What is 10 as a percentage of 15?

Find a percentage or work out the percentage given numbers and percent values. Use percent formulas to figure out percentages and unknowns in equations. Add or subtract a percentage from a number or solve the equations.

How to Calculate Percentages

There are many formulas for percentage problems. You can think of the most basic as X/Y = P x 100. The formulas below are all mathematical variations of this formula.

Let's explore the three basic percentage problems. X and Y are numbers and P is the percentage:

1. Find P percent of X
2. Find what percent of X is Y
3. Find X if P percent of it is Y

Read on to learn more about how to figure percentages.

1. How to calculate percentage of a number. Use the percentage formula: P% * X = Y

Example: What is 10% of 150?

• Convert the problem to an equation using the percentage formula: P% * X = Y
• P is 10%, X is 150, so the equation is 10% * 150 = Y
• Convert 10% to a decimal by removing the percent sign and dividing by 100: 10/100 = 0.10
• Substitute 0.10 for 10% in the equation: 10% * 150 = Y becomes 0.10 * 150 = Y
• Do the math: 0.10 * 150 = 15
• Y = 15
• So 10% of 150 is 15
• Double check your answer with the original question: What is 10% of 150? Multiply 0.10 * 150 = 15

2. How to find what percent of X is Y. Use the percentage formula: Y/X = P%

Example: What percent of 60 is 12?

• Convert the problem to an equation using the percentage formula: Y/X = P%
• X is 60, Y is 12, so the equation is 12/60 = P%
• Do the math: 12/60 = 0.20
• Important! The result will always be in decimal form, not percentage form. You need to multiply the result by 100 to get the percentage.
• Converting 0.20 to a percent: 0.20 * 100 = 20%
• So 20% of 60 is 12.
• Double check your answer with the original question: What percent of 60 is 12? 12/60 = 0.20, and multiplying by 100 to get percentage, 0.20 * 100 = 20%

3. How to find X if P percent of it is Y. Use the percentage formula Y/P% = X

Example: 25 is 20% of what number?

• Convert the problem to an equation using the percentage formula: Y/P% = X
• Y is 25, P% is 20, so the equation is 25/20% = X
• Convert the percentage to a decimal by dividing by 100.
• Converting 20% to a decimal: 20/100 = 0.20
• Substitute 0.20 for 20% in the equation: 25/0.20 = X
• Do the math: 25/0.20 = X
• X = 125
• So 25 is 20% of 125
• Double check your answer with the original question: 25 is 20% of what number? 25/0.20 = 125

Remember: How to convert a percentage to a decimal

• Remove the percentage sign and divide by 100
• 15.6% = 15.6/100 = 0.156

Remember: How to convert a decimal to a percentage

• Multiply by 100 and add a percentage sign
• 0.876 = 0.876 * 100 = 87.6%

Percentage Problems

There are nine variations on the three basic problems involving percentages. See if you can match your problem to one of the samples below. The problem formats match the input fields in the calculator above. Formulas and examples are included.

• Written as an equation: Y = P% * X
• The 'what' is Y that we want to solve for
• Remember to first convert percentage to decimal, dividing by 100
• Solution: Solve for Y using the percentage formula
  Y = P% * X

• Written using the percentage formula: Y = 10% * 25
• First convert percentage to a decimal 10/100 = 0.1
• Y = 0.1 * 25 = 2.5
• So 10% of 25 is 2.5

• Written as an equation: Y = P% ? X
• The 'what' is P% that we want to solve for
• Divide both sides by X to get P% on one side of the equation
• Y ÷ X = (P% ? X) ÷ X becomes Y ÷ X = P%, which is the same as P% = Y ÷ X
• Solution: Solve for P% using the percentage formula
  P% = Y ÷ X

• Written using the formula: P% = 12 ÷ 40
• P% = 12 ÷ 40 = 0.3
• Convert the decimal to percent
• P% = 0.3 × 100 = 30%
• So 12 is 30% of 40

• Written as an equation: Y = P% * X
• The 'what' is X that we want to solve for
• Divide both sides by P% to get X on one side of the equation
• Y ÷ P% = (P% × X) ÷ P% becomes Y ÷ P% = X, which is the same as X = Y ÷ P%
• Solution: Solve for X using the percentage formula
  X = Y ÷ P%

• Writen using the formula: X = 9 ÷ 60%
• Convert percent to decimal
• 60% ÷ 100 = 0.6
• X = 9 ÷ 0.6
• X = 15
• So 9 is 60% of 15

• Written as an equation: P% * X = Y
• The 'what' is P% that we want to solve for
• Divide both sides by X to get P% on one side of the equation
• (P% * X) ÷ X = Y ÷ X becomes P% = Y ÷ X
• Solution: Solve for P% using the percentage formula
  P% = Y ÷ X

• Written using the formula: P% = 6 ÷ 27
• 6 ÷ 27 = 0.2222
• Convert decimal to percent
• P% = 0.2222 × 100
• P% = 22.22%
• So 22.22% of 27 is 6

• Written as an equation: P% × X = Y
• The 'what' is X that we want to solve for
• Divide both sides by P% to get X on one side of the equation
• (P% × X) ÷ P% = Y ÷ P% becomes X = Y ÷ P%
• Solution: Solve for X using the percentage formula
  X = Y ÷ P%

• Written using the formula: X = 7 ÷ 20%
• Convert the percent to a decimal
• 20% ÷ 100 = 0.2
• X = 7 ÷ 0.2
• X = 35
• So 20% of 35 is 7.

• Written as an equation: P% * X = Y
• The 'what' is Y that we want to solve for
• Solution: Solve for Y using the percentage formula
  Y = P% * X

• Written using the formula: 5% * 29 = Y
• Convert the percent to a decimal
• 5% ÷ 100 = 0.05
• Y = 0.05 * 29
• Y = 1.45
• So 5% of 29 is 1.45

• Written as an equation: Y / X = P%
• The 'what' is X that we want to solve for
• Multiply both sides by X to get X out of the denominator
• (Y / X) * X = P% * X becomes Y = P% * X
• Divide both sides by P% so that X is on one side of the equation
• Y ÷ P% = (P% * X) ÷ P% becomes Y ÷ P% = X
• Solution: Solve for X using the percentage formula
  X = Y ÷ P%

• Written using the formula: X = 4 ÷ 12%
• Solve for X: X = Y ÷ P%
• Convert the percent to a decimal
• 12% ÷ 100 = 0.12
• X = 4 ÷ 0.12
• X = 33.3333
• 4 of 33.3333 is 12%

• Written as an equation: Y / X = P%
• The 'what' is Y that we want to solve for
• Multiply both sides by X to get Y on one side of the equation
• (Y ÷ X) * X = P% * X becomes Y = P% * X
• Solution: Solve for Y using the percentage formula
  Y = P% * X

• Written using the formula: Y = 11% * 25
• Convert the percent to a decimal
• 11% ÷ 100 = 0.11
• Y = 0.11 * 25
• Y = 2.75
• So 2.75 of 25 is 11%

• Written as an equation: Y / X = P%
• The 'what' is P% that we want to solve for
• Solution: Solve for P% using the percentage formula
  P% = Y / X

• Written using the formula: P% = Y / X
• 9 ÷ 13 = P%
• 9 ÷ 13 = 0.6923
• Convert decimal to percent by multiplying by 100
• 0.6923 * 100 = 69.23%
• 9 ÷ 13 = 69.23%
• So 9 of 13 is 69.23%

Related Calculators

Find the change in percentage as an increase or decrease using the Percentage Change Calculator.

Solve decimal to percentage conversions with our Decimal to Percent Calculator.

Convert from percentage to decimals with the Percent to Decimal Calculator.

If you need to convert between fractions and percents see our Fraction to Percent Calculator, or our Percent to Fraction Calculator.

References

Weisstein, Eric W. "Percent." From MathWorld -- A Wolfram Web Resource.

It's very common when learning about fractions to want to know how convert a fraction like 10/15 into a percentage. In this step-by-step guide, we'll show you how to turn any fraction into a percentage really easily. Let's take a look!

Want to quickly learn or show students how to convert 10/15 to a percentage? Play this very quick and fun video now!

Before we get started in the fraction to percentage conversion, let's go over some very quick fraction basics. Remember that a numerator is the number above the fraction line, and the denominator is the number below the fraction line. We'll use this later in the tutorial.

When we are using percentages, what we are really saying is that the percentage is a fraction of 100. "Percent" means per hundred, and so 50% is the same as saying 50/100 or 5/10 in fraction form.

So, since our denominator in 10/15 is 15, we could adjust the fraction to make the denominator 100. To do that, we divide 100 by the denominator:

100 ÷ 15 = 6.6666666666667

Once we have that, we can multiple both the numerator and denominator by this multiple:

10 x 6.6666666666667 / 15 x 6.6666666666667 = 66.666666666667 / 100

Now we can see that our fraction is 66.666666666667/100, which means that 10/15 as a percentage is 66.6667%.

We can also work this out in a simpler way by first converting the fraction 10/15 to a decimal. To do that, we simply divide the numerator by the denominator:

10/15 = 0.66666666666667

Once we have the answer to that division, we can multiply the answer by 100 to make it a percentage:

0.66666666666667 x 100 = 66.6667%

And there you have it! Two different ways to convert 10/15 to a percentage. Both are pretty straightforward and easy to do, but I personally prefer the convert to decimal method as it takes less steps.

I've seen a lot of students get confused whenever a question comes up about converting a fraction to a percentage, but if you follow the steps laid out here it should be simple. That said, you may still need a calculator for more complicated fractions (and you can always use our calculator in the form below).

If you want to practice, grab yourself a pen, a pad, and a calculator and try to convert a few fractions to a percentage yourself.

Hopefully this tutorial has helped you to understand how to convert a fraction to a percentage. You can now go forth and convert fractions to percentages as much as your little heart desires!

Fraction to Percentage Calculator

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