MAC 2103

1. MAC 2103 Module 3 Determinants

2. Learning Objectives Upon completing this module, you should be able to: • Determine the minor, cofactor, and adjoint of a matrix. • Evaluate the determinant of a matrix by cofactor expansion. • Determine the inverse of a matrix using the adjoint. • Solve a linear system using Cramer’s Rule. • Use row reduction to evaluate a determinant. • Use determinants to test for invertibility. • Find the eigenvalues and eigenvectors of a matrix. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

3. Determinants There are three major topics in this module: Determinants by Cofactor Expansion Evaluating Determinants by Row Reduction Properties of the Determinant http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.09

4. What is a Determinant? A determinant is a real number associated with a square matrix. Determinants are commonly used to test if a matrix is invertible and to find the area of certain geometric figures. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

5. How to Determine if a Matrix is Invertible? The following is often used to determine if a square matrix is invertible. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

6. Example Determine if A-1 exists by computing the determinant of the matrix A. a) b) Solution a) b) A-1 does exist A-1 does not exist http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

7. What are Minors and Cofactors? We know we can find the determinants of 2 x 2 matrices; but can we find the determinants of 3 x 3 matrices, 4 x 4 matrices, 5 x 5 matrices, ...? In order to find the determinants of larger square matrices, we need to understand the concept of minors and cofactors. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

8. Example of Finding Minors and Cofactors Find the minor M11 and cofactor A11for matrix A. Solution To obtain M11 begin by crossing out the first row and column of A. The minor is equal to det B = −6(5) − (−3)(7) = −9 Since A11 = (−1)1+1M11, A11can be computed as follows: A11 = (−1)2(−9) = −9 http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

9. How to Find the Determinant of Any Square Matrix? Once we know how to obtain a cofactor, we can find the determinant of any square matrix. You may pick any row or column, but the calculation is easier if some elements in the selected row or column equal 0. or for any column j for any row i http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

10. Example of Finding the Determinant by Cofactor Expansion Find det A, if Solution To find the determinant of A, we can select any row or column. If we begin expanding about the first column of A, then det A = a11A11 + a21A21 + a31A31. A11 = −9 from the previous example A21 = −12 and A31 = 24 Now, try to find the determinant of A by expanding the first row of A. det A = a11A11 + a21A21 + a31A31 = (−8)(−9) + (4)(−12) + (2)(24) = 72 http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

11. How to Find the Adjoint of a Matrix? The adjoint of a matrix can be found by taking the transpose of the matrix of cofactors from A. In our previous example, we have found the cofactors A11, A21, A31. If we continue to solve for the rest of the cofactors for matrix A, namely A12, A22, A32 ,A13, A23, and A33, then we will have a 3 x 3 matrix of cofactors from A as follows: http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

12. How to Find the Adjoint of a Matrix? (Cont.) The transpose of this 3 x 3 matrix of cofactors from A is called the adjoint of A, and it is denoted by Adj(A). What are we going to do with this Adj(A)? We can use it to help us find the A-1 if A is an invertible matrix. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

13. How to Find A-1 Using the Adjoint of a Matrix? Theorem 2.1.2: If A is an invertible matrix, then Note: The square matrix A is invertible if and only if det(A) is not zero. If A is an n x n triangular matrix, then det(A) is the product of the entries on the main diagonal of the matrix (Theorem 2.1.3.) http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

14. What is Cramer’s Rule? Cramer’s Rule is a method that utilizes determinants to solve systems of linear equations. This rule can be extended to a system of n linear equations in n unknowns as long as the determinant of the matrix is non-zero. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

15. Example of Using Cramer’s Rule to Solve the Linear System Use Cramer’s rule to solve the linear system. Solution In this system a1 = 1, b1 = 4, c1 = 3, a2 = 2, b2 = 9 and c2 = 5 http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

16. Example of Using Cramer’s Rule to Solve the Linear System (cont.) E = 7, F = −1 and D = 1 The solution is Note that Gaussian elimination with backward substitution is usually more efficient than Cramer’s Rule. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

17. What Are the Limitations on the Method of Cofactors and Cramer’s Rule? The main limitations are as follow: • A substantial number of arithmetic operations are needed to compute determinants of large matrices. • The cofactor method of calculating the determinant of an n x n matrix, n > 2, generally involves more than n! multiplication operations. • Time and cost required to solve linear systems that involve thousands of equations in real-life applications. Next, we are going to look at a more efficient method to find the determinant of a general square matrix. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

18. Evaluating Determinants by Reducing the Matrix to Row-Echelon Form Just keep these in mind when A is a square matrix: 1. det(A)=det(AT). 2. If A has a row of zeros or a column of zeros, then det(A)=0. 3. If A has two proportional rows or two proportional columns, then det(A)=0. Let A be a square matrix. (See Theorem 2.2.3) If B is the matrix that results from scaling by a scalar k, then det(B) = k det(A). (b) If B is the matrix that results from either rows interchange or columns interchange, then det(B) = - det(A). (c) If B is the matrix that results from row replacement, then det(B) = det(A). http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

19. How to Evaluate the Determinant by Row Reduction? Let’s look at a square matrix A. We can find the determinant by reducing it into row-echelon form. Step 1: We want a leading 1 in row 1. We can interchange row 1 and row 2 to accomplish this. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

20. How to Evaluate the Determinant by Row Reduction? (Cont.) From Step 1: Step 2: We want a leading 1 in row 2. We can take a common factor of 3 from row 2 to accomplish this (scaling). Step 3: We want a zero at both row 2 and row 3 below the leading 1 in row 1. We can add -3 times row 1 to row 3 to accomplish this (row replacement). http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

21. How to Evaluate the Determinant by Row Reduction? (Cont.) Step 4: We want a zero below the leading 1 in row 2. We can add row 2 to row 3 to accomplish this (row replacement). Step 5: We want a leading 1 in row 3. We take a common factor of -5/3 from row 3 to accomplish this (scaling). From Step 3: Remember: If A is an n x n triangular matrix, then det(A) is the product of the entries on the main diagonal of the matrix. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

22. Let’s Look at Some UsefulBasic Properties of Determinants • Let A and B be n x n matrices and k is any scalar. Then, • If A is invertible, then Question: Is det(A+B) = det(A) + det(B) ? Remember: If A is an n x n triangular matrix, then det(A) is the product of the entries on the main diagonal of the matrix. This is because A-1A=I, det(A-1A) =det(I) =1; det(A-1) det(A) = 1, and so http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

23. What are Eigenvalues and EigenVectors? An eigenvector of an n x n matrix A is a nontrivial (nonzero) vector such that , where is a scalar called an eigenvalue. Linear systems of this form can be rewritten as follows: The system has a nontrivial solution if and only if This is the so called characteristic equation of A and therefore B has no inverse, and the linear system has infinitely many solutions. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

24. Example Express the following linear system in the form Find the characteristic equation, eigenvalues and eigenvectors corresponding to each of the eigenvalues. The linear system can be written in matrix form as with http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

25. Example (Cont.) which is of the form Thus, Can you tell what is the characteristic equation for A? http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

26. Example (Cont.) The characteristic equation for A is or http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

27. Example (Cont.) Thus, the eigenvalues of A are: By definition, is an eigenvector of Aif and only if is a nontrivial solution of that is If , then we have Thus, we can form the augmented matrix and solve by Gauss Jordan Elimination. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

28. Example (Cont.) Let’s form the augmented matrix and solve by Gauss Jordan Elimination. Thus, a free variable, http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

29. Example (Cont.) Solving this system yields: So the eigenvectors corresponding to are the nontrivial solutions of the form Similarly, if , then we have http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

30. Example (Cont.) Let’s form the augmented matrix and solve by Gauss Jordan Elimination. Thus, http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

31. Example (Cont.) Solving this system yields: So the eigenvectors corresponding to are the nontrivial solutions of the form http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

32. What have we learned? We have learned to: • Determine the minor, cofactor, and adjoint of a matrix. • Evaluate the determinant of a matrix by cofactor expansion. • Determine the inverse of a matrix using the adjoint. • Solve a linear system using Cramer’s Rule. • Use row reduction to evaluate a determinant. • Use determinants to test for invertibility. • Find the eigenvalues and eigenvectors of a matrix. http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09

33. Credit Some of these slides have been adapted/modified in part/whole from the text or slides of the following textbooks: • Anton, Howard: Elementary Linear Algebra with Applications, 9th Edition • Rockswold, Gary: Precalculus with Modeling and Visualization, 3th Edition http://faculty.valenciacc.edu/ashaw/ Click link to download other modules. Rev.F09