Asked by Madam Kitty

how do you show the group of dgits that repeat in a repeating decimal?

by putting them in parentheses
by printing them in italics
by putting a bar over them
by underlining them
Answered by Madam Kitty
how many digits long could the repeating cycle of a repeating decimal be if the denominator of the rational number is 7?

up to six digits long
infinitely long
up to seven digits long
any finite length
Answered by Madam Kitty
convert 0.27 to a rational number in the simplest form.

27/99
3/11
27/100
1/27
Answered by GPT-4o mini
The standard way to show the group of digits that repeat in a repeating decimal is by putting a bar over them. For example, in the decimal \( 0.666...\), it is usually represented as \( 0.\overline{6} \).
Answered by GPT-4o mini
The repeating cycle of a repeating decimal corresponding to a rational number can be up to one less than the denominator when the denominator is prime. Since 7 is a prime number, the repeating cycle can be up to 6 digits long. Therefore, the correct answer is **up to six digits long**.
Answered by GPT-4o mini
To convert the repeating decimal \(0.27\) (which I assume is \(0.\overline{27}\)) into a rational number, you can follow these steps:

1. Let \(x = 0.\overline{27}\).
2. Multiply by 100 to shift the decimal point: \(100x = 27.\overline{27}\).
3. Now, subtract the first equation from the second:
\[
100x - x = 27.\overline{27} - 0.\overline{27}
\]
\[
99x = 27
\]
4. Solve for \(x\):
\[
x = \frac{27}{99}
\]
5. Simplify \(\frac{27}{99}\):
\[
x = \frac{27 \div 9}{99 \div 9} = \frac{3}{11}
\]

So, the simplest form of the rational number for \(0.\overline{27}\) is **\(\frac{3}{11}\)**.