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EQUALITY MATHEMATICS

  • Equality (mathematics)
  • Basic notion of sameness in mathematics

    In mathematics, equality is a relationship between two quantities or expressions, stating that they have the same value, or represent the same mathematical

    Equality (mathematics)

    Equality (mathematics)

    Equality_(mathematics)

  • Equals sign
  • Mathematical symbol of equality

    (American English), also known as the equality sign, is the mathematical symbol =, which is used to indicate equality. In an equation it is placed between

    Equals sign

    Equals_sign

  • Equality
  • Topics referred to by the same term

    legislation Equality (mathematics), the relationship between expressions that represent the same value or mathematical object Equals sign, = Logical equality Equality

    Equality

    Equality

  • Predicate (logic)
  • Symbol representing a property or relation in logic

    well-defined. For example, equality may be understood solely through its reflexive and substitution properties (cf. Equality (mathematics) § Axioms). Other properties

    Predicate (logic)

    Predicate_(logic)

  • Similarity
  • Topics referred to by the same term

    containing Similarity Same (disambiguation) Difference (disambiguation) Equality (mathematics) Identity (philosophy) This disambiguation page lists articles associated

    Similarity

    Similarity

  • Mathematics
  • Field of knowledge

    Mathematics is a field of knowledge concerned with abstract concepts such as numbers, geometric shapes, sets, functions, and probabilities. It uses logical

    Mathematics

    Mathematics

    Mathematics

  • Balance
  • Topics referred to by the same term

    biomechanics Balance (accounting) Balance or weighing scale Balance, as in equality (mathematics) or equilibrium Balance (1983 film), a Bulgarian film Balance (1989

    Balance

    Balance

  • Relational operator
  • Programming language construct

    "case equality" or "case subsumption" operator. Binary relation Common operator notation Conditional (computer programming) Equality (mathematics) Equals

    Relational operator

    Relational_operator

  • Outline of discrete mathematics
  • Overview of and topical guide to discrete mathematics

    equation – Polynomial equation of degree two Solution point – Mathematical formula expressing equalityPages displaying short descriptions of redirect targets

    Outline of discrete mathematics

    Outline_of_discrete_mathematics

  • Identity (mathematics)
  • Equation that is satisfied for all values of the variables

    In mathematics, an identity is an equality relating one mathematical expression A to another mathematical expression B, such that A and B (which might

    Identity (mathematics)

    Identity (mathematics)

    Identity_(mathematics)

  • Gender-equality paradox
  • Concept in psychology and sociology

    with the gender-equality paradox in STEM hypothesis. Another 2020 study did find evidence of the paradox in the pursuit of mathematical studies; however

    Gender-equality paradox

    Gender-equality paradox

    Gender-equality_paradox

  • Equal
  • Topics referred to by the same term

    dictionary. Equal(s) may refer to: Equality (mathematics). Equals sign (=), a mathematical symbol used to indicate equality. Equals (film), a 2015 American

    Equal

    Equal

  • Equation
  • Mathematical formula expressing equality

    In mathematics, an equation is a mathematical formula that expresses the equality of two expressions, by connecting them with the equals sign =. The word

    Equation

    Equation

  • Equivalence
  • Topics referred to by the same term

    or Ricardo–de Viti–Barro equivalence, a proposition in economics Equality (mathematics) Equivalence relation Equivalence class Equivalence of categories

    Equivalence

    Equivalence

  • Mathematical coincidence
  • Coincidence in mathematics

    A mathematical coincidence is said to occur when two expressions with no direct relationship show a near-equality which has no apparent theoretical explanation

    Mathematical coincidence

    Mathematical_coincidence

  • Type theory
  • Mathematical theory of data types

    In mathematical logic, and theoretical computer science, type theory is the study of formal systems that classify expressions or mathematical objects by

    Type theory

    Type_theory

  • Constraint (mathematics)
  • Condition of an optimization problem which the solution must satisfy

    In mathematics, a constraint is a condition of an optimization problem that the solution must satisfy. There are several types of constraints—primarily

    Constraint (mathematics)

    Constraint_(mathematics)

  • First-order logic
  • Type of logical system

    calculus, or quantificational logic, is a type of formal system used in mathematics, philosophy, linguistics, and computer science. First-order logic uses

    First-order logic

    First-order_logic

  • Extensionality
  • Logic principle

    same. The extensional definition of function equality, discussed above, is commonly used in mathematics. A similar extensional definition is usually employed

    Extensionality

    Extensionality

  • Gender equality
  • Equality for all genders

    Gender equality, also known as sexual equality, gender egalitarianism, or equality of the sexes, is the state of equal ease of access to resources and

    Gender equality

    Gender equality

    Gender_equality

  • Setoid
  • Mathematical construction of a set with an equivalence relation

    interpretation of intensional equality (the equality on the original set) and extensional equality (the equivalence relation, or the equality on the quotient set)

    Setoid

    Setoid

  • Canonical form
  • Standard representation of a mathematical object

    In mathematics and computer science, a canonical, normal, or standard form of a mathematical object is a standard way of presenting that object as a mathematical

    Canonical form

    Canonical form

    Canonical_form

  • Homotopy type theory
  • Type theory in logic and mathematics

    property of equality. Here, an important difference between HoTT and classical mathematics comes in. In classical mathematics, once the equality of two values

    Homotopy type theory

    Homotopy type theory

    Homotopy_type_theory

  • Glossary of mathematical symbols
  • A mathematical symbol is a figure or a combination of figures that is used to represent a mathematical object, an action on mathematical objects, a relation

    Glossary of mathematical symbols

    Glossary_of_mathematical_symbols

  • Euler's identity
  • Mathematical equation linking e, i and π

    In mathematics, Euler's identity (also known as Euler's equation) is the equality e i π + 1 = 0 {\displaystyle e^{i\pi }+1=0} where e {\displaystyle e}

    Euler's identity

    Euler's identity

    Euler's_identity

  • Proportionality (mathematics)
  • Property of two varying quantities with a constant ratio

    In mathematics, two sequences of numbers, often experimental data, are proportional or directly proportional if their corresponding elements have a constant

    Proportionality (mathematics)

    Proportionality (mathematics)

    Proportionality_(mathematics)

  • Matrix (mathematics)
  • Array of numbers

    In mathematics, a matrix (pl.: matrices) is a rectangular array of numbers or other mathematical objects with elements or entries arranged in rows and

    Matrix (mathematics)

    Matrix (mathematics)

    Matrix_(mathematics)

  • Double colon
  • Topics referred to by the same term

    may refer to: an analogy symbolism operator, in logic and mathematics a notation for equality of ratios a scope resolution operator, in computer programming

    Double colon

    Double_colon

  • Liberté, égalité, fraternité
  • National motto of France and Haiti

    (French pronunciation: [libɛʁte eɡalite fʁatɛʁnite]; French for 'liberty, equality, fraternity', Latin: Libertas, aequalitas, fraternitas; Haitian Creole:

    Liberté, égalité, fraternité

    Liberté, égalité, fraternité

    Liberté,_égalité,_fraternité

  • Operand
  • Object of a mathematical operation, quantity on which an operation is performed

    In mathematics, an operand is the object of a mathematical operation, i.e., it is the object or quantity that is operated on. Unknown operands in equalities

    Operand

    Operand

  • Science, technology, engineering, and mathematics
  • Umbrella term for technical disciplines

    ISBN 978-1-4338-3264-2. "Corrigendum: The Gender-Equality Paradox in Science, Technology, Engineering, and Mathematics Education". Psychological Science. 31 (1):

    Science, technology, engineering, and mathematics

    Science, technology, engineering, and mathematics

    Science,_technology,_engineering,_and_mathematics

  • Identity type
  • Notion of equality in type theory

    theory, a branch of mathematics, the identity type represents the concept of equality. It is also known as propositional equality to differentiate it

    Identity type

    Identity_type

  • Number
  • Used to count, measure, and label

    A number is a mathematical object used to count, measure, and label. The most basic examples are the natural numbers: 1, 2, 3, 4, 5, and so forth. Individual

    Number

    Number

    Number

  • Law (mathematics)
  • Mathematical statement which always holds true

    contain variables), usually using equality or inequality, or between formulas themselves, for instance, in mathematical logic. For example, the formula

    Law (mathematics)

    Law_(mathematics)

  • Expression (mathematics)
  • Symbolic description of a mathematical object

    expressions usually denote mathematical objects, whereas formulas are statements about mathematical objects, such as an equality. This is analogous to natural

    Expression (mathematics)

    Expression (mathematics)

    Expression_(mathematics)

  • Eva Miranda
  • Spanish mathematician (born 1973)

    Toward Equality | Mathematics. Universität Göttingen. 2025-07-02. Retrieved 2025-08-30 – via YouTube. "Nachdiplom lectures". Institute for Mathematical Research

    Eva Miranda

    Eva Miranda

    Eva_Miranda

  • Triple bar
  • Symbol with multiple meanings

    symbol ≡ for definitional equality. Cajori, Florian (2013), A History of Mathematical Notations, Dover Books on Mathematics, Courier Dover Publications

    Triple bar

    Triple_bar

  • Kleene equality
  • Equality operator on partial functions

    In mathematics, Kleene equality, or strong equality, ( ≃ {\displaystyle \simeq } ) is an equality operator on partial functions, that states that on a

    Kleene equality

    Kleene_equality

  • Approximation
  • Something roughly the same as something else

    } (\gtrapprox) : either an inequality holds or approximate equality. Approximate equalities denoted by wavy or dotted symbols. Approximation arises naturally

    Approximation

    Approximation

  • Theory of pure equality
  • Decidable theory of equality

    In mathematical logic the theory of pure equality is a first-order theory. It has a signature consisting of only the equality relation symbol, and includes

    Theory of pure equality

    Theory_of_pure_equality

  • Computer algebra
  • Scientific area at the interface between computer science and mathematics

    \log(z^{2}-5)} . There are two notions of equality for mathematical expressions. Syntactic equality is the equality of their representation in a computer

    Computer algebra

    Computer algebra

    Computer_algebra

  • Parity (mathematics)
  • Property of being an even or odd number

    In mathematics, parity is the property of an integer of whether it is even or odd. An integer is even if it is divisible by 2, and odd if it is not. For

    Parity (mathematics)

    Parity (mathematics)

    Parity_(mathematics)

  • Formula
  • Expression of symbolic information

    relations like equality (=) or inequality (<). Expressions denote a mathematical object, where as formulas denote a statement about mathematical objects. This

    Formula

    Formula

    Formula

  • Set (mathematics)
  • Collection of mathematical objects

    In mathematics, a set is a collection of different things; the things are called elements or members of the set and are typically mathematical objects:

    Set (mathematics)

    Set (mathematics)

    Set_(mathematics)

  • Identity function
  • Function that returns its argument unchanged

    In mathematics, an identity function, also called an identity relation, identity map or identity transformation, is a function that always returns the

    Identity function

    Identity function

    Identity_function

  • 0.999...
  • Alternative decimal expansion of 1

    same number. There are many ways of showing this equality, from intuitive arguments to mathematically rigorous proofs. The intuitive arguments are generally

    0.999...

    0.999...

  • Anti-bias curriculum
  • Educational plan meant to reduce perceived prejudice in education

    of equality based on equal opportunities (formal equality) or based on equality of outcomes for different groups, also called substantive equality.[failed

    Anti-bias curriculum

    Anti-bias_curriculum

  • Mathematical optimization
  • Study of mathematical algorithms for optimization problems

    Mathematical optimization (alternatively spelled optimisation) or mathematical programming is the selection of a best element, with regard to some criteria

    Mathematical optimization

    Mathematical optimization

    Mathematical_optimization

  • Moment (mathematics)
  • Measure of the shape of a function

    Moments of a function in mathematics are certain quantitative measures related to the shape of the function's graph. For example, if the function represents

    Moment (mathematics)

    Moment_(mathematics)

  • Cauchy–Schwarz inequality
  • Mathematical inequality relating inner products and norms

    Hassani, Sadri (1999). Mathematical Physics: A Modern Introduction to Its Foundations. Springer. p. 29. ISBN 0-387-98579-4. Equality holds iff <c|c> = 0

    Cauchy–Schwarz inequality

    Cauchy–Schwarz_inequality

  • Transitive relation
  • Type of binary relation

    In mathematics, a binary relation R on a set X is transitive if, for all elements a, b, c in X, whenever R relates a to b and b to c, then R also relates

    Transitive relation

    Transitive_relation

  • −1
  • Integer

    In mathematics, −1 (negative one or minus one) is the additive inverse of 1, that is, the number that when added to 1 gives the additive identity element

    −1

    −1

  • Uniqueness quantification
  • Logical quantifier

    In mathematics and logic, the term "uniqueness" refers to the property of being the one and only object satisfying a certain condition. This sort of quantification

    Uniqueness quantification

    Uniqueness_quantification

  • Variable
  • Topics referred to by the same term

    associated value may be changed Variable (mathematics), a symbol that represents a quantity in a mathematical expression, as used in many sciences Propositional

    Variable

    Variable

  • Logical equality
  • Logical operator in propositional calculus

    the operands x and y, the truth table of the logical equality operator is as follows: In mathematics, the plus sign "+" almost invariably indicates an operation

    Logical equality

    Logical equality

    Logical_equality

  • Music and mathematics
  • Relationships between music and mathematics

    equality of 53 perfect fifths with 31 octaves, and was noted by Jing Fang and Nicholas Mercator. Musical set theory uses the language of mathematical

    Music and mathematics

    Music and mathematics

    Music_and_mathematics

  • Symmetry of second derivatives
  • Mathematical theorem

    In mathematics, the symmetry of second derivatives (also called the equality of mixed partials) is the fact that exchanging the order of partial derivatives

    Symmetry of second derivatives

    Symmetry_of_second_derivatives

  • Variable (mathematics)
  • Symbol representing a mathematical object

    In mathematics, a variable (from Latin variabilis 'changeable') is a symbol, typically a letter, that refers to an unspecified mathematical object. One

    Variable (mathematics)

    Variable_(mathematics)

  • E (mathematical constant)
  • 2.71828...; base of natural logarithms

    The number e is a mathematical constant, approximately equal to 2.71828, that is the base of the natural logarithm and exponential function. It is sometimes

    E (mathematical constant)

    E (mathematical constant)

    E_(mathematical_constant)

  • Ratio
  • Relationship between two numbers of the same kind

    In mathematics, a ratio (/ˈreɪ.ʃ(i.)oʊ/) shows how many times one number contains another. For example, if there are eight oranges and six lemons in a

    Ratio

    Ratio

    Ratio

  • Strict
  • Mathematical property excluding equality

    Wiktionary, the free dictionary. In mathematical writing, the term strict refers to the property of excluding equality and equivalence and often occurs in

    Strict

    Strict

  • Karush–Kuhn–Tucker conditions
  • Concept in mathematical optimization

    In mathematical optimization, the Karush–Kuhn–Tucker (KKT) conditions, also known as the Kuhn–Tucker conditions, are first derivative tests (sometimes

    Karush–Kuhn–Tucker conditions

    Karush–Kuhn–Tucker_conditions

  • Proportion (mathematics)
  • Statement in mathematics

    A proportion is a mathematical statement expressing equality of two ratios. a : b = c : d {\displaystyle a:b=c:d} a and d are called extremes, b and c

    Proportion (mathematics)

    Proportion_(mathematics)

  • Nonlinear programming
  • Solution process for some optimization problems

    satisfaction of a system of equalities and inequalities, collectively termed constraints. It is the sub-field of mathematical optimization that deals with

    Nonlinear programming

    Nonlinear_programming

  • Inequality (mathematics)
  • Mathematical relation making a non-equal comparison

    In mathematics, an inequality is a relation which makes a non-equal comparison between two numbers or other mathematical expressions. It is used most

    Inequality (mathematics)

    Inequality (mathematics)

    Inequality_(mathematics)

  • Mathematical fallacy
  • Certain type of mistaken proof

    In mathematics, certain kinds of mistaken proof are often exhibited, and sometimes collected, as illustrations of a concept called mathematical fallacy

    Mathematical fallacy

    Mathematical_fallacy

  • List of Encyclopædia Britannica Films titles
  • around Us William Kay (producer); Albert Larson color 13m May 23, 1972 Equality under Law: The California Fair Housing Cases editor: Meredith Lefcourt

    List of Encyclopædia Britannica Films titles

    List_of_Encyclopædia_Britannica_Films_titles

  • Isomorphism
  • In mathematics, invertible homomorphism

    In mathematics, an isomorphism is a structure-preserving mapping or morphism between two structures of the same type that can be reversed by an inverse

    Isomorphism

    Isomorphism

    Isomorphism

  • Sides of an equation
  • Mathematical nomenclature

    In mathematics, LHS is informal shorthand for the left-hand side of an equation. Similarly, RHS is the right-hand side. The two sides have the same value

    Sides of an equation

    Sides_of_an_equation

  • Peano axioms
  • Axioms for the natural numbers

    In mathematical logic, the Peano axioms (/piˈɑːnoʊ/; [peˈaːno]), also known as the Dedekind–Peano axioms or the Peano postulates, are axioms for the natural

    Peano axioms

    Peano_axioms

  • James Samuel Coleman
  • American sociologist (1926–1995)

    Introduction to Mathematical Sociology (1964) Models of Change and Response Uncertainty (1964) Adolescents and the Schools (1965) Equality of Educational

    James Samuel Coleman

    James Samuel Coleman

    James_Samuel_Coleman

  • Wealthy Babcock
  • American mathematician (1895–1990)

    Women’s Hall of Fame, KU Emily Taylor Center for Women and Gender Equality Mathematics Genealogy Project Bill Mayer, “Rabid KU Fans Prove Basketballs Mass

    Wealthy Babcock

    Wealthy Babcock

    Wealthy_Babcock

  • Glossary of areas of mathematics
  • Mathematics is a broad subject that is commonly divided in many areas or branches that may be defined by their objects of study, by the used methods,

    Glossary of areas of mathematics

    Glossary_of_areas_of_mathematics

  • Quantity
  • Property of magnitude or multitude

    further divided as mathematical and physical. In formal terms, quantities—their ratios, proportions, order and formal relationships of equality and inequality—are

    Quantity

    Quantity

  • Neutral
  • Topics referred to by the same term

    journalistic objectivity) Gender neutrality, a principle which advocates gender equality practices and behaviors which are neutral in regard to gender Humanitarian

    Neutral

    Neutral

  • Degeneracy (mathematics)
  • Limiting case which is different from the rest of the class

    In mathematics, a degenerate case is a limiting case of a class of objects which appears to be qualitatively different from (and usually simpler than)

    Degeneracy (mathematics)

    Degeneracy_(mathematics)

  • Calculus
  • Branch of mathematics

    Calculus is the branch of mathematics that studies continuous change, and is the principal precursor of modern mathematical analysis. Originally called

    Calculus

    Calculus

  • Algebra
  • Branch of mathematics

    Algebra is a branch of mathematics that deals with abstract systems, known as algebraic structures, and the manipulation of expressions within those systems

    Algebra

    Algebra

  • Square root
  • Number whose square is a given number

    In mathematics, a square root of a number x is a number y such that y 2 = x {\displaystyle y^{2}=x} ; in other words, a number y whose square (the result

    Square root

    Square root

    Square_root

  • Equal opportunity
  • Aspect of social equality

    decision-makers. The determination of equality of opportunity in such an instance is based on mathematical probability: if equality of opportunity is in effect

    Equal opportunity

    Equal_opportunity

  • Formalism (philosophy of mathematics)
  • View that mathematics does not necessarily represent reality, but is more akin to a game

    In the philosophy of mathematics, formalism is the view that holds that statements of mathematics and logic can be considered to be statements about the

    Formalism (philosophy of mathematics)

    Formalism_(philosophy_of_mathematics)

  • Parseval's identity
  • Result in Fourier analysis

    theorem – Theorem in mathematics Bessel's inequality – Theorem on orthonormal sequences "Parseval equality", Encyclopedia of Mathematics, EMS Press, 2001

    Parseval's identity

    Parseval's_identity

  • Image (mathematics)
  • Set of the values of a function

    In mathematics, the image of a function ⁠ f : X → Y {\displaystyle f:X\to Y} ⁠ is the set of all ⁠ f ( x ) {\displaystyle f(x)} ⁠ such that ⁠ x {\displaystyle

    Image (mathematics)

    Image (mathematics)

    Image_(mathematics)

  • Convex optimization
  • Subfield of mathematical optimization

    Convex optimization is a subfield of mathematical optimization that studies the problem of minimizing convex functions over convex sets (or, equivalently

    Convex optimization

    Convex_optimization

  • Gender gaps in mathematics and reading
  • Child learning phenomenon

    the mathematics and reading gender gaps, that is, nations with a larger mathematics gap have a smaller reading gap and vice versa. Gender-equality paradox

    Gender gaps in mathematics and reading

    Gender_gaps_in_mathematics_and_reading

  • Congruence (geometry)
  • Relationship between two figures of the same shape and size, or mirroring each other

    {\displaystyle ABC\ncong A'B'C'} In many cases it is sufficient to establish the equality of three corresponding parts and use one of the following results to deduce

    Congruence (geometry)

    Congruence (geometry)

    Congruence_(geometry)

  • Mathematical economics
  • Branch of applied mathematics

    Mathematical economics is the application of mathematical methods to represent theories and analyze problems in economics. Often, these applied methods

    Mathematical economics

    Mathematical_economics

  • Equivalence relation
  • Mathematical concept for comparing objects

    In mathematics, an equivalence relation is a binary relation that is reflexive, symmetric, and transitive. The equipollence relation between line segments

    Equivalence relation

    Equivalence relation

    Equivalence_relation

  • Women in STEM
  • Female participants in technical fields

    Higher Levels of Gender Equality Show Larger National Sex Differences in Mathematics Anxiety and Relatively Lower Parental Mathematics Valuation for Girls"

    Women in STEM

    Women in STEM

    Women_in_STEM

  • Substitution (logic)
  • Concept in logic

    variable), and the substitution property of equality, also called Leibniz's Law. Considering mathematics as a formal language, a variable is a symbol

    Substitution (logic)

    Substitution_(logic)

  • Sex differences in education
  • Educational discrimination on the basis of sex

    Higher Levels of Gender Equality Show Larger National Sex Differences in Mathematics Anxiety and Relatively Lower Parental Mathematics Valuation for Girls"

    Sex differences in education

    Sex differences in education

    Sex_differences_in_education

  • Transportation theory (mathematics)
  • Study of optimal transportation and allocation of resources

    In mathematics and economics, transportation theory or transport theory is a name given to the study of optimal transportation and allocation of resources

    Transportation theory (mathematics)

    Transportation_theory_(mathematics)

  • Elementary mathematics
  • Mathematics taught in primary and secondary school

    Elementary mathematics, also known as primary or secondary school mathematics, is the study of mathematics topics that are commonly taught at the primary

    Elementary mathematics

    Elementary mathematics

    Elementary_mathematics

  • McKay conjecture
  • Theorem in group theory

    In mathematics, specifically in the field of group theory, the McKay conjecture is a theorem of equality between two numbers: the number of irreducible

    McKay conjecture

    McKay_conjecture

  • Sex differences in intelligence
  • Area of scientific research

    characterized by greater gender equality. One line of inquiry has focused on the role that stereotype threat might play in mathematics performance differences

    Sex differences in intelligence

    Sex_differences_in_intelligence

  • Hume's principle
  • Logical principle

    In the foundations of mathematics, Hume's principle (or HP) says that, given two collections of objects F {\displaystyle {\mathcal {F}}} and G {\displaystyle

    Hume's principle

    Hume's_principle

  • Commutative diagram
  • Collection of maps which give the same result

    equalities (1) and (2) if one were to show that the diagram commutes. Diagram chasing (also called diagrammatic search) is a method of mathematical proof

    Commutative diagram

    Commutative diagram

    Commutative_diagram

  • Latial culture
  • Iron Age culture in central Italy

    aristocratic expression were intended to present a semblance of legal equality that reinforced the notion of a unified citizenry. Viglietti connects these

    Latial culture

    Latial culture

    Latial_culture

  • Reign of Alfonso XII
  • History of Spain from 1874 to 1885

    freedom. To stop aspiring to uniformity in order to seek the harmony of equality with variety, that is, the perfect union among the various Spanish regions

    Reign of Alfonso XII

    Reign of Alfonso XII

    Reign_of_Alfonso_XII

  • Doctrine (mathematics)
  • Theory and Topoi. Lecture Notes in Mathematics. Vol. 445. pp. 3–14. doi:10.1007/BFb0061291. ISBN 978-3-540-07164-8.; Equality in hyperdoctrines and comprehension

    Doctrine (mathematics)

    Doctrine_(mathematics)

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EQUALITY MATHEMATICS

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EQUALITY MATHEMATICS

  • Quality
  • n.

    That which makes, or helps to make, anything such as it is; anything belonging to a subject, or predicable of it; distinguishing property, characteristic, or attribute; peculiar power, capacity, or virtue; distinctive trait; as, the tones of a flute differ from those of a violin in quality; the great quality of a statesman.

  • Equality
  • n.

    Sameness in state or continued course; evenness; uniformity; as, an equality of temper or constitution.

  • Egality
  • n.

    Equality.

  • Sexuality
  • n.

    The quality or state of being distinguished by sex.

  • Equally
  • adv.

    In an equal manner or degree in equal shares or proportion; with equal and impartial justice; without difference; alike; evenly; justly; as, equally taxed, furnished, etc.

  • Qualify
  • v. t.

    To reduce from a general, undefined, or comprehensive form, to particular or restricted form; to modify; to limit; to restrict; to restrain; as, to qualify a statement, claim, or proposition.

  • Inequality
  • n.

    Disproportion to any office or purpose; inadequacy; competency; as, the inequality of terrestrial things to the wants of a rational soul.

  • Equality
  • n.

    The condition or quality of being equal; agreement in quantity or degree as compared; likeness in bulk, value, rank, properties, etc.; as, the equality of two bodies in length or thickness; an equality of rights.

  • Equality
  • n.

    Evenness; uniformity; as, an equality of surface.

  • Equalize
  • v. t.

    To make equal; to cause to correspond, or be like, in amount or degree as compared; as, to equalize accounts, burdens, or taxes.

  • Qualify
  • v. t.

    To give individual quality to; to modulate; to vary; to regulate.

  • Inequality
  • n.

    Variableness; changeableness; inconstancy; lack of smoothness or equability; deviation; unsteadiness, as of the weather, feelings, etc.

  • Duality
  • n.

    The quality or condition of being two or twofold; dual character or usage.

  • Sequacity
  • n.

    Quality or state of being sequacious; sequaciousness.

  • Coequality
  • n.

    The state of being on an equality, as in rank or power.

  • Inequality
  • n.

    An expression consisting of two unequal quantities, with the sign of inequality (< or >) between them; as, the inequality 2 < 3, or 4 > 1.

  • Equability
  • n.

    The quality or condition of being equable; evenness or uniformity; as, equability of temperature; the equability of the mind.

  • Inequality
  • n.

    The quality of being unequal; difference, or want of equality, in any respect; lack of uniformity; disproportion; unevenness; disparity; diversity; as, an inequality in size, stature, numbers, power, distances, motions, rank, property, etc.

  • Equality
  • n.

    Exact agreement between two expressions or magnitudes with respect to quantity; -- denoted by the symbol =; thus, a = x signifies that a contains the same number and kind of units of measure that x does.

  • Equity
  • n.

    An equitable claim; an equity of redemption; as, an equity to a settlement, or wife's equity, etc.