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1 гипергеометрическая функция
1) Engineering: hypergeometric function2) Makarov: Jacobi polynomial, hypergeometric polynomialУниверсальный русско-английский словарь > гипергеометрическая функция
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2 многочлен Якоби
Mathematics: Jacobi polynomial, hypergeometric polynomial -
3 полином Якоби
Makarov: Jacobi polynomial, hypergeometric polynomial -
4 гипергеометрический многочлен
Mathematics: hypergeometric polynomialУниверсальный русско-английский словарь > гипергеометрический многочлен
См. также в других словарях:
hypergeometric polynomial — hipergeometrinis daugianaris statusas T sritis fizika atitikmenys: angl. hypergeometric polynomial; Jacobi polynomial vok. hypergeometrisches Polynom, n rus. гипергеометрический полином, m; полином Якоби, m pranc. polynôme hypergéométrique, m … Fizikos terminų žodynas
Hypergeometric series — In mathematics, a hypergeometric series is a power series in which the ratios of successive coefficients k is a rational function of k . The series, if convergent, will define a hypergeometric function which may then be defined over a wider… … Wikipedia
Polynomial — In mathematics, a polynomial (from Greek poly, many and medieval Latin binomium, binomial [1] [2] [3], the word has been introduced, in Latin, by Franciscus Vieta[4]) is an expression of finite length constructed from variables (also known as… … Wikipedia
Jacobi polynomial — hipergeometrinis daugianaris statusas T sritis fizika atitikmenys: angl. hypergeometric polynomial; Jacobi polynomial vok. hypergeometrisches Polynom, n rus. гипергеометрический полином, m; полином Якоби, m pranc. polynôme hypergéométrique, m … Fizikos terminų žodynas
Confluent hypergeometric function — In mathematics, a confluent hypergeometric function is a solution of a confluent hypergeometric equation, which is a degenerate form of a hypergeometric differential equation where two of the three regular singularities merge into an irregular… … Wikipedia
Neumann polynomial — In mathematics, a Neumanns polynomial, introduced by Carl Neumann for the special case α = 0, is a polynomial in 1/z used to expand functions in term of Bessel functions.[1] The first few polynomials are … Wikipedia
Mary Celine Fasenmyer — Sister Mary Celine Fasenmyer, R.S.M., (October 4, 1906, Crown, Pennsylvania – December 27, 1996, Erie, Pennsylvania) was a mathematician. She is most noted for her work on hypergeometric functions and linear algebra. Contents 1 Life 2 Sister… … Wikipedia
Hilbert matrix — In linear algebra, a Hilbert matrix is a matrix with the unit fraction elements: H {ij} = frac{1}{i+j 1}. For example, this is the 5 times; 5 Hilbert matrix::H = egin{bmatrix} 1 frac{1}{2} frac{1}{3} frac{1}{4} frac{1}{5} [4pt] frac{1}{2}… … Wikipedia
hipergeometrinis daugianaris — statusas T sritis fizika atitikmenys: angl. hypergeometric polynomial; Jacobi polynomial vok. hypergeometrisches Polynom, n rus. гипергеометрический полином, m; полином Якоби, m pranc. polynôme hypergéométrique, m … Fizikos terminų žodynas
hypergeometrisches Polynom — hipergeometrinis daugianaris statusas T sritis fizika atitikmenys: angl. hypergeometric polynomial; Jacobi polynomial vok. hypergeometrisches Polynom, n rus. гипергеометрический полином, m; полином Якоби, m pranc. polynôme hypergéométrique, m … Fizikos terminų žodynas
polynôme hypergéométrique — hipergeometrinis daugianaris statusas T sritis fizika atitikmenys: angl. hypergeometric polynomial; Jacobi polynomial vok. hypergeometrisches Polynom, n rus. гипергеометрический полином, m; полином Якоби, m pranc. polynôme hypergéométrique, m … Fizikos terminų žodynas