We've updated our
Privacy Policy effective December 15. Please read our updated Privacy Policy and tap

Study Guides > MATH 0123

Proportions

Learning Outcome

  • Solve an application by writing and solving a proportion
A proportion is a statement that two ratios are equal to each other. You probably use proportional reasoning in real-life situations quite frequently. For example, say you have volunteered to provide drinks for a community event. You are asked to bring enough drinks for [latex]35-40[/latex] people. At the store you see that drinks come in packages of [latex]12[/latex]. So you multiply [latex]12[/latex] by [latex]3[/latex] to estimate how many packages you'll need and get [latex]36[/latex]. This may not be enough if [latex]40[/latex] people show up, so you decide to buy [latex]4[/latex] packages of drinks just to be sure everyone who wants one will get a drink. This process can also be expressed as a proportional equation and solved using mathematical principles. First, we can express the number of drinks in a package as a ratio:

[latex]\frac{12\text{ drinks }}{1\text{ package }}[/latex]

Then we express the number of people for whom we are buying drinks as a ratio with the unknown number of packages we need. We will use the maximum so we'll have enough.

[latex]\frac{40\text{ people }}{x\text{ packages }}[/latex]

We can find out how many packages to purchase by setting the expressions equal to each other:

[latex]\frac{12\text{ drinks }}{1\text{ package }}=\frac{40\text{ people }}{x\text{ packages }}[/latex]

To solve for x, we can use techniques for solving linear equations, or we can cross multiply as a shortcut.

[latex]\begin{array}{l}\,\,\,\,\,\,\,\frac{12\text{ drinks }}{1\text{ package }}=\frac{40\text{ people }}{x\text{ packages }}\\\text{}\\x\cdot\frac{12\text{ drinks }}{1\text{ package }}=\frac{40\text{ people }}{x\text{ packages }}\cdot{x}\\\text{}\\\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,12x=40\\\text{}\\\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,\,x=\frac{40}{12}=\frac{10}{3}=3.33\end{array}[/latex]

We can round up  to [latex]4[/latex] from [latex]3.33[/latex] since it doesn't make sense to buy [latex]0.33[/latex] of a package of drinks.  Of course, you don't usually write out your thinking this way when you are trying to estimate how many drinks to buy at the store. But doing so helps to apply the concepts involved to more challenging problems. The following example shows how to use a proportion in an application of a serious social issue, access to sanitary waste management systems and clean water.

Example

As of March, [latex]2016[/latex] the world's population was estimated at [latex]7.4[/latex] billion. [footnote] "Current World Population." World Population Clock: [latex]7.4[/latex] Billion People [latex](2016)[/latex]. Accessed June [latex]21, 2016[/latex]. http://www.worldometers.info/world-population/. [/footnote].  According to water.org, [latex]1[/latex] out of every [latex]3[/latex] people on the planet lives without access to a toilet.  Find the number of people on the planet that do not have access to a toilet.

Answer: We can use a proportion to find the unknown number of people who live without a toilet since we are given that [latex]1[/latex] in [latex]3[/latex] do not have access, and we are given the population of the planet. We know that [latex]1[/latex] out of every [latex]3[/latex] people do not have access, so we can write that as a ratio (fraction).

[latex]\frac{1}{3}[/latex]

Let the number of people without access to a toilet be x. The ratio of people with and without toilets is then

[latex]\frac{x}{7.4\text{ billion }}[/latex]

Equate the two ratios since they are representing the same fractional amount of the population.

[latex]\frac{1}{3}=\frac{x}{7.4\text{ billion }}[/latex]

Solve:

[latex]\begin{array}{l}\frac{1}{3}=\frac{x}{7.4}\\\text{}\\7.4\cdot\frac{1}{3}=\frac{x}{7.4}\cdot{7.4}\\\text{}\\2.46=x\end{array}[/latex]

The original units were billions of people, so our answer is [latex]2.46[/latex] billion people do not have access to a toilet. Wow, that is a lot of people.

In the next example, we'll see how we can use the length of a person's femur to estimate their height. This process is used in forensic science and anthropology. It has been found in scientific studies to be a good estimate.

Example

It has been shown that a person's height is proportional to the length of their femur [footnote]Obialor, Ambrose, Churchill Ihentuge, and Frank Akapuaka. "Determination of Height Using Femur Length in Adult Population of Oguta Local Government Area of Imo State Nigeria." Federation of American Societies for Experimental Biology, April [latex]2015[/latex]. Accessed June [latex]22, 2016[/latex]. http://www.fasebj.org/content/29/1_Supplement/LB19.short.[/footnote]. Given that a person who is [latex]71[/latex] inches tall has a femur length of [latex]17.75[/latex] inches, how tall is someone with a femur length of [latex]16[/latex] inches?

Answer: Height and femur length are proportional for everyone, so we can define a ratio with the given height and femur length. We can then use this to write a proportion to find the unknown height. Let x be the unknown height. Define the ratio of femur length and height for both people using the given measurements.

Person [latex]1[/latex]:  [latex]\frac{\text{femur length}}{\text{height}}=\frac{17.75\text{ }\text{inches}}{71\text{ }\text{inches}}[/latex]

Person [latex]2[/latex]:  [latex]\frac{\text{femur length}}{\text{height}}=\frac{16\text{ }\text{inches}}{x\text{ }\text{inches}}[/latex]

Equate the ratios since we are assuming height and femur length are proportional for everyone.

[latex]\frac{17.75\text{ }\text{inches}}{71\text{ }\text{inches}}=\frac{16\text{ }\text{inches}}{x\text{ }\text{inches}}[/latex]

 Solve by using the common denominator to clear fractions. The common denominator is [latex]71x[/latex].

[latex]\begin{array}{c}\frac{17.75}{71}=\frac{16}{x}\\\\71x\cdot\frac{17.75}{71}=\frac{16}{x}\cdot{71x}\\\\17.75\cdot{x}=16\cdot{71}\\\\17.75\cdot{x}=1136\\\\x=\frac{1136}{17.75}=64\end{array}[/latex]

The unknown height of person [latex]2[/latex] is [latex]64[/latex] inches. In general, we can simplify the fraction [latex]\frac{17.75}{71}=0.25=\frac{1}{4}[/latex] to find a general rule for everyone. This would translate to saying a person's height is 4 times the length of their femur.

Another way to describe the ratio of femur length to height that we found in the last example is to say there is a [latex]1:4[/latex] ratio between femur length and height, or [latex]1[/latex] to [latex]4[/latex]. Ratios are also used in scale drawings. Scale drawings are enlarged or reduced drawings of objects, buildings, roads, and maps. Maps are smaller than what they represent, while a drawing of dendritic branching [footnote] Urbanska M, Blazeczyk M, Jaworski J, "Molecular basis of dendritic arborization" Acta Neurobiol Exp (Wars). 2008:68(2):264-88. Accessed May 19, 2019 https://www.ncbi.nlm.nih.gov/pubmed/18511961[/footnote] in your brain would most likely be larger than what it represents. The scale of the drawing is a ratio that represents a comparison of the length of the actual object and its representation in the drawing. The image below shows a map of the United States with a scale of [latex]1[/latex] inch representing [latex]557[/latex] miles. We could write the scale factor as a fraction [latex]\frac{1}{557}[/latex] or as we did with the femur-height relationship, [latex]1:557[/latex].
Map of the United States with scale factor 1 inch = 577 miles Map of the United States with scale factor 1:577
In the next example, we will use the scale factor given in the image above to find the distance between Seattle, Washington and San Jose, California.

Example

Given a scale factor of [latex]1:557[/latex] on a map of the US, if the distance from Seattle, WA to San Jose, CA is [latex]1.5[/latex] inches on the map,  define a proportion to find the actual distance between them.

Answer: We need to define a proportion to solve for the unknown distance between Seattle and San Jose.  The scale factor is [latex]1:557[/latex], and we will call the unknown distance x. The ratio of inches to miles is [latex]\frac{1}{557}[/latex]. We know the inches between the two cities, but we do not know miles, so the ratio that describes the distance between them is [latex]\frac{1.5}{x}[/latex]. The proportion that will help us solve this problem is [latex]\frac{1}{557}=\frac{1.5}{x}[/latex]. Solve using the common denominator [latex]557x[/latex] to clear fractions. [latex-display]\begin{array}{ccc}\frac{1}{557}=\frac{1.5}{x}\\557x\cdot\frac{1}{557}=\frac{1.5}{x}\cdot{557x}\\x=1.5\cdot{557}=835.5\end{array}[/latex-display] We used the scale factor [latex]1:557[/latex] to find an unknown distance between Seattle and San Jose. We also checked our answer of [latex]835.5[/latex] miles with Google maps and found that the distance is [latex]839.9[/latex] miles, so we did pretty well!

In the next example, we will find a scale factor given the length between two cities on a map and their actual distance from each other.

Example

Two cities are [latex]2.5[/latex] inches apart on a map.  Their actual distance from each other is [latex]325[/latex] miles.  Write a proportion to represent and solve for the scale factor for one inch of the map.

Answer: We know that for each [latex]2.5[/latex] inches on the map, it represents [latex]325[/latex] actual miles. We are looking for the scale factor for one inch of the map. The ratio we want is [latex]\frac{1}{x}[/latex] where x is the actual distance represented by one inch on the map.  We know that for every [latex]2.5[/latex] inches, there are [latex]325[/latex] actual miles, so we can define that relationship as [latex]\frac{2.5}{325}[/latex] We can use a proportion to equate the two ratios and solve for the unknown distance.

[latex]\begin{array}{ccc}\frac{1}{x}=\frac{2.5}{325}\\325x\cdot\frac{1}{x}=\frac{2.5}{325}\cdot{325x}\\325=2.5x\\x=130\end{array}[/latex]

The scale factor for one inch on the map is [latex]1:130[/latex] or for every inch of map there are [latex]130[/latex] actual miles.

Watch the following video for an example of using proportions to obtain the correct amount of medication for a patient as well as to find a desired mixture of coffees. https://www.youtube.com/watch?v=yGid1a_x38g&feature=youtu.be

Licenses & Attributions

CC licensed content, Original

CC licensed content, Shared previously

  • Unit 15: Rational Expressions, from Developmental Math: An Open Program. Provided by: http://nrocnetwork.org/dm-opentext Authored by: Monterey Institute of Technology and Education. License: CC BY: Attribution.
  • Ex: Proportion Applications - Mixtures . Authored by: James Sousa (Mathispower4u.com) . License: CC BY: Attribution.
  • Map of USA showing state names (adapted to add Seattle, San Jose, and scale factor). Provided by: Wikimedia Commons Authored by: User:Wapcaplet (adapted by dwdevlin for Lumen Learning). Located at: https://commons.wikimedia.org/wiki/File:Map_of_USA_showing_state_names.png. License: CC BY-SA: Attribution-ShareAlike.