Question
Rational Numbers in Different Forms Quick Check
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Question
How many digits long could the repeating cycle of a repeating decimal be if the denominator of the rational number is 7?(1 point)
Responses
up to seven digits long
up to seven digits long
any finite length
any finite length
infinitely long
infinitely long
up to six digits long
up to six digits long
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Answers
GPT-4o mini
The repeating cycle of a repeating decimal for a rational number is determined by the denominator when it is in its simplest form. For a denominator of 7, the cycle can be up to 6 digits long.
This is based on the property that the maximum length of the repeating cycle of a decimal representation of a rational number \( \frac{p}{q} \) occurs at \( q - 1 \) if \( q \) is prime and does not divide 10. Since 7 is a prime number, the repeating cycle can be up to 6 digits long.
So the correct answer is:
**up to six digits long**.
This is based on the property that the maximum length of the repeating cycle of a decimal representation of a rational number \( \frac{p}{q} \) occurs at \( q - 1 \) if \( q \) is prime and does not divide 10. Since 7 is a prime number, the repeating cycle can be up to 6 digits long.
So the correct answer is:
**up to six digits long**.