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Topics referred to by the same term
Defining equation may refer to: Defining equation (physical chemistry) Physical quantity This disambiguation page lists articles associated with the title
Defining_equation
_{1}Y1}+{\eta _{2}Y2}+\cdots +\eta _{\mathit {p}}{Y}_{\mathit {p}}}}} and the defining equation for the rate constant k applies to the simpler synthesis reaction
Defining equation (physical chemistry)
Defining_equation_(physical_chemistry)
Functional equation Functional equation (L-function) Constitutive equation Laws of science Defining equation (physical chemistry) List of equations in classical
List_of_equations
Equations describing behavior of a model
governing equation, but usually a defining equation for transport properties. Darcy's law was originally established as an empirical equation, but is later
Governing_equation
Substance-specific relation between two physical quantities
In physics and engineering, a constitutive equation or constitutive relation is a relation between two or more physical quantities (especially kinetic
Constitutive_equation
Equations describing classical electromagnetism
Maxwell's equations are a set of coupled partial differential equations that describe how electric and magnetic fields are generated by electric charges
Maxwell's_equations
Continuity equation Constitutive equation Defining equation (physical chemistry) List of equations in classical mechanics Table of thermodynamic equations List
Lists_of_physics_equations
Type of thermodynamic potential
products are all in their thermodynamic standard states, then the defining equation is written as Δ G ∘ = Δ H ∘ − T Δ S ∘ {\displaystyle \Delta G^{\circ
Gibbs_free_energy
Concepts from linear algebra
eigenvector problem can also be defined for row vectors that left multiply matrix A. In this formulation, the defining equation is u A = κ u , {\displaystyle
Eigenvalues_and_eigenvectors
Generalization of golden and silver ratios
their norm. The defining equation x 2 − n x − 1 = 0 {\displaystyle x^{2}-nx-1=0} of the nth metallic mean is the characteristic equation of a linear recurrence
Metallic_mean
Type of functional equation (mathematics)
derivatives represent their rates of change, and the differential equation defines a relationship between the two. Such relations are common in mathematical
Differential_equation
Mathematical relation consisting of a multi-variable function equal to zero
variables can be written. The defining equation R(x, y) = 0 can also have other pathologies. For example, the equation x = 0 does not imply a function
Implicit_function
Differential equations involving stochastic processes
A stochastic differential equation (SDE) is a differential equation in which one or more of the terms is a stochastic process, resulting in a solution
Stochastic differential equation
Stochastic_differential_equation
flow/current/flux. Defining equation (physical chemistry) List of electromagnetism equations List of equations in classical mechanics List of equations in gravitation
List of equations in fluid mechanics
List_of_equations_in_fluid_mechanics
Stress-strain relation in a linear elastic material
{\displaystyle \mathbf {C} } and Y {\displaystyle \mathbf {Y} } . The defining equation can be written as T i j = C i j k l E k l {\displaystyle T^{ij}=C^{ijkl}E_{kl}}
Elasticity_tensor
property value. Defining equation (physical chemistry) Fresnel equations List of equations in classical mechanics List of equations in fluid mechanics
List of electromagnetism equations
List_of_electromagnetism_equations
Equation that does not involve powers or products of variables
of equation y = − c b . {\displaystyle y=-{\frac {c}{b}}.} There are various ways of defining a line. In the following subsections, a linear equation of
Linear_equation
Vector quantity describing mass flow rate through a given area
the defining equation for mass flux in this article is used interchangeably with the defining equation in mass flow rate. Mass flux is defined as the
Mass_flux
Capacity of a material to conduct heat
as mineral wool or Styrofoam, are used for thermal insulation. The defining equation for thermal conductivity is q = − k ∇ T {\displaystyle \mathbf {q}
Thermal conductivity and resistivity
Thermal_conductivity_and_resistivity
different names. Defining equation (physical chemistry) List of electromagnetism equations List of equations in classical mechanics List of equations in gravitation
List_of_optics_equations
oscillator respectively. List of physics formulae Defining equation (physical chemistry) Constitutive equation Mechanics Optics Electromagnetism Thermodynamics
List of equations in classical mechanics
List_of_equations_in_classical_mechanics
Common thermodynamic equations and quantities in thermodynamics, using mathematical notation, are as follows: Many of the definitions below are also used
Table of thermodynamic equations
Table_of_thermodynamic_equations
Fictional mind control formula in DC Comics
Anti-Life Equation is a fictional concept appearing in American comic books published by DC Comics. Various comics have defined the equation in different
Anti-Life_Equation
Equations that describe the behavior of a physical system
In physics, equations of motion are equations that describe the behavior of a physical system in terms of its motion as a function of time. More specifically
Equations_of_motion
Property of operations
power it gives itself as the result, it may be called idempotent. The defining equation of nilpotent and idempotent expressions are respectively An = 0 and
Idempotence
the higher-dimensional generalization of the elliptic curve. The equations defining abelian varieties are a topic of study because every abelian variety
Equations defining abelian varieties
Equations_defining_abelian_varieties
Field-equations in general relativity
field equations (EFE; also known as Einstein's equations) relate the geometry of spacetime to the distribution of matter-energy within it. The equations were
Einstein_field_equations
Algebraic curve in mathematics
Let K be a field over which the curve is defined (that is, the coefficients of the defining equation or equations of the curve are in K) and denote the curve
Elliptic_curve
are used. Defining equation (physical chemistry) List of electromagnetism equations List of equations in classical mechanics List of equations in fluid
List of equations in quantum mechanics
List_of_equations_in_quantum_mechanics
Equation describing the flow of a fluid through a porous medium
Darcy's constitutive equation, for single phase (fluid) flow, is the defining equation for absolute permeability (single phase permeability). With reference
Darcy's_law
Type of Diophantine equation
Pell's equation, also called the Pell–Fermat equation, is any Diophantine equation of the form x 2 − n y 2 = 1 , {\displaystyle x^{2}-ny^{2}=1,} where
Pell's_equation
Polynomial equation whose integer solutions are sought
Diophantine equation is a polynomial equation with integer coefficients, for which only integer solutions are of interest. A linear Diophantine equation equates
Diophantine_equation
classical equations. Defining equation (physical chemistry) List of electromagnetism equations List of equations in classical mechanics List of equations in
List of equations in gravitation
List_of_equations_in_gravitation
Partial differential equation
mechanics and information theory, the Fokker–Planck equation is a partial differential equation that describes the time evolution of the probability
Fokker–Planck_equation
Polynomial equation of degree 3
zero. The solutions of this equation are called roots of the cubic function defined by the left-hand side of the equation. If all of the coefficients
Cubic_equation
Mathematical formula expressing equality
languages may have subtly different meanings; for example, in French an équation is defined as containing one or more variables, while in English, any well-formed
Equation
Description of a quantum-mechanical system
The Schrödinger equation is a partial differential equation that governs the wave function of a non-relativistic quantum-mechanical system. Its discovery
Schrödinger_equation
Equations of motion for viscous fluids
Navier–Stokes equations (/nævˈjeɪ ˈstoʊks/ nav-YAY STOHKS) describe the motion of viscous fluids. This system of partial differential equations was named
Navier–Stokes_equations
Partial differential equation describing the evolution of temperature in a region
specifically thermodynamics), the heat equation is a parabolic partial differential equation. The theory of the heat equation was first developed by Joseph Fourier
Heat_equation
Generalization of the Dirac equation
vector fields (which are not necessarily defined globally on M {\displaystyle M} ). Their defining equation is g a b e μ a e ν b = η μ ν . {\displaystyle
Dirac equation in curved spacetime
Dirac_equation_in_curved_spacetime
Expression whose definition assigns it a unique interpretation
regarding the well-definedness of a function often arise when the defining equation of a function refers not only to the arguments themselves, but also
Well-defined_expression
2nd-degree plane curve which is reducible
plane curve, defined by a polynomial equation of degree two) that fails to be an irreducible curve. This means that the defining equation is factorable
Degenerate_conic
Differential equation for the description of waves or standing wave
The wave equation is a second-order linear partial differential equation for the description of waves or standing wave fields such as mechanical waves
Wave_equation
Central object in linear algebra; mapping vectors to vectors
the defining equation, which reduces to A e i = λ i e i {\displaystyle A\mathbf {e} _{i}=\lambda _{i}\mathbf {e} _{i}} . The resulting equation is known
Transformation_matrix
Type of differential equation
In mathematics, a partial differential equation (PDE) is an equation which involves a multivariable function and one or more of its partial derivatives
Partial_differential_equation
Curve defined as zeros of polynomials
plane curve by homogenizing its defining polynomial. Conversely, a projective algebraic plane curve of homogeneous equation h(x, y, t) = 0 can be restricted
Algebraic_curve
Differential equation containing derivatives with respect to only one variable
differential equations (SDEs) where the modeled process is random. A linear differential equation is a differential equation that is defined by a linear
Ordinary differential equation
Ordinary_differential_equation
Approach to public-key cryptography
curve. The elliptic curve is defined by the coefficients in its defining equation. Finally, the cyclic subgroup is defined by its generator (a.k.a. base
Elliptic-curve_cryptography
Mathematical algorithm
^{k}~M_{n-k},} where one may define the harmless M0≡0. Inserting the explicit polynomial forms into the defining equation for the adjugate, above, ∑ k
Faddeev–LeVerrier_algorithm
Equation describing the transport of some quantity
A continuity equation or transport equation is an equation that describes the transport of some quantity. It is particularly simple and powerful when
Continuity_equation
Representation of a type of random process
X_{t-2}+\varepsilon _{t-1}} for X t − 1 {\displaystyle X_{t-1}} in the defining equation. Continuing this process N times yields X t = φ N X t − N + ∑ k =
Autoregressive_model
Electromagnetic effect of point charges
of the retarded time. Taking the derivatives of both sides of its defining equation (remembering that r s = r s ( t r ) {\displaystyle \mathbf {r_{s}}
Liénard–Wiechert_potential
Relativistic quantum mechanical wave equation
In particle physics, the Dirac equation is a relativistic wave equation derived by British physicist Paul Dirac in 1928. In its free form, or including
Dirac_equation
Geographic coordinate specifying north-south position
methods of proceeding. The first is a numerical inversion of the defining equation for each and every particular value of the auxiliary latitude. The
Latitude
These equations need to be refined such that the notation is defined as has been done for the previous sets of equations. Defining equation (physical
List of equations in nuclear and particle physics
List_of_equations_in_nuclear_and_particle_physics
Algorithm to solve systems of equations
above standard case is the fact that the left and right sides of the defining equation can differ by an unknown multiplicative factor which is dependent
Direct_linear_transformation
Necessary condition for optimality associated with dynamic programming
A Bellman equation, named after Richard E. Bellman, is a technique in dynamic programming which breaks an optimization problem into a sequence of simpler
Bellman_equation
Equation of the state of a hypothetical ideal gas
The ideal gas law, also called the general gas equation, is the equation of state of a hypothetical ideal gas. It is a good approximation of the behavior
Ideal_gas_law
Physical law in electrochemistry
In electrochemistry, the Nernst equation is a chemical thermodynamical relationship that permits the calculation of the reduction potential of a reaction
Nernst_equation
Matrix whose only nonzero elements are on its main diagonal
en, for which the matrix A takes the diagonal form. Hence, in the defining equation A e j = ∑ i a i , j e i {\textstyle \mathbf {Ae} _{j}=\sum _{i}a_{i
Diagonal_matrix
Estimate of extraterrestrial civilizations
The Drake equation is a probabilistic argument used to estimate the number of active, communicative extraterrestrial civilizations in the Milky Way Galaxy
Drake_equation
Set of quasilinear hyperbolic equations governing adiabatic and inviscid flow
In fluid dynamics, the Euler equations are a set of partial differential equations governing adiabatic and inviscid flow. They are named after Leonhard
Euler equations (fluid dynamics)
Euler_equations_(fluid_dynamics)
Type of motion in which the path of the moving object is a straight line
|\mathbf {v} |} is called the instantaneous speed. The instantaneous velocity equation comes from finding the limit as t approaches 0 of the average velocity
Linear_motion
are used. Defining equation (physical chemistry) List of equations in classical mechanics List of equations in fluid mechanics List of equations in gravitation
List of equations in wave theory
List_of_equations_in_wave_theory
Elliptic partial differential equation
Poisson's equation is an elliptic partial differential equation of broad utility in theoretical physics. For example, the solution to Poisson's equation is the
Poisson's_equation
Topics referred to by the same term
from Bell Labs that outputs a sequence of numbers Schrödinger equation, a defining equation of quantum mechanics Sequence data (or .seq), a file that stores
SEQ
Plane curve: conic section
hy-PUR-bə-lə) is a type of smooth curve lying in a plane, defined by its geometric properties or by equations for which it is the solution set. A hyperbola has
Hyperbola
text of the article, but the example used units of luminance. The defining equation used the symbol L v {\displaystyle L_{v}} . The table at the end of
Light_value
Coordinate transformation that preserves the form of Hamilton's equations
change the right-hand side of the equation below. To derive the implicit transformation, we expand the defining equation above p ⋅ q ˙ − H ( q , p , t )
Canonical_transformation
Constraint equations of a mechanical system
Kinematics equations are the constraint equations of a mechanical system such as a robot manipulator that define how input movement at one or more joints
Kinematics_equations
Stochastic process modeling random walk with friction
-y{\frac {d}{dy}}\phi -{\frac {\lambda }{\theta }}\phi =0} which is the defining equation for Hermite polynomials. Its solutions are ϕ ( y ) = H e n ( y ) {\displaystyle
Ornstein–Uhlenbeck_process
On solvability of Diophantine equations
polynomial in an equation defining that set. Similarly, we can call the dimension of such a set the fewest unknowns in a defining equation. Because of the
Hilbert's_tenth_problem
Statistical phenomenon where some effects appear the same
{\displaystyle s=3} . To each defining expression (the left-hand side of a defining equation) corresponds a defining word. The defining words generate a subgroup
Aliasing (factorial experiments)
Aliasing_(factorial_experiments)
Second-order partial differential equation
In mathematics and physics, Laplace's equation is a second-order partial differential equation named after Pierre-Simon Laplace, who first studied its
Laplace's_equation
Mathematical concept
century. Every algebraic plane curve has a degree, the degree of the defining equation, which is equal, in case of an algebraically closed field, to the
Plane_curve
Unit in physics
{\displaystyle {\frac {\Delta \rho /\rho }{\varepsilon }}} term of the defining equation above. In constantan strain gauges (the most commercially popular)
Gauge_factor
Topological space that locally resembles Euclidean space
the neighborhood of every point because the left hand side of its defining equation x 2 + y 2 − 1 = 0 {\displaystyle x^{2}+y^{2}-1=0} has nonzero gradient
Manifold
Principal square root of minus 1
real axis). Being a quadratic polynomial with no multiple root, the defining equation x2 = −1 has two distinct solutions, which are equally valid and which
Imaginary_unit
Physical constant equivalent to the Boltzmann constant, but in different units
density. Finally, by defining the kinetic energy associated to the temperature, T := k B T , {\displaystyle T:=k_{\text{B}}T,} the equation becomes simply P
Gas_constant
Number used in algebraic geometry
The degree of a hypersurface is equal to the total degree of its defining equation. A generalization of Bézout's theorem asserts that, if an intersection
Degree of an algebraic variety
Degree_of_an_algebraic_variety
Partial differential equations whose solutions are instantons
differential geometry and gauge theory, the Yang–Mills equations are a system of partial differential equations for a connection on a vector bundle or principal
Yang–Mills_equations
Programming language
distinction from defining equations. Similarly, extra variables (i.e., variables not occurring in the left-hand side of the defining equation) are explicitly
Curry_(programming_language)
Formulation of classical mechanics using momenta
isomorphism, one can define a cometric. (In coordinates, the matrix defining the cometric is the inverse of the matrix defining the metric.) The solutions
Hamiltonian_mechanics
Principle relating to fluid dynamics
speed increases, it was Leonhard Euler in 1752 who derived Bernoulli's equation in its usual form. Bernoulli's principle can be derived from the principle
Bernoulli's_principle
Polynomial equation of degree two
In mathematics, a quadratic equation (from Latin quadratus 'square') is an equation that can be rearranged in standard form as a x 2 + b x + c = 0 , {\displaystyle
Quadratic_equation
Mathematical models for calculating viscosity
mathematical viscosity model called a constitutive equation, which is usually far more complex than the defining equation of shear viscosity. One such complicating
Viscosity_models_for_mixtures
Coefficients in angular momentum eigenstates of quantum systems
1+1\otimes \mathrm {j} _{\mathrm {z} }\end{aligned}}} to both sides of the defining equation shows that the Clebsch–Gordan coefficients can only be nonzero when
Clebsch–Gordan_coefficients
Operator equation in the style of Fredholm theory
In mathematics, the Volterra integral equations are a special type of integral equations, named after Vito Volterra. They are divided into two groups referred
Volterra_integral_equation
Mathematical descriptions of transmission line voltage and current
The telegrapher's equations (or telegraph equations) are a set of two coupled, linear partial differential equations that model voltage and current along
Telegrapher's_equations
Mathematical function, inverse of an exponential function
{\displaystyle b=x^{\frac {1}{y}},} which can be seen from taking the defining equation x = b log b x = b y {\displaystyle x=b^{\,\log _{b}x}=b^{y}} to
Logarithm
Equation for the force of drag
drag equation is a formula used to calculate the force of drag experienced by an object due to movement through a fully enclosing fluid. The equation is:
Drag_equation
Formulation of classical mechanics
Lagrange's equations and defining the Lagrangian as L = T − V obtains Lagrange's equations of the second kind or the Euler–Lagrange equations of motion
Lagrangian_mechanics
Law describing the pressure drop in an incompressible and Newtonian fluid
dynamics, the Hagen–Poiseuille equation, also known as the Hagen–Poiseuille law, Poiseuille law or Poiseuille equation, is a physical law that gives the
Hagen–Poiseuille_equation
Expression of the ionic flux across a cell membrane
The Goldman–Hodgkin–Katz flux equation (or GHK flux equation or GHK current density equation) describes the ionic flux across a cell membrane as a function
Goldman–Hodgkin–Katz flux equation
Goldman–Hodgkin–Katz_flux_equation
Model for flow conditions around rotating disk electrodes
terms in the velocity expression are available. The Levich equation is often simplified by defining a Levich constant B such that: I L = ( 0.620 ) n F A D
Levich_equation
Second-order partial differential equation describing motion of mechanical system
classical mechanics, the Euler–Lagrange equations are a system of second-order ordinary differential equations whose solutions are stationary points of
Euler–Lagrange_equation
Foundational law of classical magnetism
for use with the SI is not standard and depends on the choice of defining equation for the magnetic charge and current; in one variation, magnetic charge
Gauss's_law_for_magnetism
Higher-order function Y for which Y f = f (Y f)
evaluation, as in Haskell, it is possible to define a fixed-point combinator using the defining equation of the fixed-point combinator which is conventionally
Fixed-point_combinator
Type of signal processing filter
unity. The cutoff attenuation equation may be derived through algebraic manipulation of the Butterworth defining equation stated at the top of the page
Butterworth_filter
Electrical engineering standard
component are related to the voltage v and current i variables by the defining equation for power and Ohm's law: p = v i ( 1 ) {\displaystyle p=vi\qquad \qquad
Passive_sign_convention
DEFINING EQUATION
DEFINING EQUATION
Boy/Male
German American Teutonic
Defending warrior.
Girl/Female
Hindu, Indian, Marathi, Sanskrit, Telugu
Desiring Union
Boy/Male
Hindu
Defending men
Boy/Male
Muslim
Desiring, Willing
Surname or Lastname
English
English : patronymic from an Old English personal name, Dynna.Irish : variant of Dineen.German : habitational name from Denning in Bavaria.
Boy/Male
Tamil
Manasyu | மாநஸà¯à®¯à¯‚
Wishing, Desiring
Manasyu | மாநஸà¯à®¯à¯‚
Girl/Female
Indian
Desiring, Desirous
Boy/Male
Tamil
Tarshit | தாரà¯à®·à®¿à®¤
Thirsty, Desiring
Tarshit | தாரà¯à®·à®¿à®¤
Girl/Female
Muslim
Desiring, Desirous
Boy/Male
Hindu
Thirsty, Desiring
Boy/Male
German
Defending warrior.
Girl/Female
Biblical
Divining.
Boy/Male
Biblical
Desiring God.
Boy/Male
Indian
Desiring, Willing
Boy/Male
Tamil
Manashyu | மாஂநாஷà¯à®¯à¯à®‚
Wishing, Desiring
Manashyu | மாஂநாஷà¯à®¯à¯à®‚
Boy/Male
Tamil
Defending men
Biblical
divining
Boy/Male
Teutonic
Defending ruler.
Boy/Male
Hindu
Wishing, Desiring
Girl/Female
Tamil
Milika | மிலிக஼ா
Desiring union
DEFINING EQUATION
DEFINING EQUATION
Girl/Female
American, Australian, Hebrew
Supplanter; Holder of the Heel; May God Protect; One who Supplants
Boy/Male
Indian, Punjabi, Sikh
Full of Righteousness
Girl/Female
Muslim
Precious
Boy/Male
Hindu, Indian, Tamil
God is Gracious
Girl/Female
Arabic, Muslim, Pashtun
Beautiful
Boy/Male
Gujarati, Indian, Kannada
Sight
Girl/Female
Hebrew
Lovely tune.
Girl/Female
Hindu, Indian
Young Girl
Surname or Lastname
English
English : variant spelling of Mitton.
Girl/Female
Hindu
DEFINING EQUATION
DEFINING EQUATION
DEFINING EQUATION
DEFINING EQUATION
DEFINING EQUATION
p. pr. & vb. n.
of Deify
a.
Having certain limits in signification; determinate; certain; precise; fixed; exact; clear; as, a definite word, term, or expression.
a.
Distinguishing; distinctive; defining.
p. pr. & vb. n.
of Define
n.
The process of fining or refining; clarification; also (Metal.), the conversion of cast iron into suitable for puddling, in a hearth or charcoal fire.
n.
A defiling; pollution; stain.
a.
Serving to define or restrict; limiting; determining; as, the definite article.
a.
Declining; sloping.
n.
The act of defining; definition; description.
n.
The act or practice of drining the surface of land.
n.
The act of defiling; defilement; pollution.
a.
That divines; for divining.
a.
Having certain or distinct; determinate in extent or greatness; limited; fixed; as, definite dimensions; a definite measure; a definite period or interval.
p. pr. & vb. n.
of Defile
p. pr. & vb. n.
of Deign
p. pr. & vb. n.
of Demise
p. pr. & vb. n.
of Refine
a.
Intriguing; artful; scheming; as, a designing man.
a.
Drooling; defiling with saliva.
n.
A devising.