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A Generalization of Cramer's Rule

The Two-Year College Mathematics Journal, 1983
(1983). A Generalization of Cramer's Rule. The Two-Year College Mathematics Journal: Vol. 14, No. 3, pp. 203-205.
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Solving constrained matrix equations and Cramer rule

Applied Mathematics and Computation, 2004
The authors consider the matrix equation \(AXB=D\) where the matrices with complex entries \(A\), \(B\), \(D\) are respectively \(m\times n\), \(p\times q\), \(m\times q\), under the constraints \(R(X)\subseteq T\), \(N(X)\supseteq \widetilde{S}\) for the predetermined subspaces \(T\subseteq {\mathbb C}^n (\dim T\leq \operatorname{rank} A ...
Guorong Wang, Sanzheng Qiao
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Condensed cramer rule for solving restricted matrix equations

Applied Mathematics and Computation, 2006
A Cramer rule for solving restricted matrix equations of the kind \(WAWX\widetilde{W} B\widetilde{W}=D\), \(R(X)\subset R[(AW)^{k_1}]\), \(N(X)\supset N[(\tilde{W}B)^{k_2}]\) was presented by \textit{G. Wang} and \textit{J. Sun} [Appl. Math. Comput. 154, 415--422 (2004; Zbl 1055.15024)].
Chao Gu, Guorong Wang
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Cramer’s rule for a system of quaternion matrix equations with applications

Applied Mathematics and Computation, 2018
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Guang-Jing Song   +2 more
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Cramer's rule on 2-by-2 systems

ACM SIGNUM Newsletter, 1974
Cramer's rule expresses the solution to a system of simultaneous linear equaations in terms of ratios of determinants. It is widely known as an example of an impractical method for large systems because of the time required to compute the determinants.
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Cramer's Rule

2001
Saul I. Gass, Carl M. Harris
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On an Elementary Derivation of Cramer's Rule

The American Mathematical Monthly, 1953
D. E. Whitford, M. S. Klamkin
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Cramer Rule

2014
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Cramer Rule

2018
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