Learning Outcomes
- Translate a sentence into an algebraic equation
- Solve an equation that has been translated and verify the solution is correct
- Solve an application problem by writing and solving an algebraic equation
In previous chapters, we translated word sentences into equations. This skill will help you when you solve word problems. Previously, you translated phrases into expressions, and now we will translate phrases into mathematical equations so we can solve them.
The first step in translating phrases into equations is to look for the word (or words) that translate(s) to the equal sign. The table below reminds us of some of the words that translate to the equal sign.
Equals (=) | ||||||
---|---|---|---|---|---|---|
is | is equal to | is the same as | the result is | gives | was | will be |
Let’s review the steps we used to translate a sentence into an equation.
- Locate the “equals” word(s). Translate to an equal sign.
- Translate the words to the left of the “equals” word(s) into an algebraic expression.
- Translate the words to the right of the “equals” word(s) into an algebraic expression.
In our first example we will translate and solve a one-step equation.
Example
Translate and solve: five more than [latex]x[/latex] is equal to [latex]26[/latex].
Solution:
Translate. | Five more than [latex]x[/latex] [latex]\Rightarrow\quad{x+5}[/latex]is equal to [latex]\Rightarrow\quad{=}[/latex]
[latex]26[/latex] [latex]\Rightarrow\quad{26}[/latex] [latex]x+5=26[/latex] |
Subtract 5 from both sides. | [latex]x+5\color{red}{-5}=26\color{red}{-5}[/latex] |
Simplify. | [latex]x=21[/latex] |
Check:Is [latex]26[/latex] five more than [latex]21[/latex] ?
[latex]21+5\stackrel{\text{?}}{=}26[/latex] |
Example
Translate and solve: The difference of [latex]5p[/latex] and [latex]4p[/latex] is [latex]23[/latex].
Watch this video for more examples of how to translate a phrase into an equation, then solve it.
Translate and Solve Applications
In most of the application problems we solved earlier, we were able to find the quantity we were looking for by simplifying an algebraic expression. Now we will be using equations to solve application problems. We’ll start by restating the problem in just one sentence, then we’ll assign a variable, and then we’ll translate the sentence into an equation to solve. When assigning a variable, choose a letter that reminds you of what you are looking for.
Example
The Robles family has two dogs, Buster and Chandler. Together, they weigh [latex]71[/latex] pounds.
Chandler weighs [latex]28[/latex] pounds. How much does Buster weigh?
try it
https://ohm.lumenlearning.com/multiembedq2.php?id=145529&theme=oea&iframe_resize_id=mom520
https://ohm.lumenlearning.com/multiembedq2.php?id=145530&theme=oea&iframe_resize_id=mom550
Devise a problem-solving strategy.
- Read the problem. Make sure you understand all the words and ideas.
- Identify what you are looking for.
- Name what you are looking for. Choose a variable to represent that quantity.
- Translate into an equation. It may be helpful to restate the problem in one sentence with all the important information. Then, translate the English sentence into an algebra equation.
- Solve the equation using good algebra techniques.
- Check the answer in the problem and make sure it makes sense.
- Answer the question with a complete sentence.
Let’s take a look at the problem-solving strategy in action.
example
Shayla paid $[latex]24,575[/latex] for her new car. This was $[latex]875[/latex] less than the sticker price. What was the sticker price of the car?
Now you can try translating an equation from a statement that represents subtraction.
In the following video you will see another example of how to translate a phrase into an equation and solve.
Candela Citations
- One Step Linear Equation in One Variable App: Sticker Price. Authored by: James Sousa (Mathispower4u.com) for Lumen Learning. Located at: https://youtu.be/0eUNh_Qkw9A. License: CC BY: Attribution
- Question Id 145529, 145530, 141742, 141743, 141746. Authored by: Lumen Learning. License: CC BY: Attribution. License Terms: IMathAS Community License, CC-BY + GPL
- Prealgebra. Provided by: OpenStax. License: CC BY: Attribution. License Terms: Download for free at http://cnx.org/contents/caa57dab-41c7-455e-bd6f-f443cda5519c@9.757