L4-5/L4-6 Objective: Students will be able to evaluate determinants of matrices.

Slides:

Advertisements

Similar presentations

4.5 2x2 Matrices, Determinants and Inverses

Advertisements

Determinant The numerical value of a square array of numbers that can be used to solve systems of equations with matrices. Second-Order Determinant (of.

Identity and Inverse Matrices

Maths for Computer Graphics

Matrix Operations. Matrix Notation Example Equality of Matrices.

Section 9.6 Determinants and Inverses Objectives To understand how to find a determinant of a 2x2 matrix. To understand the identity matrix. Do define.

Warm-up 23-1 A = 0-54 B = C = 9 4 D = Find 8A 2. Find AC 3. Find CD 4. Find BD.

Finding the Inverse of a Matrix

MATRICES MATRIX OPERATIONS. About Matrices  A matrix is a rectangular arrangement of numbers in rows and columns. Rows run horizontally and columns run.

CE 311 K - Introduction to Computer Methods Daene C. McKinney

4.3 The Inverse of a Matrix Warm-up (IN)

Table of Contents Matrices - Inverse Matrix Definition The inverse of matrix A is a matrix A -1 such that... and Note that... 1) For A to have an inverse,

4.7 Identity and Inverse Matrices. What is an identity? In math the identity is the number you multiply by to have equivalent numbers. For multiplication.

Section 10.3 – The Inverse of a Matrix No Calculator.

4.5, x 2 and 3 x 3 Matrices, Determinants, and Inverses Date: _____________.

Overview Definitions Basic matrix operations (+, -, x) Determinants and inverses.

Matrix Determinants and Inverses

Ch X 2 Matrices, Determinants, and Inverses.

1.10 and 1.11 Quiz : Friday Matrices Test: Oct. 20.

2.5 Determinants and Multiplicative Inverses of Matrices Objectives: Evaluate determinants. Find inverses of matrices. Solve systems of equations by using.

10.4 Matrix Algebra 1.Matrix Notation 2.Sum/Difference of 2 matrices 3.Scalar multiple 4.Product of 2 matrices 5.Identity Matrix 6.Inverse of a matrix.

Warm Up. Inverse Matrices Three main topics today Identity Matrix Determinant Inverse Matrix.

Chapter 4 Section 4: Inverse and Identity Matrices 1.

Inverse and Identity Matrices Can only be used for square matrices. (2x2, 3x3, etc.)

2 x 2 Matrices, Determinants, and Inverses.  Definition 1: A square matrix is a matrix with the same number of columns and rows.  Definition 2: For.

4.4 Identify and Inverse Matrices Algebra 2. Learning Target I can find and use inverse matrix.

Inverse of a Matrix Multiplicative Inverse of a Matrix For a square matrix A, the inverse is written A -1. When A is multiplied by A -1 the result is the.

2x2 Matrices, Determinants and Inverses

2.5 Determinants and Multiplicative Inverses of Matrices. Objectives: 1.Evaluate determinants. 2.Find the inverses of matrices. 3.Solve systems of equations.

4-5 – 2x2 Matrices, Determinants, & Inverses. Objectives Evaluating Determinants of 2x2 Matrices Using Inverse Matrices to Solve Equations.

10.4 Matrix Algebra 1.Matrix Notation 2.Sum/Difference of 2 matrices 3.Scalar multiple 4.Product of 2 matrices 5.Identity Matrix 6.Inverse of a matrix.

MATRIX A set of numbers arranged in rows and columns enclosed in round or square brackets is called a matrix. The order of a matrix gives the number of.

2.5 – Determinants and Multiplicative Inverses of Matrices.

3.6 Multiplying Matrices Homework 3-17odd and odd.

Chapter 1 Section 1.6 Algebraic Properties of Matrix Operations.

Notes Over 4.2 Finding the Product of Two Matrices Find the product. If it is not defined, state the reason. To multiply matrices, the number of columns.

4-3 Matrix Multiplication Objective: To multiply a matrix by a scalar multiple.

Chapter 5: Matrices and Determinants Section 5.1: Matrix Addition.

Matrices. Variety of engineering problems lead to the need to solve systems of linear equations matrixcolumn vectors.

MATRICES MATRIX Multiplication. Warm-up Subtract (don’t forget to KCC):

Section 6-2: Matrix Multiplication, Inverses and Determinants There are three basic matrix operations. 1.Matrix Addition 2.Scalar Multiplication 3.Matrix.

1 Matrix Math ©Anthony Steed Overview n To revise Vectors Matrices.

College Algebra Chapter 6 Matrices and Determinants and Applications

Use Inverse Matrices to Solve Linear Systems

4-2 Multiplying Matrices Warm Up Lesson Presentation Lesson Quiz

What would happen to this problem if there weren’t parentheses?

Lesson 43: Working with Matrices: Multiplication

Copyright © 2009 Dan Nettleton

Finding the Inverse of a Matrix

Matrix Operations Add and Subtract Matrices Multiply Matrices

Multiplication of Matrices

Warm-up a. Solve for k: 13 −5

MATRICES MATRIX OPERATIONS.

Using Matrices to Solve Systems of Equations

Use Inverse Matrices to Solve Linear Systems

More about Matrices Chapter 4, Sections 5, 7.

Solving Linear Systems Using Inverse Matrices

27. Determinants and Inverses

MATRICES MATRIX OPERATIONS.

( ) ( ) ( ) ( ) Matrices Order of matrices

Section 3.3 – The Inverse of a Matrix

MATRICES Operations with Matrices Properties of Matrix Operations

Multiplication of Matrices

A square matrix is a matrix with the same number of columns as rows.

MATRICES MATRIX OPERATIONS.

MATRICES MATRIX OPERATIONS.

Lesson 4: Inverses of Matrices (part 1)

Matrices and Determinants

Today, you will be able to:

Presentation transcript:

L4-5/L4-6 Objective: Students will be able to evaluate determinants of matrices

A matrix is a table with rows and columns A square matrix is a matrix with the same number of columns as rows. A multiplicative identity matrix gives you a product with 1’s along the main diagonal and 0’s elsewhere. Multiplicative inverses are written as A and A- 1

Show that matrices A and B are multiplicative inverses. Additional Examples Show that matrices A and B are multiplicative inverses. 3 –1 7 1 0.1 0.1 –0.7 0.3 A = B =

Practice (on whiteboards) Are these multiplicative inverses?

Practice (on whiteboards) Are these multiplicative inverses?

Evaluate each determinant. 2 X 2 Matrices, Determinants, and Inverses LESSON 4-5 Additional Examples Evaluate each determinant. 7 8 –5 –9 a. det b. det c. det 4 –3 5 6 a –b b a

Practice Find the determinant

Ex 3: Evaluate the determinant of X = . 3 X 3 Matrices, Determinants, and Inverses 8 –4 3 –2 9 5 1 6 0 Ex 3: Evaluate the determinant of X = .

Ex 4:

Practice Find the determinant

2.

3.

4. Homework 4.5 P207 #8-12e 4.6 P213 #1-4all 16 18