To convert the repeating decimal \( 0.01\overline{01} \) (where \( 01 \) is the repeating part) into a fraction, we can use the following steps:
Let \( x = 0.01\overline{01} \).
This means: \[ x = 0.0101010101\ldots \]
To eliminate the repeating decimals, we can multiply \( x \) by 10000 (since there are 4 digits in each full cycle of the repetition): \[ 10000x = 101.0101010101\ldots \]
Now, we have two equations:
- \( x = 0.0101010101\ldots \) (the original equation)
- \( 10000x = 101.0101010101\ldots \) (the equation after multiplying by 10000)
Next, we subtract the first equation from the second: \[ 10000x - x = 101.0101010101\ldots - 0.0101010101\ldots \] This simplifies to: \[ 9999x = 101 \]
Now, solve for \( x \): \[ x = \frac{101}{9999} \]
To simplify this fraction, we can check if 101 and 9999 have any common factors. Since 101 is a prime number, we can check if 9999 is divisible by 101. Dividing \( 9999 \) by \( 101 \): \[ 9999 \div 101 \approx 99 \] Calculating \( 101 \times 99 = 9999 \), which confirms \( 9999 = 101 \times 99 \).
Thus, we can simplify: \[ \frac{101}{9999} = \frac{1}{99} \]
Therefore, the simplest form of the fraction that represents the repeating decimal \( 0.01\overline{01} \) is: \[ \boxed{\frac{1}{99}} \]
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