In
mathematics
Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...
, an implicit equation is a
relation
Relation or relations may refer to:
General uses
*International relations, the study of interconnection of politics, economics, and law on a global level
*Interpersonal relationship, association or acquaintance between two or more people
*Public ...
of the form
where is a
function
Function or functionality may refer to:
Computing
* Function key, a type of key on computer keyboards
* Function model, a structured representation of processes in a system
* Function object or functor or functionoid, a concept of object-oriente ...
of several variables (often a
polynomial
In mathematics, a polynomial is an expression consisting of indeterminates (also called variables) and coefficients, that involves only the operations of addition, subtraction, multiplication, and positive-integer powers of variables. An exa ...
). For example, the implicit equation of the
unit circle
In mathematics, a unit circle is a circle of unit radius—that is, a radius of 1. Frequently, especially in trigonometry, the unit circle is the circle of radius 1 centered at the origin (0, 0) in the Cartesian coordinate system in the Eucl ...
is
An implicit function is a
function
Function or functionality may refer to:
Computing
* Function key, a type of key on computer keyboards
* Function model, a structured representation of processes in a system
* Function object or functor or functionoid, a concept of object-oriente ...
that is defined by an implicit equation, that relates one of the variables, considered as the
value
Value or values may refer to:
Ethics and social
* Value (ethics) wherein said concept may be construed as treating actions themselves as abstract objects, associating value to them
** Values (Western philosophy) expands the notion of value beyo ...
of the function, with the others considered as the
argument
An argument is a statement or group of statements called premises intended to determine the degree of truth or acceptability of another statement called conclusion. Arguments can be studied from three main perspectives: the logical, the dialectic ...
s.
For example, the equation
of the
unit circle
In mathematics, a unit circle is a circle of unit radius—that is, a radius of 1. Frequently, especially in trigonometry, the unit circle is the circle of radius 1 centered at the origin (0, 0) in the Cartesian coordinate system in the Eucl ...
defines as an implicit function of if , and is restricted to nonnegative values.
The
implicit function theorem provides conditions under which some kinds of implicit equations define implicit functions, namely those that are obtained by equating to zero
multivariable functions that are
continuously differentiable
In mathematics, a differentiable function of one real variable is a function whose derivative exists at each point in its domain. In other words, the graph of a differentiable function has a non-vertical tangent line at each interior point in its ...
.
Examples
Inverse functions
A common type of implicit function is an
inverse function
In mathematics, the inverse function of a function (also called the inverse of ) is a function that undoes the operation of . The inverse of exists if and only if is bijective, and if it exists, is denoted by f^ .
For a function f\colon X\t ...
. Not all functions have a unique inverse function. If is a function of that has a unique inverse, then the inverse function of , called , is the unique function giving a
solution
Solution may refer to:
* Solution (chemistry), a mixture where one substance is dissolved in another
* Solution (equation), in mathematics
** Numerical solution, in numerical analysis, approximate solutions within specified error bounds
* Soluti ...
of the equation
:
for in terms of . This solution can then be written as
:
Defining as the inverse of is an implicit definition. For some functions , can be written out explicitly as a
closed-form expression
In mathematics, a closed-form expression is a mathematical expression that uses a finite number of standard operations. It may contain constants, variables, certain well-known operations (e.g., + − × ÷), and functions (e.g., ''n''th roo ...
— for instance, if , then . However, this is often not possible, or only by introducing a new notation (as in the
product log example below).
Intuitively, an inverse function is obtained from by interchanging the roles of the dependent and independent variables.
Example: The
product log is an implicit function giving the solution for of the equation .
Algebraic functions
An algebraic function is a function that satisfies a polynomial equation whose coefficients are themselves polynomials. For example, an algebraic function in one variable gives a solution for of an equation
:
where the coefficients are polynomial functions of . This algebraic function can be written as the right side of the solution equation . Written like this, is a
multi-valued
In mathematics, a multivalued function, also called multifunction, many-valued function, set-valued function, is similar to a function, but may associate several values to each input. More precisely, a multivalued function from a domain to a ...
implicit function.
Algebraic functions play an important role in
mathematical analysis
Analysis is the branch of mathematics dealing with continuous functions, limit (mathematics), limits, and related theories, such as Derivative, differentiation, Integral, integration, measure (mathematics), measure, infinite sequences, series (m ...
and
algebraic geometry
Algebraic geometry is a branch of mathematics, classically studying zeros of multivariate polynomials. Modern algebraic geometry is based on the use of abstract algebraic techniques, mainly from commutative algebra, for solving geometrical ...
. A simple example of an algebraic function is given by the left side of the unit circle equation:
:
Solving for gives an explicit solution:
:
But even without specifying this explicit solution, it is possible to refer to the implicit solution of the unit circle equation as , where is the multi-valued implicit function.
While explicit solutions can be found for equations that are
quadratic,
cubic, and
quartic in , the same is not in general true for
quintic
In algebra, a quintic function is a function of the form
:g(x)=ax^5+bx^4+cx^3+dx^2+ex+f,\,
where , , , , and are members of a field, typically the rational numbers, the real numbers or the complex numbers, and is nonzero. In other words, a ...
and higher degree equations, such as
:
Nevertheless, one can still refer to the implicit solution involving the multi-valued implicit function .
Caveats
Not every equation implies a graph of a single-valued function, the circle equation being one prominent example. Another example is an implicit function given by where is a
cubic polynomial
In mathematics, a cubic function is a function of the form f(x)=ax^3+bx^2+cx+d
where the coefficients , , , and are complex numbers, and the variable takes real values, and a\neq 0. In other words, it is both a polynomial function of degree ...
having a "hump" in its graph. Thus, for an implicit function to be a ''true'' (single-valued) function it might be necessary to use just part of the graph. An implicit function can sometimes be successfully defined as a true function only after "zooming in" on some part of the -axis and "cutting away" some unwanted function branches. Then an equation expressing as an implicit function of the other variables can be written.
The defining equation can also have other pathologies. For example, the equation does not imply a function giving solutions for at all; it is a vertical line. In order to avoid a problem like this, various constraints are frequently imposed on the allowable sorts of equations or on the
domain
Domain may refer to:
Mathematics
*Domain of a function, the set of input values for which the (total) function is defined
**Domain of definition of a partial function
**Natural domain of a partial function
**Domain of holomorphy of a function
* Do ...
. The
implicit function theorem provides a uniform way of handling these sorts of pathologies.
Implicit differentiation
In
calculus
Calculus, originally called infinitesimal calculus or "the calculus of infinitesimals", is the mathematical study of continuous change, in the same way that geometry is the study of shape, and algebra is the study of generalizations of arithm ...
, a method called implicit differentiation makes use of the
chain rule
In calculus, the chain rule is a formula that expresses the derivative of the composition of two differentiable functions and in terms of the derivatives of and . More precisely, if h=f\circ g is the function such that h(x)=f(g(x)) for every , ...
to differentiate implicitly defined functions.
To differentiate an implicit function , defined by an equation , it is not generally possible to solve it explicitly for and then differentiate. Instead, one can
totally differentiate with respect to and and then solve the resulting linear equation for to explicitly get the derivative in terms of and . Even when it is possible to explicitly solve the original equation, the formula resulting from total differentiation is, in general, much simpler and easier to use.
Examples
Example 1
Consider
:
This equation is easy to solve for , giving
:
where the right side is the explicit form of the function . Differentiation then gives .
Alternatively, one can totally differentiate the original equation:
:
Solving for gives
:
the same answer as obtained previously.
Example 2
An example of an implicit function for which implicit differentiation is easier than using explicit differentiation is the function defined by the equation
:
To differentiate this explicitly with respect to , one has first to get
:
and then differentiate this function. This creates two derivatives: one for and another for .
It is substantially easier to implicitly differentiate the original equation:
:
giving
:
Example 3
Often, it is difficult or impossible to solve explicitly for , and implicit differentiation is the only feasible method of differentiation. An example is the equation
:
It is impossible to
algebraically express explicitly as a function of , and therefore one cannot find by explicit differentiation. Using the implicit method, can be obtained by differentiating the equation to obtain
:
where . Factoring out shows that
:
which yields the result
:
which is defined for
:
General formula for derivative of implicit function
If , the derivative of the implicit function is given by
:
where and indicate the
partial derivative
In mathematics, a partial derivative of a function of several variables is its derivative with respect to one of those variables, with the others held constant (as opposed to the total derivative, in which all variables are allowed to vary). Part ...
s of with respect to and .
The above formula comes from using the
generalized chain rule to obtain the
total derivative
In mathematics, the total derivative of a function at a point is the best linear approximation near this point of the function with respect to its arguments. Unlike partial derivatives, the total derivative approximates the function with resp ...
— with respect to — of both sides of :
:
hence
:
which, when solved for , gives the expression above.
Implicit function theorem
Let be a
differentiable function
In mathematics, a differentiable function of one real variable is a function whose derivative exists at each point in its domain. In other words, the graph of a differentiable function has a non-vertical tangent line at each interior point in its ...
of two variables, and be a pair of
real number
In mathematics, a real number is a number that can be used to measure a ''continuous'' one-dimensional quantity such as a distance, duration or temperature. Here, ''continuous'' means that values can have arbitrarily small variations. Every real ...
s such that . If , then defines an implicit function that is differentiable in some small enough
neighbourhood
A neighbourhood (British English, Irish English, Australian English and Canadian English) or neighborhood (American English; see spelling differences) is a geographically localised community within a larger city, town, suburb or rural are ...
of ; in other words, there is a differentiable function that is defined and differentiable in some neighbourhood of , such that for in this neighbourhood.
The condition means that is a
regular point of the
implicit curve
In mathematics, an implicit curve is a plane curve defined by an implicit equation relating two coordinate variables, commonly ''x'' and ''y''. For example, the unit circle is defined by the implicit equation x^2+y^2=1. In general, every implic ...
of implicit equation where the
tangent
In geometry, the tangent line (or simply tangent) to a plane curve at a given point is the straight line that "just touches" the curve at that point. Leibniz defined it as the line through a pair of infinitely close points on the curve. More ...
is not vertical.
In a less technical language, implicit functions exist and can be differentiated, if the curve has a non-vertical tangent.
In algebraic geometry
Consider a
relation
Relation or relations may refer to:
General uses
*International relations, the study of interconnection of politics, economics, and law on a global level
*Interpersonal relationship, association or acquaintance between two or more people
*Public ...
of the form , where is a multivariable polynomial. The set of the values of the variables that satisfy this relation is called an
implicit curve
In mathematics, an implicit curve is a plane curve defined by an implicit equation relating two coordinate variables, commonly ''x'' and ''y''. For example, the unit circle is defined by the implicit equation x^2+y^2=1. In general, every implic ...
if and an implicit surface if . The implicit equations are the basis of
algebraic geometry
Algebraic geometry is a branch of mathematics, classically studying zeros of multivariate polynomials. Modern algebraic geometry is based on the use of abstract algebraic techniques, mainly from commutative algebra, for solving geometrical ...
, whose basic subjects of study are the simultaneous solutions of several implicit equations whose left-hand sides are polynomials. These sets of simultaneous solutions are called
affine algebraic set
Affine may describe any of various topics concerned with connections or affinities.
It may refer to:
* Affine, a relative by marriage in law and anthropology
* Affine cipher, a special case of the more general substitution cipher
* Affine com ...
s.
In differential equations
The solutions of differential equations generally appear expressed by an implicit function.
Applications in economics
Marginal rate of substitution
In
economics
Economics () is the social science that studies the Production (economics), production, distribution (economics), distribution, and Consumption (economics), consumption of goods and services.
Economics focuses on the behaviour and intera ...
, when the level set is an
indifference curve
In economics, an indifference curve connects points on a graph representing different quantities of two goods, points between which a consumer is ''indifferent''. That is, any combinations of two products indicated by the curve will provide the c ...
for the quantities and consumed of two goods, the absolute value of the implicit derivative is interpreted as the
marginal rate of substitution
In economics, the marginal rate of substitution (MRS) is the rate at which a consumer can give up some amount of one good in exchange for another good while maintaining the same level of utility. At equilibrium consumption levels (assuming no exte ...
of the two goods: how much more of one must receive in order to be indifferent to a loss of one unit of .
Marginal rate of technical substitution
Similarly, sometimes the level set is an
isoquant
An isoquant (derived from quantity and the Greek word iso, meaning equal), in microeconomics, is a contour line drawn through the set of points at which the same quantity of output is produced while changing the quantities of two or more inputs. T ...
showing various combinations of utilized quantities of labor and of
physical capital
Physical capital represents in economics one of the three primary factors of production. Physical capital is the apparatus used to produce a good and services. Physical capital represents the tangible man-made goods that help and support the produc ...
each of which would result in the production of the same given quantity of output of some good. In this case the absolute value of the implicit derivative is interpreted as the
marginal rate of technical substitution
In microeconomic theory, the marginal rate of technical substitution (MRTS)—or technical rate of substitution (TRS)—is the amount by which the quantity of one input has to be reduced (-\Delta x_2) when one extra unit of another input is used ( ...
between the two factors of production: how much more capital the firm must use to produce the same amount of output with one less unit of labor.
Optimization
Often in
economic theory
Economics () is the social science that studies the production, distribution, and consumption of goods and services.
Economics focuses on the behaviour and interactions of economic agents and how economies work. Microeconomics analyzes ...
, some function such as a
utility function
As a topic of economics, utility is used to model worth or value. Its usage has evolved significantly over time. The term was introduced initially as a measure of pleasure or happiness as part of the theory of utilitarianism by moral philosoph ...
or a
profit function is to be maximized with respect to a choice vector even though the objective function has not been restricted to any specific functional form. The
implicit function theorem guarantees that the
first-order condition
In calculus, a derivative test uses the derivatives of a function to locate the critical points of a function and determine whether each point is a local maximum, a local minimum, or a saddle point. Derivative tests can also give information abou ...
s of the optimization define an implicit function for each element of the optimal vector of the choice vector . When profit is being maximized, typically the resulting implicit functions are the
labor demand In economics, the labor demand of an employer is the number of labor-hours that the employer is willing to hire based on the various exogenous (externally determined) variables it is faced with, such as the wage rate, the unit cost of capital, the ...
function and the
supply function
In economics, supply is the amount of a resource that firms, producers, labourers, providers of financial assets, or other economic agents are willing and able to provide to the marketplace or to an individual. Supply can be in produced goods, la ...
s of various goods. When utility is being maximized, typically the resulting implicit functions are the
labor supply
In mainstream economic theories, the labour supply is the total hours (adjusted for intensity of effort) that workers wish to work at a given real wage rate. It is frequently represented graphically by a labour supply curve, which shows hypotheti ...
function and the
demand function
In economics, a demand curve is a graph depicting the relationship between the price of a certain commodity (the ''y''-axis) and the quantity of that commodity that is demanded at that price (the ''x''-axis). Demand curves can be used either for t ...
s for various goods.
Moreover, the influence of the problem's
parameters
A parameter (), generally, is any characteristic that can help in defining or classifying a particular system (meaning an event, project, object, situation, etc.). That is, a parameter is an element of a system that is useful, or critical, when ...
on — the partial derivatives of the implicit function — can be expressed as
total derivative
In mathematics, the total derivative of a function at a point is the best linear approximation near this point of the function with respect to its arguments. Unlike partial derivatives, the total derivative approximates the function with resp ...
s of the system of first-order conditions found using
total differentiation
In mathematics, the total derivative of a function at a point is the best linear approximation near this point of the function with respect to its arguments. Unlike partial derivatives, the total derivative approximates the function with re ...
.
See also
*
Implicit curve
In mathematics, an implicit curve is a plane curve defined by an implicit equation relating two coordinate variables, commonly ''x'' and ''y''. For example, the unit circle is defined by the implicit equation x^2+y^2=1. In general, every implic ...
*
Functional equation
In mathematics, a functional equation
is, in the broadest meaning, an equation in which one or several functions appear as unknowns. So, differential equations and integral equations are functional equations. However, a more restricted meaning ...
*
Level set
In mathematics, a level set of a real-valued function of real variables is a set where the function takes on a given constant value , that is:
: L_c(f) = \left\~,
When the number of independent variables is two, a level set is calle ...
**
Contour line
A contour line (also isoline, isopleth, or isarithm) of a function of two variables is a curve along which the function has a constant value, so that the curve joins points of equal value. It is a plane section of the three-dimensional grap ...
**
Isosurface
An isosurface is a three-dimensional analog of an isoline. It is a surface that represents points of a constant value (e.g. pressure, temperature, velocity, density) within a volume of space; in other words, it is a level set of a continuous f ...
*
Marginal rate of substitution
In economics, the marginal rate of substitution (MRS) is the rate at which a consumer can give up some amount of one good in exchange for another good while maintaining the same level of utility. At equilibrium consumption levels (assuming no exte ...
*
Implicit function theorem
*
Logarithmic differentiation
In calculus, logarithmic differentiation or differentiation by taking logarithms is a method used to differentiate functions by employing the logarithmic derivative of a function ''f'',
:(\ln f)' = \frac \quad \implies \quad f' = f \cdot (\ ...
*
Polygonizer
*
Related rates
References
Further reading
*
*
*
External links
*Archived a
Ghostarchiveand th
Wayback Machine {{cbignore
Differential calculus
Theorems in analysis
Multivariable calculus
Differential topology
Algebraic geometry