To show the group of digits that repeat in a repeating decimal, you can use a bar over them. For example, in the repeating decimal 0.666..., the repeating digit can be represented as \(0.\overline{6}\).

simplify

To simplify the response directly:

To show the repeating digits in a repeating decimal, use a bar over them. For example, \(0.\overline{6}\) indicates that the digit 6 repeats.

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 up to six digits long up to six digits long infinitely long simplify

The repeating cycle of a repeating decimal derived from a rational number with a denominator of 7 can be up to six digits long.

So, the correct response is: up to six digits long.

To convert 0.264¯¯¯¯¯¯¯¯ to a rational number, you would set x equal to 0.264¯¯¯¯¯¯¯¯ and then multiply both sides of the equation by what number?(1 point) Responses 100 100 999 999 10 10 1,000 simplify

To convert \(0.264\overline{6}\) to a rational number, you would set \(x\) equal to \(0.264\overline{6}\) and then multiply both sides of the equation by 1000.

So, the correct response is: 1,000.

thank you

You're welcome! If you have any more questions, feel free to ask. Happy studying!