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# 6.25 as a Fraction: Understanding the Math Behind It Have you ever encountered the number 6.25 and wondered how it can be expressed as a fraction? Numbers can often be fascinating, and understanding their different forms allows us to explore the depths of mathematics. In this article, we will dive into the world of 6.25 as a fraction, uncovering its meaning and how it can be represented mathematically. So, let’s embark on this numerical journey together!

## 6.25: The Fraction Unveiled

To express 6.25 as a fraction, we need to break it down into its simplest form. The number 6.25 is a decimal, and fractions are another way to represent parts of a whole. When we convert a decimal to a fraction, we reveal its fractional equivalent.

The process begins by examining the decimal places after the decimal point. In the case of 6.25, the decimal point is followed by two digits, which represent the hundredth place. To convert this decimal to a fraction, we can consider the number 6.25 as 6 wholes, 2 tenths, and 5 hundredths.

## Converting 6.25 to a Fraction: Step by Step

Now, let’s walk through the step-by-step process of converting 6.25 to a fraction:

Step 1: We start by writing the whole number part of the decimal as the numerator. In this case, the whole number is 6.

Step 2: Next, we determine the denominator of the fraction. Since we have two decimal places after the decimal point (hundredths), we use 100 as the denominator. This represents the number of equal parts that make up a whole.

Step 3: To incorporate the decimal part of the number, we take the digits after the decimal point (25) and write them as the numerator of a fraction.

Step 4: The denominator remains the same, which is 100.

By following these steps, we can express 6.25 as a fraction: 6.25 = 6 25/100.

## Reducing the Fraction

Now that we have expressed 6.25 as a fraction, we can simplify or reduce it to its simplest form. To do this, we divide both the numerator and denominator by their greatest common divisor (GCD), which is the largest number that divides evenly into both.

In this case, the GCD of 25 and 100 is 25. Dividing both the numerator and denominator by 25, we get:

6.25 = 6 (25 ÷ 25) / (100 ÷ 25) = 6/4.

Further simplifying, we can divide both the numerator and denominator by 2:

6/4 = (6 ÷ 2) / (4 ÷ 2) = 3/2.

Therefore, 6.25, when expressed as a fraction in its simplest form, is 3/2.