have bing
It is a terminating decimal.
A terminating decimal.
repeating
To find the 2001st digit in the repeating decimal for 1/7, we need to understand that 1/7 is a recurring decimal with a repeating pattern of 142857. Since the pattern length is 6 digits, we divide 2001 by 6 to get the remainder, which is 1. Therefore, the 2001st digit in the repeating decimal for 1/7 is the first digit in the repeating pattern, which is 1.
It is a repeating decimal.
As a decimal, it is 0.2535353... with the two digit string, 53, repeating!
A decimal that has more than one digit repeating forever is known as a repeating or recurring decimal. For example, the decimal 0.142857142857... continues with the sequence "142857" repeating indefinitely. This can be represented as (0.\overline{142857}). Such decimals can be expressed as fractions, indicating that they are rational numbers.
If it is the same digit then technically the answer is yes. However, many people write 1.33 when they really mean 1.33 ... - the repeating decimal.
It is 7.8... (with the underlined digit repeating).
4/15 as a decimal is 0.26666 repeating
I don’t understand the question
To show a repeating decimal you put a dot above the digit that repeats.