Translate a word sentence to an algebraic 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.
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-display]26[/latex] [latex]\Rightarrow\quad{26}[/latex-display]
[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-display]21+5\stackrel{\text{?}}{=}26[/latex-display]
[latex-display]26=26\quad\checkmark[/latex-display]
The solution checks. |
|
Example
Translate and solve: The difference of [latex]5p[/latex] and [latex]4p[/latex] is [latex]23[/latex].
Answer:
Solution:
| Translate. |
The difference of [latex]5p[/latex] and [latex]4p[/latex] [latex]\Rightarrow\quad{5p-4p}[/latex]
is [latex]\Rightarrow\quad{=}[/latex]
[latex-display]23[/latex] [latex]\Rightarrow\quad{23}[/latex-display]
[latex]5p-4p=23[/latex] |
| Simplify. |
[latex]p=23[/latex] |
| Check:
[latex-display]5p-4p=23[/latex-display]
[latex-display]5(23)-4(23)\stackrel{?}{=}23[/latex-display]
[latex-display]115-92\stackrel{?}{=}23[/latex-display]
[latex]23=23\quad\checkmark[/latex] |
|
| The solution checks. |
|
Watch this video for more examples of how to translate a phrase into an equation, then solve it.
https://youtu.be/w-64WyZYAMU
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?
Answer:
Solution:
| Read the problem carefully. |
|
| Identify what you are asked to find, and choose a variable to represent it. |
How much does Buster weigh?
Let [latex]b=[/latex] Buster's weight |
| Write a sentence that gives the information to find it. |
Buster's weight plus Chandler's weight equals 71 pounds. |
| We will restate the problem, and then include the given information. |
Buster's weight plus 28 equals 71. |
| Translate the sentence into an equation, using the variable [latex]b[/latex]. |
[latex]b+28=71[/latex] |
| Solve the equation using good algebraic techniques. |
[latex]b+28-28=71-28[/latex]
[latex]b=43[/latex] |
| Check the answer in the problem and make sure it makes sense. |
|
| Is 43 pounds a reasonable weight for a dog? |
Yes. |
| Does Buster's weight plus Chandler's weight equal 71 pounds? |
[latex]43+28\stackrel{?}{=}71[/latex] |
|
[latex]71=71\quad\checkmark[/latex] |
| Write a complete sentence that answers the question, "How much does Buster weigh?" |
Buster weighs [latex]43[/latex] pounds. |
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?
Answer:
Solution:
| What are you asked to find? |
"What was the sticker price of the car?" |
| Assign a variable. |
Let [latex]s=[/latex] the sticker price of the car. |
| Write a sentence that gives the information to find it. |
$24,575 is $875 less than the sticker price.
$24,575 is $875 less than [latex]s[/latex]. |
| Translate into an equation. |
[latex]24,575=s-875[/latex] |
| Solve. |
[latex]24,575+875=s-875+875[/latex]
[latex]24,575=s[/latex] |
| Check: |
Is $875 less than $25,450 equal to $24,575?
[latex-display]25,450 - 875\stackrel{?}{=}24,575[/latex-display]
[latex]24,575=24,575\quad\checkmark[/latex] |
| Write a sentence that answers the question. |
The sticker price was $[latex]25,450[/latex]. |
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.
https://youtu.be/0eUNh_Qkw9A
