Equation (mathematics): Difference between revisions

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In [[mathematics]], an '''equation''' is a relationship between quantities which are stated to be equal.  It is usually regarded as a kind of mathematical problem in which at least one side of this equality is dependent on some [[variable]] (or variables); it is required to find the ''solution'', namely the value or set of values of these variables for which the equality holds '''[[true(mathematics)|true]]'''.  For example, <math>x+2 = 3</math> is an equation in which the ''solution'' is the value <math>x=1</math>.
In [[mathematics]], an '''equation''' is a statement that two quantities are equal.  It is usually regarded as a kind of mathematical problem in which you have to find a value which makes the equation true. A simple example is the question: What do you have to fill in on the dots in … + 2 = 3? The answer is 1, because 1 + 2 = 3. The unknown quantity in such problems is frequently denotes be a letter, often ''x'', so that the equation becomes ''x'' + 2 = 3. The solution of this equation is ''x'' = 1.


By contrast, an '''identity''' is an equality which is stated to be universally true for all permissible values of the variables, rather than representing a condition on those values.  For example, <math>x+y = y+x</math> is an identity for real numbers, since it is true for all real values of ''x'' and ''y''.
By contrast, an '''identity''' is an equality which is stated to be universally true for all permissible values of the variables, rather than representing a condition on those values.  For example, <math>x+y = y+x</math> is an identity for [[real number]]s, since it is true for all real values of ''x'' and ''y''.
 
Technically, an equation has to indicate what values the unknown variable can take; this is called the ''domain'' of the variable. In the example ''x'' + 2 = 3, it may be specified that <math>x</math> is a real number. Often, the domain is not specified explicitly, but it is assumed that the reader knows what it is supposed to be.
 
The equation may have no solution, may have one solution and may have many solutions, depending on the form of the equations and the domain of the unknown variable.
 
[[Science|Scientific]] laws are often formulated as equations, especially in [[physics]] and other [[natural sciences]]. Examples are [[Newton's laws]], the equation of a [[harmonic oscillator]] and the [[Schrödinger equation]].
The term ''equation'' is used also in [[chemistry]], indicating conservation of atomic or [[isotopic content|isotopic]] content at the [[chemical reaction]]s.
 
==Examples==


The equation may have the form  
The equation may have the form  
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:(2) <math>F(x)=G(x)</math>
:(2) <math>F(x)=G(x)</math>
where <math> F </math> and <math>G</math> are [[known function]]s and <math>x</math> is the [[unknown variable]].
where <math> F </math> and <math>G</math> are [[known function]]s and <math>x</math> is the [[unknown variable]].
An equation may have as solution some value of variable (<math>x </math> in the example above, although variable can be denoted by any letter, including letters from exotic alphabets), at which the equality has value '''true'''.
It is usually supposed that the variable belongs to some set <math>\mathrm A</math>; for example, it may be specified that <math>x</math> is [[real(mathematics)|real]].
The equation may have no solution, may have one solution and may have many solutions, depending on the form of the equations and the set <math>\mathrm A</math> of possible values.
Equations are common in the language used in [[science]]; especially in [[mathematics]] and [[physics]]:
[[Newton equation]], equation of [[oscillator]], [[Schrödinger equation ]].
The term '''equation''' is used also in [[chemistry]], indicating conservation of atomic or [[isotopic content|isotopic]] content at the [[chemical reaction]]s.
==Examples==


For function <math>F(x)=1+x</math>, the equation (1) has no solutions among [[natural number]]s, but has solution
For function <math>F(x)=1+x</math>, the equation (1) has no solutions among [[natural number]]s, but has solution

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In mathematics, an equation is a statement that two quantities are equal. It is usually regarded as a kind of mathematical problem in which you have to find a value which makes the equation true. A simple example is the question: What do you have to fill in on the dots in … + 2 = 3? The answer is 1, because 1 + 2 = 3. The unknown quantity in such problems is frequently denotes be a letter, often x, so that the equation becomes x + 2 = 3. The solution of this equation is x = 1.

By contrast, an identity is an equality which is stated to be universally true for all permissible values of the variables, rather than representing a condition on those values. For example, is an identity for real numbers, since it is true for all real values of x and y.

Technically, an equation has to indicate what values the unknown variable can take; this is called the domain of the variable. In the example x + 2 = 3, it may be specified that is a real number. Often, the domain is not specified explicitly, but it is assumed that the reader knows what it is supposed to be.

The equation may have no solution, may have one solution and may have many solutions, depending on the form of the equations and the domain of the unknown variable.

Scientific laws are often formulated as equations, especially in physics and other natural sciences. Examples are Newton's laws, the equation of a harmonic oscillator and the Schrödinger equation. The term equation is used also in chemistry, indicating conservation of atomic or isotopic content at the chemical reactions.

Examples

The equation may have the form

(1)

or

(2)

where and are known functions and is the unknown variable.

For function , the equation (1) has no solutions among natural numbers, but has solution in the set of integer numbers.

Equation has no solutions among rational numbers, has one solution () among positive real numbers, and has two soluitons ( and ) among real numbers.

Inverse function

Function in equation (1) ; or functions and in equation (2) may also depend on some parameter(s). In this case, the solution(s) also may depend on parameter(s). Indicating the function, the parameter, say, , can be specified as a second argument, writing , or as subscript, writing , .

In relatively simple cases, function depends only on the unknown variable, and depends on the parameter; for example,

(3) .

In this case, the solution is considered as an inverse function of , which can be written as

(4) .

Dependending on the function , range of values of and set , there may exist no inverse function, one inverse function or several inverse functions.

Graphical solution of equations

FIg.1. Example of graphic solution of equation for (two solutions, and ), (one solution ), and (no real solutions).

Solving equations, it may worth to begin with graphic solution of the equation, which allows the quick and dirty estimates. One plots both functions, and at the same graphic, and watch the point (s) of the intersection of the curves. In figire 1, functions is plotted with black line, and function is plotted with red curve. The intersections with black curve indicate values of which are solutions.

At the same figure, the cases (only one solution, ) and (no solutions among real numbers) are shown with green and blue curves.

System of equations

In the equations (1) or (2), may denote several numbers at once, ; and functions and may return values from multidimentional space . In this case, one says that there is system of equations. For example, there is well developed theory of systems of linear equations, while unknown variables are real or complex numbers.

Differential equations and integral equations

In particular, the variable may denote a function of one or several variables, so that the set of p[ossible values is some Hilbert space; the function is then an operator on this space which may be expressed in terms of derivatives or integrals of the function elements. In these cases, the equation is called a differential equation or an integral equation.

Operator equations

Equations can be used for objects of any origin, as soon, as the operation of equality is defined. In particular, in Quantum mechanics, the Heisenberg equation deals with non-commuting objects (operators).