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The percentage difference calculator is here to help you compare two numbers. Here we will show you how to calculate the percentage difference between two numbers and, hopefully, to properly explain what the percentage difference is as well as some common mistakes. In the following article, we will also show you the percentage difference formula. On top of that, we will explain the differences between various percentage calculators, and how data can be presented in misleading, but still technically true, ways to prove various arguments.Now, if we want to talk about percentage difference, we will first need a difference, that is, we need two, non identical, numbers. Let's take, for example, 23 and 31; their difference is 8. Now we need to translate 8 into a percentage, and for that, we need a point of reference, and you may have already asked the question: Should I use 23 or 31? As we have not provided any context for these numbers, neither of them is a proper reference point, and so the most honest answer would be to use the average, or midpoint, of these two numbers.We would like to remind you that, although we have given a precise answer to the question "what is percentage difference?", precision is not as common as we all hope it to be. It is very common to (intentionally or unintentionally) call percentage difference what is, in reality, a percentage change. This makes it even more difficult to learn what is percentage difference without a proper, pinpoint search.
We will tackle this problem, along with dishonest representations of data, in later sections. We hope this will help you distinguish good data from bad data so that you can tell what percentage difference is from what percentage difference is not. For now, though, let's see how to use this calculator and how to find percentage difference of two given numbers. "How is this even possible?" Thats a good question. The reason here is that, despite the absolute difference gets bigger between these two numbers, the change in percentage difference decreases dramatically. The two numbers are so far apart that such a large increase is actually quite small in terms of their current difference. Therefore, if we want to compare numbers that are very different from one another, using the percentage difference becomes misleading. If you want to avoid any of these problems, our recommendation to only compare numbers that are different by no more than one order of magnitude (two if you want to push it). If you want to learn more about orders of magnitude and what this term means, we recommend our scientific notation calculator. Finally, what if you need to know the percentage change (increase or decrease) between amount or size "X" and "Y"? An item you have been thinking of purchasing had cost $249.95 and now costs $199.95. The ratio is 249.95:199.95. What is the percent the price dropped? (We would ask what is the "discount?") We can easily flip the calculation on its head. Suppose the price had been $199.95 and is now $249.95 (199.95:249.95), what is the percent increase? Use Percentage Calculator 4 (Source: financial-calculators.com)
To use it, first understand the ratio. For example, if you earn $1,000 a week and you have $183 taken out of your pay, and you want to know what percentage of your pay gets deducted from the total then the ratio you want to convert is 183:1000. Enter 183 as "This number" and the 1,000 as the "is what percent of this number." The result is 18.3%. Or you have 18.3% deducted from your pay.Calculator 1 can also be used as a fraction to percent calculator. How? If you've been following along, you probably already know. But for those who may have skipped ahead, the answer is simple. Take any fractions, for example, "27/82", and enter the numerator (27) into "This number." Then take the denominator (82) and enter it into "is what percent of this number." The percentage is 32.9268%. The concept of percent increase is basically the amount of increase from the original number to the final number in terms of 100 parts of the original. An increase of 5 percent would indicate that, if you split the original value into 100 parts, that value has increased by an additional 5 parts. So if the original value increased by 14 percent, the value would increase by 14 for every 100 units, 28 by every 200 units and so on. To make this even more clear, we will get into an example using the percent increase formula in the next section.
If we, on the other hand, prefer to stay with raw numbers we can say that there are currently about 17 million more active workers in the USA compared to 2010. Or we could that, since the labor force has been decreasing over the last years, there are about 9 million less unemployed people, and it would be equally true. Just by looking at these figures presented to you, you have probably started to grasp the true extent of the problem with data and statistics, and how different they can look depending on how they are presented. "How is this even possible?" Thats a good question. The reason here is that, despite the absolute difference gets bigger between these two numbers, the change in percentage difference decreases dramatically. The two numbers are so far apart that such a large increase is actually quite small in terms of their current difference. Therefore, if we want to compare numbers that are very different from one another, using the percentage difference becomes misleading. If you want to avoid any of these problems, our recommendation to only compare numbers that are different by no more than one order of magnitude (two if you want to push it). If you want to learn more about orders of magnitude and what this term means, we recommend our scientific notation calculator. (Source: www.omnicalculator.com)