Name DateWORKSHEET 3.21: SOLVING SYSTEMS OF EQUATIONS THAT
HAVE ONE SOLUTION, NO SOLUTION, OR AN INFINITE NUMBER
OF SOLUTIONS
-------------------------------------------------------------------------------------To solve a system of equations, try to eliminate one of the variables and then follow the steps
below:- If only one of the variables is eliminated, the system of equations has only one solu-
tion. You can find this solution by substituting the value for the variable in one of the
equations and solving for the other variable. - If both variables are eliminated and the equation is true, there is an infinite number of
solutions. - If both variables are eliminated and the equation is false, there is no solution.
EXAMPLES
Solve each system of equations.y−x= 1 −x+ 2 y= 22 x+y= 4
y+x= 9 x− 2 y=− 2 − 2 x−y= 6
2 y= 10 0 = 00 = 10
y= 5 True statement False statement
Substitute 5 fory. Infinite number of solutions No solution
5 +x= 9
x= 4DIRECTIONS: Solve each system of equations, or write ‘‘infinite number of solutions’’ or
‘‘no solution.’’- x= 2 y 2.x+ 2 y= 8 3. x−y= 6
x− 2 y= 4 x−y=− 42 x+y= 3 - 2 x+ 2 y= 10 5.− 3 x+ 4 y=− 6
x+y= 55 x− 6 y= 8
CHALLENGE:By using guess and check, Jay found that the solution to the
system of equationsx+y=3and2(x+y)=6isx=1andy=2. Do you
agree? Explain your answer.129Copyright
©
2011 by Judith A. Muschla, Gary Robert Muschla, and Erin Muschla. All rights reserved.