High Impact Tutoring Built By Math Experts
Personalized standards-aligned one-on-one math tutoring for schools and districts
In order to access this I need to be confident with:
Decimals Fractions Addition and subtraction Multiplication and division Exponents Order of operations (PEMDAS) Algebraic expressionsHere you will learn about substitution, including what it is and how to use it to solve algebraic equations, expressions and inequalities.
Students will first learn about substitution as part of expressions and equations in 6th grade.
Substitution means replacing the variables in an algebraic expression, equation or inequality.
You can substitute values to solve general mathematical formulas.
For example,
Use the formula A= \cfrac{1}{2} \, bh to find the area of the triangle.
Substitute 5 for h and 13 for b and follow the order of operations:
\begin{aligned} &A=\cfrac{1}{2} \, b h \\\\ & A=\cfrac{1}{2} \times 13 \times 5 \\\\ & A=32.5 \text { units }^2 \end{aligned}
You can also use substitution in any mathematical expression, equation or inequality with unknowns (variables) to find the solution.
For example,
Does x = 2 satisfy the equation 4x+1=3 ?
Substitute 2 for x and follow the order of operations:
4 \times 2+1=8 + 1
8+1=9
9
Substituting 2 for x, does not satify the equation, so 2 is not a solution for 4x+1=3.
For example,
Does y = -4 satify the inequality y < 3 ?
Substitute -4 for y :
-4 < 3
Substituting -4 for y satisfies the inequality, so -4 is a solution for y < 3.
*Note that there are an infinite amount of solutions for this inequality – any number less than 3 will satisfy the inequality.
How does this relate to 6th grade math?
In order to use substitution to solve an algebraic expression, equation or inequality:
Use this worksheet to check your 6th grade students’ understanding of substitution. 15 questions with answers to identify areas of strength and support!
DOWNLOAD FREEUse this worksheet to check your 6th grade students’ understanding of substitution. 15 questions with answers to identify areas of strength and support!
DOWNLOAD FREEFind the volume of the rectangular prism using the formula, V=l \times w \times h.
V=12 \times 5 \times 4.5
2Solve using the order of operations.
\begin{aligned} & V=12 \times 5 \times 4.5 \\\\ & V=60 \times 4.5 \\\\ & V=270 \mathrm{~cm}^3 \end{aligned}
Find the value of 20-\cfrac{m}{5} \, when m=35.
Substitute each variable with its given value.
20-\cfrac{35}{5}
Solve using the order of operations.
\cfrac{35}{5} \, is an improper fraction and can be simplified to 7.
20-7=13
Does d = -8 satisfy the inequality d \geq -9 ?
Substitute each variable with its given value.
-8 \geq-9
Solve using the order of operations.
There is nothing to calculate, but you read the inequality ‘-8 is greater than or equal to -9.’
Substituting -8 for d satisfies the inequality, so -8 is a solution for d \geq -9.
*Note that there are an infinite amount of solutions for this inequality – any number greater than or equal to -9 will satisfy the inequality.
Does x=4 and y=2 satify the equation 3 x-5 y=2 ?
Substitute each variable with its given value.
3 \times 4-5 \times 2
Solve using the order of operations.
\begin{aligned} & 3 \times 4-5 \times 2 \\\\ & 12-10=2 \\\\ & 2=2 \end{aligned}
Substituting 4 for x and 2 for y satisfies the equation, so x=4 and y=2 is a solution for 3x-5y=2.
Find the value of 2 (q-r) when q=15 and r=6.
Substitute each variable with its given value.
2(15-6)
Solve using the order of operations.
2(9)=18
Remember 2(9) is the same as 2\times 9
The value of the expression is 18
Find the value of s^2(20-t) when s=2 and t=9.
Substitute each variable with its given value.
2^2(20-9)
Solve using the order of operations.
\begin{aligned} & 2^2(20-9) \\\\ & =2^2(11) \\\\ & =4(11) \quad \quad \text{ **Remember } 4(11) \text{ is the same as } 4 \times 11 \\\\ & =44 \end{aligned}
This substitution topic guide is part of our series on math equations. You may find it helpful to start with the main math equations topic guide for a summary of what to expect or use the step-by-step guides below for further detail on individual topics. Other topic guides in this series include:
1. Find the volume of the cube using the formula, V=s^3.
Substitute each variable with its given value.
Remember, s^3=s \times s \times s.
V=\left(\cfrac{1}{2}\right)^3
Solve using the order of operations.
\begin{aligned} & V=\left(\cfrac{1}{2}\right)^3 \\\\ & V=\cfrac{1}{2} \times \cfrac{1}{2} \times \cfrac{1}{2} \\\\ & V=\cfrac{1}{4} \times \cfrac{1}{2} \\\\ & V=\cfrac{1}{8} \, m^3 \end{aligned}
2. Find the value of 7 x-10 when x=5.
Substitute each variable with its given value.
7 \times 5-10
Solve using the order of operations.
\begin{aligned} & 7 \times 5-10 \\\\ & =35-10 \\\\ & =25 \end{aligned}
3. Which number is not a solution for x \leq-56?
Substitute each variable with its given value and then read each inequality:
-55 \leq-56… ‘-55 is less than or equal to -56’
-56 \leq-56… ‘-56 is less than or equal to -56’
-57 \leq-56… ‘-57 is less than or equal to -56’
-112 \leq-56… ‘-112 is less than or equal to -56’
Substituting -55 for x does not make the inequality true, so -55 is not a solution for x \leq-56.
4. Find the value of \cfrac{y}{4}+8 r when y=20 and r=3.
Substitute each variable with its given value.
\cfrac{20}{4}+8 \times 3
Solve using the order of operations.
\cfrac{20}{4} is an improper fraction and can be simplified to 5.
\begin{aligned} & \cfrac{20}{4}+8 \times 3 \\\\ & =5+8 \times 3 \\\\ & =5+24 \\\\ & =29 \end{aligned}
5. Find the value of 6 g \, (3 h-9) when g=10 and h=5.
Substitute each variable with its given value.
6 \times 10(3 \times 5-9)
Solve using the order of operations.
\begin{aligned} & 6 \times 10(3 \times 5-9) \\\\ & =6 \times 10(15-9) \\\\ & =6 \times 10(6) \\\\ & =6 \times 10 \times 6 \\\\ & =60 \times 6 \\\\ & =360 \end{aligned}
6. Find the value of 3 e^2+8 when e=4.
Substitute each variable with its given value.
3 \times 4^2+8
Solve using the order of operations.
Remember, 4^2=4 \times 4.
\begin{aligned} & 3 \times 4^2+8 \\\\ & =3 \times 16+8 \\\\ & =48+8 \\\\ & =56 \end{aligned}
Like the everyday definition of substitution, it is the act of replacing something with something else.
In other grades, students will learn how to use substitution in simultaneous equations, such as linear systems, which can include graphing.
No, by substituting numbers you are not changing the overall value of the equation, but seeing if the substituted number keeps the equation true.
No, factoring is finding the factors of algebraic expressions or equations by using properties of operations. This is different from using substitution to see if a number is within the solution set.
The substitution method is another way to say substitution. It can be used for simple equations, such as the ones shown on the page, all the way up to more complicated equations, such as solving systems of equations in algebra or finding derivatives in calculus.
At Third Space Learning, we specialize in helping teachers and school leaders to provide personalized math support for more of their students through high-quality, online one-on-one math tutoring delivered by subject experts.
Each week, our tutors support thousands of students who are at risk of not meeting their grade-level expectations, and help accelerate their progress and boost their confidence.
Find out how we can help your students achieve success with our math tutoring programs.
Prepare for math tests in your state with these 3rd Grade to 8th Grade practice assessments for Common Core and state equivalents.
Get your 6 multiple choice practice tests with detailed answers to support test prep, created by US math teachers for US math teachers!