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Mathematical function
mathematics, the beta function, also called the Euler integral of the first kind, is a special function that is closely related to the gamma function and to binomial
Beta_function
Probability distribution
for the beta prime distribution. The generalization to multiple variables is called a Dirichlet distribution. The probability density function (PDF) of
Beta_distribution
Topics referred to by the same term
The beta function, also called the Euler beta function or the Euler integral of the first kind, is a special function in mathematics. Beta function may
Beta function (disambiguation)
Beta_function_(disambiguation)
Special mathematical function
the Dirichlet beta function (also known as the Catalan beta function) is a special function, closely related to the Riemann zeta function. It is a particular
Dirichlet_beta_function
Function that encodes the dependence of a coupling parameter on the energy scale
theoretical physics, specifically quantum field theory, a beta function or Gell-Mann–Low function, β(g), encodes the dependence of a coupling parameter,
Beta_function_(physics)
Mathematical activation function in data analysis
function. Since swish β ( x ) = swish 1 ( β x ) / β {\displaystyle \operatorname {swish} _{\beta }(x)=\operatorname {swish} _{1}(\beta x)/\beta }
Swish_function
Second letter of the Greek alphabet
predictor X. In statistics, beta may represent type II error, or regression slope. Dirichlet beta function Some uses of beta in physics and engineering
Beta
The beta function in accelerator physics is a function related to the transverse size of the particle beam at the location s along the nominal beam trajectory
Beta function (accelerator physics)
Beta_function_(accelerator_physics)
Discrete probability distribution
\beta _{2}={\frac {(\alpha +\beta )^{2}(1+\alpha +\beta )}{n\alpha \beta (\alpha +\beta +2)(\alpha +\beta +3)(\alpha +\beta +n)}}\left[(\alpha +\beta )(\alpha
Beta-binomial_distribution
Probability distribution
F(x;\alpha ,\beta )=I_{\frac {x}{1+x}}\left(\alpha ,\beta \right),} where I is the regularized incomplete beta function. While the related beta distribution
Beta_prime_distribution
Function defined by a hypergeometric series
j-invariant, a modular function, is a rational function in λ ( τ ) {\displaystyle \lambda (\tau )} . Incomplete beta functions Bx(p, q) are related by
Hypergeometric_function
analogue. Digamma function, Polygamma function Incomplete beta function Incomplete gamma function K-function Multivariate gamma function: A generalization
List of mathematical functions
List_of_mathematical_functions
Extension of the factorial function
integral of the second kind. (Euler's integral of the first kind is the beta function.) The value Γ ( 1 ) {\displaystyle \Gamma (1)} can be calculated as
Gamma_function
Probability distribution
to the cumulative distribution functions of the beta distribution and of the F-distribution: F ( k ; n , p ) = F beta-distribution ( x = 1 − p ; α = n
Binomial_distribution
Possible outcome of renormalization in physics
triviality” is scarce and allows different interpretation. The beta function β ( g ) {\displaystyle \beta (g)} was recently studied by different methods: (1) by
Quantum_triviality
Continuous probability distribution for a non-negative random variable
^{k}\operatorname {B} (1-k/\beta ,1+k/\beta )\\[5pt]&=\alpha ^{k}\,{k\pi /\beta \over \sin(k\pi /\beta )}\end{aligned}}} where B is the beta function. Expressions for
Log-logistic_distribution
Smooth approximation of one-hot arg max
If the function is scaled with the parameter β {\displaystyle \beta } , then these expressions must be multiplied by β {\displaystyle \beta } . See multinomial
Softmax_function
The β function lemma given below is an essential step of that proof. Gödel gave the β function its name in (Gödel 1934). The β {\displaystyle \beta } function
Gödel's_β_function
Type of cell found in pancreatic islets
islets, beta cells play a vital role in maintaining blood glucose levels. Problems with beta cells can lead to disorders such as diabetes. The function of
Beta_cell
Number of subsets of a given size
generalized to two real or complex valued arguments using the gamma function or beta function via ( x y ) = Γ ( x + 1 ) Γ ( y + 1 ) Γ ( x − y + 1 ) = 1 ( x
Binomial_coefficient
Special functions of several complex variables
following, three important theta function values are to be derived as examples: This is how the Euler beta function is defined in its reduced form: β
Theta_function
Medical condition
Pancreatic beta cell function (synonyms Gβ or, if calculated from fasting concentrations of insulin and glucose, HOMA-Beta or SPINA-GBeta) is one of the
Pancreatic_beta_cell_function
Probability distribution
green. The cumulative distribution function (CDF) can be written in terms of I, the regularized incomplete beta function. For t > 0 , F ( t ) = ∫ − ∞ t f
Student's_t-distribution
Parameter describing the strength of a force
In this case, the non-zero beta function tells us that the classical scale-invariance is anomalous. If a beta function is positive, the corresponding
Coupling_constant
Type of radioactive decay
In nuclear physics, beta decay (β-decay) is a type of radioactive decay in which an atomic nucleus emits a beta particle (fast energetic electron or positron)
Beta_decay
Concept in theoretical physics
{\frac {\partial g}{\partial \ln \mu }}=\psi (g)=\beta (g)} or the beta function. Since it is a function of g, integration in g of a perturbative estimate
Renormalization_group
Continuous probability distribution
X-\log(1-X)} is the logit function. If X ∼ G u m b e l ( μ X , β ) {\displaystyle X\sim \mathrm {Gumbel} (\mu _{X},\beta )} and Y ∼ G u m b e l ( μ Y
Logistic_distribution
Probability distribution
{\displaystyle p} , and q {\displaystyle q} positive. The function B(p,q) is the beta function. The parameter b {\displaystyle b} is the scale parameter
Generalized_beta_distribution
Measure of inequality of a statistical distribution
Gamma function B ( ) {\displaystyle B(\,)} is the Beta function I k ( ) {\displaystyle I_{k}(\,)} is the Regularized incomplete beta function Sometimes
Gini_coefficient
Type of mathematical function
\beta <1-{\frac {c}{\log \!\!\;{\big (}q(2+|\gamma |){\big )}}}\ } for β + i γ {\displaystyle \beta +i\gamma } a non-real zero. Dirichlet L-functions may
Dirichlet_L-function
Ratio of the perimeter of Bernoulli's lemniscate to its diameter
lemniscate elliptic functions and is approximately equal to 2.62205755. It also appears in evaluation of the gamma and beta function at certain rational
Lemniscate_constant
Size of a mathematical ball
value of a well-known special function called the beta function Β(x, y), and the volume in terms of the beta function is V n ( R ) = V n − 1 ( R ) ⋅
Volume_of_an_n-ball
Probability distribution
normalizing constant is the multivariate beta function, which can be expressed in terms of the gamma function: B ( α ) = ∏ i = 1 K Γ ( α i ) Γ ( ∑ i =
Dirichlet_distribution
1968 physics-related discovery
by Italian theoretical physicist Gabriele Veneziano that the Euler beta function, when interpreted as a scattering amplitude, has many of the features
Veneziano_amplitude
Property of gauge theories in particle physics
quark flavors. Asymptotic freedom can be derived by calculating the beta function describing the variation of the theory's coupling constant under the
Asymptotic_freedom
Probability distribution
{\displaystyle X\sim \Gamma (\alpha ,\beta )\equiv \operatorname {Gamma} (\alpha ,\beta )} The corresponding probability density function in the shape-rate parameterization
Gamma_distribution
Compound probability distribution
in terms of the beta function,: f ( k | α , β , r ) = ( r + k − 1 k ) B ( α + r , β + k ) B ( α , β ) {\displaystyle f(k|\alpha ,\beta ,r)={\binom {r+k-1}{k}}{\frac
Beta negative binomial distribution
Beta_negative_binomial_distribution
American physicist (1947–2001)
in quantum gauge theory, most notably, his 1972 calculation of the beta function to two-loop accuracy. His pioneering work in the days of FORTRAN and
William_E._Caswell
Topics referred to by the same term
Look up Beta, beta, béta, or bêta in Wiktionary, the free dictionary. Beta (B, β) is the second letter of the Greek alphabet. Beta or BETA may also refer
Beta_(disambiguation)
Generalization of beta distribution
_{p}\left(a,b\right)} is the multivariate beta function: β p ( a , b ) = Γ p ( a ) Γ p ( b ) Γ p ( a + b ) {\displaystyle \beta _{p}\left(a,b\right)={\frac {\Gamma
Matrix variate beta distribution
Matrix_variate_beta_distribution
Evolutionary equation under renormalization group flow
n-point correlation functions under variation of the energy scale at which the theory is defined and involves the beta function of the theory and the
Callan–Symanzik_equation
Class of statistical models
{\boldsymbol {\beta }})).} It is convenient if V follows from an exponential family of distributions, but it may simply be that the variance is a function of the
Generalized_linear_model
Continuous probability distribution
parametrization of the beta prime distribution, which is also called the beta distribution of the second kind. The characteristic function is listed incorrectly
F-distribution
Number, approximately 0.916
.., and it is also equal to β(2) where β is the Dirichlet beta function. Catalan's constant was named after Eugène Charles Catalan, who found
Catalan's_constant
Field theory of scalar fields
constant g on the scale λ is encoded by a beta function, β(g), defined by β ( g ) = λ ∂ g ∂ λ . {\displaystyle \beta (g)=\lambda \,{\frac {\partial g}{\partial
Scalar_field_theory
Economic formula of productivity
The most common version of the function is given by: Y ( L , K ) = A L α K β {\displaystyle Y(L,K)=AL^{\alpha }K^{\beta }} where: Y is the total production
Cobb–Douglas production function
Cobb–Douglas_production_function
Function in thermodynamics and statistical physics
and discrete, the canonical partition function is defined as Z = ∑ i e − β E i , {\displaystyle Z=\sum _{i}e^{-\beta E_{i}},} where i {\displaystyle i} is
Partition function (statistical mechanics)
Partition_function_(statistical_mechanics)
Mathematical function
_{k=0}^{\infty }{\frac {z^{k}}{\Gamma (\alpha k+\beta )}},} When β = 1 {\displaystyle \beta =1} , the one-parameter function E α = E α , 1 {\displaystyle E_{\alpha
Mittag-Leffler_function
Transcendental single-variable function
tangent integral, polygamma function, Riemann zeta function, Dirichlet eta function, and Dirichlet beta function. The Clausen function of order 2 – often referred
Clausen_function
Class of integrals appearing in quantum field theory
used to determine counterterms, which in turn allow evaluation of the beta function, which encodes the dependence of coupling g {\displaystyle g} for an
Loop_integral
Attempt to find a consistent theory of quantum gravity
theory is still applicable, and one can expand the beta-function ( β {\displaystyle \beta } -function) describing the renormalization group running of Newton's
Asymptotic_safety
Polynomial sequence
gamma function. In the special case that the four quantities n {\displaystyle n} , n + α {\displaystyle n+\alpha } , n + β {\displaystyle n+\beta } , n
Jacobi_polynomials
Function related to statistics and probability theory
{\textstyle \beta _{2}} yields an optimal value function β 2 ( β 1 ) = ( X 2 T X 2 ) − 1 X 2 T ( y − X 1 β 1 ) {\textstyle \beta _{2}(\beta _{1})=\left(\mathbf
Likelihood_function
Neural oscillation in the brain, 12.5–30 Hz
in function. Beta waves can be split into three sections: Low Beta Waves (12.5–16 Hz, "Beta 1"); Beta Waves (16.5–20 Hz, "Beta 2"); and High Beta Waves
Beta_wave
Concept in probability theory and statistics
moment generating function M X ( t ) {\displaystyle M_{X}(t)} , then α X + β {\displaystyle \alpha X+\beta } has moment generating function M α X + β ( t
Moment_generating_function
Discrete probability distribution
{\displaystyle \rho >0} , where B {\displaystyle \operatorname {B} } is the beta function. Equivalently the pmf can be written in terms of the rising factorial
Yule–Simon_distribution
Family of continuous probability distributions
beta distribution, but much simpler to use especially in simulation studies since its probability density function, cumulative distribution function and
Kumaraswamy_distribution
conjecture has implications in the study of complex functions and is related to Euler's Beta function. While the conjecture is known to hold for certain
Khabibullin's conjecture on integral inequalities
Khabibullin's_conjecture_on_integral_inequalities
In mathematics, a non-algebraic number
(following from their respective algebraic independences). The values of Beta function B ( a , b ) {\displaystyle \mathrm {B} (a,b)} if a , b {\displaystyle
Transcendental_number
Signed odd unit fractions sum to π/4
modulus 4 evaluated at s = 1, and therefore the value β(1) of the Dirichlet beta function. π 4 = arctan 1 = ∫ 0 1 1 1 + x 2 d x = ∫ 0 1 ( ∑ k = 0 n ( − 1 )
Leibniz_formula_for_π
Features that do not change if length or energy scales are multiplied by a common factor
and this theory is not scale-invariant. We can see this from the QED beta-function. This tells us that the electric charge (which is the coupling parameter
Scale_invariance
Topics referred to by the same term
g. in a matrix or for summation Ix(a,b), the regularized incomplete beta function (of a variable x and parameters a,b) î, the unit vector along the x-axis
I_(disambiguation)
Discrete probability distribution
F(k)=1+{\frac {\mathrm {B} (p;k+1,0)}{\ln(1-p)}}} where B is the incomplete beta function. A Poisson compounded with Log(p)-distributed random variables has a
Logarithmic_distribution
Name for several different families of probability distributions
>0\\[4pt]&={\frac {\sigma (x)^{\alpha }\sigma (-x)^{\beta }}{B(\alpha ,\beta )}}.\end{aligned}}} Where, B is the beta function and σ ( x ) = 1 / ( 1 + e − x ) {\displaystyle
Generalized logistic distribution
Generalized_logistic_distribution
Number-theoretic concept
)}{g(\chi \psi )}}\,,} analogous to the formula for the beta function in terms of gamma functions. Since the nontrivial Gauss sums g have absolute value
Jacobi_sum
Index of articles associated with the same name
types of Euler integral: The Euler integral of the first kind is the beta function B ( z 1 , z 2 ) = ∫ 0 1 t z 1 − 1 ( 1 − t ) z 2 − 1 d t = Γ ( z 1 )
Euler_integral
Probability distribution
\right)} . The cumulative distribution function can be expressed in terms of the regularized incomplete beta function: F ( k ; r , p ) ≡ Pr ( X ≤ k ) = I
Negative binomial distribution
Negative_binomial_distribution
Statistical model for a binary dependent variable
log-odds as a function of x. Conversely, μ = − β 0 / β 1 {\displaystyle \mu =-\beta _{0}/\beta _{1}} and s = 1 / β 1 {\displaystyle s=1/\beta _{1}} . Note
Logistic_regression
Risk measure estimating the average loss in the worst tail of the distribution
where I α {\displaystyle I_{\alpha }} is the regularized incomplete beta function, I α ( a , b ) = B α ( a , b ) B ( a , b ) {\displaystyle I_{\alpha
Expected_shortfall
Mathematical constant related to the cosine function
where I − 1 {\displaystyle I^{-1}} is the inverse of the regularized beta function. This value can be obtained using Kepler's equation, along with other
Dottie_number
Concept in probability theory
(\alpha ,\beta )} is the Beta function acting as a normalising constant. In this context, α {\displaystyle \alpha } and β {\displaystyle \beta } are called
Conjugate_prior
Symmetry in statistical physics
{\displaystyle \beta (K):=\xi {\frac {dK}{d\xi }}={\frac {2s(K)(1-s(K))}{(1+s(K))[ds(K)/dK]}}.} This function is the beta function of renormalization
Kramers–Wannier_duality
Stochastic process formalizing cumulative advantage
Γ(x) being the standard gamma function, and γ = 2 + k 0 + a m . {\displaystyle \gamma =2+{k_{0}+a \over m}.} The beta function behaves asymptotically as B(x
Preferential_attachment
Special mathematical function
\operatorname {Li} _{s}(\pm i)=-2^{-s}\eta (s)\pm i\beta (s),} where β(s) is the Dirichlet beta function. The polylogarithm is related to the complete Fermi–Dirac
Polylogarithm
+\beta )&=\sin \alpha \cos \beta +\cos \alpha \sin \beta \\\sin(\alpha -\beta )&=\sin \alpha \cos \beta -\cos \alpha \sin \beta \\\cos(\alpha +\beta )&=\cos
List of trigonometric identities
List_of_trigonometric_identities
Difference between logarithm and harmonic series
constants. Values of the derivative of the Riemann zeta function and Dirichlet beta function. In connection to the Laplace and Mellin transform. In the
Euler's_constant
Family of mathematical integrals
evaluated by using Euler integrals: Euler integral of the first kind: the Beta function: B ( x , y ) = ∫ 0 1 t x − 1 ( 1 − t ) y − 1 d t = Γ ( x ) Γ ( y ) Γ
Wallis'_integrals
Stages in development and support of computer software
system). It typically consists of several stages, such as pre-alpha, alpha, beta, and release candidate, before the final version, or "gold", is released
Software_release_life_cycle
Statistical method
objective function min β 0 , β { 1 N ‖ y − β 0 − X β ‖ 2 2 } {\displaystyle \min _{\beta _{0},\beta }\left\{{\frac {1}{N}}\left\|y-\beta _{0}-X\beta
Lasso_(statistics)
Mathematical function
In mathematics, the Selberg integral is a generalization of Euler beta function to n dimensions introduced by Atle Selberg. It has applications in statistical
Selberg_integral
Degree of differentiability of a function or map
_{2}f^{(2)}(1)+\beta _{3}f^{(1)}(1)\\g^{(4)}(0)&=\beta _{1}^{4}f^{(4)}(1)+6\beta _{1}^{2}\beta _{2}f^{(3)}(1)+(4\beta _{1}\beta _{3}+3\beta _{2}^{2})f^{(2)}(1)+\beta
Smoothness
Two-parameter family of continuous probability distributions
f(x;\alpha ,\beta )={\frac {f(x/\beta ;\alpha ,1)}{\beta }}} The cumulative distribution function is the regularized gamma function F ( x ; α , β ) = Γ ( α ,
Inverse-gamma_distribution
Generalization of the concept from statistical mechanics
{\displaystyle Z(\beta )=\sum _{x_{i}}\exp \left(-\beta H(x_{1},x_{2},\dots )\right)} The function H is understood to be a real-valued function on the space
Partition function (mathematics)
Partition_function_(mathematics)
Types of special mathematical functions
"Uniform Asymptotic Expansions of the Incomplete Gamma Functions and the Incomplete Beta Function". Math. Comp. 29 (132): 1109–1114. doi:10.1090/S0025-5718-1975-0387674-2
Incomplete_gamma_function
Type of probability distribution
(\alpha )+U\cdot (\Phi (\beta )-\Phi (\alpha )))\sigma +\mu } with Φ {\displaystyle \Phi } the cumulative distribution function of the normal distribution
Truncated_normal_distribution
Result of repeatedly applying a mathematical function
In mathematics, an iterated function is a function that is obtained by composing another function with itself two or several times. The process of repeatedly
Iterated_function
Search algorithm
Alpha–beta pruning is a search algorithm that seeks to decrease the number of nodes that are evaluated by the minimax algorithm in its search tree. It
Alpha–beta_pruning
Mathematical function common in physics
The stretched exponential function f β ( t ) = e − t β {\displaystyle f_{\beta }(t)=e^{-t^{\beta }}} is obtained by inserting a fractional power law into
Stretched exponential function
Stretched_exponential_function
Set of statistical processes for estimating the relationships among variables
Y i {\displaystyle Y_{i}} is a function (regression function) of X i {\displaystyle X_{i}} and β {\displaystyle \beta } , with e i {\displaystyle e_{i}}
Regression_analysis
Probability distribution
variable by transformation U = Y−1 − 1 of a beta random variable ,Y, whose probability density function is f ( y ) = y γ 1 − 1 ( 1 − y ) γ 2 − 1 B (
Pareto_distribution
Mathematical Function
\chi _{n}(i)=i\beta (n),} where λ ( n ) \lambda (n) is the Dirichlet lambda function and β ( n ) \beta (n) is the Dirichlet beta function. ∫ 0 π / 2 arcsin
Legendre_chi_function
Type of Gödel numbering in mathematics
{\displaystyle \beta } function using the Chinese remainder theorem in his article written in 1931. This is a primitive recursive function. Thus, for all
Gödel_numbering_for_sequences
Particular case of the generalized extreme value distribution
function of the Gumbel distribution (maximum case) is F ( x ; μ , β ) = e − e − ( x − μ ) / β {\displaystyle F(x;\mu ,\beta )=e^{-e^{-(x-\mu )/\beta }}\
Gumbel_distribution
Metric used in probability and statistics
{B(a_{1},b_{1})B(a_{2},b_{2})}}}} where B {\displaystyle B} is the beta function. The squared Hellinger distance between two gamma distributions P ∼
Hellinger_distance
Number specifying how a quantum operator changes under dilations
quantum field theory, run) with the distance scale according to their beta-function. Therefore the anomalous dimension γ ( g ) {\displaystyle \gamma (g)}
Scaling_dimension
Integral transform useful in probability theory, physics, and engineering
{\displaystyle g(E)} defines the partition function. That is, the canonical partition function Z ( β ) {\displaystyle Z(\beta )} is given by Z ( β ) = ∫ 0 ∞ e −
Laplace_transform
Inverse of the gamma function
the inverse gamma function refers to the principal branch with domain on the real interval [ β , + ∞ ) {\displaystyle \left[\beta ,+\infty \right)} and
Inverse_gamma_function
Measure of linear correlation
{n-2}{2}}\right)}}}},} where B {\displaystyle \mathrm {B} } is the beta function, which is one way of writing the density of a Student's t-distribution
Pearson correlation coefficient
Pearson_correlation_coefficient
Least squares approximation of linear functions to data
_{1}+3\beta _{2})]^{2}+[10-(\beta _{1}+4\beta _{2})]^{2}\\[6pt]&=4\beta _{1}^{2}+30\beta _{2}^{2}+20\beta _{1}\beta _{2}-56\beta _{1}-154\beta _{2}+210
Linear_least_squares
Symbols for constants, special functions
{\displaystyle \mathrm {B} } represents the beta function β {\displaystyle \beta } represents: the thermodynamic beta, equal to (kBT)−1, where kB is the Boltzmann
Greek letters used in mathematics, science, and engineering
Greek_letters_used_in_mathematics,_science,_and_engineering
BETA FUNCTION
BETA FUNCTION
Boy/Male
Scottish Shakespearean
Son of Beth.
Boy/Male
Bengali, Hindu, Indian, Sanskrit
Heart Beat
Female
Polish
Polish form of Greek Elisabet, ELŻBIETA means "God is my oath."
Female
Native American
 Native American Blackfoot name PETA means "golden eagle." Compare with another form of Peta.
Male
Hebrew
(בֶּלַע) Hebrew name BELA means "destruction." In the bible, this is the name of several characters, including a king of Edom.
Female
Spanish
 Short form of Spanish Aleta, LETA means "winged." Compare with another form of Leta.
Female
English
Short form of English Elizabeth, BETH means "God is my oath."Â
Female
Hebrew
(× Ö¶×˜Ö·×¢) Hebrew unisex name NETA means meaning "plant, shrub."
Boy/Male
Hindu, Indian, Sanskrit
Emperor; Single Beat
Female
German
Short form of German Margarete, META means "pearl."
Female
English
English name derived from the second letter of the Greek alphabet, beta, related to Hebrew bet, BETA means "house."Â
Female
Polish
Polish name derived from Latin beatus, BEATA means "blessed."Â
Female
English
Czech and Polish form of German Bertha, BERTA means "bright."
Girl/Female
Greek Hebrew English
From the Hebrew Elisheba, meaning either oath of God, or God is satisfaction. Famous bearer: Old...
Female
Hungarian
Hungarian form of Greek Elisabet, ERZSÉBET means "God is my oath."
Female
English
Short form of English Beatrix, BEA means "voyager (through life)."Â
Female
Italian
 Variant spelling of Italian Zita, ZETA means "little girl." Compare with another form of Zeta.
Female
English
Short form of English Elizabeth, BET means "God is my oath."Â
Biblical
Beth (Hebrew)|house of the sun
Girl/Female
Indian, Marathi
Our Heart Beat
BETA FUNCTION
BETA FUNCTION
Boy/Male
American, British, English, Hebrew
Beloved
Boy/Male
Muslim
Wish
Surname or Lastname
English
English : habitational name from North or South Elkington in Lincolnshire, so named from an Old English personal name (possibly Ä’a(n)lÄc) + Old English tÅ«n ‘enclosure’, ‘settlement’. Elkington in Northamptonshire is not the source of the family name: it did not acquire the name until 1617, before which it was Eltington or Elteton.
Boy/Male
Indian
Star of the religion (Islam)
Girl/Female
Russian
Born at Christmas.
Boy/Male
Muslim/Islamic
Jurist Scholar of religious laws
Male
Hindi/Indian
 Hindi name AGNIMUKHA means "face of fire." In one of the ancient Panchatantra children's tales, this is the name of a flea.
Girl/Female
American, Australian, British, Christian, Danish, English, Finnish, French, German, Hebrew, Irish, Latin, Swedish, Teutonic
House Owner; Pearl; Diminutive of Henrietta; Keeper of the Hearth; From Henriette; The French Feminine Form of Henry; Little One
Boy/Male
Hindu, Indian, Marathi
Guarding Well
Boy/Male
Bengali, Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi, Telugu
Gift of Ganga
BETA FUNCTION
BETA FUNCTION
BETA FUNCTION
BETA FUNCTION
BETA FUNCTION
n.
A sudden swelling or reenforcement of a sound, recurring at regular intervals, and produced by the interference of sound waves of slightly different periods of vibrations; applied also, by analogy, to other kinds of wave motions; the pulsation or throbbing produced by the vibrating together of two tones not quite in unison. See Beat, v. i., 8.
v. t.
That on which bets are laid; the subject of a bet.
v. t.
To beat.
v. i.
A cheat or swindler of the lowest grade; -- often emphasized by dead; as, a dead beat.
v. t.
To give the signal for, by beat of drum; to sound by beat of drum; as, to beat an alarm, a charge, a parley, a retreat; to beat the general, the reveille, the tattoo. See Alarm, Charge, Parley, etc.
v. t.
To beat severely.
v. t.
To strike repeatedly; to lay repeated blows upon; as, to beat one's breast; to beat iron so as to shape it; to beat grain, in order to force out the seeds; to beat eggs and sugar; to beat a drum.
v. i.
A round or course which is frequently gone over; as, a watchman's beat.
pl.
of Seta
n.
The rise or fall of the hand or foot, marking the divisions of time; a division of the measure so marked. In the rhythm of music the beat is the unit.
p. p.
of Beat
n.
A recurring stroke; a throb; a pulsation; as, a beat of the heart; the beat of the pulse.
n.
The common beet (Beta vulgaris).
imp.
of Beat
v. i.
To make a succession of strokes on a drum; as, the drummers beat to call soldiers to their quarters.
imp. & p. p.
of Bet
v. i.
To make a sound when struck; as, the drums beat.
v. t.
To beat thoroughly or severely.