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I-C Finite Math 1.20
Recall the rules for divisibility by $9$ and $11$:
- A number is divisible by $9$ if and only if the sum of its digits is divisible by $9$. Since the number has only $1$'s, it must have a multiple of $9$ number of digits.
- A number is divisible by $11$ if and only if the alternating sum of its digits is divisible by $11$. Since the number has only $1$'s, the alternating sum of its digits will be $1$ if it has an odd number of digits, or $0$ if it has an even number of digits. Thus, we need the number to have an even number of digits.
Since we need the number to have a number of digits that is a multiple of $9$ and even, the smallest possible number of digits it may have is $18$.
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