

A275239


Highly composite numbers of class 1 (see comment).


7



3, 8, 16, 18, 30, 72, 144, 168, 252, 336, 420, 900, 960, 1008, 1080, 1440, 2160, 2880, 3360, 6300, 6720, 7920, 9240, 12600, 18480, 30240, 60480, 65520, 98280, 131040, 196560, 262080, 327600, 360360, 589680, 655200, 786240, 831600, 1108800, 1330560, 1663200
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OFFSET

1,1


COMMENTS

Consider the sequence of highly composite numbers (HCN) (A002182). Let us say that its terms are HCN of class 0. Removing A002182 from the positive integers we obtain the sequence 3,5,7,8,9,10,11,13,14,15,16,17,18,...(1)
Consider the subsequence whose number of divisors set a record. We obtain 3,8,16,18,... We call this sequence HCN of class 1. It is A275239.
Furthermore, removing from sequence (1) the HCN of class 1 we obtain the sequence 5,7,9,10,11,13,14,15,17,19,20,21,... (2)
Again consider the subsequence whose number of divisors are records. We obtain 5,9,10,20,... We call this sequence HCN of class 2. It is A275240, etc.
Note that the sequence of HCN of class h>=1 numbers begins from Prime(h+1)(which is the unique prime in the sequence).


LINKS

Amiram Eldar, Table of n, a(n) for n = 1..78 (terms below 10^10)


CROSSREFS

Cf. A002182, A275240, A275241, A275242, A275243, A275244.
Sequence in context: A094357 A136532 A030417 * A190450 A188012 A123979
Adjacent sequences: A275236 A275237 A275238 * A275240 A275241 A275242


KEYWORD

nonn


AUTHOR

Vladimir Shevelev and Peter J. C. Moses, Jul 21 2016


STATUS

approved



