Let $n$ be a perfect number. Prove that:
$$\mathbf{\sum_{d \mid n} \frac{1}{d}= 2} $$
Solution
We recall that a perfect number is a positive integer that is equal to the sum of its proper positive divisors, that is, the sum of its positive divisors excluding the number itself. Equivelanlty we have that:
$$\sigma(n)=2n$$
Thus for the sum in question we have that:
$$\mathbf{\sum_{d \mid n} \frac{1}{d}= \frac{\sigma(n)}{n}= \frac{2n}{n}=2} $$
ending the exercise.
$$\mathbf{\sum_{d \mid n} \frac{1}{d}= 2} $$
Solution
We recall that a perfect number is a positive integer that is equal to the sum of its proper positive divisors, that is, the sum of its positive divisors excluding the number itself. Equivelanlty we have that:
$$\sigma(n)=2n$$
Thus for the sum in question we have that:
$$\mathbf{\sum_{d \mid n} \frac{1}{d}= \frac{\sigma(n)}{n}= \frac{2n}{n}=2} $$
ending the exercise.
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