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Sequence of numbers ((2n) choose (n))
In mathematics the nth central binomial coefficient is the particular binomial coefficient ( 2 n n ) = ( 2 n ) ! ( n ! ) 2 for all n ≥ 0. {\displaystyle
Central_binomial_coefficient
Number of subsets of a given size
mathematics, the binomial coefficients are the positive integers that occur as coefficients in the binomial theorem. Commonly, a binomial coefficient is indexed
Binomial_coefficient
Family of polynomials
the Gaussian binomial coefficients (also called Gaussian coefficients, Gaussian numbers, Gaussian polynomials, or q-binomial coefficients) are q-analogs
Gaussian_binomial_coefficient
Probability distribution
! {\displaystyle {\binom {n}{k}}={\frac {n!}{k!(n-k)!}}} is the binomial coefficient. The formula can be understood as follows: pk qn−k is the probability
Binomial_distribution
Conjecture in combinatorial number theory
three times, as do all central binomial coefficients except for 1 and 2; (it is in principle not excluded that such a coefficient would appear five, seven
Singmaster's_conjecture
Probability distribution
positive covariance term. The term "negative binomial" is likely due to the fact that a certain binomial coefficient that appears in the formula for the probability
Negative binomial distribution
Negative_binomial_distribution
Natural number
a composite number, an Erdős–Woods number, a Pell number, a central binomial coefficient, and a primitive abundant number. 70 is the smallest weird number
70_(number)
Binomial series Binomial theorem Binomial transform Binomial type Carlson's theorem Catalan number Fuss–Catalan number Central binomial coefficient Combination
List of factorial and binomial topics
List_of_factorial_and_binomial_topics
Solved prime-number problem
p r {\displaystyle p^{r}} in the prime decomposition of the central binomial coefficient ( 2 n n ) = ( 2 n ) ! / ( n ! ) 2 {\displaystyle \textstyle {\binom
Proof_of_Bertrand's_postulate
Natural number
and preceding 127. As the binomial coefficient ( 9 4 ) {\displaystyle {\tbinom {9}{4}}} , 126 is a central binomial coefficient, and in Pascal's Triangle
126_(number)
Combinatorial identity about binomial coefficients
Pascal's formula) is a combinatorial identity about binomial coefficients. The binomial coefficients are the numbers that appear in Pascal's triangle. Pascal's
Pascal's_rule
Series related to Ramanujan's pi formulas
recurrence relation, sequences which may be expressed in terms of binomial coefficients ( n k ) {\displaystyle {\tbinom {n}{k}}} , and A , B , C {\displaystyle
Ramanujan–Sato_series
Natural number
1, 0 786 might be the largest n for which the value of the central binomial coefficient 2 n C n {\displaystyle {}_{2n}\!C_{n}} is not divisible by an
786_(number)
Natural number
time 924 = 22 × 3 × 7 × 11, sum of a twin prime (461 + 463), central binomial coefficient ( 12 6 ) {\displaystyle {\tbinom {12}{6}}} 925 = 52 × 37, pentagonal
900_(number)
Recursive integer sequence
n-th Catalan number can be expressed directly in terms of the central binomial coefficients by C n = 1 n + 1 ( 2 n n ) = ( 2 n ) ! ( n + 1 ) ! n ! for
Catalan_number
Points with no three in a line
there is a 1 / n {\displaystyle {1/{\sqrt {n}}}} factor in the central binomial coefficient. In 2013, five researchers together published an analysis of
Cap_set
Arrangement of trinomial coefficients
contains the binomial coefficients that appear in the binomial expansion and the binomial distribution. The binomial and trinomial coefficients, expansions
Pascal's_pyramid
Branch of discrete mathematics
astronomer Rabbi Abraham ibn Ezra (c. 1140) established the symmetry of binomial coefficients, while a closed formula was obtained later by the talmudist and
Combinatorics
Data structure that acts as a priority queue
binomial tree of order k {\displaystyle k} has ( k d ) {\displaystyle {\tbinom {k}{d}}} nodes at depth d {\displaystyle d} , a binomial coefficient.
Binomial_heap
Natural number
253. 252 is: the central binomial coefficient ( 10 5 ) {\displaystyle {\tbinom {10}{5}}} , the largest one divisible by all coefficients in the previous
252_(number)
Integer sequence
(starting from n = 0) gives the highest power of 2 that divides the central binomial coefficient ( 2 n n ) {\displaystyle {\tbinom {2n}{n}}} , and it gives the
Gould's_sequence
Number without repeated prime factors
(See sequences A019565, A048672 and A064273 in the OEIS.) The central binomial coefficient ( 2 n n ) {\displaystyle {2n \choose n}} is never squarefree
Square-free_integer
{\displaystyle p} pairs of identical cards from the two sets, which is the binomial coefficient ( n p ) {\displaystyle {n \choose p}} . The remaining k − 2 p {\displaystyle
Trinomial_triangle
was published in 2016. The Erdős squarefree conjecture that central binomial coefficients C(2n, n) are never squarefree for n > 4 was proved in 1996 by
List of conjectures by Paul Erdős
List_of_conjectures_by_Paul_Erdős
Transcendental single-variable function
hypergeometric series, summations involving the inverse of the central binomial coefficient, sums of the polygamma function, and Dirichlet L-series. The
Clausen_function
the quotient of both sides tends to one for large n) of the central binomial coefficient follows from Stirling's formula and shows the fast convergence
Proof_that_22/7_exceeds_π
Family of graphs with 2n nodes and n(n-1) edges
{k}{\lfloor k/2\rfloor }}\,\right\},} the inverse function of the central binomial coefficient. The complement graph of a 2n-vertex crown graph is the Cartesian
Crown_graph
Triangular array of the binomial coefficients
mathematics, Pascal's triangle is an infinite triangular array of the binomial coefficients which play a crucial role in probability theory, combinatorics,
Pascal's_triangle
Group of symmetries of an n-dimensional hypercube
noncrossing partitions for S n ± {\displaystyle S_{n}^{\pm }} is the central binomial coefficient ( 2 n n ) {\displaystyle {\binom {2n}{n}}} , with the number
Hyperoctahedral_group
Size of biclique cover of a graph
{k}{\lfloor k/2\rfloor }}\,\right\}} is the inverse function of the central binomial coefficient (de Caen, Gregory & Pullman 1981). The bipartite dimension of
Bipartite_dimension
Mathematical sequence involving arithmetic progressions
numbers n {\displaystyle n} such that the n {\displaystyle n} th central binomial coefficient is 1 mod 3, and the numbers whose balanced ternary representation
Stanley_sequence
Mathematical fallacy
endomorphism. One way to prove this is to show that p divides all the binomial coefficients except for the first and the last, so all the intermediate terms
Freshman's_dream
Relative measure of dispersion expressed as the ratio of standard deviation to the mean
In probability theory and statistics, the coefficient of variation (CV), also known as normalized root-mean-square deviation (NRMSD), and relative standard
Coefficient_of_variation
_{s}(z)} is a polylogarithm. ( n k ) {\displaystyle n \choose k} is binomial coefficient exp ( x ) {\displaystyle \exp(x)} denotes exponential of x {\displaystyle
List_of_mathematical_series
Tetrachoric correlation Uncertainty coefficient Wald test Bernstein inequalities (probability theory) Binomial regression Binomial proportion confidence interval
List of analyses of categorical data
List_of_analyses_of_categorical_data
Measure of linear correlation
statistics, the Pearson correlation coefficient (PCC), also known as Pearson's r, the Pearson product-moment correlation coefficient (PPMCC), or simply the unqualified
Pearson correlation coefficient
Pearson_correlation_coefficient
Numerical measure of a statistical relationship between variables
A correlation coefficient is a numerical measure of some type of linear correlation, meaning a linear function between two variables. The variables may
Correlation_coefficient
Special mathematical function
{Ap} (n+1)x^{2n}}{16^{n}}}} The first numerical values of the central binomial coefficients and the two numerical sequences described are listed in the
Nome_(mathematics)
17, 19, ... Positive integer powers of prime numbers A000961 Central binomial coefficients 1, 2, 6, 20, 70, 252, 924, ... ( 2 n n ) = ( 2 n ) ! ( n ! )
List_of_integer_sequences
Statistical model for count data
log-linear model, especially when used to model contingency tables. Negative binomial regression is a popular generalization of Poisson regression because it
Poisson_regression
Statistical measure of association for two binary variables
In statistics, the phi coefficient, also known as the mean square contingency coefficient or Yule coefficient of correlation and commonly denoted by φ
Phi_coefficient
Statistical modeling method
explanatory variable with a slope coefficient. A multiple regression e right hand side, each with its own slope coefficient Rencher, Alvin C.; Christensen
Linear_regression
Nonparametric measure of rank correlation
In statistics, Spearman's rank correlation coefficient or Spearman's ρ is a number ranging from -1 to 1 that indicates how strongly two sets of ranks
Spearman's rank correlation coefficient
Spearman's_rank_correlation_coefficient
Regression analysis technique
In statistics, binomial regression is a regression analysis technique in which the response (often referred to as Y) has a binomial distribution: it is
Binomial_regression
Discrete analog of a derivative
k ! {\displaystyle {\binom {x}{k}}={\frac {(x)_{k}}{k!}}} is the binomial coefficient, and ( x ) k = x ( x − 1 ) ( x − 2 ) ⋯ ( x − k + 1 ) {\displaystyle
Finite_difference
Uses of the constant
{\frac {4^{n}}{\sqrt {\pi n}}}} (asymptotic growth rate of the central binomial coefficients) C n ∼ 4 n π n 3 {\displaystyle C_{n}\sim {\frac {4^{n}}{\sqrt
List_of_formulae_involving_π
Statistic for rank correlation
n − 1 ) 2 {\displaystyle {n \choose 2}={n(n-1) \over 2}} is the binomial coefficient for the number of ways to choose two items from n items. The number
Kendall rank correlation coefficient
Kendall_rank_correlation_coefficient
Sum of a factorial number and a triangular number
2 and 5. They also proved in the same paper that the only central binomial coefficients which are also factoriangular numbers are 1 and 2. The concept
Factoriangular_number
Range to estimate an unknown parameter
for the parameter θ {\displaystyle \theta } , with confidence level or coefficient γ {\displaystyle \gamma } , is an interval ( u ( X ) , v ( X ) ) {\displaystyle
Confidence_interval
Device invented by Francis Galton
Francis Galton to demonstrate the central limit theorem, in particular that with sufficient sample size the binomial distribution approximates a normal
Galton_board
Fundamental theorem in probability theory and statistics
known as de Moivre–Laplace theorem. The binomial distribution article details such an application of the central limit theorem in the simple case of a discrete
Central_limit_theorem
Set of quantities in probability theory
and binomial sequences are studied via umbral calculus. The joint cumulant κ of several random variables X1, ..., Xn is defined as the coefficient κ1,
Cumulant
Table that displays the frequency of variables
applicable only to the case of 2 × 2 contingency tables, is the phi coefficient (φ) defined by ϕ = ± χ 2 N , {\displaystyle \phi =\pm {\sqrt {\frac {\chi
Contingency_table
Method for evaluating stock options that divides time into discrete intervals
binomial, a similar (although smaller) range of methods exist. The trinomial model is considered to produce more accurate results than the binomial model
Lattice_model_(finance)
Statistical transformation
z-transformation) of a Pearson correlation coefficient is its inverse hyperbolic tangent (artanh). When the sample correlation coefficient r is near 1 or -1, its distribution
Fisher_transformation
French mathematician (1667–1754)
Find the coefficient of the middle term [of a binomial expansion] for a very large and even power [n], or find the ratio that the coefficient of the middle
Abraham_de_Moivre
Poincaré plot Point-biserial correlation coefficient Point estimation Point pattern analysis Point process Poisson binomial distribution Poisson distribution
List_of_statistics_articles
Normalized measure of the dispersion of a probability distribution
dispersion, dispersion index, coefficient of dispersion, relative variance, or variance-to-mean ratio (VMR), like the coefficient of variation, is a normalized
Index_of_dispersion
Algorithm to smooth data points
equations can be found, in the form of a single set of "convolution coefficients" that can be applied to all data sub-sets, to give estimates of the smoothed
Savitzky–Golay_filter
Statistical quantity
meanings. The nonparametric skew is one third of the Pearson 2 skewness coefficient and lies between −1 and +1 for any distribution. This range is implied
Nonparametric_skew
Statistical relationship
product-moment correlation coefficient, most commonly called 'Pearson's correlation coefficient' or simply 'the correlation coefficient' (as it is the most common
Correlation
Probability distribution
{prior} ,n-s+\beta \operatorname {prior} )}}.\end{aligned}}} The binomial coefficient ( s + f s ) = ( n s ) = ( s + f ) ! s ! f ! = n ! s ! ( n − s )
Beta_distribution
Type of mathematical expression
of terms with nonzero coefficients, so that a one-term polynomial is called a monomial, a two-term polynomial is called a binomial, and a three-term polynomial
Polynomial
Statistic measuring inter-rater agreement for categorical items
Cohen's kappa coefficient (symbol κ, lowercase Greek kappa) is a statistic used to measure inter-rater reliability for qualitative or categorical data
Cohen's_kappa
Type of data measuring one attribute
geometric mean and harmonic mean are added, as measures of central tendency, and the coefficient of variation as a measure of dispersion. For interval and
Univariate_(statistics)
Measure of the asymmetry of random variables
operator, μ3 is the third central moment, and κt are the t-th cumulants. It is sometimes referred to as Pearson's moment coefficient of skewness, or simply
Skewness
Transform in numerical harmonic analysis
{\displaystyle h} . The outputs give the detail coefficients (from the high-pass filter) and approximation coefficients (from the low-pass). It is important that
Discrete_wavelet_transform
Class of statistical models
attendance would typically be modelled with a Bernoulli distribution (or binomial distribution, depending on exactly how the problem is phrased) and a log-odds
Generalized_linear_model
Statistical hypothesis test
test used in place of the 2 × 1 chi-squared test for goodness of fit, see binomial test. Cochran–Mantel–Haenszel chi-squared test. McNemar's test, used in
Chi-squared_test
Array of partial sums of the binomial coefficients
Bernoulli's triangle is an array of partial sums of the binomial coefficients. For any non-negative integer n and for any integer k included between 0
Bernoulli's_triangle
Study of the inheritance of continuously variable traits
This is the inbreeding coefficient of the example progenies bulk, provided it is unbiased with respect to the full binomial distribution. An example
Quantitative_genetics
Statistical measure of the magnitude of a phenomenon
sizes include the correlation between two variables, the regression coefficient in a regression, the mean difference, and the risk of a particular event
Effect_size
Type of statistics
implies central symmetry. The common measure of dependence between paired random variables is the Pearson product-moment correlation coefficient, while
Summary_statistics
takes value 1 with probability 1/2 and value −1 with probability 1/2. The binomial distribution, which describes the number of successes in a series of independent
List of probability distributions
List_of_probability_distributions
Statistical property
common use in describing the standard error for a particular regression coefficient as used in confidence intervals. Suppose a statistically independent
Standard_error
Comparison of two distributions
correlation coefficient" (PPCC plot) is the correlation coefficient between the paired sample quantiles. The closer the correlation coefficient is to one
Q–Q_plot
Theorem on the largest antichain of sets
largest size of an r-chain-free family is the sum of the r largest binomial coefficients ( n i ) {\displaystyle {\binom {n}{i}}} . The case r = 1 is Sperner's
Sperner's_theorem
Statistical model for a binary dependent variable
logit regression) estimates the parameters of a logistic model (the coefficients in the linear or non linear combinations). In binary logistic regression
Logistic_regression
Generalization of the binomial distribution
probability theory, the multinomial distribution is a generalization of the binomial distribution. For example, it models the probability of counts for each
Multinomial_distribution
Distinction between nominal, ordinal, interval and ratio variables
some ratios, such as the coefficient of variation. More subtly, while one can define moments about the origin, only central moments are meaningful, since
Level_of_measurement
Probability distribution
maximum one-day rainfalls showing also the 90% confidence belt based on the binomial distribution. The rainfall data are represented by plotting positions as
Log-normal_distribution
Early attempt to explain constant speed of light
Fresnel's dragging coefficient was directly confirmed by the Fizeau experiment and its repetitions. In general, with the aid of this coefficient the negative
Aether_drag_hypothesis
Fourth standardized moment in statistics
{Kurt} [Y]{\big )}.\end{aligned}}} Note that the fourth-power binomial coefficients (1, 4, 6, 4, 1) appear in the above equation. The interpretation
Kurtosis
Uniqueness theorem in complex analysis
\Delta ^{n}f(0)} where ( z n ) {\textstyle {z \choose n}} is the binomial coefficient and Δ n f ( 0 ) {\displaystyle \Delta ^{n}f(0)} is the n-th forward
Carlson's_theorem
Random process of binary (boolean) random variables
of such strings that contain k occurrences of H is given by the binomial coefficient N ( k , n ) = ( n k ) = n ! k ! ( n − k ) ! {\displaystyle N(k,n)={n
Bernoulli_process
Statistical method
the binomial distribution is Poisson: lim n → ∞ Binomial ( n , 1 / n ) = Poisson ( 1 ) {\displaystyle \lim _{n\to \infty }\operatorname {Binomial} (n
Bootstrapping_(statistics)
Correlation of a signal with a time-shifted copy of itself, as a function of shift
autocovariance function to get a time-dependent Pearson correlation coefficient. However, in other disciplines (e.g. engineering) the normalization is
Autocorrelation
Covariance and correlation
cross-correlation function to get a time-dependent Pearson correlation coefficient. However, in other disciplines (e.g. engineering) the normalization is
Cross-correlation
Metric for fit of statistical models
regression validation, the following topics relate to goodness of fit: Coefficient of determination (the R-squared measure of goodness of fit); Lack-of-fit
Goodness_of_fit
Statistical sequence characterizing probability distributions
[X_{1:4}]\right).\end{aligned}}} Note that the coefficients of the rth L-moment are the same as in the rth term of the binomial transform, as used in the r-order finite
L-moment
Empirical law on the variance of species in a habitat
the Sundt-Jewel family are the Poisson, binomial, negative binomial (Pascal), extended truncated negative binomial and logarithmic series distributions.
Taylor's_law
Statistical property quantifying how much a collection of data is spread out
These include: Coefficient of variation Quartile coefficient of dispersion Relative mean difference, equal to twice the Gini coefficient Entropy: While
Statistical_dispersion
Data transformation of statistics into rank
Friedman test Kruskal–Wallis test Rank products Spearman's rank correlation coefficient Mann–Whitney U test Wilcoxon signed-rank test Van der Waerden test The
Ranking_(statistics)
Statistical measure of association
2 contingency table Cramér's V is equal to the absolute value of Phi coefficient. Let a sample of size n of the simultaneously distributed variables A
Cramér's_V
Mathematical function for the probability a given outcome occurs in an experiment
correlation coefficient) Beta distribution, for a single probability (real number between 0 and 1); conjugate to the Bernoulli distribution and binomial distribution
Probability_distribution
Statistical test used on paired nominal data
distribution. [citation needed] An exact binomial test can then be used, where b is compared to a binomial distribution with size parameter n = b + c
McNemar's_test
Statistic comparing ordinal rankings
A rank correlation coefficient can measure that relationship, and the measure of significance of the rank correlation coefficient can show whether the
Rank_correlation
Experimental design in statistical mathematics
In statistics, a central composite design is an experimental design, useful in response surface methodology, for building a second order (quadratic) model
Central_composite_design
Mathematical function
uses a discrete Gaussian kernel, which may be approximated by the Binomial coefficient or sampling a Gaussian. In geostatistics they have been used for
Gaussian_function
Counts pieces of a disk cut by lines
n 2 + n + 2 2 . {\displaystyle p={\frac {n^{2}+n+2}{2}}.} Using binomial coefficients, the formula can be expressed as p = 1 + ( n + 1 2 ) = ( n 0 ) +
Lazy_caterer's_sequence
CENTRAL BINOMIAL-COEFFICIENT
CENTRAL BINOMIAL-COEFFICIENT
Boy/Male
Assamese, Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi, Oriya, Sindhi, Telugu
Of Variegated Colour
Girl/Female
Muslim
Protector, Defendant, Central
Girl/Female
Hindu, Indian, Marathi, Tamil, Traditional
Central
Girl/Female
Arabic, Muslim
Protector; Central; Defendant
Boy/Male
Hindu
Of variegated color
Girl/Female
Tamil
Central
Surname or Lastname
English
English : variant of Cantrell.
Girl/Female
Hindu, Indian, Kannada, Marathi, Sindhi, Tamil, Telugu
Central
Girl/Female
Muslim/Islamic
Protector defendant, central
Surname or Lastname
English (chiefly central and northern), Scottish, and Irish
English (chiefly central and northern), Scottish, and Irish : variant of Hanley.
Surname or Lastname
English (mainly central)
English (mainly central) : topographic name for someone who lived where holly trees grew, from Middle English holi(n)s, plural of holin, holi(e) (Old English hole(g)n).
Surname or Lastname
English (central and northern)
English (central and northern) : nickname for a gentle or timid person, from Middle English, Old English hind ‘female deer’.English and Scottish : variant of Hine ‘servant’, with excrescent -d.
Boy/Male
Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi
Central; Lord Shiva
Surname or Lastname
English (southeastern and central)
English (southeastern and central) : topographic name for someone who lived by some oak trees, from misdivision of Middle English atten okes ‘at the oaks’ (see Nock).
Girl/Female
Assamese, Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi, Sanskrit
Central; Centre of Body; An Ancient King
Girl/Female
Muslim
Limitless, Protector, Defendant, Central
Girl/Female
Arabic, Australian, Muslim
Protector; Defendant; Central
Surname or Lastname
English (central western England)
English (central western England) : from the Middle English personal name Huwelet, Huwelot, Hughelot, a double diminutive of Hugh formed with the diminutive suffixes -el + -et and -ot. The surname is also established in Ireland.
Surname or Lastname
English (mainly central England)
English (mainly central England) : patronymic from a pet form of the personal name Thomas.
Surname or Lastname
English (mainly central and southeastern England)
English (mainly central and southeastern England) : patronymic from a personal name (see Hawk 1), or a variant of Hawk 2.
CENTRAL BINOMIAL-COEFFICIENT
CENTRAL BINOMIAL-COEFFICIENT
Female
Finnish
Finnish form of Scandinavian Hulda, HULTA means "hidden, obscure, secret."
Female
Italian
Pet form of Italian Piera, PIERINA means "rock, stone."
Male
Serbian
Croatian and Serbian form of Greek Andreas, ANDRIJA means "man; warrior."
Boy/Male
Arabic
Big
Surname or Lastname
English
English : habitational name from a place named Butterwick, for example in County Durham, Lincolnshire, North Yorkshire, and North Lincolnshire. The place name is from Old English butere ‘butter’ + wīc ‘farmstead’.William Buttrick came from Kingston-upon-Thames, Surrey, England, to Concord, MA, in 1640.
Boy/Male
Indian, Punjabi, Sikh
Treasure
Boy/Male
Indian, Punjabi, Sikh
Righteous Warrior
Male
Hebrew
Variant form of Hebrew Shimown, SHIMEON means "hearkening."
Boy/Male
Muslim
Forgiver
Girl/Female
German
Shining; Brilliant
CENTRAL BINOMIAL-COEFFICIENT
CENTRAL BINOMIAL-COEFFICIENT
CENTRAL BINOMIAL-COEFFICIENT
CENTRAL BINOMIAL-COEFFICIENT
CENTRAL BINOMIAL-COEFFICIENT
v. t.
To place or fix in the center or on a central point.
adv.
In a central manner or situation.
adv.
Toward the ventral side; on the ventral side; ventrally; -- opposed to dorsad.
a.
Having two names; -- used of the system by which every animal and plant receives two names, the one indicating the genus, the other the species, to which it belongs.
n.
A monomial.
a.
Consisting of two terms; pertaining to binomials; as, a binomial root.
a.
Consisting of three terms; of or pertaining to trinomials; as, a trinomial root.
a.
Of, pertaining to, or situated near, the belly, or ventral side, of an animal or of one of its parts; hemal; abdominal; as, the ventral fin of a fish; the ventral root of a spinal nerve; -- opposed to dorsal.
n.
An expression consisting of two terms connected by the sign plus (+) or minus (-); as, a + b, or 7 - 3.
n.
The central, or one of the central, bones of the carpus or or tarsus. In the tarsus of man it is represented by the navicular.
n.
Alt. of Centrale
a.
Of or pertaining to two names; binomial.
a.
Binominal.
v. i.
To be placed in a center; to be central.
n. & a.
Trinomial.
pl.
of Centrum
n.
A numerical coefficient in any particular case of the binomial theorem.
a.
Alt. of Centrical
a.
Placed in the center or middle; central.