# What is 0.63 as a fraction?

Converting decimals to fractions can be useful in many situations. Let's go through the steps to convert a decimal 0.63 to a fraction.

You can try other values to get more familiar with the conversion process.

Often, convert 0.629 to a fraction or 0.631 to a fraction, depending on the task.

## Understanding the decimal: “0.63”

A decimal number consists of an integer part and a fractional part, separated by a decimal point. The integer part is on the left, and the fractional part is on the right. For example, in 0.63, 0 is the integer part and 63 is the fractional part.

## Conversion Explanation:

**For the numerator:**- We start with the number
**0.63**. - By removing the decimal point, we derive the numerator as
**63**.

- We start with the number
**For the denominator:**- Each position after the decimal represents a division by
**10**. - Thus, having
**2**positions after the decimal equates to**100**or**10**.^{2}

- Each position after the decimal represents a division by
**Factors:**- The factors for the numerator and the denominator are numbers that can evenly divide each of them.
- For instance, the factors of
**63**include**1, 3, 7, 9, 21, and 63**. - The factors of
**100**comprise**1, 2, 4, 5, 10, 20, 25, 50, and 100**.

**Greatest Common Divisor (GCD):**- It's the largest number that can evenly divide both the numerator and the denominator.
- In this instance, the GCD for
**63**and**100**is**1**.

## The factors of 63 are:

__1__3 7 9 21 63## The factors of 100 are:

__1__2 4 5 10 20 25 50 100## Conversion formula (equation):

**$0.63=\frac{0.63}{1}=\frac{\mathrm{0.63\; \times \; 100}}{\mathrm{1\; \times \; 100}}=\frac{63}{100}=\frac{\mathrm{63\xf71}}{\mathrm{100\xf71}}=\frac{63}{100}$**

## Solution:

**0.63 = $\frac{63}{100}$**

## What is a decimal?

A decimal is a numeral system that includes a point to separate the whole number part from the fractional part. This system makes it easy to work with numbers less than one.

## What is a fraction?

A fraction is a mathematical way of showing a part of a whole. It has two parts: the numerator on top and the denominator below, which help express partial values and comparisons.

## Step-by-step solution:

**Step 1:**First, write the decimal as a fraction over**1**. This sets up the next steps.**0.63 = $\frac{0.63}{1}$****Step 2:**Decimals can have different lengths. We will align the number of digits after the decimal point. For**0.63**, we have three digits. This means multiplying the fraction by a factor of**10**for each digit. Factor**= 10**^{2}= 100**Step 3:**Using this factor, multiply both the numerator and the denominator.**$\frac{\mathrm{0.63\; \times \; 100}}{\mathrm{1\; \times \; 100}}$ = $\frac{63}{100}$****Step 4:**Now we need to simplify the fraction by finding common divisors. The greatest common divisor is**1**. Divide both the numerator and the denominator by this common divisor.**$\frac{\mathrm{63\; \xf7\; 1}}{\mathrm{100\; \xf7\; 1}}$ = $\frac{63}{100}$**