A colossally abundant number is a special type of integer that surpasses a specific threshold related to its divisors. More formally, a positive integer \( n \) is considered colossally abundant if it satisfies the condition: \[ \frac{\sigma(n)}{n} > \frac{\sigma(m)}{m} \] for all positive integers \( m < n \), where \( \sigma(n) \) is the sum of the positive divisors of \( n \).

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