What Is 30 Percent Of 750?

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When it comes to mathematics, solving problems can be quite challenging for many individuals. One of the common problems that people tend to stumble upon is calculating percentages. In this article, we will discuss and break down the process of finding out what 30 percent of 750 is. So, if you're someone who is struggling with percentages, this article is for you!

Understanding Percentages

Before we dive into the problem, let's have a quick refresher on percentages. Percentages are a way of representing a fraction of something in terms of 100. In simpler terms, percentages can be defined as a part of a whole number. For example, 50% can be represented as 50 out of 100, which can also be simplified as 1/2.

When it comes to calculating percentages, there are different methods that one can use. However, the most commonly used method is the percentage formula, which is:

Percentage Formula:

Percentage = (Part/Whole) x 100

This formula is used to calculate the percentage of a particular value in relation to a whole number. The part refers to the value that we want to find the percentage of, while the whole is the total value of the problem.

Calculating 30 Percent of 750

Now that we have a basic understanding of percentages and the formula used to calculate them, let's move on to solving the problem at hand, which is finding out what 30 percent of 750 is. To solve this problem, we will use the percentage formula.

Step 1:

Identify the part and the whole of the problem. In this case, the part is 30% and the whole is 750.

Step 2:

Convert the percentage to a decimal by dividing it by 100. In this case, 30% is equal to 0.3.

Step 3:

Plug the values into the percentage formula and solve for the part.

Percentage = (Part/Whole) x 100

30 = (Part/750) x 100

To solve for the part, we can cross multiply the equation:

30 x 750 = Part x 100

22500 = Part x 100

Divide both sides of the equation by 100 to isolate the part:

22500/100 = Part

225 = Part

Conclusion

Therefore, 30 percent of 750 is 225. By applying the percentage formula, we can easily solve percentage problems like this. It is important to have a basic understanding of percentages and the formula used to calculate them to avoid confusion and errors. With practice, solving percentage problems can become easier and less intimidating.