Math Formulas - Math Steps, Examples & Questions

High Impact Tutoring Built By Math Experts

Personalized standards-aligned one-on-one math tutoring for schools and districts

Request a demo

In order to access this I need to be confident with:

Addition and subtraction Multiplication and division

Absolute value

Fractions

Vectors

Exponential notation

Math resources Algebra

Math formulas

Here you will learn about math formulas, including what math formulas are and how to use them.

Students will first learn about math formulas as part of expressions and equations in 6th grade and expand on that knowledge in high school algebra.

What are math formulas?

Math formulas are rules that connect two or more variables. They are used to work out the values of unknown variables by substituting in other known values.

Formulas will usually include coefficients, constants, variables, and an operator.

For example, here is a rectangle with base $b$ and height $h.$ . You can use a math formula to find the value of the perimeter by substituting in the values for the length and width of the rectangle.

The formula for the perimeter $P$ of a rectangle is:

$P=2 \, (b+h)$

[FREE] Algebra Check for Understanding Quiz (Grade 6 to 8)

Use this quiz to check your grade 6 to 8 students’ understanding of algebra. 10+ questions with answers covering a range of 6th and 8th grade algebra topics to identify areas of strength and support!

DOWNLOAD FREE

[FREE] Algebra Check for Understanding Quiz (Grade 6 to 8)

DOWNLOAD FREE

Literal equations

Literal equations are equations that have more than one variable in them. Literal equations are represented by formulas and equations.

These equations will all have more than one variable in them, and in order to solve them, you will need to isolate one of the variables. To do this, you will use the inverse operation.

Step-by-step guide: Literal equations

Kinematic equations

Kinematic equations are a set of equations that describe the motion of an object with constant acceleration. These equations can be used to predict the position, time, speed, and acceleration of an object. They are often used in precalculus, calculus, and physics classes.

The four main kinematic equations, where $v_o$ is the initial velocity (original velocity), $v$ is the final velocity, $a$ is the constant acceleration, $t$ is time, and $s$ is the displacement (change in position). These equations can look different depending on the class you are in. For example, displacement, which is denoted by the variable s can be denoted by $x.$

Velocity-Time relation
$v=v_o+a t$
Displacement-Time relation
$s=v_o t+\frac{1}{2} a t^2$
Velocity-Displacement relation
$v^2=v_0^2+2 a s$
Average Velocity-Displacement relation
$s=\frac{\left(v_0+v\right)}{2} t$

Step-by-step guide: Kinematic equations (coming soon)

List of important math formulas

The following formulas are considered important math formulas for students to know and understand, including geometry formulas.

What are math formulas?

$What are math formulas?$

Common Core State Standards

How does this relate to 6th grade math and high school math?

Grade 6: Expressions and Equations (6.EE.A.2c)
Evaluate expressions at specific values of their variables. Include expressions that arise from formulas used in real-world problems. Perform arithmetic operations, including those involving whole number exponents, in the conventional order when there are no parentheses to specify a particular order (Order of Operations). For example, use the formulas $V = s^3$ and $A = 6s^2$ to find the volume and surface area of a cube with sides of length $s = 1/2.$

High School: Algebra (HS.A.CED.A.4)
Rearrange formulas to highlight a quantity of interest, using the same reasoning as in solving equations. For example, rearrange Ohm’s law $V = IR$ to highlight resistance $R.$

How to use math formulas

In order to solve with math formulas:

Use the formula given in the question.
Work carefully to answer the question, one step at a time.
Write the final answer clearly.

Math formulas examples

Example 1: perimeter of a rectangle

Find the perimeter of the given rectangle using the formula, $P=2 \, (b+h).$

Use the formula given in the question.

You will use the formula $P=2 \, (b+h)$ to find the perimeter of the rectangle.

The length of the rectangle is $13 \, cm$ and the width is $5 \, cm,$ so substitute the measurements into the formula.

$P=2 \, (13+5)$

2Work carefully to answer the question, one step at a time.

$P=2 \, (13+5)$

Solve the operation within the parenthesis first. Adding $13$ and $5$ gives you $18.$

$P=2 \times 18$

You will then multiply $2 \times 18.$

This can also be solved as $18 + 18$ to give the answer of $36.$

$P=36$

3Write the final answer clearly.

The final answer is $P = 36 \, cm.$

The perimeter of the rectangle is $36$ centimeters.

Example 2: area of a rectangle

Find the area of the rectangle given, using the formula $A = b \times h.$

Use the formula given in the question.

You will use the formula $A = b \times h$ to find the area of the rectangle.

The length of the rectangle is $32$ feet and the height is $17$ feet.

Substitute the measurements into the formula.

$A=32 \times 17$

Work carefully to answer the question, one step at a time.

$A=32 \times 17$

You will multiply $32$ by $17.$

$A = 544$

Write the final answer clearly.

The final answer is $A = 544 \, ft^2$ .

The area of the rectangle is $544$ square feet.

Example 3: area of a square

Find the area of the square given, using the formula $A=s \times s.$

Use the formula given in the question.

You will use the formula $A=s \times s$ to find the area of the square.

The side of the square is $17$ centimeters. Substitute the measurement into the formula.

$A=17 \times 17$

Work carefully to answer the question, one step at a time.

$A=17 \times 17$

You will multiply $17$ by $17.$

$A = 289$

Write the final answer clearly.

The final answer is $A=289 \mathrm{~cm}^2$ .

The area of the square is $289$ square centimeters.

Example 4: volume of a rectangular prism

Find the volume of the rectangular prism using the formula, $V = b \times h \times d.$

Use the formula given in the question.

You will use the formula $V = b \times h \times d$ to find the volume of the rectangular prism.

The length of the prism is $9$ inches, the width is $6$ inches and the height is $15$ inches. Substitute the measurements into the given formula.

$V = 9 \times 6 \times 15$

Work carefully to answer the question, one step at a time.

$V=9 \times 6 \times 15$

First, multiply the first two numbers using the knowledge of your multiplication facts, $9 \times 6 = 54.$

Multiply $54$ by $15$ to calculate the volume of the rectangular prism.

$V=54 \times 15$

$V=810 \text { inches }$

Write the final answer clearly.

The final answer is $V = 810 \text{ inches}^3.$

The volume of the rectangular prism is $810$ cubic inches.

Example 5: area of a triangle

Find the area of the triangle given, using the formula $A=\cfrac{1}{2} \, b h.$

Use the formula given in the question.

You will use the formula $A=\cfrac{1}{2} \, b h$ to find the area of the triangle.

The base of the triangle is $15 \, cm$ and the height of the triangle is $10 \, cm.$

Substitute the measurement into the formula.

$A=\cfrac{1}{2}\,(10 \times 15)$

Work carefully to answer the question, one step at a time.

$A=\cfrac{1}{2} \, (10 \times 15)$

Following the order of operations, you will multiply $10$ by $15$ first.

$10 \times 15=150$

$A=\cfrac{1}{2} \, (150)$

Finally you will multiply $150$ by $\, \cfrac{1}{2} \, ,$ or divide $150$ by $2.$

$A = 75$

Write the final answer clearly.

The final answer is $A=75 \mathrm{~cm}.^2$

The area of the triangle is $75$ square centimeters.

Example 6: area of a parallelogram

Find the area of the parallelogram given, using the formula $A = b \times h.$

Use the formula given in the question.

You will use the formula $A =b \times h$ to find the area of the parallelogram.

The base of the parallelogram is $27$ inches and the height is $19$ inches. Substitute the measurement into the formula.

$A=27 \times 19$

Work carefully to answer the question, one step at a time.

$A=27 \times 19$

To find the area, you will multiply $27$ by $19.$

$A = 513$

Write the final answer clearly.

The final answer is $A=513 \mathrm{~in}^2$ .

The area of the parallelogram is $513$ square inches.

Teaching tips for math formulas

Formulas can be difficult for students to memorize. Always have a way for students to refer back to the formula, such as an anchor chart or a reference sheet, until they get familiar and comfortable with each formula.

These basic math formulas will prepare students for work in high school with more complex numbers and formulas, including linear equations, the quadratic formula, and other algebra formulas, such as the slope-intercept formula.

While using quizzes to assess a student’s knowledge of the different equations is important, consider making the assessments real-life, and have students measure items within the classroom or school, and use the formulas to calculate the area of the classroom or playground.

Easy mistakes to make

Substituting in the wrong number in the equation
Learning the equation is important, but learning what each variable in an equation is equally important. In some basic math formulas, flipping the base and the height would still give students the same answer. However, as students move to more complex formulas, flipping of variables could result in incorrect answers.

For example, when finding the area of a trapezoid, flipping of a side versus the height would result in the wrong answer because the sides are added together and divided by $2,$ and the height is not.

Not clearly writing variables
Neat writing is important. For example, the variables $v$ and $u$ can easily be muddled as they look similar and they both represent velocity in kinematic formulas.

Practice math formulas questions

$83$ feet

$166$ feet

$163$ feet

$85$ feet

You will use the formula $P=2 \, (b+h)$ to find the perimeter.

Substitute the values within the formula.

$P=2 \, (32+51)$

Add the values within the parenthesis first.

$Math Formulas practice question 1 image 2$

$P=2 \, (83)$

Then multiply $83$ by $2.$

$Math Formulas practice question 1 image 3$

The final answer is $P = 166 \, ft.$

The perimeter of the rectangle is $166$ feet.

$2,747$ feet $^2$

$216$ feet $^2$

$2,647$ feet $^2$

$225$ feet $^2$

You will use the formula $A = b \times h$ to find the area of the rectangle.

Substitute in the values within the formula.

$A=41 \times 67$

Multiply $41$ by $67.$

$Math Formulas practice question 2 image 2$

The final answer is $A = 2,747 \, ft^2$ .

The area of the rectangle is $2,747$ feet $^2.$

$180$ inches $^2$

$1,825$ inches $^2$

$2,025$ inches $^2$

$225$ inches $^2$

You will use the formula for finding the area of a square $A=s \times s.$

Substitute the value into the formula.

$A=45 \times 45$

You will multiply $45$ by $45.$

$Math Formulas practice question 3 image 2$

The final answer is $A = 2,025 \, in^2$ .

The area of the square is $2,025$ inches $^2.$

$322$ inches $^3$

$1,510$ inches $^3$

$525$ inches $^3$

$1,610$ inches $^3$

You will use the formula to find volume of the rectangular prism $V=l \times w \times h.$

Substitute the measurements into the given formula.

$V=14 \times 5 \times 23$

Multiply $14 \times 5,$ first.

$Math Formulas practice question 4 image 2$

Then multiply the product of $14$ and $5$ by $23.$

$Math Formulas practice question 4 image 3$

The final answer is $V= 1,610 \, in^3$ .

The volume of the rectangular prism is $1,610$ inches $^3.$

$988$ inches $^2$

$114$ inches $^2$

$494$ inches $^2$

$524$ inches $^2$

You will use the formula $A=\cfrac{1}{2} \, b h$ to find the area of the triangle.

Substitute the measurements into the formula.

$A=\cfrac{1}{2} \, (38 \times 26)$

Following the order of operations, multiply $38$ by $26$ first.

$Math Formulas practice question 5 image 2$

$A=\cfrac{1}{2} \, (988)$

Then multiply $988$ by $\,\cfrac{1}{2} \, ,$ or divide $988$ by $2.$

$Math Formulas practice question 5 image 3$

The final answer is $A= 494 \, in^2$ .

The area of the triangle is $494$ inches $^2.$

9,408 \, cm^2.

448 \, cm^2.

623 \, cm^2.

9,308 \, cm^2.

You will use the formula $A=b \times h$ to find the area of the triangle.

Substitute the measurements into the formula.

$A=84 \times 112$

You will multiply $112$ and $84$ together to find the area of the quadrilateral.

$Math Formulas practice question 6 image 2$

The final answer is $A= 9,408 \, cm^2$ .

The area of the parallelogram is $9,408$ centimeters $^2.$

Math formulas FAQs

What is the Pythagorean Theorem?

The Pythagorean Theorem states that in any right triangle, the sum of the squares of the legs equals the square of the hypotenuse. If you know the lengths of any two sides of a right triangle, you can use the Pythagorean Theorem to find the third length.

What are the six functions of trigonometry?

The six functions of an angle, used in trigonometry, are sine, cosine, tangent, cotangent, secant, and cosecant.

What is the distance formula?

The distance formula is a formula used to measure how far apart two objects or points are.

The next lessons are

Beyond elementary

You can use formulas in lots of different areas of math. One of the most famous formulas is the quadratic formula which we can use to solve quadratic equations.

$x=\cfrac{-b \pm \sqrt{b^2-4 a c}}{2 a}$

Quadratics are a type of polynomial and using coordinate geometry you can use them to produce a parabola shaped quadratic graph. We can use the graph to work out the solutions to the equation and the y-intercept of the graph.

Still stuck?

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.