 # What Is 1/99 as a Decimal + Solution With Free Steps

The fraction 1/99 as a decimal is equal to 0.010101.

Fraction expression is defined as when a dividend is divided by a divisor.  p/q  represents the fraction expression whereas p is the dividend and q is the divisor. e.g 1/2 and 3/2 are fractions in which the p and q belong to integer values.

Here, we are more interested in the division types that result in a Decimal value, as this can be expressed as a Fraction. We see fractions as a way of showing two numbers having the operation of Division between them that result in a value that lies between two Integers. Now, we introduce the method used to solve said fraction to decimal conversion, called Long Division, which we will discuss in detail moving forward. So, let’s go through the Solution of fraction 1/99.

## Solution

First, we convert the fraction components, i.e., the numerator and the denominator, and transform them into the division constituents, i.e., the Dividend and the Divisor, respectively.

This can be done as follows:

Dividend = 1

Divisor = 99

Now, we introduce the most important quantity in our division process: the Quotient. The value represents the Solution to our division and can be expressed as having the following relationship with the Division constituents:

Quotient = Dividend $\div$ Divisor = 1 $\div$ 99

This is when we go through the Long Division solution to our problem. The following figure shows the long division: Figure 1

## 1/99 Long Division Method

We start solving a problem using the Long Division Method by first taking apart the division’s components and comparing them. As we have 1 and 99, we can see how 1 is Smaller than 99, and to solve this division, we require that 1 be Bigger than 99.

This is done by multiplying the dividend by 10 and checking whether it is bigger than the divisor or not. If so, we calculate the Multiple of the divisor closest to the dividend and subtract it from the Dividend. This produces the Remainder, which we then use as the dividend later.

Now, we begin solving for our dividend 1, which after getting multiplied by 10 twice becomes 100 and adding zero in quotient after the decimal point.

We take this 100 and divide it by 99; this can be done as follows:

100 $\div$ 99 $\approx$ 1

Where:

99 x 1 = 99

This will lead to the generation of a Remainder equal to 100 – 99 = 1. Now this means we have to repeat the process by Converting the 1 into 100 by multiplying the dividend with 10 again and adding zero in the quotient and solving for that:

100 $\div$ 99 $\approx$ 1

Where:

99 x 1 = 99

This, therefore, produces another Remainder which is equal to 100 – 99 = 1. Now , we have a Quotient generated after combining the pieces of it as 0.0101=z, with a Remainder equal to 1. Images/mathematical drawings are created with GeoGebra.