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a few, a little [1]: 391 -body, -one, -thing, & -where [1]: 411 . anybody, anyone, anything, anywhere; everybody, everyone, everything, everywhere; nobody, no one ...
Other determiners in English include the demonstratives this and that, and the quantifiers (e.g., all, many, and none) as well as the numerals. [ 1 ] : 373 Determiners also occasionally function as modifiers in noun phrases (e.g., the many changes ), determiner phrases (e.g., many more ) or in adjective or adverb phrases (e.g., not that big ).
In mathematics, the determinant is a scalar-valued function of the entries of a square matrix.The determinant of a matrix A is commonly denoted det(A), det A, or | A |.Its value characterizes some properties of the matrix and the linear map represented, on a given basis, by the matrix.
Pages in category "Determinants" The following 47 pages are in this category, out of 47 total. This list may not reflect recent changes. ...
This is a list of notable theorems. Lists of theorems and similar statements include: ... Sylvester's determinant theorem (determinants) Sylvester's theorem (number ...
wife wò 2SG. POSS âka that nà the ani wò âka nà wife 2SG.POSS that the ´that wife of yours´ There are also languages in which demonstratives and articles do not normally occur together, but must be placed on opposite sides of the noun. For instance, in Urak Lawoi, a language of Thailand, the demonstrative follows the noun: rumah house besal big itu that rumah besal itu house big that ...
A square diagonal matrix, with all entries on the main diagonal equal to 1, and the rest 0. a ij = δ ij: Lehmer matrix: a ij = min(i, j) ÷ max(i, j). A positive symmetric matrix. Matrix of ones: A matrix with all entries equal to one. a ij = 1. Pascal matrix: A matrix containing the entries of Pascal's triangle. Pauli matrices
The Jacobian determinant is sometimes simply referred to as "the Jacobian". The Jacobian determinant at a given point gives important information about the behavior of f near that point. For instance, the continuously differentiable function f is invertible near a point p ∈ R n if the Jacobian determinant at p is non-zero.