Today I turned \( \textbf{27717} \) days old and this number has a plethora of interesting properties that deserve a special mention and thus a dedicated post. Here are some of those properties.
- \( \textbf{27717} \) is a so-called Lucky Cube, meaning it is a number whose cubes contain the digit sequence “888”, here:$$27717^3 = 21293088810813$$The numbers that satisfy from 27717 to 40000 are: 27717, 27942, 27973, 28192, 28442, 28484, 28692, 28740, 28942, 29079, 29192, 29354, 29387, 29391, 29418, 29420, 29442, 29491, 29642, 29692, 29942, 29989.
- \( \textbf{27717} \) is the lesser of a pair of adjacent composite numbers such that both are only one step away from their home primes. Here:
- \(27717 = 3 \times 9239 \rightarrow 39239\)
- \(27718 = 2 \times 13859 \rightarrow 213859\)
- \( \textbf{27717} \) is a number such that n + POD(n) and n - POD(n) are both prime (where POD stands for Product Of Digits). Here we have POD = 686:
- \(27717 + 686 = 28403\) which is a prime number
- \(27717 - 686 = 27031\) which is a prime number
- \( \textbf{27717} \) is an interprime number because it is at equal distance from the previous prime (27701) and the next prime (27733).
- \( \textbf{27717} \) is a number whose sum of divisors has prime factors (ignoring multiplicity) that multiply to the factorial 2310 where
\(2310= 2 \times 3 \times 5 \times 7 \times 11\)
Here 27717 has a sum of divisors 36960 and
\(36960= 2^5 \times 3 \times 5 \times 7 \times 11\)
but also forms a consecutive pair with 27718 because its sum of the divisors is 41580 and
\(41580= 2^2 \times 3^3 \times 5 \times 7 \times11\)
See blog post Primorials and the Sigma Function. - \( \textbf{27717} \) is the TENTH member of an interesting number chain (which is base independent):
- \(27708 = 12 \times 2309\)
- \(27709 = 11 \times 2519\)
- \(27710 = 10 \times 2771\)
- \(27711 = 9 \times 3079\)
- \(27712 = 8 \times 3464\)
- \(27713 = 7 \times 3959\)
- \(27714 = 6 \times 4619\)
- \(27715 = 5 \times 5543\)
- \(27716 = 4 \times 6929\)
- \(27717 = 3 \times 9239\)
- \(27718 = 2 \times 13859\)
See blog post Count Down Number Chains
- \( \textbf{27717} \) is a cyclic number.
- \( \textbf{27717} \) is a xenodrome in base 9 : 42016. See blog post Xenodromes.
- \( \textbf{27717} \) is a number that does not reach a palindrome after 2001 cycles of the reverse and add algorithm.
- \( \textbf{27717} \) is a D-number meaning it is a number \(n > 3\) such that n divides \( k^{n-2}- k\) for all \(1 < k < n\) relatively prime to \(n\).
- \( \textbf{27717} \) can be rendered as a digit equation as follows: \(2 - \dfrac{7}{7} = 1 ^ 7\)
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