Post on 24-Feb-2016
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Chapter 8 – Systems of Non-Linear Equations
7 Days
8.1 Systems of Equations
Two days
Solving Systems of Equations
1242
xyxy
Solving Systems of Equations
7 1022
yxyx
p590 #2,5,11,13,19 - 21, 26 NO TI
Homework
Solving Systems
25 25
2
22
yxyx
Solving Systems with the TI
0yx2922 yx
p590 #15, 18,25,26,48,50,52
Homework
11-1 WS #5-20all, 23,25
Homework
8.3 Systems of Inequalities
Two days
Graphing systems of inequalities
2242
xyxy
Graphing systems of inequalities
5425
2
22
xxyyx
Graphing systems of inequalities
34912
2
22
xxyyx
pg 608 #5-11 odd, 15, 19, 23-29 odd
Homework
pg 608 #6-10 even, 16, 22-32 even
Homework
Field Trip: LD is preparing a trip to New York for 400 students. The company who is providing the transportation has small buses of 40 seats each and large buses of 50 seats, but only has 9 drivers available. Graph the system of inequalities to show all possible combinations of small buses and large buses that could be used for the trip.
Deal at the Outlets: Aeropostale at the Outlets in Hershey wants to liquidate 200 of its shirts and 100 pairs of pants from last season. They have decided to put together two offers, A and B. Offer A is a package of one shirt and a pair of pants]. Offer B is a package of three shirts and a pair of pants. The store does not want to sell less than 20 packages of Offer A and no less than 10 of Offer B. Graph the system of inequalities to show all possible combination of offer A and offer B that can be sold.
pg 610 #35-38, 41
Homework
Chicken Feed: One of your friends who owns a local farm asks you to use mathematics to help them save money. They have their chickens a healthy diet to gain weight. The chickens have to consume at least 15g of grain and at least 15g of protein. In the local market there are only two types of chicken feed for sale: Type X, with a composition of one gram of grain to five grams of protein, and another type, Y, with a composition of five grams of grain to one gram of protein. The price of a bag of Type X is $10 and Type Y is $30. What are the quantities of each type of feed that have to be purchased to cover the needs of the diet with a minimal cost?
Systems of Inequalities WS
Homework
8.5 MatricesFour Days
Inverses can be used to solve systems of equations. Solving large systems requires a different method using an augmented matrix.An augmented matrix consists of the coefficients and constant terms of a system of linear equations.
A vertical line separates the coefficients from the constants.
To write an augmented matrix, be sure your equations are in the form ax + by = c or ax + by + cx = d.
Write the augmented matrix for the system of equations.
Write the augmented matrix.
You can use the augmented matrix of a system to solve the system. First you will do a row operation to change the form of the matrix. These row operations create a matrix equivalent to the original matrix. So the new matrix represents a system equivalent to the original system.
For each matrix, the following row operations produce a matrix of an equivalent system.
Row reduction is the process of performing elementary row operations on an augmented matrix to solve a system. The goal is to get the coefficients to reduce to the identity matrix on the left side.This is called reduced row-echelon form.
1x = 51y = 2
Solving Systems of 2 Equations and 2 Unknowns
3382
yxyx
Solving Systems of 3 Equations and 3 Unknowns
243342432
zyxzyxzyx
Homework
8.5 Matrices Day 2
Get into groups of 4 students and solve the following systems using matrices.
Warm-up
72392263
zyxzyxzyx
1022632853
zyxzyxzyx
Pg 633 (#1, 3, 19)
Homework
8.5 Matrices Day 3
Warm-up #1
1935682
yxyx
Warm-up #2
433632533
zyxzyxzyx
Challenge!
6.28349.241035.342
123
4321
4321
4321
4321
xxxxxxxxxxxxxxxx
pg 633 (# 2, 4, 18, 20)
Homework
Pg 633 (# 5,10 by hand; 7,8 w/ calc) Pg 673 (# 9,10,16 w/ calc)
Homework
8.6 Operations on Matrices
2 Days
The size of a matrix is #Rows x #Columns
Size of a Matrix
Matrices to be added must the same size.
Adding and Subtracting Martices
Scalar Multiplication - each element in a matrix is multiplied by a constant.1. 2 7 1 0 -14 2 0
2. 4 2 04 5
-8 016 -20
3. 51 2 34 5 6 7 8 9
-5 -10 15-20 25 -3035 -40 45
Matrix Multiplication**Multiply rows times columns.**You can only multiply if the number of columns in the 1st matrix is equal to the number of rows in the 2nd matrix.
3 2 57 1 0
8 21 50 3
Dimensions: 3 x 22 x 3
They must match.
The dimensions of your answer.
Examples:
1. 2 13 4
3 9 25 7 6
2(3) + -1(5)
2(-9) + -1(7) 2(2) + -1(-6)3(3) + 4(5) 3(-9) + 4(7) 3(2) + 4(-6)
1 25 1029 1 18
3 9 2 2 1.
5 7 6 3 4
2
Dimensions: 2 x 3 2 x 2*They don’t match so can’t be multiplied
together.*
1 2 1 1 1 3 2 7
2 6 1 8
xyz
3.x 2y z 1x 3y 2z 72x 6y z 8
0 1 4 3
1 0 2 5
4.
2 x 2 2 x 2
*Answer should be a 2 x 2
0(4) + (-1)(-2) 0(-3) + (-1)(5)1(4) + 0(-2)
1(-3) +0(5)
2 -54 -3
Matrix Practice
4321
3123
BA
BA Find
AB Find
??? Does ABBA
More Practice
1001
3422
BA
BA Find
AB Find
1001
:MatrixIdentity
I
AAIAIA
:Matrices ofProperty Identity