How to convert a rational number to a decimal?
Last Updated :
24 May, 2022
A number System can be defined as a system of writing to express numbers. It represents numbers in mathematical notation using a set of digits and symbols in a consistent manner. There are different types of numbers included in the number system like real numbers, whole numbers, integers, even, odd, prime numbers, rational, irrational, etc. The number system provides a unique representation for each number. There are different types of number systems available in Mathematics. They are- Decimal number system, Binary number system, Octal number system, and Hexadecimal number system.
The value of any digit in a number can be determined mainly by three measures. Those are,
- The digit.
- Position of a digit in the number (Like 10’s place 100’s place)
- Base of the number system.
What is a Rational Number?
A rational number is a number that can be expressed as the ratio of two integers i.e. in fraction form P/Q and the denominator in a rational number should not be equal to zero.
A few examples of rational numbers are 1/2, 22/7, 13/3, 7/12, etc.
What is a Decimal Number?
A decimal number is a number that is used in representing integer and non-integer numbers. A decimal number has a whole number and the fractional part separated by a dot. The dot present between the whole number and the fractional part is called the decimal point.
How do you convert a rational number to a decimal?
We divide the numerator by the denominator to convert a rational number to a decimal. To convert a rational number to a decimal, we simply convert it to a fraction. The numerator is then divided by the denominator, yielding the division’s exact value.
Here are the steps to convert fractions to decimals is as follows:
- Make the fraction an incorrect fraction if it’s a mixed number.
- Subtract the denominator from the numerator.
- Round the decimal off if the division does not come out evenly.
Let’s look into a few sample problems on how to convert a rational number to a decimal number using the Division method.
Sample Problems
Problem 1: Convert a rational number 3/2 into a decimal number.
Solution:
The decimal form of number 3/2 is 1.5
Problem 2: Convert a rational number 5/6 into a decimal number.
Solution:
Even after performing further division we get 2 as remainder. So the result we get is repeating decimal.
The decimal form of number 5/6 is 0.8333…
Problem 3: Convert a rational number 1/3 into a decimal number.
Solution:
Even after performing further division we get 1 as remainder. So the result we get is repeating decimal.
The decimal form of number 1/3 is 0.333…
Problem 4: Convert the number 12/0 into decimal form.
Solution:
First of all the number 12/0 is not rational because the denominator should not be zero in rational number. Even here we can’t perform division operation between 12 and 0 because any number cannot be divided by zero.
Problem 5: Convert the rational number 22/7 into decimal form.
Solution:
Here the decimal part of 142857 will repeat again and again on further simplification.
So the decimal form of 22/7 is 3.\bar{142857}.
Problem 6: Convert the rational number 25/4 into decimal form.
Solution:
Here we got a non repeating decimal form for the given rational number.
So decimal form of a rational number 25/4 is 6.25.
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