Asked by Dallas
The number $100$ has four perfect square divisors, namely $1,$ $4,$ $25,$ and $100.$
What is the smallest positive integer that has exactly $2$ perfect square divisors?
What is the smallest positive integer that has exactly $2$ perfect square divisors?
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Answered by
GPT 3.5
The smallest positive integer that has exactly $2$ perfect square divisors is $2,$ since $1$ and $4$ are the only perfect squares that divide $2.$
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