Question

To convert the repeating decimal \(0.123123123...\) into a fraction, we can use the following method:

1. Let \(x = 0.123123123...\).

2. Notice that the decimal repeats every 3 digits. Therefore, multiply both sides by \(1000\) (since the repeating part is 3 digits long):

\[
1000x = 123.123123123...
\]

3. Now we can set up an equation using these two expressions:

\[
1000x = 123.123123123...
\]
\[
x = 0.123123123...
\]

4. Subtract the second equation from the first:

\[
1000x - x = 123.123123123... - 0.123123123...
\]

This simplifies to:

\[
999x = 123
\]

5. Now, solve for \(x\):

\[
x = \frac{123}{999}
\]

6. We can simplify \(\frac{123}{999}\) by finding the greatest common divisor (GCD) of 123 and 999. The GCD is 123, so:

\[
\frac{123 \div 123}{999 \div 123} = \frac{1}{8.12} = \frac{1}{8}
\]

7. Thus, \(x = 0.123123123... = \frac{1}{8}\) or it remains as \(x = \frac{123}{999}\) for the exact representation of the repeating decimal.

Since it appears you need to choose from the given options:

The correct answer is:

**A. \(\frac{123}{999}\)**.