Related Pages
Solve Systems of Equations by Addition
Systems of Equations (Graphical Method)
Worksheets to practice solving systems of equations
More Algebra Lessons
These algebra lessons, with videos, examples and step-by-step solutions, introduce the technique of solving systems of equations by substitution.
Systems of Equations
A system of equations is a collection of two or more equations that share the same set of variables. The goal when solving a system of equations is to find the values for each of the unknown variables that simultaneously satisfy all equations in the system.
In some word problems, we may need to translate the sentences into more than one equation. If we have two unknown variables then we would need at least two equations to solve the variable. In general, if we have n unknown variables then we would need at least n equations to solve the variable.
Methods for Solving Systems of Linear Equations
There are several common methods to solve systems of linear equations:
Substitution Method
Elimination Method (or Addition Method)
Graphing Method
Substitution Method
In the Substitution Method, we isolate one of the variables in one of the equations and substitute the results in the other equation. We usually try to choose the equation where the coefficient of a variable is 1 or -1 and isolate that variable. This is to avoid dealing with fractions whenever possible. If none of the variables has a coefficient of 1 or -1 then you may want to consider the Addition Method or Elimination Method.
The following example shows the steps to solve a system of equations using the substitution method. Scroll down the page for more examples and solutions.
Algebra Worksheets
Practice your skills with the following worksheets:
Printable & Online Algebra Worksheets
Steps to solving Systems of Equations by Substitution:
Note:
Example:
3x + 2y = 2 (equation 1)
y + 8 = 3x (equation 2)
Solution:
Step 1: Try to choose the equation where the coefficient of a variable is 1.
Choose equation 2 and isolate variable y
y = 3x - 8 (equation 3)
Step 2: From equation 3, we know that y is the same as 3x - 8
We can then substitute the variable y in equation 1 with 3x - 8
3x + 2(3x - 8) = 2
Step 3: Remove brackets using distributive property
3x + 6x - 16 = 2
Step 4: Combine like terms
9x - 16 = 2
Step 5: Isolate variable x
9x = 18
Step 6: Substitute x = 2 into
equation 3 to get the value for y
y = 3(2) - 8
y = 6 - 8 = -2
Step 7: Check your answer with equation 1
3(2) + 2(-2) = 6 - 4 = 2
Answer: x = 2 and y = -2
Solving systems of equations using Substitution Method through a series of mathematical steps to teach students algebra
Example:
2x + 5y = 6
9y + 2x = 22
How to solve systems of equations by substitution?
Example:
y = 2x + 5
3x - 2y = -9
Steps to solve a linear system of equations using the substitution method
Example:
x + 3y = 12
2x + y = 6
Example of a system of equations that is solved using the substitution method.
Example:
2x + 3y = 13
-2x + y = -9
Solving Linear Systems of Equations Using Substitution
Include an explanation of the graphs - one solution, no solution, infinite solutions.
Examples:
2x + 4y = 4
y = x - 2
x + 3y = 6
2x + 6y = -12
2x - 3y = 6
4x - 6y = 12
Example of how to solve a system of linear equation using the substitution method.
x + 2y = -20
y = 2x
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