153 (one hundred ndfifty-three) is the

natural number In mathematics, the natural numbers are those numbers used for counting (as in "there are ''six'' coins on the table") and ordering (as in "this is the ''third'' largest city in the country"). Numbers used for counting are called ''Cardinal n ...

following

152 Year 152 ( CLII) was a leap year starting on Friday (link will display the full calendar) of the Julian calendar. At the time, it was known as the Year of the Consulship of Glabrio and Homullus (or, less frequently, year 905 ''Ab urbe condita'' ...

and preceding

154 Year 154 ( CLIV) was a common year starting on Monday (link will display the full calendar) of the Julian calendar. At the time, it was known as the Year of the Consulship of Aurelius and Lateranus (or, less frequently, year 907 ''Ab urbe cond ...

In mathematics

The number 153 is associated with the geometric shape known as the

Vesica Piscis The vesica piscis is a type of lens, a mathematical shape formed by the intersection of two disks with the same radius, intersecting in such a way that the center of each disk lies on the perimeter of the other. In Latin, "vesica piscis" literal ...

or Mandorla.

Archimedes Archimedes of Syracuse (;; ) was a Greek mathematician, physicist, engineer, astronomer, and inventor from the ancient city of Syracuse in Sicily. Although few details of his life are known, he is regarded as one of the leading scientists ...

, in his ''

Measurement of a Circle ''Measurement of a Circle'' or ''Dimension of the Circle'' (Greek: , ''Kuklou metrēsis'') is a treatise that consists of three propositions by Archimedes, ca. 250 BCE. The treatise is only a fraction of what was a longer work. Propositions Prop ...

'', referred to this ratio (153/265), as constituting the "measure of the fish", this ratio being an imperfect representation of 1/. As a

triangular number A triangular number or triangle number counts objects arranged in an equilateral triangle. Triangular numbers are a type of figurate number, other examples being square numbers and cube numbers. The th triangular number is the number of dots in ...

, 153 is the sum of the first 17 integers, and is also the sum of the first five positive

factorial In mathematics, the factorial of a non-negative denoted is the product of all positive integers less than or equal The factorial also equals the product of n with the next smaller factorial: \begin n! &= n \times (n-1) \times (n-2) \t ...

1!+2!+3!+4!+5!

.Wells, D. ''

The Penguin Dictionary of Curious and Interesting Numbers ''The Penguin Dictionary of Curious and Interesting Numbers'' is a reference book for recreational mathematics and elementary number theory written by David Wells. The first edition was published in paperback by Penguin Books in 1986 in the UK, a ...

'' London: Penguin Group. (1987): 140–141. The number 153 is also a

hexagonal number A hexagonal number is a figurate number. The ''n''th hexagonal number ''h'n'' is the number of ''distinct'' dots in a pattern of dots consisting of the ''outlines'' of regular hexagons with sides up to n dots, when the hexagons are overlaid so ...

, and a truncated triangle number, meaning that 1, 15, and 153 are all triangle numbers. The distinct prime factors of 153 add up to 20, and so do the ones of 154, hence the two form a Ruth-Aaron pair. Since

153 = 1^3 + 5^3 + 3^3

, it is a 3-

narcissistic number In number theory, a narcissistic number 1 F_ : \mathbb \rightarrow \mathbb to be the following: : F_(n) = \sum_^ d_i^k. where k = \lfloor \log_ \rfloor + 1 is the number of digits in the number in base b, and : d_i = \frac is the value of each d ...

, and it is also the smallest three-digit number which can be expressed as the sum of cubes of its digits. Only five other numbers can be expressed as the sum of the cubes of their digits: 0, 1, 370, 371 and 407. It is also a

Friedman number A Friedman number is an integer, which represented in a given numeral system, is the result of a non-trivial expression using all its own digits in combination with any of the four basic arithmetic operators (+, −, ×, ÷), additive inverses, p ...

, since 153 = 3 × 51. The

Biggs–Smith graph In the mathematical field of graph theory, the Biggs–Smith graph is a 3-regular graph with 102 vertices and 153 edges. It has chromatic number 3, chromatic index 3, radius 7, diameter 7 and girth 9. It is also a 3- vertex-connected graph a ...

is a

symmetric graph In the mathematical field of graph theory, a graph is symmetric (or arc-transitive) if, given any two pairs of adjacent vertices and of , there is an automorphism :f : V(G) \rightarrow V(G) such that :f(u_1) = u_2 and f(v_1) = v_2. In oth ...

with 153 edges, all equivalent. Another feature of the number 153 is that it is the limit of the following algorithm:Catch of the Day (153 Fishes) at mathpages.com
# Take a random positive

integer An integer is the number zero (), a positive natural number (, , , etc.) or a negative integer with a minus sign (−1, −2, −3, etc.). The negative numbers are the additive inverses of the corresponding positive numbers. In the language ...

, divisible by

three 3 is a number, numeral, and glyph. 3, three, or III may also refer to: * AD 3, the third year of the AD era * 3 BC, the third year before the AD era * March, the third month Books * '' Three of Them'' (Russian: ', literally, "three"), a 1901 ...

# Split that number into its base 10 digits # Take the sum of their cubes # Go back to the second step An example, starting with the number 84:

\begin
8^3 + 4^3 &=& 512 + 64 &=& 576\\
5^3 + 7^3 + 6^3 &=& 125 + 343 + 216 &=& 684\\
6^3 + 8^3 + 4^3 &=& 216 + 512 + 64  &=& 792\\
7^3 + 9^3 + 2^3 &=& 343 + 729 + 8  &=& 1080\\
1^3 + 0^3 + 8^3 + 0^3  &=& 1 + 0 + 512 + 0  &=& 513\\
5^3 + 1^3 + 3^3 &=& 125 + 1 + 27  &=& 153\\
1^3 + 5^3 + 3^3 &=& 1 + 125 + 27  &=& 153
\end

In the Bible

The

Gospel of John The Gospel of John ( grc, Εὐαγγέλιον κατὰ Ἰωάννην, translit=Euangélion katà Iōánnēn) is the fourth of the four canonical gospels. It contains a highly schematic account of the ministry of Jesus, with seven "sig ...

( chapter 21:1–14) includes the narrative of the miraculous catch of 153 fish as the third appearance of Jesus after his

resurrection Resurrection or anastasis is the concept of coming back to life after death. In a number of religions, a dying-and-rising god is a deity which dies and is resurrected. Reincarnation is a similar process hypothesized by other religions, which ...

. The precision of the number of fish in this narrative has long been considered peculiar, and many scholars have argued that 153 has some deeper significance.

Jerome Jerome (; la, Eusebius Sophronius Hieronymus; grc-gre, Εὐσέβιος Σωφρόνιος Ἱερώνυμος; – 30 September 420), also known as Jerome of Stridon, was a Christian presbyter, priest, Confessor of the Faith, confessor, th ...

, for example, wrote that

Oppian Oppian ( grc, Ὀππιανός, ; la, Oppianus), also known as Oppian of Anazarbus, of Corycus, or of Cilicia, was a 2nd-century Greco-Roman poet during the reign of the emperors Marcus Aurelius and Commodus, who composed the ''Halieutica'', a fi ...

's ''Halieutica'' listed 153 species of fish, although this could not have been the intended meaning of the Gospel writer because Oppian composed ''Halieutica'' after the Gospel text was written, and at any rate never gave a list of fish species that clearly adds up to 153. The number is clearly an intentional detail, given the lack of precision and detail elsewhere in the story; and theologians have lent much credence to Augustine's numerology simply because it comes from historic rather than contemporary theology.

reached much the same conclusion as Augustine that the figure is an allegorical representation of totality, but through more straightforward means rather than through numerology. In his ''Commentary on Ezekiel'' he propounded the hypothesis that 153 was meant to represent the whole universe of fish, citing as proof that contemporary poets, giving

as an example, believed that there were 153 species of fish in the world. However, Robert M. Grant disproved Jerome's hypothesis by noting that Oppian actually enumerated only 149 (as catalogued by

Alexander William Mair Alexander William Mair (9 June 1875–13 November 1928) was a 20th century Scottish scholar who was Professor of Greek at the University of Edinburgh. He was an authority on the works of the Greek poet Hesiod. Life He was born in Edinburgh o ...

) fish species in his ''Halieutica'' (or only 152 "by adding 3 worms", in Grant's words). What Oppian actually said, moreover, was that only the gods knew the number; and other ancient authors gave different numbers that still were not 153, such as

Pliny The Elder Gaius Plinius Secundus (AD 23/2479), called Pliny the Elder (), was a Roman author, naturalist and natural philosopher, and naval and army commander of the early Roman Empire, and a friend of the emperor Vespasian. He wrote the encyclopedic '' ...

in ''Naturalis Historia'' (9.43) recording only 74, 104, or 144 (depending from how one counts, and whether one includes hard shelled animals) species of fish, and

Quintus Ennius Quintus Ennius (; c. 239 – c. 169 BC) was a writer and poet who lived during the Roman Republic. He is often considered the father of Roman poetry. He was born in the small town of Rudiae, located near modern Lecce, Apulia, (Ancient Calabria, ...

as reported by

Apuleius Apuleius (; also called Lucius Apuleius Madaurensis; c. 124 – after 170) was a Numidian Latin-language prose writer, Platonist philosopher and rhetorician. He lived in the Roman province of Numidia, in the Berber city of Madauros, modern-day ...

enumerating "countless kinds of fish". "Every ancient ichthyologian counted the number of species differently." stated Grant.

David Strauss David Friedrich Strauss (german: link=no, Strauß ; 27 January 1808 – 8 February 1874) was a German liberal Protestant theologian and writer, who influenced Christian Europe with his portrayal of the "historical Jesus", whose divine nature h ...

had in fact pointed out the same thing about Oppian in his ''Leben Jesu'' the century before Grant. From a strictly biological point of view, moreover, only 24 species of fish had been recorded in the Sea of Galilee by the turn of the 20th century. Theologians have continued to support Jerome's hypothesis despite Grant and Strauss, arguing variously that Jerome may have had access to other works of Oppian that are now lost, that Oppian was writing a century after the Gospel of John and at least came close, and that perhaps (despite his having mentioned Oppian by name) Jerome's reference to multiple writers actually meant other writers entirely. Grant himself opined that "there is every reason to suppose" that in fact Jerome had not actually checked Oppian's writing directly for this information, but was rather recounting secondhand some earlier Christian commentary on the Gospel of John. Many other numerological interpretations have been propounded, from adding numerological representations of

Simon Simon may refer to: People * Simon (given name), including a list of people and fictional characters with the given name Simon * Simon (surname), including a list of people with the surname Simon * Eugène Simon, French naturalist and the genus ...

's name to the Greek word for fish through the additions (100+50+7) of

Cyril of Alexandria Cyril of Alexandria ( grc, Κύριλλος Ἀλεξανδρείας; cop, Ⲡⲁⲡⲁ Ⲕⲩⲣⲓⲗⲗⲟⲩ ⲁ̅ also ⲡⲓ̀ⲁⲅⲓⲟⲥ Ⲕⲓⲣⲓⲗⲗⲟⲥ; 376 – 444) was the Patriarch of Alexandria from 412 to 444 ...

to the multiplications (17×3×3) of

Gregory the Great Pope Gregory I ( la, Gregorius I; – 12 March 604), commonly known as Saint Gregory the Great, was the bishop of Rome from 3 September 590 to his death. He is known for instigating the first recorded large-scale mission from Rome, the Gregori ...

Frédéric Louis Godet Frédéric Louis Godet (October 25, 1812, in Neuchâtel – October 29, 1900, Neuchâtel) was a Swiss Protestant theologian. Biography Godet was born on October 25, 1812, in Neuchâtel. His father, Paul-Henri, who was a lawyer, died early. His ...

characterized them as "strange". There were at least 18 distinct numerological explanations when

John Emerton John Adney Emerton, (5 June 1928 – 12 September 2015) was a British Anglican priest, theologian, and academic. He was Regius Professor of Hebrew at the University of Cambridge from 1968 to 1995. Early life and education Emerton was born on 5 ...

performed "a quick survey" in 1958. Emerton proceeded to then add a

gematria Gematria (; he, גמטריא or gimatria , plural or , ''gimatriot'') is the practice of assigning a numerical value to a name, word or phrase according to an alphanumerical cipher. A single word can yield several values depending on the cipher ...

l explanation, to which 8 others have been added since. Professor of the New Testament, Craig S. Keener observed in 2010 the several gematrial explanations, critiquing ideas such as reversing the order of the Greek alphabet as being "forced", noting that a "children of God" reading of the number "import a ministry image from Mark 1:17 that John never mentions", and commenting on allegorical suggestions linking to

Moses Moses hbo, מֹשֶׁה, Mōše; also known as Moshe or Moshe Rabbeinu (Mishnaic Hebrew: מֹשֶׁה רַבֵּינוּ, ); syr, ܡܘܫܐ, Mūše; ar, موسى, Mūsā; grc, Mωϋσῆς, Mōÿsēs () is considered the most important pro ...

that "one wonders whether John could have expected any members of his original audience to catch"; summarizing that gematrial explanations that may scholars have put forward are too complex to be discovered without starting from the answer desired and working backwards from there, and that the plethora of such explanations all distinct from one another itself indicates their weakness. However, there have been more prosaic and literal explanations, including the simple straightforward one that the detail is simply correct, and 153 is the number of fish caught. John Bernard argued by quoting

Edwin Hatch Edwin Warren Hatch (4 September 1835 Derby, England – 10 November 1889 Oxford, England) was an English theologian. He is best known as the author of the book '' Influence of Greek Ideas and Usages Upon the Christian Church'', which was based ...

that "The idea that ancient literature consists of riddles which it is the business of modern literature to solve has passed for ever away.", pointing out the irony of a Gnostic-like search for meaning in the tale when John himself was simply being quite literal. Godet, likewise, asserted that it was just "a simple fact recalled to mind". R. Alan Culpepper (who was dean of the McAfee School of Theology at

Mercer University Mercer University is a private research university with its main campus in Macon, Georgia. Founded in 1833 as Mercer Institute and gaining university status in 1837, it is the oldest private university in the state and enrolls more than 9,000 ...

) observed, in his 2021 overview of seven distinct ''classes'' of argument about the number, that whilst there are arguments in favour of symbolic interpretations "Nevertheless, the text gives no basis for interpreting the number." Professor of New Testament Studies Timothy James Wiarda stated that "It is sufficient to note that the text offers the reader no hint concerning any symbolism in the miraculous catch of fish.". Keener, having discounted gematria, Jerome (per Grant and Strauss), and Augustine (with a simple analysis of how probable it is to pick numbers that have at least ''some'' special property, be that they are

triangular A triangle is a polygon with three edges and three vertices. It is one of the basic shapes in geometry. A triangle with vertices ''A'', ''B'', and ''C'' is denoted \triangle ABC. In Euclidean geometry, any three points, when non- collinea ...

square In Euclidean geometry, a square is a regular quadrilateral, which means that it has four equal sides and four equal angles (90-degree angles, π/2 radian angles, or right angles). It can also be defined as a rectangle with two equal-length adj ...

prime A prime number (or a prime) is a natural number greater than 1 that is not a product of two smaller natural numbers. A natural number greater than 1 that is not prime is called a composite number. For example, 5 is prime because the only ways ...

, or otherwise), concludes that the straightforward explanation is the more likely one and that "the number could simply stem from an accurate memory of a careful count on the occasion", quoting Archibald Macbride Hunter in hise 1965 ''Cambridge Bible Commentaries'' that it is "no more symbolical than the hundred yards that Peter swam. It is the remembered number of a 'bumper' catch." Culpepper's three other classes (aside from Jerome, literalism, gematria, and Augustine) are algebraic interpretations based on 153 itself, algebraic interpretations based on the number 17, and the hypothesis that the symbolic meaning of the number exists but is no longer discoverable. Cornelius à Lapide writes that the "multitude of fishes mystically represents the multitude of the faithful which Peter and the Apostles afterwards caught by the net of evangelical preaching, and converted to Christ".

Augustine of Hippo Augustine of Hippo ( , ; la, Aurelius Augustinus Hipponensis; 13 November 354 – 28 August 430), also known as Saint Augustine, was a theologian and philosopher of Berber origin and the bishop of Hippo Regius in Numidia, Roman North Af ...

argued that the significance lay in the fact that 153 is the sum of the first 17

s (i.e. 153 is the 17th

), with 17 representing the combination of

divine grace Divine grace is a theological term present in many religions. It has been defined as the divine influence which operates in humans to regenerate and sanctify, to inspire virtuous impulses, and to impart strength to endure trial and resist temptati ...

(the

seven gifts of the Holy Spirit The seven gifts of the Holy Spirit are an enumeration of seven spiritual gifts first found in the book of Isaiah, and much commented upon by patristic authors. They are: wisdom, understanding, counsel, fortitude, knowledge, piety, and fear o ...

) and law (the

Ten Commandments The Ten Commandments (Biblical Hebrew עשרת הדברים \ עֲשֶׂרֶת הַדְּבָרִים, ''aséret ha-dvarím'', lit. The Decalogue, The Ten Words, cf. Mishnaic Hebrew עשרת הדיברות \ עֲשֶׂרֶת הַדִּבְ� ...

). Theologian

D. A. Carson Donald Arthur Carson (born December 21, 1946) is an evangelical biblical scholar. He is a Distinguished Emeritus Professor of New Testament at Trinity Evangelical Divinity School and president and co-founder of the Gospel Coalition. He has written ...

discusses this and other interpretations and concludes that "if the Evangelist has some symbolism in mind connected with the number 153, he has hidden it well", while other scholars note that "no symbolic significance for the number of 153 fish in John 21:11 has received widespread support." Writers claiming a major role for

Mary Magdalene Mary Magdalene (sometimes called Mary of Magdala, or simply the Magdalene or the Madeleine) was a woman who, according to the four canonical gospels, traveled with Jesus as one of his followers and was a witness to crucifixion of Jesus, his cru ...

have noted that in Greek

isopsephy Isopsephy (; ''isos'' meaning "equal" and ''psephos'' meaning "pebble") or isopsephism is the practice of adding up the number values of the letters in a word to form a single number. The total number is then used as a metaphorical bridge to othe ...

her epithet "η Μαγδαληνή" bears the number 8 + 40 + 1 + 3 + 4 + 1 + 30 + 8 + 50 + 8 = 153, thus, it is suggested, revealing her importance.Margaret Starbird, ''Magdalene's Lost Legacy: Symbolic Numbers and the Sacred Union in Christianity'', Inner Traditions / Bear & Company, 2003, pages 49 and 139, . Similarly, the phrase "τὸ δίκτυον" (the net) used in the passage bears the number 1224 = 8 × 153, as do some other phrases. The significance of this is unclear, given that

Koine Greek Koine Greek (; Koine el, ἡ κοινὴ διάλεκτος, hē koinè diálektos, the common dialect; ), also known as Hellenistic Greek, common Attic, the Alexandrian dialect, Biblical Greek or New Testament Greek, was the common supra-reg ...

provides a choice of several noun endings with different isopsephy values. The number 153 has also been related to the

vesica piscis The vesica piscis is a type of lens, a mathematical shape formed by the intersection of two disks with the same radius, intersecting in such a way that the center of each disk lies on the perimeter of the other. In Latin, "vesica piscis" literal ...

, with the claim that

used 153 as a "shorthand or abbreviation" for the

square root of 3 The square root of 3 is the positive real number that, when multiplied by itself, gives the number 3. It is denoted mathematically as \sqrt or 3^. It is more precisely called the principal square root of 3 to distinguish it from the negative nu ...

in his ''

On the Measurement of the Circle ''Measurement of a Circle'' or ''Dimension of the Circle'' (Greek: , ''Kuklou metrēsis'') is a treatise that consists of three propositions by Archimedes, ca. 250 BCE. The treatise is only a fraction of what was a longer work. Propositions Prop ...

''. However, examination of that work shows this to be only partly correct.

Evagrius Ponticus Evagrius Ponticus ( grc-gre, Εὐάγριος ὁ Ποντικός, Georgian: ევაგრე ქართველი), also called Evagrius the Solitary (345–399 AD), was a Christian monk and ascetic from Heraclea, a city on the coast of ...

referred to the catch of 153 fish, as well as to the mathematical properties of the number (153 =

100 100 or one hundred (Roman numeral: C) is the natural number following 99 and preceding 101. In medieval contexts, it may be described as the short hundred or five score in order to differentiate the English and Germanic use of "hundred" to de ...

+ 28 + 25, with 100 a

square number In mathematics, a square number or perfect square is an integer that is the square (algebra), square of an integer; in other words, it is the multiplication, product of some integer with itself. For example, 9 is a square number, since it equals ...

, 28 a

and 25 a circular number) when describing his 153-chapter work on prayer.

Louis de Montfort Louis-Marie Grignion de Montfort (31 January 1673 – 28 April 1716) was a French Roman Catholic priest and confessor. He was known in his time as a preacher and was made a missionary apostolic by Pope Clement XI. As well as preaching, Montfort ...

, in his fifth method of saying the

Rosary The Rosary (; la, , in the sense of "crown of roses" or "garland of roses"), also known as the Dominican Rosary, or simply the Rosary, refers to a set of prayers used primarily in the Catholic Church, and to the physical string of knots or b ...

, connects the catch of 153 fish with the number of

Hail Mary The Hail Mary ( la, Ave Maria) is a traditional Christian prayer addressing Mary, the mother of Jesus. The prayer is based on two biblical passages featured in the Gospel of Luke: the Angel Gabriel's visit to Mary (the Annunciation) and Mary's ...

s said (3 plus 15 sets of 10), while St Paul's School in

London London is the capital and largest city of England and the United Kingdom, with a population of just under 9 million. It stands on the River Thames in south-east England at the head of a estuary down to the North Sea, and has been a majo ...

was founded in 1512 by

John Colet John Colet (January 1467 – 16 September 1519) was an English Catholic priest and educational pioneer. John Colet was an English scholar, Renaissance humanist, theologian, member of the Worshipful Company of Mercers, and Dean of St Paul's Cat ...

to teach 153 poor men's children, also in reference to the catch.

In the military

* is an of the

Royal Australian Navy The Royal Australian Navy (RAN) is the principal naval force of the Australian Defence Force (ADF). The professional head of the RAN is Chief of Navy (CN) Vice Admiral Mark Hammond AM, RAN. CN is also jointly responsible to the Minister of ...

* was a of the Royal Australian Navy during

World War II World War II or the Second World War, often abbreviated as WWII or WW2, was a world war that lasted from 1939 to 1945. It involved the vast majority of the world's countries—including all of the great powers—forming two opposin ...

* JDS ''Yūgiri'' (DD-153) is an of the

Japanese Maritime Self-Defense Force , abbreviated , also simply known as the Japanese Navy, is the maritime warfare branch of the Japan Self-Defense Forces, tasked with the naval defense of Japan. The JMSDF was formed following the dissolution of the Imperial Japanese Navy (IJN) ...

* was a

United States Navy The United States Navy (USN) is the maritime service branch of the United States Armed Forces and one of the eight uniformed services of the United States. It is the largest and most powerful navy in the world, with the estimated tonnage ...

auxiliary ship during the

Vietnam War The Vietnam War (also known by #Names, other names) was a conflict in Vietnam, Laos, and Cambodia from 1 November 1955 to the fall of Saigon on 30 April 1975. It was the second of the Indochina Wars and was officially fought between North Vie ...

* was a United States Navy ''Trefoil''-class concrete barge during World War II * was a United States Navy during World War II * was a United States Navy during World War II * was a United States Navy naval fighting ship during World War II * was a United States Navy ship during World War II * was a United States Navy during World War II * was a United States Navy during World War II * was a United States Navy during World War II * The

153d Airlift Wing The 153d Airlift Wing (153d AW) is a unit of the Wyoming Air National Guard, stationed at Cheyenne Air National Guard Base, Wyoming. If activated to federal service, the Wing is gained by the United States Air Force Air Mobility Command. Overvi ...

is a unit of the

United States Air Force The United States Air Force (USAF) is the air service branch of the United States Armed Forces, and is one of the eight uniformed services of the United States. Originally created on 1 August 1907, as a part of the United States Army Signal ...

, located at

Cheyenne Regional Airport Cheyenne Regional Airport (Jerry Olson Field) is a civil-military airport a mile north of downtown Cheyenne, in Laramie County, Wyoming. It is owned by the Cheyenne Regional Airport Board. Cheyenne Regional Airport is the home of Cheyenne Air ...

Cheyenne, Wyoming Cheyenne ( or ) is the capital and most populous city of the U.S. state of Wyoming, as well as the county seat of Laramie County, with 65,132 residents, per the 2020 US Census. It is the principal city of the Cheyenne metropolitan statistical ...

. * The

153d Air Refueling Squadron The 153d Air Refueling Squadron is a unit of the Mississippi Air National Guard 186th Air Refueling Wing located at Key Field Air National Guard Base, Mississippi. The 153d is equipped with the KC-135 Stratotanker aircraft. The squadron is a ...

is a unit of the

Mississippi Air National Guard The Mississippi Air National Guard (MS ANG), commonly known as the Mississippi Air Guard, is the aerial militia of the State of Mississippi, United States of America. It is, along with the Mississippi Army National Guard, an element of the Missis ...

, flying the

KC-135 Stratotanker The Boeing KC-135 Stratotanker is an American military aerial refueling aircraft that was developed from the Boeing 367-80 prototype, alongside the Boeing 707 airliner. It is the predominant variant of the C-135 Stratolifter family of transpo ...

* The 153rd Illinois Volunteer Infantry Regiment was an

infantry Infantry is a military specialization which engages in ground combat on foot. Infantry generally consists of light infantry, mountain infantry, motorized infantry & mechanized infantry, airborne infantry, air assault infantry, and marine i ...

regiment A regiment is a military unit. Its role and size varies markedly, depending on the country, service and/or a specialisation. In Medieval Europe, the term "regiment" denoted any large body of front-line soldiers, recruited or conscripted ...

that served in the

Union Army During the American Civil War, the Union Army, also known as the Federal Army and the Northern Army, referring to the United States Army, was the land force that fought to preserve the Union (American Civil War), Union of the collective U.S. st ...

during the

American Civil War The American Civil War (April 12, 1861 – May 26, 1865; also known by other names) was a civil war in the United States. It was fought between the Union ("the North") and the Confederacy ("the South"), the latter formed by states th ...

* The Russian Soviet

Polikarpov I-153 The Polikarpov I-153 ''Chaika'' (Russian ''Чайка'', "Seagull") was a late 1930s Soviet biplane fighter. Developed as an advanced version of the I-15 with a retractable undercarriage, the I-153 fought in the Soviet-Japanese combats in Mong ...

''Chaika'' ("Seagull") was a late 1930s biplane fighter which saw combat during World War II

In transportation

British Rail Class 153 The British Rail Class 153 '' Super Sprinters'' are single-coach railcars converted from two-coach Class 155 diesel multiple units in the early 1990s. The class was intended for service on rural branch lines, either where passenger numbers do ...

is a single-car

diesel multiple unit A diesel multiple unit or DMU is a multiple-unit train powered by on-board diesel engines. A DMU requires no separate locomotive, as the engines are incorporated into one or more of the carriages. Diesel-powered single-unit railcars are also ...

train *

Caledonian Airways Flight 153 Caledonian Airways Flight 153 was a multi-leg nonscheduled passenger service from Luxembourg via Khartoum, Lorenzo Marques (nowadays Maputo), Douala and Lisbon, before heading back to Luxembourg. On 4 March 1962 a Douglas DC-7C flying the r ...

from

Douala International Airport MD-Douala International Airport (french: link=no, Aéroport international MD-Douala) is an international airport located in Douala, the largest city in Cameroon and the capital of Cameroon's Littoral Region. With its 4 terminals and an averag ...

Douala Douala is the largest city in Cameroon and its economic capital. It is also the capital of Cameroon's Littoral Region (Cameroon), Littoral Region. Home to Central Africa's largest port and its major international airport, Douala International Ai ...

Cameroon Cameroon (; french: Cameroun, ff, Kamerun), officially the Republic of Cameroon (french: République du Cameroun, links=no), is a country in west-central Africa. It is bordered by Nigeria to the west and north; Chad to the northeast; the C ...

crashed on March 4, 1962 * The

Peugeot Type 153 The Peugeot Type 153 was a new model from Peugeot for 1913, made in various forms until 1925. Original run The Type 153 (the colonial version was known as the Type 153 A and used a different chassis) was produced until 1916 and held popularity a ...

car, produced between 1913 and 1925 * 153rd Street station on

Metra Metra is the commuter rail system in the Chicago metropolitan area serving the city of Chicago and its surrounding suburbs via the Union Pacific Railroad, BNSF Railway, and other railroads. The system operates 242 stations on 11 rail lines. I ...

SouthWest Service The Southwest Service (SWS) is a Metra commuter rail line, running southwest from Union Station in downtown Chicago, Illinois, to Manhattan, Illinois. Metra does not refer to its lines by color, but the timetable accents for the SouthWest Service ...

Orland Park, Illinois Orland Park is a village in Cook County, Illinois, United States, with a small portion in Will County. The village is a suburb of Chicago. Per the 2020 census, Orland Park had a population of 58,703. Located 25 miles (40 km) southwest of Chicago ...

In sports

Australian rules football Australian football, also called Australian rules football or Aussie rules, or more simply football or footy, is a contact sport played between two teams of 18 players on an oval field, often a modified cricket ground. Points are scored by k ...

Scott Hodges Scott may refer to: Places Canada * Scott, Quebec, municipality in the Nouvelle-Beauce regional municipality in Quebec * Scott, Saskatchewan, a town in the Rural Municipality of Tramping Lake No. 380 * Rural Municipality of Scott No. 98, Saskat ...

had a

SANFL The South Australian National Football League, or SANFL ( or ''S-A-N-F-L''), is an Australian rules football league based in the Australian state of South Australia. It is also the state's governing body for the sport. Originally formed as the ...

season goal kicking record of 153 in 1990

In radio and TV

* The frequency of the

longwave In radio, longwave, long wave or long-wave, and commonly abbreviated LW, refers to parts of the radio spectrum with wavelengths longer than what was originally called the medium-wave broadcasting band. The term is historic, dating from the e ...

transmitters

Donebach Donebach is a neighborhood of the village of Mudau, Odenwald, Germany and has 369 inhabitants. At Donebach, there is the longwave transmitter of Deutschlandfunk for broadcasting on 153 kHz, whose antenna masts are with a height of 363 metres t ...

Ingøy Ingøy or Inga is a small fishing village on the island of Ingøya in Måsøy Municipality, Troms og Finnmark county, Norway. The village lies on the northern coast of the island of Ingøya, facing the open Arctic Ocean. The village of Ingøy li ...

, Braşov, and Kenadsa is 153 kHz

In other fields

153 is also: * The year AD 153 or 153 BC * The year 153 AH in the

Islamic calendar The Hijri calendar ( ar, ٱلتَّقْوِيم ٱلْهِجْرِيّ, translit=al-taqwīm al-hijrī), also known in English as the Muslim calendar and Islamic calendar, is a lunar calendar consisting of 12 lunar months in a year of 354 or ...

that corresponds to 769 – 770 CE * The code for malignant neoplasm of the colon in the

International Statistical Classification of Diseases and Related Health Problems The International Classification of Diseases (ICD) is a globally used diagnostic tool for epidemiology, health management and clinical purposes. The ICD is maintained by the World Health Organization (WHO), which is the directing and coordinating ...

* The code for "mental processes &

intelligence Intelligence has been defined in many ways: the capacity for abstraction, logic, understanding, self-awareness, learning, emotional knowledge, reasoning, planning, creativity, critical thinking, and problem-solving. More generally, it can b ...

" in the

Dewey Decimal Classification The Dewey Decimal Classification (DDC), colloquially known as the Dewey Decimal System, is a proprietary library classification system which allows new books to be added to a library in their appropriate location based on subject. Section 4.1 ...

* A reference to a comet ( 153P/Ikeya-Zhang) discovered in 2002 * A reference to a large

asteroid An asteroid is a minor planet of the inner Solar System. Sizes and shapes of asteroids vary significantly, ranging from 1-meter rocks to a dwarf planet almost 1000 km in diameter; they are rocky, metallic or icy bodies with no atmosphere. ...

with a dark surface (

153 Hilda Hilda ( minor planet designation: 153 Hilda) is a large asteroid in the outer main belt, with a diameter of 170 km. Because it is composed of primitive carbonaceous materials, it has a very dark surface. It was discovered by Johann Palisa ...

) in the outer

Main belt The asteroid belt is a torus-shaped region in the Solar System, located roughly between the orbits of the planets Jupiter and Mars. It contains a great many solid, irregularly shaped bodies, of many sizes, but much smaller than planets, called ...

* The ordinal number of the coat of arms of Komi Republic in the

State Heraldic Register of the Russian Federation The State Heraldic Register of the Russian Federation is a list of descriptions and images of symbols that have received official approval in the Russian Federation, created "in order to systematize and organize the use of official symbols and dis ...

* The number of combined Arabic and Persian

Hidden Words ''The Hidden Words'' (, ar, کلمات مكنونة, Persian: کلمات مکنونه) is a book written in Baghdad around 1858 by Baháʼu'lláh, the founder of the Baháʼí Faith, while he walked along the banks of the Tigris river during h ...

in the

Baháʼí Faith The Baháʼí Faith is a religion founded in the 19th century that teaches the Baháʼí Faith and the unity of religion, essential worth of all religions and Baháʼí Faith and the unity of humanity, the unity of all people. Established by ...

. * The

atomic number The atomic number or nuclear charge number (symbol ''Z'') of a chemical element is the charge number of an atomic nucleus. For ordinary nuclei, this is equal to the proton number (''n''p) or the number of protons found in the nucleus of every ...

of an element temporarily called Unpenttrium * A

sonnet A sonnet is a poetic form that originated in the poetry composed at the Court of the Holy Roman Emperor Frederick II in the Sicilian city of Palermo. The 13th-century poet and notary Giacomo da Lentini is credited with the sonnet's invention, ...

William Shakespeare William Shakespeare ( 26 April 1564 – 23 April 1616) was an English playwright, poet and actor. He is widely regarded as the greatest writer in the English language and the world's pre-eminent dramatist. He is often called England's nation ...

* The U.S.

Bureau of Transportation Statistics The Bureau of Transportation Statistics (BTS), part of the United States Department of Transportation, is a government office that compiles, analyzes, and publishes information on the nation's transportation systems across various modes; and striv ...

' world area code for

Nicaragua Nicaragua (; ), officially the Republic of Nicaragua (), is the largest country in Central America, bordered by Honduras to the north, the Caribbean to the east, Costa Rica to the south, and the Pacific Ocean to the west. Managua is the cou ...

* Number of possible type combinations in the

Pokémon (an abbreviation for in Japan) is a Japanese media franchise managed by The Pokémon Company, founded by Nintendo, Game Freak, and Creatures (company), Creatures, the owners of the trademark and copyright of the franchise. In terms of ...

series. * The number of

aphorism An aphorism (from Greek ἀφορισμός: ''aphorismos'', denoting 'delimitation', 'distinction', and 'definition') is a concise, terse, laconic, or memorable expression of a general truth or principle. Aphorisms are often handed down by tra ...

s outlined by Chr. Pack in ''153 Chymical Aphorisms''153 Chymical Aphorisms

References

Bibliography

* * * * * * * * * * * *

External links

The Number 153 at The Database of Number Correlations
{{DEFAULTSORT:153 (Number) Integers