<span class="searchmatch">inverse</span> <span class="searchmatch">matrices</span> plural of <span class="searchmatch">inverse</span> matrix...
<span class="searchmatch">inverse</span> matrix (plural <span class="searchmatch">inverse</span> <span class="searchmatch">matrices</span> or <span class="searchmatch">inverse</span> matrixes) (linear algebra) Of a matrix A, another matrix B such that A multiplied by B and B multiplied...
matriz inversa f (plural <span class="searchmatch">matrices</span> inversas) (linear algebra) <span class="searchmatch">inverse</span> matrix...
From pseudo- + <span class="searchmatch">inverse</span>. pseudoinverse (plural pseudoinverses) (mathematics) Any of several structures, similar to <span class="searchmatch">inverses</span>, related to complex <span class="searchmatch">matrices</span>...
article on: orthogonal matrix Wikipedia orthogonal matrix (plural orthogonal <span class="searchmatch">matrices</span>) (linear algebra) A square matrix whose columns, considered as vectors...
matrix (plural invertible <span class="searchmatch">matrices</span>) (linear algebra) Any n×n square matrix for which there exists a corresponding <span class="searchmatch">inverse</span> matrix (i.e., a second (or...
of elementary <span class="searchmatch">matrices</span> applied to a given square matrix row-reduce it to the identity matrix, then the same series of elementary <span class="searchmatch">matrices</span> applied to the...
for some way to average the individual unitary <span class="searchmatch">matrices</span> Uk. But a linear combination of unitary <span class="searchmatch">matrices</span> does not remain unitary. 2008, Mikio Nakahara...
multiplicative; if A {\displaystyle A} and B {\displaystyle B} are square <span class="searchmatch">matrices</span> of the same size, then det ( A B ) = det ( A ) det ( B ) {\displaystyle...
rɪks/, /mɛʈ.rɪks/ Rhymes: -eɪtɹɪks, -ætɹɪks Rhymes: -ɪks matrix (plural <span class="searchmatch">matrices</span> or matrixes) The cavity or mold in which anything is formed. (now rare)...