How to calculate the percentage

Today we are talking about “How to calculate the percentage”. The percentage is a very important part of any business, share marketing, and marketing. So, whether you’re a small and large business owner and looking for how to calculate the percentage, in this content we are going to show you “How to calculate the percentage”.

The formula for calculating percentages:

The formulas for calculating %tags or for converting from percentages are relatively quick and simple. To convert a fraction or decimal to a percentage, multiply by 100 (That is the rule of mathematics): To convert a percent to a fraction, just divide 100 into two parts and reduce the fraction (if it is possible):

Examples of the Great Percentage Calculations:

Here are the 2 Great examples, which will show how to calculate percentages.

1) 12 people out of a total of 25 were female. What percentage was female?

2) The price of a $1.50 candy bar is increased by 20%. What was the new price?

3) The tax on an item is $6.00. The tax rate is 15%. What is the price without tax?

Relevant types of problems and trouble to those in the examples above are solved in a series of 3 mini-lessons on Calculating with Percent. These are listed below.

1.    Percentage Chart

This Percentage Chart shows what 15% of $1 through $100 is although it is customizable so you can set the percentage and the numbers to whatever you want.

Find 1% - The Unitary Method:

Handy Tip: A good way of finding percentages is to start by finding what 1% is. Example: What is 6% of 31?
Find 1%. Divide by 100 (or move the decimal point two places to the left)	31 ÷ 100 = .31
We now know what 1% is. We just need to multiply it by 6 to find 6%	.31 x 6 = 1.86
6% of 31 is 1.86

You may practice calculating %tags by 1^st finding 1% (and/ or finding 10%) and then multiplying to get your accurate answer using this calculating percentage in the 2 Steps Worksheet. There are also more %tag worksheets here too.

Common Error Calculating in Percentage:

Since %tag are often logic of as parts of a larger whole concept, there may be an impulse to divide alternately of multiply when faced with a problem such as "find 35% of 80." As the example below shows, after applying the percent to a decimal.

The next step of percentage calculation is to multiply, not divide.

An understanding of percent allows the scholar to estimate to check whether their the answer is acceptable. In this example, perceptive that 35% is between one-quarter and one-half determine to mean the answer should be somewhere between 20 and 40.