Presentation is loading. Please wait.

Presentation is loading. Please wait.

Section 8.4: Determinants

Published byDustin Parks Modified over 5 years ago

Similar presentations

Presentation on theme: "Section 8.4: Determinants"— Presentation transcript:

1 Section 8.4: Determinants
Definition of Cofactors

2 Definition of Cofactors
Let M = The cofactor of the i-th row and the j-th column is defined by Aij = (-1)i + j(2 x 2 determinant obtained by deleting the i-th row and the j-th column)

3 Definition of Cofactors
Let M = The cofactor of the i-th row and the j-th column is defined by Aij = (-1)i + j(2 x 2 determinant obtained by deleting the i-th row and the j-th column)

4 Definition of Cofactors
Let M = The cofactor of the i-th row and the j-th column is defined by Aij = (-1)i + j(2 x 2 determinant obtained by deleting the i-th row and the j-th column)

5 Relation between Cofactors and Determinants
Let M = det M = aei + bfg + cdh – ceg – afh – bdi Expansion along the 1st row

6 Expansion along the 2nd row
Let M = det M = aei + bfg + cdh – ceg – afh – bdi Expansion along the 2nd row

7 Expansion along the columns
Expansion along the 1st column What should be the value of bA11 + eA21 + hA31? e h b C1 – C2 = 0 Similarly, aA21 + bA22 + cA23 = 0.

8 Applications = (a + a’)A11 + (d + d’)A21 + (g + g’)A31
= (aA11 + dA21 + gA31) + (a’A11 + d’A21 + g’A31) Why?

9 Adjoint Matrix Let M = The adjoint matrix of M is defined by adj M =

10 The product of M and adj M
M(adj M) = det M Expansion along the first row

11 The product of M and adj M
M(adj M) = det M Expansion along the second row det M det M

12 The product of M and adj M
M(adj M) = dA21 + eA22 + fA23 = det M, but aA21 + bA22 + cA23 = 0. det M det M det M

13 The product of M and adj M
M(adj M) = gA31 + hA32 + iA33 = det M, but aA31 + bA32 + cA33 = 0. det M = (det M)I det M det M

14 Conclusion Let M be a square matrix.
Then M(adj M) = (adj M)M = (det M)I. If det M  0, then

Download ppt "Section 8.4: Determinants"

Similar presentations

Elementary Linear Algebra Anton & Rorres, 9th Edition

Elementary Linear Algebra Anton & Rorres, 9th Edition
5.4. Additional properties Cofactor, Adjoint matrix, Invertible matrix, Cramers rule. (Cayley, Sylvester….)

5.4. Additional properties Cofactor, Adjoint matrix, Invertible matrix, Cramers rule. (Cayley, Sylvester….)
Chap. 3 Determinants 3.1 The Determinants of a Matrix

Chap. 3 Determinants 3.1 The Determinants of a Matrix
Section 3.1 The Determinant of a Matrix. Determinants are computed only on square matrices. Notation: det(A) or |A| For 1 x 1 matrices: det( [k] ) = k.

Section 3.1 The Determinant of a Matrix. Determinants are computed only on square matrices. Notation: det(A) or |A| For 1 x 1 matrices: det( [k] ) = k.
Economics 2301 Matrices Lecture 12. Inner Product Let a' be a row vector and b a column vector, both being n-tuples, that is vectors having n elements:

Economics 2301 Matrices Lecture 12. Inner Product Let a' be a row vector and b a column vector, both being n-tuples, that is vectors having n elements:
Chapter 3 Determinants 3.1 The Determinant of a Matrix

Chapter 3 Determinants 3.1 The Determinant of a Matrix
Economics 2301 Matrices Lecture 13.

Economics 2301 Matrices Lecture 13.
4.III. Other Formulas 4.III.1. Laplace’s Expansion Definition 1.2:Minor & Cofactor For any n  n matrix T, the (n  1)  (n  1) matrix formed by deleting.

4.III. Other Formulas 4.III.1. Laplace’s Expansion Definition 1.2:Minor & Cofactor For any n  n matrix T, the (n  1)  (n  1) matrix formed by deleting.
Matrices and Determinants

Matrices and Determinants
Determinants King Saud University. The inverse of a 2 x 2 matrix Recall that earlier we noticed that for a 2x2 matrix,

Determinants King Saud University. The inverse of a 2 x 2 matrix Recall that earlier we noticed that for a 2x2 matrix,
Recall that a square matrix is one in which there are the same amount of rows as columns. A square matrix must exist in order to evaluate a determinant.

Recall that a square matrix is one in which there are the same amount of rows as columns. A square matrix must exist in order to evaluate a determinant.
Mathematics.

Mathematics.
Spring 2013 Solving a System of Linear Equations Matrix inverse Simultaneous equations Cramer’s rule Second-order Conditions Lecture 7.

Spring 2013 Solving a System of Linear Equations Matrix inverse Simultaneous equations Cramer’s rule Second-order Conditions Lecture 7.
Chapter 2 Determinants. The Determinant Function –The 2  2 matrix is invertible if ad-bc  0. The expression ad- bc occurs so frequently that it has.

Chapter 2 Determinants. The Determinant Function –The 2  2 matrix is invertible if ad-bc  0. The expression ad- bc occurs so frequently that it has.
Chapter 4 Matrices By: Matt Raimondi.

Chapter 4 Matrices By: Matt Raimondi.
1 © 2010 Pearson Education, Inc. All rights reserved © 2010 Pearson Education, Inc. All rights reserved Chapter 9 Matrices and Determinants.

1 © 2010 Pearson Education, Inc. All rights reserved © 2010 Pearson Education, Inc. All rights reserved Chapter 9 Matrices and Determinants.
Ch. 4.5 2 X 2 Matrices, Determinants, and Inverses.

Ch X 2 Matrices, Determinants, and Inverses.
1 Ch. 4 Linear Models & Matrix Algebra Matrix algebra can be used: a. To express the system of equations in a compact manner. b. To find out whether solution.

1 Ch. 4 Linear Models & Matrix Algebra Matrix algebra can be used: a. To express the system of equations in a compact manner. b. To find out whether solution.
Matrices CHAPTER 8.1 ~ 8.8. Ch8.1-8.8_2 Contents  8.1 Matrix Algebra 8.1 Matrix Algebra  8.2 Systems of Linear Algebra Equations 8.2 Systems of Linear.

Matrices CHAPTER 8.1 ~ 8.8. Ch _2 Contents  8.1 Matrix Algebra 8.1 Matrix Algebra  8.2 Systems of Linear Algebra Equations 8.2 Systems of Linear.
Algebra 2 Chapter 4 Notes Matrices & Determinants Algebra 2 Chapter 4 Notes Matrices & Determinants.

Algebra 2 Chapter 4 Notes Matrices & Determinants Algebra 2 Chapter 4 Notes Matrices & Determinants.

Similar presentations

Ads by Google