Tips: Use tab to move to the next field. Use shift-tab to move to the previous field. Press enter to calculate the correct result.

Use this very straightforward and more complex percentage calculator, which will also show you formula for percentage to solve quickly and understand any problems involving percentage.

This is a **free mobile-friendly online percentage calculator** which can help you with calculation of percentage and figuring out the correct answer.

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Percentage is per-cent which means parts per hundred, it describes how many parts there are out of one hundred parts of a particular thing.

One percent is equal to 1/100 fraction:

1% = 1/100 = 0.01

Ten percent is equal to 10/100 fraction:

10% = 10/100 = 0.1

Fifty percent is equal to 50/100 fraction:

50% = 50/100 = 0.5

One hundred percent is equal to 100/100 fraction:

100% = 100/100 = 1

One hundred and ten percent is equal to 110/100 fraction:

110% = 110/100 = 1.1

A fraction or ratio with 100 understood as the denominator; for example, 0.98 equals a percentage of 98. The result is obtained by multiplying a quantity by a percent.

Word **"percent"** comes from Latin (per centum). In English it means "out of hundred". **It is shown by the symbol %**.

It is written to the right side of the number: 50%

However Yelp has inspired you to be extra verbal or long winded and write an epic review there are some restrictions as well. Yelp gives you up to 5,000 characters to draft your response or reviews. There is in fact a character limit to Yelp reviews also on iOS app 500 characters per Tip and add a review search box to the 'More Reviews' list on the iPhone.

**In January Dylan worked a total of 35 hours, in February he worked 45.5 hours – by what percentage did Dylan’s working hours increase in February?**

To tackle this problem first we calculate the difference in hours between the new and old numbers. 45.5 - 35 hours = 10.5 hours. We can see that Dylan worked 10.5 hours more in February than he did in January – this is his increase. To work out the increase as a percentage it is now necessary to divide the increase by the original (January) number:

**10.5 ÷ 35 = 0.3**

Finally, to get the percentage we multiply the answer by 100. This simply means moving the decimal place two columns to the right.

**0.3 × 100 = 30**

**Dylan therefore worked 30% more hours in February than he did in January.**

In March Dylan worked 35 hours again – the same as he did in January (or 100% of his January hours). What is the percentage difference between Dylan’s February hours (45.5) and his March hours (35)? You may think that as there was a 30% increase between Dylan’s January hours (35) and February (45.5) hours that there will be a 30% decrease between his February and March hours. This assumption is incorrect – let’s calculate the difference.

First calculate the decrease in hours, that is: **45.5 - 35 = 10.5**

Then divide the decrease by the original number (February hours) so:

**10.5 ÷ 45.5 = 0.23 (to two decimal places).**

Finally multiply 0.23 by 100 to give 23%. Dylan’s hours were 23% lower in March than in February.

Sometimes it is easier to show percentage decrease as a negative number – to do this follow the formula above to calculate percentage increase – your answer will be a negative number if there was a decrease. In Dylan’s case the decrease works out at -15.5. -10.5 ÷ 45.5 = -0.23. -0.23 × 100 = -23%.

Dylan's hours could be displayed in a data table as:

Month | Hours Worked |
Percentage Change |

January | 35 | |

February | 45.5 | 30% |

March | 35 | -23% |

Use our online percentage calculator find the proportion of one number to another in percentage terms.

Think of this as turning a fraction into a percentage. Your fraction is x/y, and your percentage is [unknown, here] A/100.

x/y = A/100

The easiest way to do these, then, is to move the fraction around. If you multiply both sides by 100, you get A (your unknown) = 100x divided by y. Just plug in the numbers and out will come the answer. Some examples may make this even clearer.

What is 10 as a percent of 50?

Using the formula that we have just worked out, x is 10 and y is 50. The sum is therefore:v

100 × 10 = 1000

1000 ÷ 50 = 20.

Answer: 10 is 20% of 50.

This method, of course, also works with a more word-based problem.

You have been quoted commission of $7.50 on the sale of a table. The sale price is $150.

Another company has quoted you commission of 4.5%. You want to know which is better value.

This is asking you ‘What is $7.50 as a percent of $150?’.

Using the formula, therefore, x is 7.5 and y is 150.

7.5 × 100 = 750

750 ÷ 150 = 5.

Answer: The commission is 5% on the sale price. The commission of 4.5% is therefore better value for you as a customer.

Fractions, decimals and percentages are just different ways to show the same values. In the graph below you can see first fraction, percentage and decimals. Try to click in the fields below to see what is the difference between fraction, percentage and decimals values.

Just imagine you have pie and you slice him into 100 pieces. One slice is 1 percent of the whole pie. This is very important how to work with percents.

Here is a table of commonly used values shown in Percent, Decimal and Fraction form:

Percent | Decimal | Fraction |
---|---|---|

1% | 0,01 | ^{1}/_{100} |

5% | 0,05 | ^{1}/_{20} |

10% | 0,1 | ^{1}/_{10} |

12½% | 0,125 | ^{1}/_{8} |

20% | 0,2 | ^{1}/_{5} |

25% | 0,25 | ^{1}/_{4} |

33^{1}/_{3}% |
0,333... | ^{1}/_{3} |

50% | 0,5 | ^{1}/_{2} |

75% | 0,75 | ^{3}/_{4} |

80% | 0,8 | ^{4}/_{5} |

90% | 0,9 | ^{9}/_{10} |

99% | 0,99 | ^{99}/_{100} |

100% |
1 |
100/100 |

125% | 1,25 | ^{5}/_{4} |

150% | 1,5 | ^{3}/_{2} |

200% | 2 | _{}2/1 |