagon». mathworld.wolfram.com. Retrieved 2020-08-25.
^ Weisstein, Eric W. «7». mathworld.wolfram.com. Retrieved 2020-08-07.
^ Sloane, N. J. A. (ed.). «Sequence A000566 (Heptagonal numbers (or 7-gonal numbers))». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2023-01-09.
^ Sloane, N. J. A. (ed.). «Sequence A003215». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-01.
^ Grünbaum, Branko; Shepard, Geoffrey (November 1977). «Tilings by Regular Polygons» (PDF). Mathematics Magazine. Taylor & Francis, Ltd. 50 (5): 231. doi:10.2307/2689529. JSTOR 2689529. S2CID 123776612. Zbl 0385.51006.
^ Jardine, Kevin. «Shield — a 3.7.42 tiling». Imperfect Congruence. Retrieved 2023-01-09. 3.7.42 as a unit facet in an irregular tiling.
^ Grünbaum, Branko; Shepard, Geoffrey (November 1977). «Tilings by Regular Polygons» (PDF). Mathematics Magazine. Taylor & Francis, Ltd. 50 (5): 229-230. doi:10.2307/2689529. JSTOR 2689529. S2CID 123776612. Zbl 0385.51006.
^ Dallas, Elmslie William (1855). «Part II. (VII): Of the Circle, with its Inscribed and Circumscribed Figures − Equal Division and the Construction of Polygons». The Elements of Plane Practical Geometry. London: John W. Parker & Son, West Strand. p. 134.

«…It will thus be found that, including the employment of the same figures, there are seventeen different combinations of regular polygons by which this may be effected; namely, —

When three polygons are employed , there are ten ways; viz., 6,6,6 – 3.7.42 — 3,8,24 – 3,9,18 — 3,10,15 — 3,12,12 — 4,5,20 — 4,6,12 — 4,8,8 — 5,5,10.

With four polygons there are four ways, viz., 4,4,4,4 — 3,3,4,12 — 3,3,6,6 — 3,4,4,6.

With five polygons there are two ways, viz., 3,3,3,4,4 — 3,3,3,3,6.

With six polygons one way — all equilateral triangles [ 3.3.3.3.3.3 ].»

Note: the only four other configurations from the same combinations of polygons are: 3.4.3.12, (3.6)², 3.4.6.4, and 3.3.4.3.4.
^ Coxeter, H. S. M. (1999). «Chapter 3: Wythoff’s Construction for Uniform Polytopes». The Beauty of Geometry: Twelve Essays. Mineola, NY: Dover Publications. pp. 326–339. ISBN 9780486409191. OCLC 41565220. S2CID 227201939. Zbl 0941.51001.
^ Grünbaum, Branko; Shephard, G. C. (1987). «Section 2.1: Regular and uniform tilings». Tilings and Patterns. New York: W. H. Freeman and Company. pp. 62–64. doi:10.2307/2323457. ISBN 0-7167-1193-1. JSTOR 2323457. OCLC 13092426. S2CID 119730123.
^ Grünbaum, Branko; Shephard, G. C. (1987). «Section 2.9 Archimedean and uniform colorings». Tilings and Patterns. New York: W. H. Freeman and Company. pp. 102–107. doi:10.2307/2323457. ISBN 0-7167-1193-1. JSTOR 2323457. OCLC 13092426. S2CID 119730123.
^ Sloane, N. J. A. (ed.). «Sequence A068600 (Number of n-uniform tilings having n different arrangements of polygons about their vertices.)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2023-01-09.
^ Grünbaum, Branko; Shepard, Geoffrey (November 1977). «Tilings by Regular Polygons» (PDF). Mathematics Magazine. Taylor & Francis, Ltd. 50 (5): 236. doi:10.2307/2689529. JSTOR 2689529. S2CID 123776612. Zbl 0385.51006.
^ Pisanski, Tomaž; Servatius, Brigitte (2013). «Section 1.1: Hexagrammum Mysticum». Configurations from a Graphical Viewpoint. Birkhäuser Advanced Texts (1 ed.). Boston, MA: Birkhäuser. pp. 5–6. doi:10.1007/978-0-8176-8364-1. ISBN 978-0-8176-8363-4. OCLC 811773514. Zbl 1277.05001.
^ Pisanski, Tomaž; Servatius, Brigitte (2013). «Chapter 5.3: Classical Configurations». Configurations from a Graphical Viewpoint. Birkhäuser Advanced Texts (1 ed.). Boston, MA: Birkhäuser. pp. 170–173. doi:10.1007/978-0-8176-8364-1. ISBN 978-0-8176-8363-4. OCLC 811773514. Zbl 1277.05001.
^ Szilassi, Lajos (1986). «Regular toroids» (PDF). Structural Topology. 13: 74. Zbl 0605.52002.
^ Császár, Ákos (1949). «A polyhedron without diagonals» (PDF). Acta Scientiarum Mathematicarum (Szeged). 13: 140–142. Archived from the original (PDF) on 2017-09-18.
^ Sloane, N. J. A. (ed.). «Sequence A004031 (Number of n-dimensional crystal systems.)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2023-01-30.
^ Wang, Gwo-Ching; Lu, Toh-Ming (2014). «Chapter 2: Crystal Lattices and Reciprocal Lattices». RHEED Transmission Mode and Pole Figures (1 ed.). New York: Springer Publishing. pp. 8–9. doi:10.1007/978-1-4614-9287-0_2. ISBN 978-1-4614-9286-3. S2CID 124399480.
^ Sloane, N. J. A. (ed.). «Sequence A256413 (Number of n-dimensional Bravais lattices)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2023-01-30.
^ Messer, Peter W. (2002). «Closed-Form Expressions for Uniform Polyhedra and Their Duals» (PDF). Discrete & Computational Geometry. Springer. 27 (3): 353–355, 372–373. doi:10.1007/s00454-001-0078-2. MR 1921559. S2CID 206996937. Zbl 1003.52006.
^ Massey, William S. (December 1983). «Cross products of vectors in higher dimensional Euclidean spaces» (PDF). The American Mathematical Monthly. Taylor & Francis, Ltd. 90 (10): 697. doi:10.2307/2323537. JSTOR 2323537. S2CID 43318100. Zbl 0532.55011.
^ Baez, John C. (2002). «The Octonions». Bulletin of the American Mathematical Society. American Mathematical Society. 39 (2): 152–153. doi:10.1090/S0273-0979-01-00934-X. MR 1886087. S2CID 586512.
^ Behrens, M.; Hill, M.; Hopkins, M. J.; Mahowald, M. (2020). «Detecting exotic spheres in low dimensions using coker J». Journal of the London Mathematical Society. London Mathematical Society. 101 (3): 1173. arXiv:1708.06854. doi:10.1112/jlms.12301. MR 4111938. Zbl 1460.55017.
^ Sloane, N. J. A. (ed.). «Sequence A001676 (Number of h-cobordism classes of smooth homotopy n-spheres.)». The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2023-02-23.
^ Tumarkin, Pavel; Felikson, Anna (2008). «On d-dimensional compact hyperbolic Coxeter polytopes with d + 4 facets» (PDF). Transactions of the Moscow Mathematical Society. Providence, R.I.: American Mathematical Society (Translation). 69: 105–151. doi:10.1090/S0077-1554-08-00172-6. MR 2549446. S2CID 37141102. Zbl 1208.52012.
^ Tumarkin, Pavel (2007). «Compact hyperbolic Coxeter n-polytopes with n + 3 facets». The Electronic Journal of Combinatorics. 14 (1): 1-36 (R69). doi:10.37236/987. MR 2350459. S2CID 221033082. Zbl 1168.51311.
^ Tumarkin, P. V. (2004). «Hyperbolic Coxeter N-Polytopes with n+2 Facets». Mathematical Notes. 75 (6): 848–854. arXiv:math/0301133. doi:10.1023/b:matn.0000030993.74338.dd. MR 2086616. S2CID 15156852. Zbl 1062.52012.
^ Antoni, F. de; Lauro, N.; Rizzi, A. (2012-12-06). COMPSTAT: Proceedings in Computational Statistics, 7th Symposium held in Rome 1986. Springer Science & Business Media. p. 13. ISBN 978-3-642-46890-2. …every catastrophe can be composed from the set of so called elementary catastrophes, which are of seven fundamental types.
^ Weisstein, Eric W. «Dice». mathworld.wolfram.com. Retrieved 2020-08-25.
^ «Millennium Problems | Clay Mathematics Institute». www.claymath.org. Retrieved 2020-08-25.
^ «Poincaré Conjecture | Clay Mathematics Institute». 2013-12-15. Archived from the original on 2013-12-15. Retrieved 2020-08-25.
^ Bryan Bunch, The Kingdom of Infinite Number. New York: W. H. Freeman & Company (2000): 82
^ Gonzalez, Robbie (4 December 2014). «Why Do People Love The Number Seven?». Gizmodo. Retrieved 20 February 2022.
^ Bellos, Alex. «The World’s Most Popular Numbers [Excerpt]». Scientific American. Retrieved 20 February 2022.
^ Kubovy, Michael; Psotka, Joseph (May 1976). «The predominance of seven and the apparent spontaneity of numerical choices». Journal of Experimental Psychology: Human Perception and Performance. 2 (2): 291–294. doi:10.1037/0096-1523.2.2.291. Retrieved 20 February 2022.
^ «Number symbolism — 7».
^ «Nāṣir-i Khusraw», An Anthology of Philosophy in Persia, I.B.Tauris, 2001, doi:10.5040/9780755610068.ch-008, ISBN 978-1-84511-542-5, retrieved 2020-11-17
^ Rajarajan, R.K.K. (2020). «Peerless Manifestations of Devī». Carcow Indological Studies (Cracow, Poland). XXII.1: 221–243. doi:10.12797/CIS.22.2020.01.09. S2CID 226326183.
^ Rajarajan, R.K.K. (2020). «Sempiternal «Pattiṉi»: Archaic Goddess of the vēṅkai-tree to Avant-garde Acaṉāmpikai». Studia Orientalia Electronica (Helsinki, Finland). 8 (1): 120–144. doi:10.23993/store.84803. S2CID 226373749.
^ «Encyclopædia Britannica «Number Symbolism»«. Britannica.com. Retrieved 2012-09-07.
^ Klimka, Libertas (2012-03-01). «Senosios baltų mitologijos ir religijos likimas». Lituanistica. 58 (1). doi:10.6001/lituanistica.v58i1.2293. ISSN 0235-716X.
^ «Chapter I. The Creative Thesis of Perfection by William S. Sadler, Jr. — Urantia Book — Urantia Foundation». urantia.org. 17 August 2011.
^ Yemaya. Santeria Church of the Orishas. Retrieved 25 November 2022

References[edit]

Wells, D. The Penguin Dictionary of Curious and Interesting Numbers London: Penguin Group (1987): 70–71

Источник

From Wikipedia, the free encyclopedia

← 6

8 →

−1 0 1 2 3 4 5 6 7 8 9 →

List of numbers
Integers

← 0 10 20 30 40 50 60 70 80 90 →

Cardinal

seven

Ordinal

7th
(seventh)

Numeral system

septenary

Factorization

prime

Prime

4th

Divisors

1, 7

Greek numeral

Ζ´

Roman numeral

VII, vii

Greek prefix

hepta-/hept-

Latin prefix

septua-

Binary

111₂

Ternary

21₃

Senary

11₆

Octal

7₈

Duodecimal

7₁₂

Hexadecimal

7₁₆

Greek numeral

Z, ζ

Amharic

፯

Arabic, Kurdish, Persian

Sindhi, Urdu

Bengali

৭

Chinese numeral

七, 柒

Devanāgarī

७

Telugu

౭

Tamil

௭

Hebrew

Khmer

៧

Thai

๗

Kannada

೭

Malayalam

൭

7 (seven) is the natural number following 6 and preceding 8. It is the only prime number preceding a cube.

In English, it is the first natural number whose pronunciation contains more than one syllable.

Evolution of the Arabic digit[edit]

While the shape of the character for the digit 7 has an ascender in most modern typefaces, in typefaces with text figures the character usually has a descender (⁊), as, for example, in .

Mathematics[edit]

Seven is the lowest natural number that cannot be represented as the sum of the squares of three integers. (See Lagrange’s four-square theorem#Historical development.)

Seven is the aliquot sum of one number, the cubic number 8 and is the base of the 7-aliquot tree.

7 is the only number D for which the equation 2ⁿ − D = x² has more than two solutions for n and x natural. In particular, the equation 2ⁿ − 7 = x² is known as the Ramanujan–Nagell equation.

There are 7 frieze groups in two dimensions, consisting of symmetries of the plane whose group of translations is isomorphic to the group of integers.^[14] These are related to the 17 wallpaper groups whose transformations and isometries repeat two-dimensional patterns in the plane.^[15]^[16] The seventh indexed prime number is seventeen.^[17]

A seven-sided shape is a heptagon.^[18] The regular n-gons for n ⩽ 6 can be constructed by compass and straightedge alone, which makes the heptagon the first regular polygon that cannot be directly constructed with these simple tools.^[19] Figurate numbers representing heptagons are called heptagonal numbers.^[20] 7 is also a centered hexagonal number.^[21]

Wythoff’s kaleidoscopic constructions use seven distinct generator points that lie on mirror edges of a three-sided Schwarz triangle to create most uniform tilings and polyhedra; an eighth point lying on all three mirrors is technically degenerate, reserved to represent snub forms only.^[26]

The Fano plane is the smallest possible finite projective plane with 7 points and 7 lines such that every line contains 3 points and 3 lines cross every point.^[31] With group order 168 = 2³·3·7, this plane holds 35 total triples of points where 7 are collinear and another 28 are non-collinear, whose incidence graph is the 3-regular bipartate Heawood graph with 14 vertices and 21 edges.^[32] This graph embeds in three dimensions as the Szilassi polyhedron, the simplest toroidal polyhedron alongside its dual with 7 vertices, the Császár polyhedron.^[33]^[34]

In three-dimensional space there are seven crystal systems and fourteen Bravais lattices which classify under seven lattice systems, six of which are shared with the seven crystal systems.^[35]^[36]^[37] There are also collectively seventy-seven Wythoff symbols that represent all uniform figures in three dimensions.^[38]

Graph of the probability distribution of the sum of two six-sided dice

The seventh dimension is the only dimension aside from the familiar three where a vector cross product can be defined.^[39] This is related to the octonions over the imaginary subspace Im(O) in 7-space whose commutator between two octonions defines this vector product, wherein the Fano plane describes the multiplicative algebraic structure of the unit octonions {e₀, e₁, e₂, …, e₇}, with e₀ an identity element.^[40]

There are seven fundamental types of catastrophes.^[46]

When rolling two standard six-sided dice, seven has a 6 in 6² (or 1/6) probability of being rolled (1–6, 6–1, 2–5, 5–2, 3–4, or 4–3), the greatest of any number.^[47] The opposite sides of a standard six-sided dice always add to 7.

The Millennium Prize Problems are seven problems in mathematics that were stated by the Clay Mathematics Institute in 2000.^[48] Currently, six of the problems remain unsolved.^[49]