3.1 systems of linear equations
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3.1 Systems of Linear Equations. Using graphs and tables to solve systems Using substitution and elimination to solve systems Using systems to model data Value, interests, and mixture problems Using linear inequalities in one variable to make predictions. - PowerPoint PPT PresentationTRANSCRIPT
3.1 Systems of Linear Equations
• Using graphs and tables to solve systems
• Using substitution and elimination to solve systems
• Using systems to model data
• Value, interests, and mixture problems
• Using linear inequalities in one variable to make predictions
Using Two Models to Make a Prediction
• When will the life expectancy of men and women be equal?– L = W(t) = 0.144t + 77.47– L = M(t) = 0.204t + 69.90
Years since 1980
Yea
rs o
f Li
fe
60
80
100
20 40 60 80 100 120
(84.11, 87.06)
Equal at approximately 87 years old in 2064.
System of Linear Equations in Two Variables (Linear System)
• Two or more linear equations containing two variables
y = 3x + 3
y = -x – 5
Solution of a System
• An ordered pair (a,b) is a solution of a linear system if it satisfies both equations.
• The solution sets of a system is the set of all solutions for that system.
• To solve a system is to find its solution set.
• The solution set can be found by finding the intersection of the graphs of the two equations.
• Graph both equations on the same coordinate plane– y = 3x + 3– y = -x – 5
• Verify– (-3) = 3(-2) + 3– -3 = -6 + 3– -3 = -3
– (-3) = -(-2) – 5 – -3 = 2 – 5 – -3 = -3
• Only one point satisfiesboth equations
• (-2,-3) is the solution set of the system
Find the Ordered Pairs that Satisfy Both Equations
Solutions for
y = 3x + 3
Solutions for
y = -x – 5
Solution for both (-2,-3)
Example• ¾x + ⅜y = ⅞• y = 3x – 5 • Solve first equation for y
– ¾x + ⅜y = ⅞– 8(¾x + ⅜y) = 8(⅞)– 24x + 24y = 56
4 8 8
– 6x -6x + 3y = 7 – 6x– 3y = -6x + 7
3 3 3
– y = -2x + 7/3
(1.45,-.6)
y = 3x – 5
-.6 = 3(1.45) – 5
-.6 = 4.35 – 5
-.6 ≈ -.65
y = -2x + 7/3
-.6 = -2(1.45) + 7/3
-.6 = -2.9 + 7/3
-.6 ≈ -.57
Inconsistent System
• A linear system whose solution set is empty– Example…Parallel lines never intersect
• no ordered pairs satisfy both systems
Dependent System
• A linear system that has an infinite number of solutions– Example….Two equations of the same line
• All solutions satisfy both lines
y = 2x – 2
-2x + y = -2• -2x +2x + y = -2 +2x• y = 2x – 2
One Solution System
• There is exactly one ordered pair that satisfies the linear system– Example…Two lines
that intersect in only
one point
Solving Systems with Tables
x 0 1 2 3 4
y = 4x – 6 -6 -2 2 6 10
y = -6x + 14 14 8 2 -4 -10
• Since (2,2) is a solution to both equations, it is a solution of the linear system.