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COMPLEX PLANE

  • Complex plane
  • Geometric representation of the complex numbers

    In mathematics, the complex plane is the plane formed by the complex numbers, with a Cartesian coordinate system such that the horizontal x-axis, called

    Complex plane

    Complex plane

    Complex_plane

  • Plane (mathematics)
  • 2D surface which extends indefinitely

    in adding more structure, one may view the plane as a 1-dimensional complex manifold, called the complex line. Many fundamental tasks in mathematics

    Plane (mathematics)

    Plane_(mathematics)

  • Riemann sphere
  • Model of the extended complex plane plus a point at infinity

    of the extended complex plane (also called the closed complex plane): the complex plane plus one point at infinity. This extended plane represents the

    Riemann sphere

    Riemann sphere

    Riemann_sphere

  • Complex number
  • Number with a real and an imaginary part

    standard basis makes the complex numbers a Cartesian plane, called the complex plane. This allows a geometric interpretation of the complex numbers and their

    Complex number

    Complex number

    Complex_number

  • Holomorphic function
  • Complex-differentiable (mathematical) function

    regular functions. A holomorphic function whose domain is the whole complex plane is called an entire function. The phrase "holomorphic at a point ⁠ z

    Holomorphic function

    Holomorphic function

    Holomorphic_function

  • Complex logarithm
  • Logarithm of a complex number

    These logarithms are equally spaced along a vertical line in the complex plane. A complex-valued function log : U → C {\displaystyle \log \colon U\to \mathbb

    Complex logarithm

    Complex logarithm

    Complex_logarithm

  • Generalised circle
  • Concept in geometry including line and circle

    sphere. The extended Euclidean plane can be identified with the extended complex plane, so that equations of complex numbers can be used to describe

    Generalised circle

    Generalised_circle

  • Complex analysis
  • Branch of mathematics studying functions of a complex variable

    integration: the integral of a holomorphic function over a contour in the complex plane does not depend on the details of the contour, only how it winds around

    Complex analysis

    Complex analysis

    Complex_analysis

  • Complex projective plane
  • 2-dimensional complex projective space

    In mathematics, the complex projective plane, usually denoted ⁠ P 2 ( C ) {\displaystyle \mathbb {P} ^{2}(\mathbb {C} )} ⁠ or ⁠ C P 2 , {\displaystyle

    Complex projective plane

    Complex_projective_plane

  • Sine and cosine
  • Fundamental trigonometric functions

    the complex plane, the function e i x {\displaystyle e^{ix}} for real values of x {\displaystyle x} traces out the unit circle in the complex plane. Both

    Sine and cosine

    Sine and cosine

    Sine_and_cosine

  • Upper half-plane
  • Complex numbers with non-negative imaginary part

    Poincaré half-plane model. Mathematicians sometimes identify the Cartesian plane with the complex plane, and then the upper half-plane corresponds to

    Upper half-plane

    Upper_half-plane

  • Split-complex number
  • Reals with an extra square root of +1 adjoined

    the ordinary complex ones. The collection of all such z is called the split-complex plane. Addition and multiplication of split-complex numbers are defined

    Split-complex number

    Split-complex_number

  • Analytic function
  • Type of function in mathematics

    definition of a complex analytic function is obtained by replacing, in the definitions above, "real" with "complex" and "real line" with "complex plane". A function

    Analytic function

    Analytic function

    Analytic_function

  • Unit circle
  • Circle with radius of one

    additional examples. In the complex plane, numbers of unit magnitude are called the unit complex numbers. This is the set of complex numbers z such that | z

    Unit circle

    Unit circle

    Unit_circle

  • Exponential function
  • Mathematical function, denoted exp(x) or e^x

    generalized to accept complex numbers as arguments. This reveals relations between multiplication of complex numbers, rotations in the complex plane, and trigonometry

    Exponential function

    Exponential function

    Exponential_function

  • Riemann surface
  • One-dimensional complex manifold

    thought of as deformed versions of the complex plane: locally near every point they look like patches of the complex plane, but the global topology can be quite

    Riemann surface

    Riemann surface

    Riemann_surface

  • Infinity
  • Mathematical concept

    \infty } can be added to the complex plane as a topological space giving the one-point compactification of the complex plane. When this is done, the resulting

    Infinity

    Infinity

    Infinity

  • Two-dimensional space
  • Mathematical space with two coordinates

    represent physical positions, like an affine plane or complex plane. The most basic example is the flat Euclidean plane, an idealization of a flat surface in

    Two-dimensional space

    Two-dimensional_space

  • Unit hyperbola
  • Geometric figure

    hyperbola is the set of points ( x , y ) {\displaystyle (x,y)} in the Cartesian plane that satisfy the implicit equation x 2 − y 2 = 1 {\displaystyle x^{2}-y^{2}=1}

    Unit hyperbola

    Unit hyperbola

    Unit_hyperbola

  • Attractor
  • Limiting set in dynamical systems

    method can also be applied to complex functions to find their roots. Each root has a basin of attraction in the complex plane; these basins can be mapped

    Attractor

    Attractor

    Attractor

  • Zeros and poles
  • Concept in complex analysis

    meromorphic functions. For example, if a function is meromorphic on the whole complex plane plus the point at infinity, then the sum of the multiplicities of its

    Zeros and poles

    Zeros and poles

    Zeros_and_poles

  • Meromorphic function
  • Class of mathematical function

    the mathematical field of complex analysis, a meromorphic function on an open subset D {\displaystyle D} of the complex plane is a function that is holomorphic

    Meromorphic function

    Meromorphic function

    Meromorphic_function

  • Absolute value
  • Distance from zero to a number

    The absolute value of a complex number is defined by the Euclidean distance of its corresponding point in the complex plane from the origin. This can

    Absolute value

    Absolute value

    Absolute_value

  • Eisenstein integer
  • Complex number whose mapping on a coordinate plane produces a triangular lattice

    triangular lattice in the complex plane, in contrast with the Gaussian integers, which form a square lattice in the complex plane. The Eisenstein integers

    Eisenstein integer

    Eisenstein integer

    Eisenstein_integer

  • Phasor
  • Complex number representing a particular sine wave

    A\cos(\omega t+\theta ).} Figure 2 depicts it as a rotating vector in the complex plane. It is sometimes convenient to refer to the entire function as a phasor

    Phasor

    Phasor

    Phasor

  • Euler's formula
  • Complex exponential in terms of sine and cosine

    ex to the complex plane. The exponential function f ( z ) = e z {\displaystyle f(z)=e^{z}} is the unique differentiable function of a complex variable

    Euler's formula

    Euler's formula

    Euler's_formula

  • Gamma function
  • Extension of the factorial function

    }t^{z-1}e^{-t}\,dt,\ \qquad \Re (z)>0.} The gamma function then is defined in the complex plane as the analytic continuation of this integral function: it is a meromorphic

    Gamma function

    Gamma function

    Gamma_function

  • Extrapolation
  • Method for estimating new data outside known data points

    This transform exchanges the part of the complex plane inside the unit circle with the part of the complex plane outside of the unit circle. In particular

    Extrapolation

    Extrapolation

    Extrapolation

  • Unit disk
  • Set of points at distance less than one from a given point

    identified with the set of all complex numbers of absolute value less than one. When viewed as a subset of the complex plane (C), the open unit disk is often

    Unit disk

    Unit disk

    Unit_disk

  • Imaginary unit
  • Principal square root of minus 1

    2π to this angle works as well.) In the complex plane, which is a special interpretation of a Cartesian plane, i is the point located one unit from the

    Imaginary unit

    Imaginary unit

    Imaginary_unit

  • Hyperbolic functions
  • Hyperbolic analogues of trigonometric functions

    result, the other hyperbolic functions are meromorphic in the whole complex plane. By Lindemann–Weierstrass theorem, the hyperbolic functions have a transcendental

    Hyperbolic functions

    Hyperbolic functions

    Hyperbolic_functions

  • Plane curve
  • Mathematical concept

    In mathematics, a plane curve is a curve in a plane that may be a Euclidean plane, an affine plane or a projective plane. The most frequently studied cases

    Plane curve

    Plane_curve

  • Airy function
  • Special function in the physical sciences

    ... As explained below, the Airy functions can be extended to the complex plane, giving entire functions. The asymptotic behaviour of the Airy functions

    Airy function

    Airy function

    Airy_function

  • Cubic equation
  • Polynomial equation of degree 3

    [clarification needed] With one real and two complex roots, the three roots can be represented as points in the complex plane, as can the two roots of the cubic's

    Cubic equation

    Cubic equation

    Cubic_equation

  • Complex geometry
  • Study of complex manifolds and several complex variables

    objects which are modelled, in some sense, on the complex plane. Features of the complex plane and complex analysis of a single variable, such as an intrinsic

    Complex geometry

    Complex_geometry

  • Trigonometric interpolation
  • Interpolation with trigonometric polynomials

    conditions. The problem becomes more natural if we formulate it in the complex plane. We can rewrite the formula for a trigonometric polynomial as p ( x

    Trigonometric interpolation

    Trigonometric_interpolation

  • Trigonometric functions
  • Functions of an angle

    cosine functions to the whole complex plane, and the domain of the other trigonometric functions to the complex plane with some isolated points removed

    Trigonometric functions

    Trigonometric functions

    Trigonometric_functions

  • Bessel function
  • Family of solutions to related differential equations

    } Both Jα(x) and Yα(x) are holomorphic functions of x on the complex plane cut along the negative real axis. When α is an integer, the Bessel functions

    Bessel function

    Bessel function

    Bessel_function

  • Mandelbrot set
  • Fractal named after mathematician Benoit Mandelbrot

    (/ˈmændəlbroʊt, -brɒt/) is a two-dimensional set. It is defined in the complex plane as the complex numbers c {\displaystyle c} for which the function f c ( z )

    Mandelbrot set

    Mandelbrot set

    Mandelbrot_set

  • Polar coordinate system
  • Coordinates comprising a distance and an angle

    In mathematics, the polar coordinate system specifies a given point in a plane by using a distance and an angle as its two coordinates. These are the point's

    Polar coordinate system

    Polar coordinate system

    Polar_coordinate_system

  • Error function
  • Sigmoid shape special function

    a complex contour integral which is path-independent because exp ⁡ ( − t 2 ) {\displaystyle \exp(-t^{2})} is holomorphic on the whole complex plane C

    Error function

    Error function

    Error_function

  • Inverse trigonometric functions
  • Inverse functions of sin, cos, tan, etc.

    These functions may also be expressed using complex logarithms. This extends their domains to the complex plane in a natural fashion. The following identities

    Inverse trigonometric functions

    Inverse trigonometric functions

    Inverse_trigonometric_functions

  • Inverse hyperbolic functions
  • Mathematical functions

    branch of the multivalued function, over a domain consisting of the complex plane in which a finite number of arcs (usually half lines or line segments)

    Inverse hyperbolic functions

    Inverse hyperbolic functions

    Inverse_hyperbolic_functions

  • Argument (complex analysis)
  • Angle of complex number about real axis

    and the line joining the origin and z, represented as a point in the complex plane, shown as φ {\displaystyle \varphi } in Figure 1. By convention the

    Argument (complex analysis)

    Argument (complex analysis)

    Argument_(complex_analysis)

  • Hypergeometric function
  • Function defined by a hypergeometric series

    {(b)_{n}}{(c)_{n}}}z^{n}.} For complex arguments z with |z| ≥ 1 it can be analytically continued along any path in the complex plane that avoids the branch points

    Hypergeometric function

    Hypergeometric function

    Hypergeometric_function

  • Algebraic curve
  • Curve defined as zeros of polynomials

    algebraic plane curve is the zero set of a polynomial in two variables. A projective algebraic plane curve is the zero set in a projective plane of a homogeneous

    Algebraic curve

    Algebraic curve

    Algebraic_curve

  • Poincaré half-plane model
  • Upper-half plane model of hyperbolic non-Euclidean geometry

    outside the hyperbolic plane proper. Sometimes the points of the half-plane model are considered to lie in the complex plane with positive imaginary

    Poincaré half-plane model

    Poincaré half-plane model

    Poincaré_half-plane_model

  • Euclidean plane
  • Geometric model of the planar projection of the physical universe

    the plane was thought of as a field, where any two points could be multiplied and, except for 0, divided. This was known as the complex plane. The complex

    Euclidean plane

    Euclidean plane

    Euclidean_plane

  • Continued fraction
  • Mathematical expression

    extended complex plane into a single point. Notice that the sequence {Τn} lies within the automorphism group of the extended complex plane, since each

    Continued fraction

    Continued_fraction

  • Uniformization theorem
  • Simply connected Riemann surface is equivalent to an open disk, complex plane, or sphere

    complex plane, or the Riemann sphere. The theorem is a generalization of the Riemann mapping theorem from simply connected open subsets of the plane to

    Uniformization theorem

    Uniformization_theorem

  • Nth root
  • Arithmetic operation, inverse of nth power

    number. As a function, the principal root is continuous in the whole complex plane, except along the negative real axis. The nth roots of 1 are called

    Nth root

    Nth root

    Nth_root

  • Circle
  • Simple curve of Euclidean geometry

    A circle is a shape consisting of all points in a plane that are at a given distance from a given point, the centre. The distance between any point of

    Circle

    Circle

    Circle

  • Entire function
  • Function that is holomorphic on the whole complex plane

    complex analysis, an entire function, also called an integral function, is a complex-valued function that is holomorphic on the whole complex plane.

    Entire function

    Entire_function

  • Möbius transformation
  • Rational function of the form (az + b)/(cz + d)

    In geometry and complex analysis, a Möbius transformation of the complex plane is a rational function of the form f ( z ) = a z + b c z + d {\displaystyle

    Möbius transformation

    Möbius_transformation

  • Mercator projection
  • Cylindrical conformal map projection

    mapping the sphere onto the complex plane via the stereographic projection. From there, the Mercator projection is just the complex logarithm, ⁠ z ↦ log ⁡

    Mercator projection

    Mercator projection

    Mercator_projection

  • Pole–zero plot
  • Diagram showing the singularities of a given control system's transfer function

    is a graphical representation of a rational transfer function in the complex plane which helps to convey certain properties of the system such as: Stability

    Pole–zero plot

    Pole–zero plot

    Pole–zero_plot

  • Number
  • Used to count, measure, and label

    [clarification needed] This eventually led to the concept of the extended complex plane. Prime numbers may have been studied throughout recorded history. They

    Number

    Number

    Number

  • Wave packet
  • Short "burst" or "envelope" of restricted wave action that travels as a unit

    medium. Using the physics time convention, e−iωt, the wave equation has plane-wave solutions u ( x , t ) = e i ( k ⋅ x − ω ( k ) t ) , {\displaystyle

    Wave packet

    Wave packet

    Wave_packet

  • Complex Networks
  • American media and entertainment company

    to advertise within the collective. Complex now includes over 100 sites. In 2011, Complex acquired Pigeons & Planes, an indie music and rap blog, and brought

    Complex Networks

    Complex Networks

    Complex_Networks

  • Rotation matrix
  • Matrix representing a Euclidean rotation

    xy plane counterclockwise through an angle θ about the origin of a two-dimensional Cartesian coordinate system. To perform the rotation on a plane point

    Rotation matrix

    Rotation_matrix

  • Fresnel integral
  • Special function defined by an integral

    real and positive; this can be evaluated by closing a contour in the complex plane and applying Cauchy's integral theorem. The Fresnel integrals admit

    Fresnel integral

    Fresnel integral

    Fresnel_integral

  • Hyperbolic motion
  • Isometric automorphisms of a hyperbolic space

    motions is in the study of mappings of the complex plane by Möbius transformations. Textbooks on complex functions often mention two common models of

    Hyperbolic motion

    Hyperbolic_motion

  • Logarithmic integral function
  • Special function defined by an integral

    logarithmic integral can also be taken to be a meromorphic complex-valued function in the complex domain. In this case it is multi-valued with branch points

    Logarithmic integral function

    Logarithmic integral function

    Logarithmic_integral_function

  • Nyquist stability criterion
  • Graphical method of determining the stability of a dynamical system

    transfer functions with right half-plane singularities. In addition, there is a natural generalization to more complex systems with multiple inputs and

    Nyquist stability criterion

    Nyquist stability criterion

    Nyquist_stability_criterion

  • Hilbert space
  • Type of vector space in math

    are often taken over the complex numbers. The complex plane denoted by C is equipped with a notion of magnitude, the complex modulus |z|, which is defined

    Hilbert space

    Hilbert space

    Hilbert_space

  • Sinusoidal plane wave
  • Type of plane wave

    sinusoidal plane wave is a special case of plane wave: a field whose value varies as a sinusoidal function of time and of the distance from some fixed plane. It

    Sinusoidal plane wave

    Sinusoidal_plane_wave

  • Complex conjugate
  • Fundamental operation on complex numbers

    In mathematics, the complex conjugate of a complex number is the number with an equal real part and an imaginary part equal in magnitude but opposite in

    Complex conjugate

    Complex conjugate

    Complex_conjugate

  • Dilogarithm
  • Special case of the polylogarithm

    (the integral definition constitutes its analytical extension to the complex plane): Li 2 ⁡ ( z ) = ∑ k = 1 ∞ z k k 2 . {\displaystyle \operatorname {Li}

    Dilogarithm

    Dilogarithm

    Dilogarithm

  • Contour integration
  • Method of evaluating certain integrals along paths in the complex plane

    mathematical field of complex analysis, contour integration is a method of evaluating certain integrals along paths in the complex plane. Contour integration

    Contour integration

    Contour_integration

  • Plane of rotation
  • Geometric object used to describe rotation in any number of dimensions

    dimensions, the plane of rotation is perpendicular to the axis of rotation. The main use for planes of rotation is in describing more complex rotations in

    Plane of rotation

    Plane_of_rotation

  • Topology
  • Branch of mathematics

    defined by a metric. This is the case of the real line, the complex plane, real and complex normed vector spaces and Euclidean spaces. Having a metric

    Topology

    Topology

    Topology

  • Lambert W function
  • Multivalued function in mathematics

    are disjoint. The range of the entire multivalued function W is the complex plane. The image of the real axis is the union of the real axis and the quadratrix

    Lambert W function

    Lambert W function

    Lambert_W_function

  • Annulus (mathematics)
  • Region between two concentric circles

    {\theta }{2}}\left(R^{2}-r^{2}\right).} In complex analysis an annulus ann(a; r, R) in the complex plane is an open region defined as r < | z − a | <

    Annulus (mathematics)

    Annulus (mathematics)

    Annulus_(mathematics)

  • Square
  • Shape with four equal sides and angles

    coordinates, or by repeated multiplication by i {\displaystyle i} in the complex plane. They form the metric balls for taxicab geometry and Chebyshev distance

    Square

    Square

    Square

  • Conformal map
  • Mathematical function that preserves angles

    semi-Riemannian manifolds. If U {\displaystyle U} is an open subset of the complex plane C {\displaystyle \mathbb {C} } , then a function f : U → C {\displaystyle

    Conformal map

    Conformal map

    Conformal_map

  • Smooth projective plane
  • classical planes over the complex numbers, the quaternions, and the octonions are smooth planes. However, these are not the only such planes. A smooth

    Smooth projective plane

    Smooth_projective_plane

  • Geometry
  • Branch of mathematics

    string theory. Complex geometry studies the nature of geometric structures modelled on, or arising out of, the complex plane. Complex geometry lies at

    Geometry

    Geometry

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

    }+1=0.} Any complex number z = x + i y {\displaystyle z=x+iy} can be represented by the point ( x , y ) {\displaystyle (x,y)} on the complex plane. This point

    Euler's identity

    Euler's identity

    Euler's_identity

  • Analytic number theory
  • Exploring properties of the integers with complex analysis

    was conceived as applying to power series near the unit circle in the complex plane; it is now thought of in terms of finite exponential sums (that is,

    Analytic number theory

    Analytic number theory

    Analytic_number_theory

  • Newton fractal
  • Boundary set in the complex plane

    The Newton fractal is a boundary set in the complex plane which is characterized by Newton's method applied to a fixed polynomial p(z) ∈ C {\displaystyle

    Newton fractal

    Newton fractal

    Newton_fractal

  • Residue theorem
  • Concept of complex analysis

    theorem: Let U {\displaystyle U} be a simply connected open subset of the complex plane containing a finite list of points ⁠ a 1 , … , a n {\displaystyle a_{1}

    Residue theorem

    Residue theorem

    Residue_theorem

  • Number line
  • Line formed by the real numbers

    The real line can be embedded in the complex plane, used as a two-dimensional geometric representation of the complex numbers. The first mention of the number

    Number line

    Number_line

  • Jacobi elliptic functions
  • Mathematical function

    of two circles, one real and the other imaginary. The complex plane can be replaced by a complex torus. The circumference of the first circle is 4 K {\displaystyle

    Jacobi elliptic functions

    Jacobi_elliptic_functions

  • Tetration
  • Arithmetic operation

    infinite results on the imaginary axis.[citation needed] Plotted in the complex plane, the entire sequence spirals to the limit 0.4383 + 0.3606i, which could

    Tetration

    Tetration

    Tetration

  • Domain coloring
  • Technique for visualizing complex functions

    the complex plane. By assigning points on the complex plane to different colors and brightness, domain coloring allows for a function from the complex plane

    Domain coloring

    Domain coloring

    Domain_coloring

  • Root of unity
  • Number with an integer power equal to 1

    }{n}}} is a primitive nth root of unity. This formula shows that in the complex plane the nth roots of unity are at the vertices of a regular n-sided polygon

    Root of unity

    Root of unity

    Root_of_unity

  • L-function
  • Meromorphic function on the complex plane

    An L-function is a meromorphic function on the complex plane, and one out of several categories of mathematical objects studied in analytic number theory

    L-function

    L-function

    L-function

  • Point at infinity
  • Concept in geometry

    added to the complex line (which may be thought of as the complex plane), thereby turning it into a closed surface known as the complex projective line

    Point at infinity

    Point at infinity

    Point_at_infinity

  • Quaternion
  • Four-dimensional number system

    published until 1900. Hamilton knew that the complex numbers could be interpreted as points in a plane, and he was looking for a way to do the same for

    Quaternion

    Quaternion

    Quaternion

  • Picard theorem
  • Theorem about the range of an analytic function

    values that f ( z ) {\textstyle f(z)} assumes is either the whole complex plane or the plane minus a single point. Sketch of Proof: Picard's original proof

    Picard theorem

    Picard theorem

    Picard_theorem

  • Nevanlinna theory
  • Area of mathematics

    deals with meromorphic functions of one complex variable defined in a disc |z| ≤ R or in the whole complex plane (R = ∞). Subsequent generalizations extended

    Nevanlinna theory

    Nevanlinna_theory

  • Function (mathematics)
  • Association of one output to each input

    functions whose domain is a small part of the complex plane to functions whose domain is almost the whole complex plane. Here is another classical example of

    Function (mathematics)

    Function_(mathematics)

  • Geometric function theory
  • Study of space and shapes locally given by a convergent power series

    In the most common case the function has a domain and range in the complex plane. More formally, a map, f : U → V {\displaystyle f:U\rightarrow V\qquad

    Geometric function theory

    Geometric_function_theory

  • Gaussian integer
  • Complex number whose real and imaginary parts are both integers

    which is a subring of the field of complex numbers. It is thus an integral domain. When considered within the complex plane, the Gaussian integers constitute

    Gaussian integer

    Gaussian integer

    Gaussian_integer

  • Line integral
  • Definite integral of a scalar or vector field along a path

    well, although that is typically reserved for line integrals in the complex plane. The function to be integrated may be a scalar field or a vector field

    Line integral

    Line_integral

  • Winding number
  • Number of times a curve wraps around a point in the plane

    a closed curve γ {\displaystyle \gamma } in the complex plane can be expressed in terms of the complex coordinate z = x + iy. Specifically, if we write

    Winding number

    Winding number

    Winding_number

  • Calculus
  • Branch of mathematics

    along any direction in the complex plane, the condition of differentiability is more restrictive for functions of a complex variable than it is for functions

    Calculus

    Calculus

  • Hyperbolic triangle
  • Triangle in hyperbolic geometry

    observer's viewpoint. In the half plane model, points with positive imaginary part in the complex plane comprise the hyperbolic plane. The real axis is part of

    Hyperbolic triangle

    Hyperbolic triangle

    Hyperbolic_triangle

  • Trigonometric integral
  • Special function defined by an integral

    {sinc} } ⁠ is an even entire function (holomorphic over the entire complex plane), ⁠ Si {\displaystyle \operatorname {Si} } ⁠ is entire, odd, and the

    Trigonometric integral

    Trigonometric integral

    Trigonometric_integral

  • Cayley transform
  • Mathematical operation

    1]{\begin{pmatrix}1&1\\-1&1\end{pmatrix}}.} On the upper half of the complex plane, the Cayley transform is: f ( z ) = z − i z + i . {\displaystyle f(z)={\frac

    Cayley transform

    Cayley_transform

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Online names & meanings

  • Mukshitha
  • Girl/Female

    Hindu, Indian

    Mukshitha

    Liberated

  • Unal
  • Boy/Male

    Muslim/Islamic

    Unal

    Fighter strong spirit

  • Aini
  • Girl/Female

    Arabic, Finnish, French, Indian, Indonesian, Kannada, Malaysian, Muslim, Swedish

    Aini

    Spring; Flower; Source; The Eye

  • Voisin
  • Surname or Lastname

    English (of Norman origin) and French

    Voisin

    English (of Norman origin) and French : from Old French voisin ‘neighbor’ (Anglo-Norman French veisin) . The application is uncertain; it may be a nickname for a ‘good neighbor’, or for someone who used this word as a frequent term of address, or it may be a topographic name for someone who lived on a neighboring property.

  • Mandir
  • Boy/Male

    Bengali, Hindu, Indian, Telugu

    Mandir

    Temple

  • Hrishika | ஹ்ரீஷீகா
  • Girl/Female

    Tamil

    Hrishika | ஹ்ரீஷீகா

    The village of birth

  • Margaid
  • Girl/Female

    Armenian

    Margaid

    meaning pearl.

  • Marcelino
  • Boy/Male

    Italian American

    Marcelino

    Form of the Latin Marcellus meaning hammer.

  • Nafisah |
  • Girl/Female

    Muslim

    Nafisah |

    Precious gem

  • Fairooza
  • Girl/Female

    Arabic, Muslim

    Fairooza

    A Precious Ge

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COMPLEX PLANE

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COMPLEX PLANE

  • Implex
  • a.

    Intricate; entangled; complicated; complex.

  • Complete
  • v. t.

    To bring to a state in which there is no deficiency; to perfect; to consummate; to accomplish; to fulfill; to finish; as, to complete a task, or a poem; to complete a course of education.

  • Incomplex
  • a.

    Not complex; uncompounded; simple.

  • Complexed
  • a.

    Complex, complicated.

  • Decomplex
  • a.

    Repeatedly compound; made up of complex constituents.

  • Complexus
  • n.

    A complex; an aggregate of parts; a complication.

  • Complier
  • n.

    One who complies, yields, or obeys; one of an easy, yielding temper.

  • Couple
  • a.

    See Couple-close.

  • Coupler
  • n.

    One who couples; that which couples, as a link, ring, or shackle, to connect cars.

  • Complexly
  • adv.

    In a complex manner; not simply.

  • Complex
  • n.

    Composed of two or more parts; composite; not simple; as, a complex being; a complex idea.

  • Complied
  • imp. & p. p.

    of Comply

  • Couple
  • a.

    One of the pairs of plates of two metals which compose a voltaic battery; -- called a voltaic couple or galvanic couple.

  • Couplet
  • n.

    Two taken together; a pair or couple; especially two lines of verse that rhyme with each other.

  • Compiler
  • n.

    One who compiles; esp., one who makes books by compilation.

  • Compiled
  • imp. & p. p.

    of Compile

  • Complete
  • a.

    Finished; ended; concluded; completed; as, the edifice is complete.

  • Couple-closes
  • pl.

    of Couple-close

  • Couple
  • a.

    That which joins or links two things together; a bond or tie; a coupler.

  • Coupled
  • imp. & p. p.

    of Couple