Subtracting Whole Numbers in Applications
Learning Outcomes
- Translate word phrases representing subtraction to mathematical expressions
- Use subtraction to solve word applications
Translate Word Phrases to Math Notation
As with addition, word phrases can tell us to operate on two numbers using subtraction. To translate from a word phrase to math notation, we look for key words that indicate subtraction. Some of the words that indicate subtraction are listed in the table below.Operation | Word Phrase | Example | Expression |
---|---|---|---|
Subtraction | minus | [latex]5[/latex] minus [latex]1[/latex] | [latex]5 - 1[/latex] |
difference | the difference of [latex]9[/latex] and [latex]4[/latex] | [latex]9 - 4[/latex] | |
decreased by | [latex]7[/latex] decreased by [latex]3[/latex] | [latex]7 - 3[/latex] | |
less than | [latex]5[/latex] less than [latex]8[/latex] | [latex]8 - 5[/latex] | |
subtracted from | [latex]1[/latex] subtracted from [latex]6[/latex] | [latex]6 - 1[/latex] |
example
Translate and then simplify:- The difference of [latex]13[/latex] and [latex]8[/latex]
- Subtract [latex]24[/latex] from [latex]43[/latex]
- The word difference tells us to subtract the two numbers. The numbers stay in the same order as in the phrase.
The difference of [latex]13[/latex] and [latex]8[/latex] Translate. [latex]13 - 8[/latex] Simplify. [latex]5[/latex] - The words subtract from tells us to take the second number away from the first. We must be careful to get the order correct.
Subtract [latex]24[/latex] from [latex]43[/latex] Translate. [latex]43 - 24[/latex] Simplify. [latex]19[/latex]
Subtract Whole Numbers in Applications
To solve applications with subtraction, we will use the same plan that we used with addition. First, we need to determine what we are asked to find. Then we write a phrase that gives the information to find it. We translate the phrase into math notation and then simplify to get the answer. Finally, we write a sentence to answer the question, using the appropriate units.example
The temperature in Chicago one morning was [latex]73[/latex] degrees Fahrenheit. A cold front arrived and by noon the temperature was [latex]27[/latex] degrees Fahrenheit. What was the difference between the temperature in the morning and the temperature at noon?Answer: Solution We are asked to find the difference between the morning temperature and the noon temperature.
Write a phrase. | the difference of [latex]73[/latex] and [latex]27[/latex] |
Translate to math notation. Difference tells us to subtract. | [latex]73 - 27[/latex] |
Then we do the subtraction. | |
Write a sentence to answer the question. | The difference in temperatures was [latex]46[/latex] degrees Fahrenheit. |
try it
The high temperature on [latex]\text{June}{1}^{\text{st}}[/latex] in Boston was [latex]77[/latex] degrees Fahrenheit, and the low temperature was [latex]58[/latex] degrees Fahrenheit. What was the difference between the high and low temperatures?Answer: The difference is [latex]19[/latex] degrees Fahrenheit.
The weather forecast for June [latex]2[/latex] in St Louis predicts a high temperature of [latex]90[/latex] degrees Fahrenheit and a low of [latex]73[/latex] degrees Fahrenheit. What is the difference between the predicted high and low temperatures?Answer: The difference is [latex]17[/latex] degrees Fahrenheit.
example
A washing machine is on sale for [latex]\text{\$399}[/latex]. Its regular price is [latex]\text{\$588}[/latex]. What is the difference between the regular price and the sale price?Answer: Solution We are asked to find the difference between the regular price and the sale price.
Write a phrase. | The difference between [latex]588[/latex] and [latex]399[/latex] |
Translate to math notation. | [latex]588 - 399[/latex] |
Subtract. | |
Write a sentence to answer the question. | The difference between the regular price and the sale price is [latex]\text{\$189}[/latex]. |
Licenses & Attributions
CC licensed content, Original
- Find the Difference of an Original and Sale Price (Whole Numbers). Authored by: James Sousa (Mathispower4u.com) for Lumen Learning. License: CC BY: Attribution.
CC licensed content, Shared previously
- The Language of Subtraction. Authored by: James Sousa (Mathispower4u.com). License: CC BY: Attribution.
- Question ID: 143348, 143340, 143349. Authored by: Alyson Day. License: CC BY: Attribution. License terms: IMathAS Community License CC-BY + GPL.
CC licensed content, Specific attribution
- Prealgebra. Provided by: OpenStax License: CC BY: Attribution. License terms: Download for free at http://cnx.org/contents/[email protected].