If recurring decimal form of the number T is 7.32, then the rational number T is ________
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If the recurring decimal form of the number T is 7.32, then the rational number T is 7.33
Explanation:
Recurring Decimal:
- A recurring decimal, often known as recurring decimal, is a decimal number made up only of digits that repeat after the decimal at regular intervals.
- As an illustration, 46.374374374, 517.338383, etc. Depending on the sort of digits that follow the decimal point—whether they are recurring, non-repeating, terminating, or unending—decimals can be divided into many groups.
Rational number:
- Real numbers are those that are sensible.
- Real numbers that may be expanded to a finite number of digits before ending or finally starting to repeatedly use the same finite sequence of digits are known as rational real numbers.
- This assertion is accurate not just in base 10, but also in binary and hexadecimal integer bases.
Conclusion: The decimal number with recurring digits is 7.32, which would be rounded off to the nearest digit as 7.32323232... is rounded off to 7.33
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