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Integer where the average of its positive divisors is also an integer
number theory, an arithmetic number is an integer for which the average of its positive divisors is also an integer. For instance, 6 is an arithmetic
Arithmetic_number
Branch of elementary mathematics
and negative integers. Rational number arithmetic involves operations on fractions of integers. Real number arithmetic is about calculations with real
Arithmetic
Sequence of equally spaced numbers
An arithmetic progression, arithmetic sequence or linear sequence is a sequence of numbers such that the difference from any succeeding term to its preceding
Arithmetic_progression
Branch of algebraic geometry
mathematics, arithmetic geometry is roughly the application of techniques from algebraic geometry to problems in number theory. Arithmetic geometry is
Arithmetic_geometry
Computation modulo a fixed integer
certain value, called the modulus. The modern approach to number theory using modular arithmetic was developed by Carl Friedrich Gauss in his book Disquisitiones
Modular_arithmetic
Branch of pure mathematics
Number theory is a branch of mathematics devoted primarily to the study of the integers and arithmetic functions. Number theorists study prime numbers
Number_theory
Model of (first-order) Peano arithmetic that contains non-standard numbers
non-standard model of arithmetic is a model of first-order Peano arithmetic that contains non-standard numbers. The term standard model of arithmetic refers to the
Non-standard model of arithmetic
Non-standard_model_of_arithmetic
Real number uniquely specified by description
analytical, and thus also not arithmetical. Every computable number is arithmetical, but not every arithmetical number is computable. For example, the
Definable_real_number
Disorder affecting learning arithmetic
learning disorder, resulting in difficulty learning or comprehending arithmetic, such as difficulty in understanding numbers, numeracy, learning how to
Dyscalculia
Natural number
perfect numbers. It is the sixtieth arithmetic number, where 60 is the second unitary perfect number (the next such number is 90). For n = 8 {\displaystyle
92_(number)
Natural number
integer, 69 is an arithmetic number. 69 is a congruent number—a positive integer that is the area of a right triangle with three rational number sides—and an
69_(number)
Characterization of how many integers are prime
proof is "one that can be carried out in first-order Peano arithmetic." There are number-theoretic statements (for example, the Paris–Harrington theorem)
Prime_number_theorem
Function whose domain is the positive integers
log e ( x ) {\displaystyle \log _{e}(x)} . In number theory, an arithmetic, arithmetical, or number-theoretic function is generally any function whose
Arithmetic_function
Used to count, measure, and label
called arithmetic, a term which may also refer to number theory, the study of the properties of numbers. Viewing the concept of zero as a number required
Number
Shift operator in computer programming
In computer programming, an arithmetic shift is a shift operator, sometimes termed a signed shift (though it is not restricted to signed operands). The
Arithmetic_shift
Calculations where numbers' precision is only limited by computer memory
arbitrary-precision arithmetic, also called bignum arithmetic, multiple-precision arithmetic, or sometimes infinite-precision arithmetic, indicates that calculations
Arbitrary-precision arithmetic
Arbitrary-precision_arithmetic
"serial number arithmetic" for the purposes of manipulating and comparing these sequence numbers. In short, when the absolute serial number value decreases
Serial_number_arithmetic
Axioms for the natural numbers
axiomatization of natural-number arithmetic. In 1888, Richard Dedekind proposed another axiomatization of natural-number arithmetic, and in 1889, Peano published
Peano_axioms
Mystical properties of numbers
Date incompatibility (help) Kalvesmaki, J. (2013). The Theology of Arithmetic: Number Symbolism in Platonism and Early Christianity. Center for Hellenic
Numerology
Field of mathematics
Arithmetic dynamics is a field that amalgamates two areas of mathematics, dynamical systems and number theory. Part of the inspiration comes from complex
Arithmetic_dynamics
Natural number
integer for which the arithmetic mean of all its positive divisors (including itself) is also an integer, 54 is an arithmetic number. If the complementary
54_(number)
Multi-modular arithmetic
Using a residue numeral system for arithmetic operations is also called multi-modular arithmetic. Multi-modular arithmetic is widely used for computation
Residue_number_system
Implementation of arithmetic operations
Fixed-size arithmetic "Integer arithmetic", which in practice is modular arithmetic by a power of 2. Fixed-point arithmetic Modular arithmetic Multi-modular
Computer_arithmetic
Integers have unique prime factorizations
In mathematics, the fundamental theorem of arithmetic, also called the unique factorization theorem and prime factorization theorem, states that every
Fundamental theorem of arithmetic
Fundamental_theorem_of_arithmetic
Type of average of a collection of numbers
In mathematics and statistics, the arithmetic mean ( /ˌærɪθˈmɛtɪk/ arr-ith-MET-ik), arithmetic average, or just the mean or average is the sum of a collection
Arithmetic_mean
IEEE standard for floating-point arithmetic
The IEEE Standard for Floating-Point Arithmetic (IEEE 754) is a technical standard for floating-point arithmetic originally established in 1985 by the
IEEE_754
Natural number
1+2+3+5+7+11+13+17=59.} 177 is also an arithmetic number, whose σ 0 {\displaystyle \sigma _{0}} holds an integer arithmetic mean of 60 {\displaystyle 60} — it
177_(number)
Number used for counting
terms of natural numbers. Arithmetic is the study of the ways to perform basic operations on these number systems. Number theory is the study of the
Natural_number
Computer approximation for real numbers
floating-point arithmetic (FP) is arithmetic on subsets of real numbers formed by a significand (a signed sequence of a fixed number of digits in some
Floating-point_arithmetic
Natural number
of Gerasa's number treatise, as recovered by Boethius in the Latin translation Introduction to Arithmetic, affirmed that one is not a number, but the source
1
Mathematical subject
mathematics, arithmetic combinatorics is a field in the intersection of number theory, combinatorics, ergodic theory and harmonic analysis. Arithmetic combinatorics
Arithmetic_combinatorics
Function defined on integers in number theory
In number theory, the Lagarias arithmetic derivative or number derivative is a function defined for integers, based on prime factorization, by analogy
Arithmetic_derivative
Branch of mathematics
finite, for each real x > 0 {\displaystyle x>0} . An additive number system is an arithmetic semigroup in which the underlying monoid G is free abelian.
Abstract analytic number theory
Abstract_analytic_number_theory
Combinational digital circuit
In computing, an arithmetic logic unit (ALU) is a combinational digital circuit that performs arithmetic and bitwise operations on integer binary numbers
Arithmetic_logic_unit
Area of mathematics
Arithmetic topology is an area of mathematics that is a combination of algebraic number theory and topology. It establishes an analogy between number
Arithmetic_topology
Binary representation for signed numbers
with room for one extra negative number (the range of a 4-bit number is −8 to +7). Furthermore, the same arithmetic implementations can be used on signed
Two's_complement
Form of entropy encoding used in data compression
is represented using a fixed number of bits per character, as in the ASCII code. When a string is converted to arithmetic encoding, frequently used characters
Arithmetic_coding
Differentiating positive and negative zero
ordinary arithmetic, the number 0 does not have a sign, and −0, +0 and 0 are three ways of writing the same number. However, in computing, some number representations
Signed_zero
Method for bounding the errors of numerical computations
interval arithmetic can guarantee relatively reliable and mathematically correct results. Instead of representing a value as a single number, interval
Interval_arithmetic
Number
structures. Multiplying any number by 0 results in 0, and consequently dividing by 0 is generally considered to be undefined in arithmetic. As a numerical digit
0
Decidable first-order theory of the natural numbers with addition
Presburger arithmetic is the first-order theory of the natural numbers with addition, named in honor of Mojżesz Presburger, who introduced it in 1929.
Presburger_arithmetic
Number that, when added to the original number, yields the additive identity
inverse is often referred to as the opposite number, or the negative of a number. The unary operation of arithmetic negation is closely related to subtraction
Additive_inverse
Number in base-10 numeral system
effectively decimal for storing decimal values and doing arithmetic. Often this arithmetic is done on data which are encoded using some variant of binary-coded
Decimal
Indian mathematician
Mathematics at IIT Guwahati, India. He is involved in work related to arithmetic number theory, in particular applications to Iwasawa Theory and p-adic measures
Anupam_Saikia
Number divisible only by 1 and itself
smaller than 4. Primes are central in number theory because of the fundamental theorem of arithmetic: every natural number greater than 1 is either a prime
Prime_number
Mathematical concept
arithmetical set (or arithmetic set) is a set of natural numbers that can be defined by a formula of first-order Peano arithmetic. The arithmetical sets
Arithmetical_set
Theorem about prime numbers
contains arbitrarily long arithmetic progressions. In other words, for every natural number k {\displaystyle k} , there exist arithmetic progressions of primes
Green–Tao_theorem
Mathematics independent of applications
the gap between "arithmetic", now called number theory, and "logistic", now called arithmetic. Plato regarded logistic (arithmetic) as appropriate for
Pure_mathematics
Computer programming condition
is a number of more precise absolute value than the computer can actually represent in memory on its central processing unit (CPU). Arithmetic underflow
Arithmetic_underflow
following outline is provided as an overview of and topical guide to arithmetic: Arithmetic is an elementary branch of mathematics that deals with numerical
Outline_of_arithmetic
Type of arithmetic where output is limited to a fixed range of values
Saturation arithmetic is a version of arithmetic in which all operations, such as addition and multiplication, are limited to a fixed range between a
Saturation_arithmetic
Geometrical GCD and LCM algorithm
billiard ball. To create an arithmetic billiard, a rectangle is drawn with a base of the larger number, and height of the smaller number. Beginning in the bottom-left
Arithmetic_billiards
Numbers and the basic operations on them
of arithmetic operations are unaffected. In elementary arithmetic, the successor of a natural number (including zero) is the next natural number and
Elementary_arithmetic
Number raised to the third power
In arithmetic and algebra, the cube of a number n is its third power, that is, the result of multiplying three instances of n together. The cube of a number
Cube_(algebra)
Computer representation of real numbers
A logarithmic number system (LNS) is an arithmetic system used for representing real numbers in computer and digital hardware, especially for digital signal
Logarithmic_number_system
Form of plant intelligence
Plant arithmetic is a form of plant intelligence whereby plants appear to perform arithmetic operations – a form of number sense in plants. Some such plants
Plant_arithmetic
Mathematical system
either a natural number or a set of natural numbers. Although it is much weaker than Zermelo–Fraenkel set theory, second-order arithmetic can prove essentially
Second-order_arithmetic
Axiomatic logical system
In mathematics, Robinson arithmetic is a finitely axiomatized fragment of first-order Peano arithmetic (PA), first set out by Raphael M. Robinson in 1950
Robinson_arithmetic
Integer having a non-trivial divisor
called the fundamental theorem of arithmetic. There are several known primality tests that can determine whether a number is prime or composite, which do
Composite_number
Natural number
OEIS". oeis.org. Retrieved 2024-11-28. Silverman, Joseph H. (2009). The Arithmetic of Elliptic Curves. Graduate Texts in Mathematics. Vol. 106 (2nd ed.)
3
Limitative results in mathematical logic
procedure (i.e. an algorithm) is capable of proving all truths about the arithmetic of natural numbers. For any such consistent formal system, there will
Gödel's incompleteness theorems
Gödel's_incompleteness_theorems
Class of mathematical expression
(numerator). The usual definition of the quotient in elementary arithmetic is the number which yields the dividend when multiplied by the divisor. That
Division_by_zero
Exploring properties of the integers with complex analysis
Dirichlet's theorem on arithmetic progressions. It is well known for its results on prime numbers (involving the Prime Number Theorem and Riemann zeta
Analytic_number_theory
Mathematical theory by Shinichi Mochizuki
following his earlier work in arithmetic geometry. According to Mochizuki, it is "an arithmetic version of Teichmüller theory for number fields equipped with an
Inter-universal Teichmüller theory
Inter-universal_Teichmüller_theory
Computer format for representing real numbers
1/100. This representation allows standard integer arithmetic logic units to perform rational number calculations. Negative values are usually represented
Fixed-point_arithmetic
number theory, the Siegel–Walfisz theorem was obtained by Arnold Walfisz as an application of a theorem by Carl Ludwig Siegel to primes in arithmetic
Siegel–Walfisz_theorem
Type of zeta function
to higher dimensions. The arithmetic zeta function is one of the most fundamental objects of number theory. The arithmetic zeta function ζX (s) is defined
Arithmetic_zeta_function
Set of all true first-order statements about the arithmetic of natural numbers
In mathematical logic, true arithmetic is the set of all true first-order statements about the arithmetic of natural numbers. This is the theory associated
True_arithmetic
Theory in number theory
geometry is a theory in arithmetic geometry which describes the way in which the algebraic fundamental group of a certain arithmetic variety X, or some related
Anabelian_geometry
Number equal to the sum of its proper divisors
www-groups.dcs.st-and.ac.uk. Retrieved 9 May 2018. In Introduction to Arithmetic, Chapter 16, he says of perfect numbers, "There is a method of producing
Perfect_number
1st-century AD Greek philosopher, mathematician and music theorist
mystical properties of numbers, best known for his works Introduction to Arithmetic and Manual of Harmonics, which are an important resource on Ancient Greek
Nicomachus
Fixed-precision arithmetic, also referred to as finite-precision arithmetic, is arithmetic on numbers that are represented in a fixed number of digits. Examples
Fixed-precision_arithmetic
Digit transferred from one column to another
In elementary arithmetic, a carry is a digit that is transferred from one column of digits to another column of more significant digits. It is part of
Carry_(arithmetic)
formulas and as a step in arithmetical calculations; it is equivalent to multiplication by one half. Starting with an arbitrary number or quantity x {\displaystyle
Division_by_two
Set of residue classes modulo n, relatively prime to n
Euler's totient function Greatest common divisor Modular arithmetic Number theory Residue number system Long (1972, p. 85) Pettofrezzo & Byrkit (1970, p
Reduced_residue_system
Arithmetic mean is greater than or equal to geometric mean
mathematics, the inequality of arithmetic and geometric means, or more briefly the AM–GM inequality, states that the arithmetic mean of a list of non-negative
AM–GM_inequality
Theorem on the number of primes in arithmetic sequences
on average, in accordance with the prime number theorem, the same must be true for the primes in arithmetic progressions. It is natural to ask about the
Dirichlet's theorem on arithmetic progressions
Dirichlet's_theorem_on_arithmetic_progressions
Numbers obtained by adding the two previous ones
numbers recursively in O(log n) arithmetic operations. This matches the time for computing the n-th Fibonacci number from the closed-form matrix formula
Fibonacci_sequence
Product of an integer with itself
can be useful for mental arithmetic: for example, 47 × 53 can be easily computed as 502 − 32 = 2500 − 9 = 2491. A square number is also the sum of two consecutive
Square_number
Natural number
numbers are the only numbers whose arithmetic mean of divisors is the first perfect number and unitary perfect number, 6 (that is also the smallest semiprime
29_(number)
Number format for specifying provision
the multiplication can be implemented as an arithmetic shift to the left and the division as an arithmetic shift to the right; on many processors shifts
Q_(number_format)
Mathematical logic
Skolem arithmetic is weaker than Peano arithmetic, which includes both addition and multiplication operations. Unlike Peano arithmetic, Skolem arithmetic is
Skolem_arithmetic
Arithmetic operations
Lunar arithmetic, formerly called dismal arithmetic, is a version of arithmetic in which the addition and multiplication operations on digits are defined
Lunar_arithmetic
Subset of mathematical connundrums
Problems involving arithmetic progressions are of interest in number theory, combinatorics, and computer science, both from theoretical and applied points
Problems involving arithmetic progressions
Problems_involving_arithmetic_progressions
128-bit computer number format
representable number greater than 1. In addition to the double-double arithmetic, it is also possible to generate triple-double or quad-double arithmetic if higher
Quadruple-precision floating-point format
Quadruple-precision_floating-point_format
Neoplatonist philosopher and mystic (c. 245 – c. 325)
ISBN 978-3-7749-4172-4, pp. 497-544. Kalvesmaki, Joel. The Theology of Arithmetic: Number Symbolism in Platonism and Early Christianity. Hellenic Studies Series
Iamblichus
Denormalized floating-point numbers near zero
around zero in floating-point arithmetic. Any non-zero number with magnitude smaller than the smallest positive normal number is subnormal, while denormal
Subnormal_number
Branch of mathematical logic
Reverse mathematics is usually carried out using subsystems of second-order arithmetic, where many of its definitions and methods are inspired by previous work
Reverse_mathematics
Arithmetic logic circuit
result requires a higher digit; for example, "9 + 5 = 4, carry 1". Binary arithmetic works in the same fashion, with fewer digits. In this case, there are
Carry-lookahead_adder
Figurate number
S2CID 53079729 Wikimedia Commons has media related to triangular numbers. "Arithmetic series", Encyclopedia of Mathematics, EMS Press, 2001 [1994] Triangular
Triangular_number
Product of two prime numbers
Sequences. OEIS Foundation. Nowicki, Andrzej (2013-07-01), Second numbers in arithmetic progressions, arXiv:1306.6424 Conway, J. H. (2008-06-18), Counting Groups:
Semiprime
Numeric quantity representing the center of a collection of numbers
purpose. The arithmetic mean, also known as "arithmetic average", is the sum of the values divided by the number of values. The arithmetic mean of a set
Mean
Decimal representation of real numbers in computing
Decimal floating-point (DFP) arithmetic refers to both a representation and operations on decimal floating-point numbers. Working directly with decimal
Decimal_floating_point
Type of group in group theory
They arise naturally in the study of arithmetic properties of quadratic forms and other classical topics in number theory. They also give rise to very
Arithmetic_group
Mathematical theory
1975) defined an intersection theory on the arithmetic surfaces attached to smooth projective curves over number fields, with the aim of proving certain results
Arakelov_theory
Arithmetic in a field with a finite number of elements
arithmetic is arithmetic in a finite field (a field containing a finite number of elements) contrary to arithmetic in a field with an infinite number
Finite_field_arithmetic
arithmetic. c. 20,000 BC — Nile Valley, Ishango Bone: suggested, though disputed, as the earliest reference to prime numbers as also a common number.
Timeline of numerals and arithmetic
Timeline_of_numerals_and_arithmetic
Number, product of consecutive integers
only prime pronic number. It is also the only pronic number in the Fibonacci sequence and the only pronic Lucas number. The arithmetic mean of two consecutive
Pronic_number
Study of algorithms for performing number theoretic computations
solutions to diophantine equations, and explicit methods in arithmetic geometry. Computational number theory has applications to cryptography, including RSA
Computational_number_theory
Arithmetic operation
denoted with the plus sign +, is one of the four basic operations of arithmetic, the other three being subtraction, multiplication, and division. The
Addition
ARITHMETIC NUMBER
ARITHMETIC NUMBER
Surname or Lastname
English (mainly northeastern)
English (mainly northeastern) : habitational name from any of various minor places (including perhaps some now lost) named from Old English hÄr ‘gray’, hara ‘hare’, or hær ‘rock’, ‘tumulus’ + land ‘tract of land’, ‘estate’, ‘cultivated land’, notably Harland in Kirkbymoorside. North Yorkshire, which is named from hær + land. This surname has been present in northern Ireland since the 17th century.French (Normandy) : nickname for someone given to stirring up trouble, from the present participle of medieval French hareler ‘to create a disturbance’.George and Michael Harland were Quakers who emigrated from Durham, England, to Ireland. George went on to DE in 1687 and became governor in 1695, while Michael went to Philadelphia. George Harland’s descendants, who dropped the final -d from their name, included a number of prominent American politicians, in particular James Harlan (1820–99), who became a senator and secretary of the interior.
Surname or Lastname
English
English : nickname for a virile man, from Middle English male ‘masculine’ (Old French masle, madle, Latin masculus).Belgian (van Male) : habitational name from any of a number of places in Flanders named Male.
Surname or Lastname
English (common in Devon and Cornwall), Spanish (Julián), and German
English (common in Devon and Cornwall), Spanish (Julián), and German : from a personal name, Latin Iulianus, a derivative of Iulius (see Julius), which was borne by a number of early saints. In Middle English the name was borne in the same form by women, whence the modern girl’s name Gillian.
Girl/Female
Tamil
Ankisha | அநà¯à®•à¯€à®·à®¾
Goddess of number
Ankisha | அநà¯à®•à¯€à®·à®¾
Surname or Lastname
French (western)
French (western) : from a pet form of Martin 1.English : habitational name from Martineau in France. The name was also taken to England by Huguenot refugees in the 17th century (see below).Harriet Martineau (1802–76), the English writer, was the daughter of a Norwich manufacturer. She was descended from a family of French Huguenots who owned land around Poitou and Touraine in the 15th century. They included a number of surgeons in the 17th century. In the 19th century a branch of the family was firmly established in Birmingham, England; others went to North America.
Surname or Lastname
English
English : habitational name from any of several places so called, named with the genitive plural huntena of Old English hunta ‘hunter’ + tūn ‘enclosure’, ‘settlement’ or dūn ‘hill’ (the forms in -ton and -don having become inextricably confused). A number of bearers of this name may well derive it from Huntingdon, now in Cambridgeshire (formerly the county seat of the old county of Huntingdonshire), which is named from the genitive case of Old English hunta ‘huntsman’, perhaps used as a personal name, + dūn ‘hill’.A prominent American family of this name were founded by Simon Huntington, who himself never saw the New World, for he died in 1633 on the voyage to Boston, where his widow settled with her children. Their descendants include Jabez Huntington (1719–86), a wealthy West Indies trader, and Samuel Huntington (1731–96), who was one of the signers of the Declaration of Independence. Collis Potter Huntington (1821–1900) was an American railway magnate. Beginning with little education or money, he made a huge fortune, some of which he left to his nephew, Henry Huntington (1850–1927), who used the money to establish the Huntington library and art gallery in CA.
Boy/Male
Tamil
Rajaraman | ராஜரமணÂ
Equal n number of ramans
Rajaraman | ராஜரமணÂ
Surname or Lastname
English (of Norman origin)
English (of Norman origin) : habitational name from a lost place, of uncertain location, named in Anglo-Norman French as mesnil Warin ‘domain of Warin’ (see Waring). The surname has had a large number of variant spellings; it is normally pronounced ‘Mannering’.
Surname or Lastname
English
English : variant of Marsh.French : habitational name from places so named in Ardèche, Ardennes, Gard, Loire, Nièvre, and Meurthe-et-Moselle, from the Latin personal name Marcius, used adjectivally.French : from the personal name Meard, Mard, Mart, vernacular forms of the saint’s name Médard. Morlet notes that there are a number of places called Saint-Mars, formerly recorded in Latin as Sanctus Medardus.French : from the name of the month, mars ‘ March’, denoting seed sown in March, and hence a metonymic name for an arable grower.French (De Mars) : habitational name from Mars in the Ardennes.Dutch : from a short form of the personal name Marsilius.
Surname or Lastname
English and Dutch
English and Dutch : from Latin Marcus, the personal name of St. Mark the Evangelist, author of the second Gospel. The name was borne also by a number of other early Christian saints. Marcus was an old Roman name, of uncertain (possibly non-Italic) etymology; it may have some connection with the name of the war god Mars. Compare Martin. The personal name was not as popular in England in the Middle Ages as it was on the Continent, especially in Italy, where the evangelist became the patron of Venice and the Venetian Republic, and was allegedly buried at Aquileia. As an American family name, this has absorbed cognate and similar names from other European languages, including Greek Markos and Slavic Marek.English, German, and Dutch (van der Mark) : topographic name for someone who lived on a boundary between two districts, from Middle English merke, Middle High German marc, Middle Dutch marke, merke, all meaning ‘borderland’. The German term also denotes an area of fenced-off land (see Marker 5) and, like the English word, is embodied in various place names which have given rise to habitational names.English (of Norman origin) : habitational name from Marck, Pas-de-Calais.German : from Marko, a short form of any of the Germanic compound personal names formed with mark ‘borderland’ as the first element, for example Markwardt.Americanization or shortened form of any of several like-sounding Jewish or Slavic surnames (see for example Markow, Markowitz, Markovich).Irish (northeastern Ulster) : probably a short form of Markey (when not of English origin).
Surname or Lastname
English
English : habitational name from a place in Cumbria (Westmorland). The place name is recorded in Domesday Book as Lupetun, and probably derives from an Old English personal name Hluppa (of uncertain origin) + Old English tūn ‘enclosure’, ‘settlement’.The name was brought to America by John Lupton, who sailed from Gravesend, England, on the Primrose in 1635, and is recorded in VA three years later. On 24 October 1635 Davie Lupton set off on the Constance bound for VA, but there is no record of his arrival in the New World. A Christopher Lupton is recorded in Suffolk Co., Long Island, NY, c.1635, and a large number of Luptons in NC descend from him. An American family of the name settled in the area of Winchester, VA, in the mid18th century; they can be traced back to Martin Lupton, who was married in 1630 in the parish of Rothwell, Yorkshire, England.
Surname or Lastname
English
English : habitational names from any of a number of places called Hargrave or Hargreave, of which there are examples in Cheshire, Northamptonshire, and Suffolk; all are named with Old English hÄr ‘gray’ or hara ‘hare’ + grÄf ‘grove’ or græfe ‘thicket’.
Surname or Lastname
English, Welsh, German, etc.
English, Welsh, German, etc. : ultimately from the Hebrew personal name yÅÌ£hÄnÄn ‘Jehovah has favored (me with a son)’ or ‘may Jehovah favor (this child)’. This personal name was adopted into Latin (via Greek) as Johannes, and has enjoyed enormous popularity in Europe throughout the Christian era, being given in honor of St. John the Baptist, precursor of Christ, and of St. John the Evangelist, author of the fourth gospel, as well as others of the nearly one thousand other Christian saints of the name. Some of the principal forms of the personal name in other European languages are Welsh Ieuan, Evan, Siôn, and Ioan; Scottish Ia(i)n; Irish Séan; German Johann, Johannes, Hans; Dutch Jan; French Jean; Italian Giovanni, Gianni, Ianni; Spanish Juan; Portuguese João; Greek IÅannÄ“s (vernacular Yannis); Czech Jan; Russian Ivan. Polish has surnames both from the western Slavic form Jan and from the eastern Slavic form Iwan. There were a number of different forms of the name in Middle English, including Jan(e), a male name (see Jane); Jen (see Jenkin); Jon(e) (see Jones); and Han(n) (see Hann). There were also various Middle English feminine versions of this name (e.g. Joan, Jehan), and some of these were indistinguishable from masculine forms. The distinction on grounds of gender between John and Joan was not firmly established in English until the 17th century. It was even later that Jean and Jane were specialized as specifically feminine names in English; bearers of these surnames and their derivatives are more likely to derive them from a male ancestor than a female. As a surname in the British Isles, John is particularly frequent in Wales, where it is a late formation representing Welsh Siôn rather than the older form Ieuan (which gave rise to the surname Evan). As an American family name this form has absorbed various cognates from continental European languages. (For forms, see Hanks and Hodges 1988.)
Girl/Female
Tamil
Srestha | ஸà¯à®°à¯‡à®¸à¯à®¤à®¾
The best in number & quality, Most Happy or prosperous
Srestha | ஸà¯à®°à¯‡à®¸à¯à®¤à®¾
Surname or Lastname
English
English : habitational name from any of various places so named. Gratton in Derbyshire is from Old English grēat ‘great’ + tūn ‘enclosure’, ‘settlement’. Gratton in High Bray, Devon, is probably ‘great hill’, from Old English grēat + dūn. A number of minor places in Devon are named from the dialect word gratton, gratten ‘stubble-field’.
Surname or Lastname
English
English : topographic name for someone living in a hollow, Middle English dybbe. The surname is most common in Yorkshire, where a number of minor place names are formed from it.
Surname or Lastname
German and Jewish (Ashkenazic)
German and Jewish (Ashkenazic) : nickname derived from German drei ‘three’, Middle High German drī(e), with the addition of the suffix -er. This was the name of a medieval coin worth three hellers (see Heller), and it is possible that the German surname may have been derived from this word. More probably, the nickname is derived from some other connection with the number three, too anecdotal to be even guessed at now.North German and Scandinavian : occupational name for a turner of wood or bone, from an agent derivative of Middle Low German dreien, dregen ‘to turn’. See also Dressler.Jewish (Ashkenazic) : occupational name from Yiddish dreyer ‘turner’, or a nickname from a homonym meaning ‘swindler, cheat’.English : variant spelling of Dryer.
Surname or Lastname
Americanized form of the Latin personal name Januarius or its Italian derivative Gennaro, which was borne by a number of early Christian saints, most famously a 3rd-century bishop of Benevento who became the patron of Naples.English
Americanized form of the Latin personal name Januarius or its Italian derivative Gennaro, which was borne by a number of early Christian saints, most famously a 3rd-century bishop of Benevento who became the patron of Naples.English : altered form of Janeway.In New England, a translation of French Janvier.
Girl/Female
Tamil
Sreshtha | à®·à¯à®°à¯‡à®·à¯à®Ÿ
The best in number & quality, Most Happy or prosperous
Sreshtha | à®·à¯à®°à¯‡à®·à¯à®Ÿ
Boy/Male
Tamil
Reducer of the number of demons
ARITHMETIC NUMBER
ARITHMETIC NUMBER
Girl/Female
Biblical
Deliverance of the Lord.
Male
Italian
Italian form of Latin Constantinus, COSTANTINO means "steadfast."
Girl/Female
Gujarati, Hindu, Indian, Malayalam, Marathi, Traditional
Master; Furnished; Knowledge
Girl/Female
Biblical
Millet, small pulse.
Girl/Female
Muslim
Desire or wish (1)
Male
Chinese
thunder.
Biblical
vine branches
Boy/Male
Australian, Hebrew
Given by God
Boy/Male
Hindu, Indian
Respect
Girl/Female
Hindu, Indian
Basil Plant
ARITHMETIC NUMBER
ARITHMETIC NUMBER
ARITHMETIC NUMBER
ARITHMETIC NUMBER
ARITHMETIC NUMBER
n.
The four "liberal arts," arithmetic, music, geometry, and astronomy; -- so called by the schoolmen. See Trivium.
adv.
Conformably to the principles or methods of arithmetic.
n.
One skilled in arithmetic.
a.
Sexagesimal, or made on the scale of 60; as, logistic, or sexagesimal, arithmetic.
n.
A system of arithmetic, in which numbers are expressed in a scale of 60; logistic arithmetic.
v. t.
To subject to arithmetical division.
n.
The science of numbers; the art of computation by figures.
n.
Arithmetical subtraction.
n.
Arithmetic.
v. i.
To use figures in a mathematical process; to do sums in arithmetic.
n.
A book containing the principles of this science.
n.
That part of arithmetic which treats of adding numbers.
a.
Having equal differences; as, the terms of arithmetical progression are equidifferent.
n.
Regular or proportional advance in increase or decrease of numbers; continued proportion, arithmetical, geometrical, or harmonic.
a.
Of or pertaining to arithmetic; according to the rules or method of arithmetic.
v. t.
To subtract by arithmetical operation; to deduct.
adv.
The arithmetical character 0; a cipher. See Cipher.
a.
Having an assignable arithmetical or numerical value or meaning; not imaginary.
v. i.
To perform the arithmetical operation of addition; as, he adds rapidly.
a.
Of or pertaining to a unit or units; relating to unity; as, the unitary method in arithmetic.