The following text field will produce suggestions that follow it as you type.

Coles

Loading Inventory...
Matrix Inversions via Jibunoh's Determinants & Exact Solutions of K x K Systems of Linear Equations: A Monograph on Research Discovery

Matrix Inversions via Jibunoh's Determinants & Exact Solutions of K x K Systems of Linear Equations: A Monograph on Research Discovery in Vernon, BC

By None

Current price: $8.09
Buy Online
Matrix Inversions via Jibunoh's Determinants & Exact Solutions of K x K Systems of Linear Equations: A Monograph on Research Discovery

Coles

Matrix Inversions via Jibunoh's Determinants & Exact Solutions of K x K Systems of Linear Equations: A Monograph on Research Discovery in Vernon, BC

By None

Current price: $8.09
Loading Inventory...

Size: Paperback

Buy Online
*Product information may vary - to confirm product availability, pricing, shipping and return information please contact Coles
A simple and systematic procedure for solving any k x k system of linear equations is developed in this paper. The determinant of the equation matrix is first found using Jibunoh's method. Then the matrix is inverted by applying the defined backward vector substitutions (bvs). The reciprocal of the positive value of the determinant, if the matrix is real, is taken as a factor of the inverse matrix. The complex matrix is similarly inverted to obtain what is defined as either the Analytical or Empirical inverse. The entries of any inverse matrix (real or complex) are mainly integers, without the scalar-factor multiplying the matrix. This makes the inverse matrix exact and more accurate than decimal representations obtained by computer evaluations. For any system of equations, therefore, three quantities are obtained simultaneously, namely, the determinant of the equation matrix, the inverse of the matrix and the solution of the system. The production of these quantities simultaneously, is new in the literature. By these procedures, any linear systems of equations of dimensions k can be solved easily and accurately, as k tends to infinity.
A simple and systematic procedure for solving any k x k system of linear equations is developed in this paper. The determinant of the equation matrix is first found using Jibunoh's method. Then the matrix is inverted by applying the defined backward vector substitutions (bvs). The reciprocal of the positive value of the determinant, if the matrix is real, is taken as a factor of the inverse matrix. The complex matrix is similarly inverted to obtain what is defined as either the Analytical or Empirical inverse. The entries of any inverse matrix (real or complex) are mainly integers, without the scalar-factor multiplying the matrix. This makes the inverse matrix exact and more accurate than decimal representations obtained by computer evaluations. For any system of equations, therefore, three quantities are obtained simultaneously, namely, the determinant of the equation matrix, the inverse of the matrix and the solution of the system. The production of these quantities simultaneously, is new in the literature. By these procedures, any linear systems of equations of dimensions k can be solved easily and accurately, as k tends to infinity.

More About Coles at Village Green Shopping Centre

Find everything in-store including new, used and children’s books, music, movies, games and toys. Visit Coles today to find the perfect gift, or a novel for yourself. COVID-19 UPDATE: Open | Regular Centre Hours

Find Coles at Village Green Shopping Centre in Vernon, BC

Visit Coles at Village Green Shopping Centre in Vernon, BC
Powered by Adeptmind