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Example 1:

Example 1:. The following rectangular array describes the profit (milions dollar) of 3 branches in 5 years:. Duy Tân University. Natural Science Department. Module 1:. MATRIX. Lecturer: Thân Thị Quỳnh Dao. Chapter 1: Matrix, Determinant, System of linear equations Module 1: Matrix.

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Example 1:

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  1. Example 1: The following rectangular array describes the profit (milions dollar) of 3 branches in 5 years:

  2. DuyTân University Natural Science Department Module 1: MATRIX Lecturer: Thân Thị Quỳnh Dao Chapter 1: Matrix, Determinant, System of linear equations Module 1: Matrix

  3. 1. Definition - A matrix is a rectangular array of numbers. The numbers in the array are called the entries in the matrix.

  4. 1. Definition - A matrix is a rectangular array of numbers. The numbers in the array are called the entries in the matrix. - We use the capital letters to denote matrices such as A, B, C ... - The size of matrix is described in terms of the number of rows and columns it contains.

  5. 1. Definition - Let m,n are positive integers. A general mxn matrix is a rectangular array of number with m rows and n columns as the entry occurs in row i and column j.

  6. Example:

  7. 2. Some special matrices - Row-matrix:A matrix with only 1 row. A general row matrix would be written as or - Column-matrix: A matrix with only 1column. A general column matrix would be written as or

  8. 2. Some special matrices - Square matrix of order n: A matrix with n rows, n columns. A general square matrix of order nwould be written as or main diagonal of A.

  9. 2. Some special matrices - Matrix unit of order n: A square matrix of order n whose all entris on the main diagonal are 1 and the others are 0. A general matrix unit of order n would be written as

  10. 2. Some special matrices - Zero matrix: a matrix, all of whose entries are zero, is called zero matrix.

  11. 3. Operations on matrices - Two matrices are defined to be equal if they have the same size and the corresponding entries are equal. Example: Find x such that A = B, B = C?

  12. 3. Operations on matrices - Transposition: Let A is any mxn matrix, the transpose of A, denoted by is defined to be the nxm matrix that results from interchanging the rows and the columns of A.

  13. 3. Operations on matrices - Addition and subtraction: Example: Find (if any): A + B, A – B, B + C?

  14. 3. Operations on matrices - Scalar multiples: let c is real number Example: Find 3A?

  15. Natural Science Department 3. Operations on matrices Example: Find: 2A + 3B – I3 , with: Chapter 1: Matrix, Determinant, System of linear equations Module 1: Matrix

  16. Natural Science Department 3. Operations on matrices - Multiplying matrices: Example: Find AB? Chapter 1: Matrix, Determinant, System of linear equations Module 1: Matrix

  17. Natural Science Department Thank you for your attention ;

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