When working with a "system" of equations, you are working with two or more equations at the same time. Our initial investigations are working with two linear equations at a time.
(In Algebra, we will also be working with linear-quadratic systems.)
Kyle's little sister, Jenny, claims that she can beat him in a snowmobile race to the next turn in the trail. Kyle takes the challenge and gives her a one minute head start. Jenny travels at 1640 feet per minute and Kyle travels at 2640 feet per minute. How long will it take Kyle to catch up with Jenny? |
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Solution:
Let d = distance in feet and t = time in minutes. (Remember distance = rate x time.)
Create TWO equations:
After Jenny is traveling t = 2.64 minutes, Kyle travels 4329.6 feet and catches her. Since Kyle started one minute after Jenny, he traveled 2.64- 1 = 1.64 minutes before catching Jenny.
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Solving Systems:
As the example above shows, the main task of working with linear systems is to find where the lines intersect (where they cross one another).
There are three main methods used for solving systems of linear equations.
• Substitution Method: The goal of this algebraic method is to replace one of the equations with an equivalent expression by solving for one variable in one of the equations.
• Elimination Method: The goal of this algebraic method is to eliminate one of the variables using addition or subtraction. The remaining equation will easily yield either the x or the y coordinate of the intersection point.
• Graphical Method: The goal of this graphical method is to solve the system by graphing the lines either on graph paper, or on the graphing calculator, and locating the point of intersection, in a manner similar to what was done with the example above.
When working with systems, remember that the equations of lines may appear in a variety of forms, such as: y = 2x + 1; -5x + y = 7; 4x + 2y = -5; y = 7
You may need to re-write the equations before beginning your solutions.