In many of my posts when I'm considering sequences, I only look at sequence members whose values do not exceed 40000. Why? The answer to this question relates to the reason that I set this blog up in the first place. It was designed primarily to post about interesting sequences associated with the numbers marking my diurnal age.
If we divide 40000 by 365.2425 (the average number of days in a year) we get slightly more than 109.5 years and there are not many people who live to that ripe old age. Here are milestones, one might say, on the road to oblivion.
Quite a few people won't see 30000 days let alone 40000 but many will and hence the realistic upper limit to the numbers that I normally investigate. The focus of my blog posts is generally the number associated with my diurnal age and the sequences that it can be connected to. For example, today I am \( \textbf{27920} \) days old.
- the number is gapful meaning the number formed by concantenating the first and last digits divides the number without remainder
- the sum of the number's digits equals the number formed by the concatenated first and last digits
- the number of divisors of the number equals its sum of digits (and the concatenated number)
number factor concat dividend S0D divisors
1548 2^2 * 3^2 * 43 18 86 18 18 1812 2^2 * 3 * 151 12 151 12 12 1908 2^2 * 3^2 * 53 18 106 18 18 10188 2^2 * 3^2 * 283 18 566 18 18 10548 2^2 * 3^2 * 293 18 586 18 18 11268 2^2 * 3^2 * 313 18 626 18 18 12252 2^2 * 3 * 1021 12 1021 12 12 12612 2^2 * 3 * 1051 12 1051 12 12 12708 2^2 * 3^2 * 353 18 706 18 18 13428 2^2 * 3^2 * 373 18 746 18 18 14052 2^2 * 3 * 1171 12 1171 12 12 14412 2^2 * 3 * 1201 12 1201 12 12 15138 2 * 3^2 * 29^2 18 841 18 18 18108 2^2 * 3^2 * 503 18 1006 18 18 21984 2^5 * 3 * 229 24 916 24 24 26480 2^4 * 5 * 331 20 1324 20 20 27920 2^4 * 5 * 349 20 1396 20 20 29360 2^4 * 5 * 367 20 1468 20 20 39996 2^2 * 3^2 * 11 * 101 36 1111 36 36
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