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Revision History for A035674

(Bold, blue-underlined text is an addition; faded, red-underlined text is a deletion.)

Showing entries 1-10 | older changes
A035674
Number of partitions of n into parts 8k and 8k+3 with at least one part of each type.
(history; published version)
#17 by Alois P. Heinz at Mon Aug 17 07:29:41 EDT 2020
STATUS

proposed

approved

#16 by Joerg Arndt at Mon Aug 17 07:21:55 EDT 2020
STATUS

editing

proposed

Discussion
Mon Aug 17
07:29
Alois P. Heinz: ...
#15 by Alois P. Heinz at Mon Aug 17 07:11:02 EDT 2020
FORMULA

G.f.: (-1 + 1/Product_ {k >= 0} (1 - x^(8*k + 3)))*(-1 + 1/Product_ {k >= 1} (1 - x^(8*k))). - Robert Price, Aug 12 2020

STATUS

proposed

editing

#14 by Wesley Ivan Hurt at Mon Aug 17 03:10:49 EDT 2020
STATUS

editing

proposed

#13 by Wesley Ivan Hurt at Mon Aug 17 03:10:46 EDT 2020
FORMULA

G.f. : (-1 + 1/Product_ {k >= 0} (1 - x^(8 *k + 3)))*(-1 + 1/Product_ {k >= 1} (1 - x^(8 *k))). - Robert Price, Aug 12 2020

STATUS

proposed

editing

#12 by Robert Price at Sun Aug 16 21:23:08 EDT 2020
STATUS

editing

proposed

#11 by Robert Price at Sun Aug 16 21:23:06 EDT 2020
CROSSREFS

Cf. A035441-A035468, A035618-A035673, A035675-A035699.

STATUS

approved

editing

#10 by Alois P. Heinz at Wed Aug 12 20:59:52 EDT 2020
STATUS

editing

approved

#9 by Alois P. Heinz at Wed Aug 12 20:59:49 EDT 2020
NAME

Number of partitions of n into parts 8k and 8k+3 with at least one part of each type.

STATUS

proposed

editing

#8 by Robert Price at Wed Aug 12 13:25:25 EDT 2020
STATUS

editing

proposed

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