A matrix is said to be upper triangular if for i > j, aij=0. Show that the determinant of any upper triangular 3* 3matrix is equal to the product of the matrix’s diagonalelements. (This result is true for any upper triangular matrix.)
A matrix is said to be upper triangular if for i > j, aij=0. Show that the determinant of any upper triangular 3* 3matrix is equal to the product of the matrix’s diagonalelements. (This result is true for any upper triangular matrix.)
Practical Management Science
6th Edition
ISBN:9781337406659
Author:WINSTON, Wayne L.
Publisher:WINSTON, Wayne L.
Chapter8: Evolutionary Solver: An Alternative Optimization Procedure
Section8.3: Introduction To Evolutionary Solver
Problem 2P
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A matrix is said to be upper triangular if for i > j, aij=
0. Show that the determinant of any upper triangular 3* 3
matrix is equal to the product of the matrix’s diagonal
elements. (This result is true for any upper triangular matrix.)
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