Divisor Sum of 5564

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Example of Divisor Sum of Integer

$\map {\sigma_1} {5564} = 10 \, 584$

where $\sigma_1$ denotes the divisor sum function.


Proof

From Divisor Sum of Integer

$\ds \map {\sigma_1} n = \prod_{1 \mathop \le i \mathop \le r} \frac {p_i^{k_i + 1} - 1} {p_i - 1}$

where $\ds n = \prod_{1 \mathop \le i \mathop \le r} p_i^{k_i}$ denotes the prime decomposition of $n$.


We have that:

$5564 = 2^2 \times 13 \times 107$


Hence:

\(\ds \map {\sigma_1} {5020}\) \(=\) \(\ds \frac {2^3 - 1} {2 - 1} \times \paren {13 + 1} \times \paren {107 + 1}\)
\(\ds \) \(=\) \(\ds \frac 7 1 \times 14 \times 108\)
\(\ds \) \(=\) \(\ds 7 \times \paren {2 \times 7} \times \paren {2^2 \times 3^3}\)
\(\ds \) \(=\) \(\ds 2^3 \times 3^3 \times 7^2\)
\(\ds \) \(=\) \(\ds 10 \, 584\)

$\blacksquare$

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