AI & ChatGPT searches , social queriess for INVERSE GAMMA-FUNCTION
Search references for INVERSE GAMMA-FUNCTION. Phrases containing INVERSE GAMMA-FUNCTION
See searches and references containing INVERSE GAMMA-FUNCTION!
Search references for INVERSE GAMMA-FUNCTION. Phrases containing INVERSE GAMMA-FUNCTION
See searches and references containing INVERSE GAMMA-FUNCTION!INVERSE GAMMA-FUNCTION
Inverse of the gamma function
In mathematics, the inverse gamma function Γ − 1 ( x ) {\displaystyle \Gamma ^{-1}(x)} is the inverse function of the gamma function. In other words, y
Inverse_gamma_function
Two-parameter family of continuous probability distributions
distribution differently, as a scaled inverse chi-squared distribution. The inverse gamma distribution's probability density function is defined over the support
Inverse-gamma_distribution
Extension of the factorial function
Elliptic gamma function Lemniscate constant Pseudogamma function Hadamard's gamma function Inverse gamma function Lanczos approximation Multiple gamma function
Gamma_function
Probability distribution
prefer the (α,β) parameterization, utilizing the gamma distribution as a conjugate prior for several inverse scale parameters, facilitating analytical tractability
Gamma_distribution
Mathematical operation
In mathematics, the inverse Laplace transform of a function F {\displaystyle F} is a real function f {\displaystyle f} that is piecewise-continuous,
Inverse_Laplace_transform
Image luminance mapping function
the only shades that are unaffected by gamma. To compensate for this effect, the inverse transfer function (gamma correction) is sometimes applied to the
Gamma_correction
function, Polygamma function Incomplete beta function Incomplete gamma function K-function Multivariate gamma function: A generalization of the Gamma
List of mathematical functions
List_of_mathematical_functions
Analytic function that does not satisfy a polynomial equation
the logarithm and inverse trigonometric functions. All special functions such as the gamma, error, bessel, and Riemann zeta functions are transcendental
Transcendental_function
Types of special mathematical functions
In mathematics, the upper and lower incomplete gamma functions are types of special functions which arise as solutions to various mathematical problems
Incomplete_gamma_function
Sigmoid shape special function
\end{aligned}}} The inverse of Φ is known as the normal quantile function, or probit function and may be expressed in terms of the inverse error function as probit
Error_function
Probability distribution
Further, Γ {\displaystyle \Gamma } is the gamma function. The inverse chi-squared distribution is a special case of the inverse-gamma distribution. with shape
Inverse-chi-squared distribution
Inverse-chi-squared_distribution
Probability distribution
/x)}{\Gamma _{1}(\alpha )}}.} i.e., the inverse-gamma distribution, where Γ 1 ( ⋅ ) {\displaystyle \Gamma _{1}(\cdot )} is the ordinary Gamma function. The
Inverse-Wishart_distribution
Mathematical function
In mathematics, the digamma function is defined as the logarithmic derivative of the gamma function: ψ ( z ) = d d z ln Γ ( z ) = Γ ′ ( z ) Γ ( z )
Digamma_function
Generalized mathematical function
If f : X → Y is an ordinary function, then its inverse is the multivalued function Γ f − 1 ⊆ Y × X {\displaystyle \Gamma _{f^{-1}}\ \subseteq \ Y\times
Multivalued_function
Family of multivariate continuous probability distributions
In probability theory and statistics, the normal-inverse-gamma distribution (or Gaussian-inverse-gamma distribution) is a four-parameter family of multivariate
Normal-inverse-gamma distribution
Normal-inverse-gamma_distribution
Mathematical function
reciprocal gamma function is the function f ( z ) = 1 Γ ( z ) , {\displaystyle f(z)={\frac {1}{\Gamma (z)}},} where Γ(z) denotes the gamma function. Since
Reciprocal_gamma_function
Probability theory
Other inverse distributions include inverse-chi-squared distribution inverse-gamma distribution inverse-Wishart distribution inverse matrix gamma distribution
Inverse_distribution
Continuous probability distribution
( γ ) ( t ) = W ( t ) + γ t {\displaystyle W^{(\gamma )}(t)=W(t)+\gamma t} , we can define the inverse Gaussian process A t = inf { s > 0 : W ( γ ) ( s
Normal-inverse Gaussian distribution
Normal-inverse_Gaussian_distribution
Probability distribution
instance of the hypergeometric function. For information on its inverse cumulative distribution function, see quantile function § Student's t-distribution
Student's_t-distribution
Statistical function that defines the quantiles of a probability distribution
probability distribution's quantile function is the inverse of its cumulative distribution function. That is, the quantile function of a distribution D {\displaystyle
Quantile_function
Multivariate generalization of the gamma function
gamma function Γp is a generalization of the gamma function. It is useful in multivariate statistics, appearing in the probability density function of
Multivariate_gamma_function
Fundamental trigonometric functions
the functional equation for the Gamma function, Γ ( s ) Γ ( 1 − s ) = π sin ( π s ) , {\displaystyle \Gamma (s)\Gamma (1-s)={\pi \over \sin(\pi s)},}
Sine_and_cosine
Method of solution to differential equations
Green's function. A Green's function can also be thought of as a right inverse of L. Aside from the difficulties of finding a Green's function for a particular
Green's_function
Analytic function in mathematics
{d} x} is the gamma function. The Riemann zeta function is defined for other complex values via analytic continuation of the function defined for σ >
Riemann_zeta_function
Type of mathematical function
polynomial functions, rational functions, the trigonometric functions, the exponential and logarithm functions, the n-th root, and the inverse trigonometric
Elementary_function
Special mathematical function defined as sin(x)/x
}\left(1-{\frac {x^{2}}{n^{2}}}\right)} and is related to the gamma function Γ(x), as well as to Gauss' Pi function, through Euler's reflection formula: sin ( π x
Sinc_function
Function with a smaller domain
restriction of a continuous function is continuous. For a function to have an inverse, it must be one-to-one. If a function f {\displaystyle f} is not
Restriction_(mathematics)
Integral transform useful in probability theory, physics, and engineering
x'(0)} , and can be solved for the unknown function X ( s ) {\displaystyle X(s)} . Once solved, the inverse Laplace transform can be used to transform
Laplace_transform
Probability distribution
{\displaystyle F(x;x_{0},\gamma )={\frac {1}{\pi }}\arctan \left({\frac {x-x_{0}}{\gamma }}\right)+{\frac {1}{2}}} and the quantile function (inverse cdf) of the Cauchy
Cauchy_distribution
Function uniquely mapping two numbers into a single number
pairing function and its inverse can be computed with finite-state transducers. In the same paper, the author proposed two more monotone pairing functions that
Pairing_function
Class of periodic mathematical functions
Abel discovered elliptic functions by taking the inverse function φ {\displaystyle \varphi } of the elliptic integral function α ( x ) = ∫ 0 x d t ( 1
Elliptic_function
Probability distribution and special case of gamma distribution
in the 1920s. Mathematics portal Chi distribution Scaled inverse chi-squared distribution Gamma distribution Generalized chi-squared distribution Noncentral
Chi-squared_distribution
Probability distribution
profile. It is a special case of the inverse-gamma distribution and a stable distribution. The probability density function of the Lévy distribution over the
Lévy_distribution
Function defined by a hypergeometric series
non-negative integer, one has 2F1(z) → ∞. Dividing by the value Γ(c) of the gamma function, we have the limit: lim c → − m 2 F 1 ( a , b ; c ; z ) Γ ( c ) = (
Hypergeometric_function
Difference between logarithm and harmonic series
for the gamma function and the Barnes G-function. The asymptotic expansion of the gamma function, Γ ( 1 / x ) ∼ x − γ {\displaystyle \Gamma (1/x)\sim
Euler's_constant
{C}}\Gamma _{p}(\nu )=\pi ^{{\tfrac {1}{2}}p(p-1)}\prod _{j=1}^{p}\Gamma (\nu -j+1)} The variances and covariances of the elements of the inverse complex
Complex inverse Wishart distribution
Complex_inverse_Wishart_distribution
Probability distribution
the normal-inverse-gamma distribution, which is the product of the two distributions just defined, with conjugate priors used (an inverse gamma distribution
Normal_distribution
Fourier transform of the probability density function
distribution function of X, fX is the corresponding probability density function, QX(p) is the corresponding inverse cumulative distribution function also called
Characteristic function (probability theory)
Characteristic_function_(probability_theory)
Mathematical function
the same absolute value, differing only in sign. Each function pq(u,m) has an "inverse function" (in the multiplicative sense) qp(u,m) in which the positions
Jacobi_elliptic_functions
Probability distribution
distributions, such as the normal, binomial, gamma, and Poisson distributions. The probability density function (pdf) of an exponential distribution is f
Exponential_distribution
Quantity in relativistic physics
1 ) m 0 c 2 {\displaystyle E_{k}=E-E_{0}=(\gamma -1)m_{0}c^{2}} As γ {\displaystyle \gamma } is a function of v c {\displaystyle {\tfrac {v}{c}}} , the
Lorentz_factor
Family of continuous probability distributions
generalized inverse Gaussian distribution (GIG) is a three-parameter family of continuous probability distributions with probability density function f ( x
Generalized inverse Gaussian distribution
Generalized_inverse_Gaussian_distribution
Process of calculating the causal factors that produced a set of observations
An inverse problem in science is the process of calculating from a set of observations the causal factors that produced them: for example, calculating
Inverse_problem
Method for solving certain nonlinear partial differential equations
how a function scatters waves or generates bound-states. The inverse scattering transform uses wave scattering data to construct the function responsible
Inverse_scattering_transform
Multivariate parameter family of continuous probability distributions
\nu )} . The normal-inverse-gamma distribution is the one-dimensional equivalent. The multivariate normal distribution and inverse Wishart distribution
Normal-inverse-Wishart distribution
Normal-inverse-Wishart_distribution
Probability distribution
alternative parametrization is given by the inverse-gamma distribution. The probability density function of the scaled inverse chi-squared distribution extends over
Scaled inverse chi-squared distribution
Scaled_inverse_chi-squared_distribution
Continuous function that is not absolutely continuous
the function C z ( y ) = ∑ k = 1 ∞ b k z k . {\displaystyle C_{z}(y)=\sum _{k=1}^{\infty }b_{k}z^{k}.} For z = 1/3, the inverse of the function x = 2 C1/3(y)
Cantor_function
Standard RGB color space
denoted with the letter γ {\displaystyle \gamma } , hence the common name "gamma correction" for this function. This design has the benefit of displaying
SRGB
Technique to solve partial differential equations
respectively. L f = ‖ f ‖ Γ {\displaystyle L_{f}=\Vert f\Vert _{\Gamma }} is the residual function. This second term requires the structured information represented
Physics-informed neural networks
Physics-informed_neural_networks
Number, approximately 3.14
\Gamma (n)=(n-1)!} . When the gamma function is evaluated at half-integers, the result contains π. For example, Γ ( 1 2 ) = π {\displaystyle \Gamma {\bigl
Pi
Inverse of a finite difference
1 ) {\displaystyle (x)_{k}={\frac {\Gamma (x+1)}{\Gamma (x-k+1)}}} is the falling factorial. Formally, the inverse forward difference operator can be expressed
Indefinite_sum
Mathematical function, inverse of an exponential function
logb x = y, so log10 1000 = 3. As a single-variable function, the logarithm to base b is the inverse of exponentiation with base b. The logarithm base 10
Logarithm
Mathematical formula involving a given set of operations
and include trigonometric functions, inverse trigonometric functions, hyperbolic functions, and inverse hyperbolic functions. The fundamental problem of
Closed-form_expression
Multivalued function in mathematics
Lambert W function by Corless, Gonnet, Hare, Jeffrey and Knuth. The name "product logarithm" can be understood as follows: since the inverse function of f
Lambert_W_function
Mathematical method in calculus
integral of an inverse function f−1(x) when the integral of the function f(x) is known. Indeed, the functions x(y) and y(x) are inverses, and the integral
Integration_by_parts
Generalization of the hypergeometric function
ds,} where Γ denotes the gamma function. This integral is of the so-called Mellin–Barnes type, and may be viewed as an inverse Mellin transform. The definition
Meijer_G-function
Transcendental single-variable function
polylogarithm, inverse tangent integral, polygamma function, Riemann zeta function, Dirichlet eta function, and Dirichlet beta function. The Clausen function of order
Clausen_function
Continuous probability distribution
{\displaystyle \gamma _{2}={\frac {-6\Gamma _{1}^{4}+12\Gamma _{1}^{2}\Gamma _{2}-3\Gamma _{2}^{2}-4\Gamma _{1}\Gamma _{3}+\Gamma _{4}}{[\Gamma _{2}-\Gamma _{1}^{2}]^{2}}}}
Weibull_distribution
Probability distribution
In statistics, the inverse matrix gamma distribution is a generalization of the inverse gamma distribution to positive-definite matrices. It is a more
Inverse matrix gamma distribution
Inverse_matrix_gamma_distribution
Class of statistical models
canonical link functions and their inverses (sometimes referred to as the mean function, as done here). In the cases of the exponential and gamma distributions
Generalized_linear_model
Special function defined by an integral
{2(1-G)}{G(2-G)}}}\\G&=e^{-\gamma }\end{aligned}}} with γ {\displaystyle \gamma } being the Euler–Mascheroni constant. We can express the Inverse function of the exponential
Exponential_integral
Mathematical concept
1 2 + i γ {\textstyle \rho ={\frac {1}{2}}+i\gamma } and the function h is related to the test function g by a Fourier transform, g ( u ) = 1 2 π ∫ −
Explicit formulae for L-functions
Explicit_formulae_for_L-functions
Probability distribution
{y^{\gamma _{1}-1}(1-y)^{\gamma _{2}-1}}{B(\gamma _{1},\gamma _{2})}},\qquad 0<y<1;\gamma _{1},\gamma _{2}>0,} where B( ) is the beta function. If W = μ + σ ( Y
Pareto_distribution
into the metric space X. Given a ray γ, the Busemann function B γ : X → R {\displaystyle B_{\gamma }:X\to \mathbb {R} } is defined by B γ ( x ) = lim t
Busemann_function
Probability distribution
-1}\end{aligned}}} where Γ ( z ) {\displaystyle \Gamma (z)} is the gamma function. The beta function, B {\displaystyle \mathrm {B} } , is a normalization
Beta_distribution
Rules for computing derivatives of functions
g)]_{x}=[{\text{D}}f]_{g(x)}\cdot [{\text{D}}g]_{x}.} If the function f {\textstyle f} has an inverse function g {\textstyle g} , meaning that g ( f ( x ) ) = x
Differentiation_rules
special case of the gamma distribution with integral shape parameter, developed to predict waiting times in queuing systems The inverse-gamma distribution The
List of probability distributions
List_of_probability_distributions
Total species diversity in a landscape
Then gamma diversity can be calculated by first taking the weighted mean of species proportional abundances in the dataset, and then taking the inverse of
Gamma_diversity
Family of linear transformations
{\begin{aligned}\beta &=\tanh \zeta \,,\\\gamma &=\cosh \zeta \,,\\\beta \gamma &=\sinh \zeta \,.\end{aligned}}} Taking the inverse hyperbolic tangent gives the rapidity
Lorentz_transformation
Mathematical functions
{2}}\pi ^{\frac {3}{2}}}{2\left(\Gamma \left({\frac {3}{4}}\right)\right)^{2}}}=2.62205\ldots } The lemniscate functions satisfy the basic relation cl
Lemniscate_elliptic_functions
computing derivatives of functions Incomplete gamma function – Types of special mathematical functions Indefinite sum – Inverse of a finite difference Integration
Lists_of_integrals
Green's function for Laplacian
is an operator in vector calculus that acts as the inverse to the negative Laplacian on functions that are smooth and decay rapidly enough at infinity
Newtonian_potential
Mathematical function common in physics
_{K})^{\beta }}={\tau _{K} \over \beta }\Gamma {\left({\frac {1}{\beta }}\right)}} where Γ is the gamma function. For exponential decay, ⟨τ⟩ = τK is recovered
Stretched exponential function
Stretched_exponential_function
Probability distribution
Gamma (d/p)}},} where Γ ( ⋅ ) {\displaystyle \Gamma (\cdot )} denotes the gamma function. The cumulative distribution function is F ( x ; a
Generalized gamma distribution
Generalized_gamma_distribution
Arithmetic function
{n}{d^{2}}}\right).} The Dirichlet inverse of the Liouville function is the absolute value of the Möbius function, λ − 1 ( n ) = | μ ( n ) | = μ 2 ( n
Liouville_function
Mathematical operation
transform, and the theory of the gamma function and allied special functions. The Mellin transform of a complex-valued function f defined on R + × = ( 0 , ∞
Mellin_transform
Mathematical function
In mathematics, a Gaussian function, often simply referred to as a Gaussian, is a function of the base form f ( x ) = exp ( − x 2 ) {\displaystyle f(x)=\exp(-x^{2})}
Gaussian_function
Method of evaluating certain integrals along paths in the complex plane
f(t)={\frac {1}{2\pi i}}\int _{\gamma -i\infty }^{\gamma +i\infty }e^{st}F(s)\,ds} This integral expresses a function f ( t ) {\displaystyle f(t)} in
Contour_integration
Concept in probability theory
issues apply to the Dirichlet distribution. β is rate or inverse scale. In parameterization of gamma distribution,θ = 1/β and k = α. This is the posterior
Conjugate_prior
Concept in probability theory and statistics
density function, which can therefore be deduced from it by inverse Fourier transform. Cumulant-generating function The cumulant-generating function is defined
Moment_generating_function
Concept in mathematics
Walsh functions form a complete orthogonal set of functions that can be used to represent any discrete function—just like trigonometric functions can be
Walsh_function
Formulation of classical mechanics
{\displaystyle \gamma =\gamma (\tau ;t,t_{0},\mathbf {q} ,\mathbf {q} _{0})} be the (unique) extremal from the definition of the Hamilton's principal function S
Hamilton–Jacobi_equation
identities give the result of composing a trigonometric function with an inverse trigonometric function. sin ( arcsin x ) = x cos ( arcsin x ) = 1
List of trigonometric identities
List_of_trigonometric_identities
{1}{x}}}}{2\gamma x}}\phi \left({\frac {{\sqrt {x}}-{\sqrt {\frac {1}{x}}}}{\gamma }}\right)\quad x>0;\gamma >0} Since the general form of probability functions can
Birnbaum–Saunders distribution
Birnbaum–Saunders_distribution
Estimate of the importance of a word in a document
called Inverse Document Frequency (idf), which became a cornerstone of term weighting: The specificity of a term can be quantified as an inverse function of
Tf–idf
Class of norms in additive combinatorics
{\displaystyle {\tilde {N}}>2^{d}N} . An inverse conjecture for these norms is a statement asserting that if a bounded function f has a large Gowers d-norm then
Gowers_norm
Multiplicative function in number theory
{\mu (n)\ln ^{2}n}{n}}=-2\gamma ,} where γ {\displaystyle \gamma } is Euler's constant. The Lambert series for the Möbius function is ∑ n = 1 ∞ μ ( n ) q
Möbius_function
Operation in mathematical calculus
compute the definite integral of a function when its antiderivative is known; differentiation and integration are inverse operations. Although methods of
Integral
Statistics function
maintaining their simplicity and effectiveness. The inverse Q-function can be related to the inverse error functions: Q − 1 ( y ) = 2 e r f − 1 ( 1 − 2 y ) =
Q-function
Economic formula of productivity
case of the Gorman polar form. The expenditure function is the inverse of the indirect utility function: e ( p , u ) = ( 1 / K ) ∏ i = 1 n p i α i u {\displaystyle
Cobb–Douglas production function
Cobb–Douglas_production_function
Discrete probability distribution
that λ is distributed according to the gamma density g parameterized in terms of a shape parameter α and an inverse scale parameter β: g ( λ ∣ α , β ) =
Poisson_distribution
Operation on formal power series
{\pi }}}\times \Gamma \left(n+{\frac {1}{2}}\right),} where an integral for the double factorial function, or rational gamma function, is given by 1 2
Generating function transformation
Generating_function_transformation
Data processing technology
Stabilized inverse Q filtering is a data processing technology for enhancing the resolution of reflection seismology images where the stability of the
Stabilized inverse Q filtering
Stabilized_inverse_Q_filtering
Mathematical function for the probability a given outcome occurs in an experiment
matrix; conjugate to the inverse of the covariance matrix of a multivariate normal distribution; generalization of the gamma distribution The cache language
Probability_distribution
Point of interest for complex multi-valued functions
function. Typically, one is not interested in f {\displaystyle f} itself, but in its inverse function. However, the inverse of a holomorphic function
Branch_point
Function related to statistics and probability theory
implicitly defined by the value at 0 {\textstyle \mathbf {0} } of the inverse function s n − 1 : E d → Θ {\textstyle s_{n}^{-1}:\mathbb {E} ^{d}\to \Theta
Likelihood_function
Concept in statistics and wave theory
2.634\;X} where arcsch is the inverse hyperbolic secant. Beam diameter § Full width at half maximum Gaussian function Cutoff frequency Spatial resolution
Full_width_at_half_maximum
Arithmetic operation
than or equal to 3 have analogous inverses); e.g., in the function 3 y = x {\displaystyle {^{3}}y=x} , the two inverses are the cube super-root of y and
Tetration
Integral of the Gaussian function, equal to sqrt(π)
t {\textstyle \Gamma (z)=\int _{0}^{\infty }t^{z-1}e^{-t}dt} is the gamma function. More generally, ∫ 0 ∞ x n e − a x b d x = Γ ( ( n + 1 ) / b ) b a (
Gaussian_integral
{\displaystyle g} of G {\displaystyle G} and continuous function f {\displaystyle f} on G / Γ {\displaystyle G/\Gamma } is to take b ( n ) {\displaystyle b(n)} ,
Nilsequence
INVERSE GAMMA-FUNCTION
INVERSE GAMMA-FUNCTION
Female
English
Variant spelling of Italian Gemma, JEMMA means "precious stone."
Girl/Female
Australian, French, Hebrew
Without Flaw; Palm Tree; Perfect
Girl/Female
Greek
Kind or innocent.
Boy/Male
Tamil
Universe
Boy/Male
Tamil
Universe
Girl/Female
African, American, Australian, British, Chinese, Christian, Danish, Dutch, English, French, German, Irish, Italian, Jamaican, Latin
Jewel; Precious Stone; Gem
Girl/Female
Danish, Indian, Latin, Sanskrit, Swedish
Loveable; Desire
Boy/Male
Indian
Supreme god.
Girl/Female
Hebrew
Without flaw.
Boy/Male
Tamil
Universe
Girl/Female
Hindu, Indian, Kannada, Telugu
Beautiful; A Destiny
Girl/Female
Arabic, Indian, Kashmiri
Beautiful Sky
Girl/Female
Norse
Grandmother.
Girl/Female
Australian, Greek
Kind; Innocent
Boy/Male
African, British, English, Indian
Mother; God-like
Surname or Lastname
Danish and Norwegian
Danish and Norwegian : patronymic from the personal name Ivar, from Old Norse Ãvarr, a compound of either Ãv ‘yew tree’, ‘bow’ or Ing (the name of a god) + ar ‘warrior’ or ‘spear’.North German (Frisian) : patronymic from a Germanic personal name composed of the elements Ä«wa ‘yew (tree)’ + hard ‘strong’, ‘firm’.English : variant spelling of Iverson.
Surname or Lastname
English
English : from Middle English, Old French convers ‘convert’ (Latin conversus, past participle of convertere ‘to turn’), hence a nickname for a Jew converted to Christianity, or more often an occupational name for someone converted to the religious way of life, a lay member of a convent.
Female
English
Italian name GEMMA means "precious stone."
Girl/Female
French Latin Italian
Jewel.
Girl/Female
Gujarati, Hindu, Indian
The Soothing Voice
INVERSE GAMMA-FUNCTION
INVERSE GAMMA-FUNCTION
Female
English
Variant spelling of English Chelsea, CHELSIE means "landing place" or "landing port."
Girl/Female
Hindu
Name of a Raga
Boy/Male
Indian, Sanskrit
Fearful
Girl/Female
Arabic, Australian, French, Hebrew, Swiss
Precious
Boy/Male
British, English
From the Sandy Stream
Boy/Male
Indian
Shi means Golden Kin means Poetry; Four Virtues Compassion Love Sincerity and Dedication; The Heart that Possesses These Qualities
Girl/Female
Anglo Saxon
Joyous.
Girl/Female
Sikh
Immersed in God, Tradition
Boy/Male
Muslim/Islamic
Pure Clean
Boy/Male
Hindu
Lord of diamonds
INVERSE GAMMA-FUNCTION
INVERSE GAMMA-FUNCTION
INVERSE GAMMA-FUNCTION
INVERSE GAMMA-FUNCTION
INVERSE GAMMA-FUNCTION
a.
Inverted; having a position or mode of attachment the reverse of that which is usual.
v. t.
To reverse.
adv.
In an inverse order or manner; by inversion; -- opposed to directly.
a.
Acting against, or in a contrary direction; opposed; contrary; opposite; conflicting; as, adverse winds; an adverse party; a spirit adverse to distinctions of caste.
v. t.
See Inhearse.
a.
Alt. of Renverse
a.
Reversed; as, a reverse shell.
a.
Opposite in order, relation, or effect; reversed; inverted; reciprocal; -- opposed to direct.
n.
To offer incense to. See Incense.
a.
Opposite in nature and effect; -- said with reference to any two operations, which, when both are performed in succession upon any quantity, reproduce that quantity; as, multiplication is the inverse operation to division. The symbol of an inverse operation is the symbol of the direct operation with -1 as an index. Thus sin-1 x means the arc whose sine is x.
a.
Subjected to the process of inversion; inverted; converted; as, invert sugar.
n.
To perfume with, or as with, incense.
n.
Mamma.
n.
An inverted arch.
a.
In hostile opposition to; unfavorable; unpropitious; contrary to one's wishes; unfortunate; calamitous; afflictive; hurtful; as, adverse fates, adverse circumstances, things adverse.
imp. & p. p.
of Invert
a.
The back side; as, the reverse of a drum or trench; the reverse of a medal or coin, that is, the side opposite to the obverse. See Obverse.
n.
A viola da gamba.
a.
Extreme in degree; excessive; immoderate; as: (a) Ardent; fervent; as, intense heat. (b) Keen; biting; as, intense cold. (c) Vehement; earnest; exceedingly strong; as, intense passion or hate. (d) Very severe; violent; as, intense pain or anguish. (e) Deep; strong; brilliant; as, intense color or light.
n.
That which is inverse.