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1 вронскиан
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2 вронскиан
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3 Определитель Вронского
Русско-английский словарь по прикладной математике и механике > Определитель Вронского
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4 детерминант Вронского
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5 вронскиан
Wronskian determinant, Wronskian -
6 Вронскиан
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7 определитель Вронского
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8 определитель Вронского
Русско-английский новый политехнический словарь > определитель Вронского
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9 антигенная детерминанта
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10 конформационно-зависимая детерминанта
Русско-английский научный словарь > конформационно-зависимая детерминанта
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11 определитель Вронского
Mathematics: Vronskian, Wronskian, Wronskian determinantУниверсальный русско-английский словарь > определитель Вронского
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12 сложенные детерминанты
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13 Вронскиан
Русско-английский словарь математических терминов > Вронскиан
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14 Вронскиан
Mathematics: Wronskian (determinant) -
15 вронскиан
Mathematics: Wronskian (determinant) -
16 вронскиан
вронскиа́н м. мат.
Wronskian (determinant) -
17 Вронскиан
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18 определитель
determinant, identifier* * *определи́тель м. мат.
determinantраскрыва́ть определи́тель — expand a determinantопредели́тель Вро́нского — Wronskianопредели́тель n [m2]-го поря́дка — determinant of order n, determinant of the n th orderфункциона́льный определи́тель — functional determinant, Jacobian -
19 определитель
м. мат. determinantуравнение, содержащее определитель — determinantal equation
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20 определитель
f. determinant; определитель Вронского, WronskianРусско-английский словарь математических терминов > определитель
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См. также в других словарях:
wronskian determinant — noun see wronskian … Useful english dictionary
Wronskian — In mathematics, the Wronskian is a function named after the Polish mathematician Józef Hoene Wroński. It is especially important in the study of differential equations, where it can be used to determine whether a set of solutions is linearly… … Wikipedia
wronskian — ˈ(v)rä]nzkēən, rȯ], ]nskēən noun or wronskian determinant ( s) Usage: usually capitalized W Etymology: Józef Maria Wroński (Hoene Wroński) died 1853 Pol. mathematician and philosopher + English an : a mathemati … Useful english dictionary
Determinant — This article is about determinants in mathematics. For determinants in epidemiology, see Risk factor. In linear algebra, the determinant is a value associated with a square matrix. It can be computed from the entries of the matrix by a specific… … Wikipedia
Wronskian — /rahn skee euhn, vrahn /, n. Math. the determinant of order n associated with a set of n functions, in which the first row consists of the functions, the second row consists of the first derivatives of the functions, the third row consists of… … Universalium
Method of variation of parameters — In mathematics, variation of parameters also known as variation of constants, is a general method to solve inhomogeneous linear ordinary differential equations. It was developed by the Italian French mathematician Joseph Louis Lagrange.For first… … Wikipedia
Variation of parameters — In mathematics, variation of parameters, also known as variation of constants, is a general method to solve inhomogeneous linear ordinary differential equations. It was developed by Joseph Louis Lagrange[citation needed]. For first order… … Wikipedia
List of eponymous adjectives in English — An eponymous adjective is an adjective which has been derived from the name of a person, real or fictional. Persons from whose name the adjectives have been derived are called eponyms.Following is a list of eponymous adjectives in English. A… … Wikipedia
Wolsztyn — Infobox Settlement name = Wolsztyn image caption = Hotel Wolsztyn image shield = POL Wolsztyn COA.svg pushpin subdivision type = Country subdivision name = POL subdivision type1 = Voivodeship subdivision name1 = Greater Poland subdivision type2 … Wikipedia
Vandermonde matrix — In linear algebra, a Vandermonde matrix, named after Alexandre Théophile Vandermonde, is a matrix with the terms of a geometric progression in each row, i.e., an m × n matrix or … Wikipedia
Oscillation theory — In mathematics, in the field of ordinary differential equations, a non trivial solution to an ordinary differential equation is called oscillating if it has an infinite number of roots, otherwise it is called non oscillating. The differential… … Wikipedia
