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Systems of Linear Equations in Two Variables

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Systems of Linear Equations in Two Variables ... system will have one ordered pair solution. 2. The two lines are ... Microsoft Equation 3.0 Section 4.1 ... – PowerPoint PPT presentation

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Title: Systems of Linear Equations in Two Variables


1
Section 4.1
  • Systems of Linear Equations in Two Variables

2
Introduction
  • In this section we will explore systems of linear
    equations and their solutions.
  • A system of linear equations is in the form

3
Solutions
  • We know from Chapter 4 that the graph of every
    linear equation is a straight line.
  • When you have two linear equations, you have (at
    most) two lines.
  • There are three possible scenarios for the
    relationship between those lines

4
1. The lines intersect in a single point
  • The system will have one ordered pair solution.

5
2. The two lines are parallel.
  • There are no ordered pair solutions.

6
3. The two lines are actually the same line.
  • There are infinitely many ordered pair solutions.

7
Solving Methods
  • Substitution
  • One of the equations has an isolated variable, or
    a variable that can be easily isolated.
  • Substitute what the variable is equal to into the
    other equation. Solve the resulting equation.
  • Use that solution to find the other variable.

8
Examples
9
Solving Methods
  • Elimination
  • Put both equations into standard form.
  • If necessary, multiply one or both equations by
    some number(s) to create a set of opposite
    coefficients.
  • Add the equations together. One variable will
    cancel. Solve for the remaining variable.
  • Substitute into either equation to find the other
    variable.

10
Examples
11
Special Cases
  • Both variables cancel out.
  • If the resulting statement is true, you have
    infinitely many solutions (the two equations make
    the same line).
  • If the resulting statement is false, you have no
    solution (the two equations make parallel lines).

12
Examples
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