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An equation is a mathematical
Mathematics

Mathematics is the study of quantity, structure, space, change, and related topics of pattern and form. Mathematicians seek out patterns whether found in numbers, space, natural science, computers, imaginary abstractions, or elsewhere....
 statement
Proposition

This article is about the term proposition in logic and philosophy; for other uses see PropositionIn logic and philosophy, proposition refers to either the "content" or Meaning of a meaningful declarative sentence or the pattern of symbols, marks, or sounds that make up a meaningful declarative sentence....
, in symbols
Table of mathematical symbols

This is a listing of common symbols found within all branches of the science of mathematics....
, that two things are exactly the same (or equivalent). Equations are written with an equal sign, as in .

The equation above is an example of an equality
Equality (mathematics)

Equality is the paradigmatic example of the more general concept of equivalence relations on a set: those binary relations which are reflexive relation, symmetric relation, and transitive relation....
: a proposition
Proposition

This article is about the term proposition in logic and philosophy; for other uses see PropositionIn logic and philosophy, proposition refers to either the "content" or Meaning of a meaningful declarative sentence or the pattern of symbols, marks, or sounds that make up a meaningful declarative sentence....
 which states that two constants are equal. Equalities may be true or false.

Equations are often used to state the equality of two expressions
Expression (mathematics)

In mathematics, the word expression is a term for any well-formed formula combination of mathematical symbols. For example,is an expression, while...
 containing one or more variable
Variable

A variable is a symbol that stands for a value that may vary; the term usually occurs in opposition to constant, which is a symbol for a non-varying value, i.e....
s. In the reals
Real number

In mathematics, the real numbers may be described informally in several different ways. The real numbers include both rational numbers, such as 42 and −23/129, and irrational numbers, such as pi and the square root of two; or, a real number can be given by an infinite decimal representation, such as 2.4871773339...., where the digits co...
 we can say, for example, that for any given value of it is true that

The equation above is an example of an identity
Identity (mathematics)

In mathematics, the term identity has several different important meanings:*An identity is an equality that remains true regardless of the values of any variables that appear within it, to distinguish it from an Equality which is true under more particular conditions....
, that is, an equation that is true regardless of the values of any variables that appear in it.






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An equation is a mathematical
Mathematics

Mathematics is the study of quantity, structure, space, change, and related topics of pattern and form. Mathematicians seek out patterns whether found in numbers, space, natural science, computers, imaginary abstractions, or elsewhere....
 statement
Proposition

This article is about the term proposition in logic and philosophy; for other uses see PropositionIn logic and philosophy, proposition refers to either the "content" or Meaning of a meaningful declarative sentence or the pattern of symbols, marks, or sounds that make up a meaningful declarative sentence....
, in symbols
Table of mathematical symbols

This is a listing of common symbols found within all branches of the science of mathematics....
, that two things are exactly the same (or equivalent). Equations are written with an equal sign, as in .

The equation above is an example of an equality
Equality (mathematics)

Equality is the paradigmatic example of the more general concept of equivalence relations on a set: those binary relations which are reflexive relation, symmetric relation, and transitive relation....
: a proposition
Proposition

This article is about the term proposition in logic and philosophy; for other uses see PropositionIn logic and philosophy, proposition refers to either the "content" or Meaning of a meaningful declarative sentence or the pattern of symbols, marks, or sounds that make up a meaningful declarative sentence....
 which states that two constants are equal. Equalities may be true or false.

Equations are often used to state the equality of two expressions
Expression (mathematics)

In mathematics, the word expression is a term for any well-formed formula combination of mathematical symbols. For example,is an expression, while...
 containing one or more variable
Variable

A variable is a symbol that stands for a value that may vary; the term usually occurs in opposition to constant, which is a symbol for a non-varying value, i.e....
s. In the reals
Real number

In mathematics, the real numbers may be described informally in several different ways. The real numbers include both rational numbers, such as 42 and −23/129, and irrational numbers, such as pi and the square root of two; or, a real number can be given by an infinite decimal representation, such as 2.4871773339...., where the digits co...
 we can say, for example, that for any given value of it is true that

The equation above is an example of an identity
Identity (mathematics)

In mathematics, the term identity has several different important meanings:*An identity is an equality that remains true regardless of the values of any variables that appear within it, to distinguish it from an Equality which is true under more particular conditions....
, that is, an equation that is true regardless of the values of any variables that appear in it. The following equation is not an identity:

It is false for an infinite number of values of , and true for only two, the roots
Root (mathematics)

In mathematics, a root of a complex-valued Function is a member of the Domain of such that vanishes at , that is,In other words, a "root" of a function is a value for that produces a result of zero ....
 or solutions of the equation, and . Therefore, if the equation is known to be true, it carries information about the value of To solve an equation
Equation solving

In mathematics, equation solving is the problem of finding what values fulfill a condition stated as an equality . Usually, this condition involves expressions with variables , which are to be substituted by values in order for the equality to hold....
 means to find its solutions.

Many authors reserve the term equation for an equality which is not an identity. The distinction between the two concepts can be subtle; for example, is an identity, while is an equation, whose roots are and . Whether a statement is meant to be an identity or an equation, carrying information about its variables can usually be determined from its context.

Letters from the beginning of the alphabet like a, b, c... often denote constants in the context of the discussion at hand, while letters from end of the alphabet, like x, y, z..., are usually reserved for the variables, a convention initiated by Descartes
René Descartes

Ren? Descartes , , also known as Renatus Cartesius , was a French philosophy, mathematician, scientist, and writer who spent most of his adult life in the Dutch Republic....
.

Properties

If an equation in algebra
Elementary algebra

Elementary algebra is a fundamental and relatively basic form of algebra taught to students who are presumed to have little or no formal knowledge of mathematics beyond arithmetic....
 is known to be true, the following operations may be used to produce another true equation:

  1. Any quantity can be added
    Addition

    Addition is the mathematics process of putting things together. The plus sign "+" means that numbers are added together. For example, in the picture on the right, there are 3 + 2 apples?meaning three apples and two other apples?which is the same as five apples, since 3 + 2 = 5....
     to both sides.
  2. Any quantity can be subtracted
    Subtraction

    Subtraction is one of the four basic arithmetic operations; it is the inverse of addition, meaning that if we start with any number and add any number and then subtract the same number we added, we return to the number we started with....
     from both sides.
  3. Any quantity can be multiplied
    Multiplication

    Multiplication is the Operation of scaling one number by another. It is one of the four basic operations in elementary arithmetic .Multiplication is defined for Natural number in terms of repeated addition; for example, 4 multiplied by 3 can be calculated by adding 3 copies of 4 together:...
     to both sides.
  4. Any nonzero quantity can divide
    Division (mathematics)

    In mathematics, especially in elementary arithmetic, division is an arithmetic operation which is the inverse of multiplication.Specifically, if c times b equals a, written:...
     both sides.
  5. Generally, any function
    Function (mathematics)

    The mathematical concept of a function expresses dependence between two quantities, one of which is known and the other which is produced. A function associates a single output to each input element drawn from a fixed Set , such as the real numbers , although different inputs may have the same output....
     can be applied to both sides. (However, caution must be exercised to ensure that one does not encounter extraneous solutions.)


The algebraic properties (1-4) imply that equality is a congruence relation
Congruence relation

In mathematics and especially in abstract algebra, a congruence relation or simply congruence is an equivalence relation that is compatible with some algebraic operation....
 for a field
Field (mathematics)

In abstract algebra, a field is an algebraic structure with notions of addition, subtraction, multiplication and division , satisfying certain axioms....
; in fact, it is essentially the only one.

The most well known system of numbers which allows all of these operations is the real numbers, which is an example of a field
Field (mathematics)

In abstract algebra, a field is an algebraic structure with notions of addition, subtraction, multiplication and division , satisfying certain axioms....
. However, if the equation were based on the natural number
Natural number

In mathematics, a natural number can mean either an element of the Set = *n = = ? = ? ...
s for example, some of these operations (like division and subtraction) may not be valid as negative numbers and non-whole numbers are not allowed. The integers are an example of an integral domain
Integral domain

In abstract algebra, an integral domain is a commutative ring without zero divisors and with a multiplicative identity 1 not equal to 0, the additive identity....
 which does not allow all divisions as, again, whole numbers are needed. However, subtraction is allowed, and is the inverse operator in that system.

If a function that is not injective is applied to both sides of a true equation, then the resulting equation will still be true, but it may be less useful. Formally, one has an implication, not an equivalence
Logical biconditional

In logic and mathematics, logical biconditional is a logical operator connecting two statements to assert, p Iff q where p is a hypothesis and q is a logical consequence ....
, so the solution set may get larger. The functions implied in properties (1), (2), and (4) are always injective, as is (3) if we do not multiply by zero
0 (number)

0 is both a number and the numerical digit used to represent that number in numeral system. It plays a central role in mathematics as the additive identity of the integers, real numbers, and many other algebraic structures....
. Some generalized products
Product (mathematics)

In the a mathematics, a product is the result of Multiplication, or an expression that identifies divisors to be multiplied. The order in real number or complex number numbers are multiplied has no bearing on the product; this is known as the Commutativity of multiplication....
, such as a dot product
Dot product

In mathematics, the dot product, also known as the scalar product, is an operation which takes two vector over the real numbers R and returns a real-valued scalar quantity....
, are never injective.

See also



External links

  • : Plots 2D mathematical equations, computes integrals, and finds solutions online.
  • : A web page for producing and downloading pdf or postscript plots of the solution sets to equations and inequations in two variables (x and y).
  • : A Windows freeware program that plots Cartesian and polar equations, with both integration
    Integral

    Integration is an important concept in mathematics, specifically in the field of calculus and, more broadly, mathematical analysis. Given a function ƒ of a Real number variable x and an interval [ab] of the real line, the integral...
     and differentiation
    Derivative

    In calculus, a branch of mathematics, the derivative is a measure of how a function changes as its input changes. Loosely speaking, a derivative can be thought of as how much a quantity is changing at a given point....
     solvers and graphing capabilities.
  • — contains information on solutions to many different classes of mathematical equations.
  • : A webpage that can solve single equations and linear equation systems.
  • : Online Equation Plotter with Automatic Table of Coordinates
  • MathMagic
    MathMagic

    MathMagic, with its text form logotype [Math+Magic], is an equation editor for Windows and Mac OS including Mac OS X.MathMagic is a bit similar with MathType in terms of user interface but it seems to focus more on high quality printing - targeting publishing market, and higher productivity with easier interface and various faster input meth...
    : WYSIWYG equation editor for Wiki equations