Word Problems at a Glance

The art of determining how and when math can and should be applied in the real world is all about translating. It's helpful to come up with a game plan for figuring out complex word problems and translating them into Algebra-ese. (Algebrish? Algebrean? Something like that.) From there, all we have to do is solve a simple math equation. Shmoop will lay out the 7 magic steps that will make deciphering word problems an alge–breeze.

Oh, you want to know what they are? Sure, no problem. Well, word problems, but we meant no problem with—actually, nevermind. Let's take a look at those seven Shmoop steps.

Step 1: Read the Problem Thoroughly

First of all, we realize that you aren’t a fool. We aren't trying to insult your intelligence by telling you to do this, but you’d be amazed how many people get problems wrong because they don’t read carefully.

Pay attention to key pieces of information, and don’t get distracted by random fun facts that have nothing to do with solving the problem. For example, if a word problem asks you how many puppies there are total in a pet shop, don't worry about how many are brown, how many are spotted, or how many are wearing hats, and definitely ignore anything that has to do with cats.

Step 2: Identify the Unknown(s)

Once we've read the problem all the way through, we should identify what we're trying to solve for. In other words, what is the problem asking us to find?

If we're having trouble, look for key parts of the problem. Sentences that end in question marks are a big giveaway. Also look for key words such as "solve for" and "identify." Identifying the unknowns will help us set a clear goal so that we don’t get carried away.

Step 3: Write It Out

A helpful way to solve any word problem is to first write an "equation" using words. That’s right, no numbers. This is a way to map out what we'll later replace with variables and numbers. If we map out our equation first, using our language of choice, it will help us understand how to go about solving for the unknowns.

Step 4: Assign Labels

Now that we’ve listed out all of the parts of the equation in words, it's time to assign labels to each part. Labels can either be numbers or variables. Assigning labels will help us transition from words to the equation that will ultimately lead to the answer.

Sometimes it can also be helpful to list out applicable units next to each label so that we don't forget to write the final answer in the proper form (e.g., feet, grams, seconds, balloon animals, etc.).

Step 5: Turn Into Numbers

Now that everything's set up, it’s just a game of replacing words with labels. When we finish replacing, we'll see a beautiful algebraic equation. It's not just a pretty face, though; it's the key to finding our answer.

Step 6: Solve

We have an equation; now to solve it for the unknown. Don't act like you didn't see this step coming.

Step 7: Answer the Question

Believe it or not, this is the step that people forget most often. They get so excited about solving for a variable that they forget that they still need to check if that solution actually answers the question posed in the problem. This is one of the reasons why we read the problem so much in Step 1 and identify the unknowns in Step 2.

Once we've arrived at a solution, we go back and read the word problem again and write out a full answer in sentence form using the appropriate solution, including units. For example, if the question asks, "How long did the jog take," a complete answer would be, "The jog took 40 minutes." Simply scribble down "40" and you probably won't get any credit, even though you just did six steps' worth of hard work.

All of this sounds simple enough when just talking about it, but go ahead and click on the Examples button up top to see the magic in action.

Example 1

Marty, our resident baker, can frost 2 cupcakes per minute. He has baked both chocolate and vanilla cupcakes, but he also loves to decorate his cupcakes using sprinkles, yum. How long will it take him to frost 55 cupcakes?


Example 2

This one's about figuring out a grade for a class; it doesn't get more real-world—or meta—than that. Mae is taking a class in which her grade is determined by her scores on four exams. She has taken three exams so far, and she got scores of 92, 84, and 88 out of 100 points. She wants to average 90% in the class. What is the minimum score she can get on her last exam to still get a 90% in the class?


Example 3

Through painstaking research, Gary the deranged hamster farmer has determined that a single hamster running on its wheel can power a light bulb for 30 minutes. Gary wants to replace as much of his electricity as possible with hamster power. He needs to replace at least 5 light bulbs in his house, but if he replaces 10 or more, the energy company will figure out his scheme and send Animal Control after him. If Gary keeps his lights on for 8 hours a day, how many hamsters can he use?


Exercise 1

Leonardo was given a new phone on his last birthday. His parents had told him it was for emergencies only, but they're suspicious that he has been secretly texting a girlfriend that he hasn't told them about. The plan they got costs $49.98 per month, plus 10 cents per text message. If the bill for this first year that Leonardo had his new phone was $612.96, how many text messages did Leonardo use per month, on average?


Exercise 2

Mr. and Mrs. Smith get into their respective cars to go to work. (Not the Mr. and Mrs. Smith from the movie; there are no car chases or gunfire in this word problem.) They leave their house at exactly the same time, and Mr. Smith heads west at 60 mph, while Mrs. Smith heads east at 45 mph. How long does it take before they are 42 miles apart?


Exercise 3

Batty old Ms. Beauregard has a lot of cats and birds in her house. (It's not the animals that qualify her as batty, though: she thinks Elvis is alive and living in her basement.) There are a total of 252 legs in her house, including her own pair, and thankfully each of those legs is attached to a living organism. The number of birds is 3 less than twice the number of cats. How many cats does Ms. Beauregard have?


Exercise 4

The length of a rectangular shed is 3 times its width, while its area is 27 ft2. What are its dimensions? Just saying length and width won't count, smarty pants.


Exercise 5

Two mimes walk into a bar. One of them says, "Ouch." The other puts him in an invisible box and ships him to work in the mime pits under Kansas as punishment. Shipping costs a $10 flat fee, plus 75 cents for every pound the package weighs. The total cost of shipping was $107.50. How much does the unfortunate mime weigh?