A 2-year old child measures 32 inches tall and weighs 24 pounds. A 10-year old child measures 52 inches tall and weighs 96 pounds. How many percent is the smaller child's age of the older child's age?
- Ratio Rates Percents
- Rates Ratios And Percents Worksheets
- Percent And Ratio 101
- Ratio And Unit Rates Worksheets
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Given a number, finding the value that is some percentage of that value is another common skill. Typically this involves converting a percentage to a fraction over 100, then multiplying that fraction by the other number. This free percentage calculator computes a number of values involving percentages, including the percentage difference between two given values. Explore various other math calculators as well as hundreds of calculators addressing finance, health, fitness and more. LESSON 1: Unit Rate Problems (Part 1 of 3)LESSON 2: Unit Rate Problems (Part 2 of 3)LESSON 3: Unit Rate Problems (Part 3 of 3)LESSON 4: Ratios and PercentsLESSON 5: Finding Percent of a Number with DiagramsLESSON 6: Finding the Whole with DiagramsLESSON 7: Percentage EquationsLESSON 8: Finding the Total Using Percentage Equations.
| 1. Which of the following is equal to? |
| 2. Which of the following is equal to 0.218 ? |
| 3. Which of the following is equal to 95% ? |
| 4. Which of the following is equal to 12.5% ? |
| 5. Which of the following is equal to 62.5% ? |
| 6. Which of the following is equal to 1.75 ? |
| 7. Which of the following is equal to? |
| 8. Which of the following is equal to 0.0947 ? |
| 9. Which of the following is equal to 279% ? |
| 10. Which of the following is equal to 0.9625% ? |
Lesson 1: Introduction to Percentages
What are percentages?
A percentage is another way of writing a decimal. Just like decimals, a percentage is a part of a whole. Basically, it's less than 1 whole thing, but more than 0.
We use percentages all the time in real life. For example, have you ever left a fifteen percent tip at a restaurant? Or bought something on sale for twenty percent off? Those are both percentages—15percent and 20percent.
Click through the slideshow to learn how percentages work.
Let's look at some more percentages from real life. In Introduction to Decimals, you learned that 25 cents is 0.25 of a dollar.
Another way to say this is that 0.25 cents is 25percent of a dollar.
What about two quarters, or fifty cents? That's 0.50, or 50percent of a dollar.
Three quarters would be 75 cents, or 75 percent of a dollar.
And four quarters, or 100 cents, would be 100 percent of a dollar...
And four quarters, 100 cents, would be 100 percent of a dollar...or one whole dollar.
Percent literally means 'per hundred', or 'out of a hundred'.
In our example, every dollar is made up of one hundred pennies, or 100 cents.
So you could say that each penny is equal to 1 percent of a dollar.
Let's look at another example. Let's imagine we cut a pizza into five slices.
Each slice is equal to one-fifth, or .20, of the pizza.
We know that one slice is equal to .20 because .20 + .20 + .20 + .20 + .20 = 1.00.
So we can also say that one slice is equal to 20 percent of the pizza.
We can use the percent sign (%) to write that as 20%.
Right now, we have one whole pizza, or 100% of the pizza.
What if we take away one slice? Now we have 80%. That's because we removed a slice, or 20% of the pizza.
What if we take away two slices? Now we have 60%.
Now we have 40% left.
Even though we have less than one pizza, we still have more than zero pizzas. We have a percentage of the pizza left.
Writing percentages
As you saw in the slideshow, every percentage has two parts: a number and the percentsign (%). When you write a percentage, you'll write the number first, then the percent sign. Let's try it! How would you write this percentage?
nine percent
First, we'll write the number, nine, and then the percent sign (%). So our percentage will look like this:
9%
Try This!
Try writing the correct percentage in the box.
Reading percentages
When you read a percentage out loud, you'll need to read two parts: the number and the percentsign (%). Let's look at an example:
25%
25% is twenty five out of one hundred. We'd read 25% like this:
twenty-five percent
Sometimes percentages might have a decimal. For example:
7.5%
Here, 7.5% means we have seven-and-a-half out of one hundred. We'd read it like this:
seven point five percent
OR
seven and a half percent
You can read any percentage with a decimal point like this. How about 10.25%? That's ten and one quarter out of one hundred, so we'd read it as ten point two five percent, or ten and a quarter percent.
Try This!
Try reading each of the percentages below aloud.
Comparing percentages
Let's imagine you're shopping for apple juice. You find two different kinds—one contains 20% real juice, while the other contains 50% real juice.
Do you know which bottle has more real juice? Since both bottles are the same size, we can simply compare the numbers to see which percentage is larger.
50 is larger than 20, so 50% is a larger percentage than 20%. The larger the number next to the percent sign, the larger the percentage.
What about these percentages?
7% and 17%
Which is larger? Again, we'll look to see which number is larger. 17 is larger than 7, so 17% is a larger percentage than 7%.
Comparing percentages with decimals
What if you had to compare two percentages like this?
5.4% and 5.5%
Ratio Rates Percents
At first glance, it might be difficult to tell which percentage is larger. Remember, this is just another way of asking, 'Which is larger, five and four-tenths of a percent or five and five-tenths of a percent?' Since the first number is the same for both fractions, we'll compare the numbers to the right of the decimal place.
5 is larger than 4, so 5.5% is larger than 5.4%.
Rates Ratios And Percents Worksheets
What about these percentages?
5.55% and 5.56%
Again, since the first number is the same, we'll compare the numbers to the right of the decimal place.
56 is larger than 55, so 5.56% is larger than 5.55%.
Percent And Ratio 101
Do you know which bottle has more real juice? Since both bottles are the same size, we can simply compare the numbers to see which percentage is larger.
50 is larger than 20, so 50% is a larger percentage than 20%. The larger the number next to the percent sign, the larger the percentage.
What about these percentages?
7% and 17%
Which is larger? Again, we'll look to see which number is larger. 17 is larger than 7, so 17% is a larger percentage than 7%.
Comparing percentages with decimals
What if you had to compare two percentages like this?
5.4% and 5.5%
Ratio Rates Percents
At first glance, it might be difficult to tell which percentage is larger. Remember, this is just another way of asking, 'Which is larger, five and four-tenths of a percent or five and five-tenths of a percent?' Since the first number is the same for both fractions, we'll compare the numbers to the right of the decimal place.
5 is larger than 4, so 5.5% is larger than 5.4%.
Rates Ratios And Percents Worksheets
What about these percentages?
5.55% and 5.56%
Again, since the first number is the same, we'll compare the numbers to the right of the decimal place.
56 is larger than 55, so 5.56% is larger than 5.55%.
Percent And Ratio 101
Ratio And Unit Rates Worksheets
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