Solving Applications of Percent
Solving Applications of Percent
Many applications of percent—such as tips, sales tax, discounts, and interest—occur in our daily lives. To solve these applications we’ll translate to a basic percent equation, just like those we solved in previous examples. Once we translate the sentence into a percent equation, we know how to solve it.
We will restate the problem solving strategy we used earlier for easy reference.
Use a Problem-Solving Strategy to Solve an Application
- Read the problem. Make sure all the words and ideas are understood.
- Identify what we are looking for.
- Name what we 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 algebraic 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.
Now that we have the strategy to refer to, and have practiced solving basic percent equations, we are ready to solve percent applications. Be sure to ask yourself if your final answer makes sense—since many of the applications will involve everyday situations, you can rely on your own experience.
Example
Dezohn and his girlfriend enjoyed a nice dinner at a restaurant and his bill was $68.50. He wants to leave an 18% tip. If the tip will be 18% of the total bill, how much tip should he leave?
Solution
| Step 1. Read the problem. | ||
| Step 2. Identify what we are looking for. | the amount of tip should Dezohn leave | |
| Step 3. Name what we are looking for. | ||
| Choose a variable to represent it. | Let t = amount of tip. | |
| Step 4. Translate into an equation. | ||
| Write a sentence that gives the information to find it. | ||
| Translate the sentence into an equation. | ||
| Step 5. Solve the equation. Multiply. | ||
| Step 6. Check. Does this make sense? | ||
| Yes, 20% of $70 is $14. | ||
| Step 7. Answer the question with a complete sentence. | Dezohn should leave a tip of $12.33. |
Notice that we used t to represent the unknown tip.
Example
The label on Masao’s breakfast cereal said that one serving of cereal provides 85 milligrams (mg) of potassium, which is 2% of the recommended daily amount. What is the total recommended daily amount of potassium?
Solution
| Step 1. Read the problem. | ||
| Step 2. Identify what we are looking for. | the total amount of potassium that is recommended | |
| Step 3. Name what we are looking for. | ||
| Choose a variable to represent it. | Let \(a=\) total amount of potassium. | |
| Step 4. Translate. Write a sentence that gives the information to find it. | ||
| Translate into an equation. | ||
| Step 5. Solve the equation. | ||
| Step 6. Check. Does this make sense? | ||
| Yes, 2% is a small percent and 85 is a small part of 4,250. | ||
| Step 7. Answer the question with a complete sentence. | The amount of potassium that is recommended is 4,250 mg. |
Example
Mitzi received some gourmet brownies as a gift. The wrapper said each brownie was 480 calories, and had 240 calories of fat. What percent of the total calories in each brownie comes from fat?
Solution
| Step 1. Read the problem. | ||
| Step 2. Identify what we are looking for. | the percent of the total calories from fat | |
| Step 3. Name what we are looking for. | ||
| Choose a variable to represent it. | Let \(p=\) percent of fat. | |
| Step 4. Translate. Write a sentence that gives the information to find it. | ||
| Translate into an equation. | ||
| Step 5. Solve the equation. | ||
| Divide by 480. | ||
| Put in a percent form. | ||
| Step 6. Check. Does this make sense? | ||
| Yes, 240 is half of 480, so 50% makes sense. | ||
| Step 7. Answer the question with a complete sentence. | Of the total calories in each brownie, 50% is fat. |
This lesson is part of:
Math Models and Geometry II