The On-Line Encyclopedia of Integer Sequences (OEIS)

Revision History for A002549 (Bold, blue-underlined text is an addition; faded, red-underlined text is a ~~deletion~~.)
Showing entries 1-10 | older changes

A002549

Numerators of coefficients of log(1+x)/sqrt(1+x).
(history; published version)

#34 by N. J. A. Sloane at Sat Jul 18 13:15:38 EDT 2015

STATUS

editing

approved

#33 by N. J. A. Sloane at Sat Jul 18 13:15:34 EDT 2015

LINKS

W. G. Bickley and J. C. P. Miller, <a href="/A002551/a002551.pdf">Numerical differentiation near the limits of a difference table</a>, Phil. Mag., 33 (1942), 1-12 (plus tables) [Annotated scanned copy]

STATUS

approved

editing

#32 by Bruno Berselli at Fri Apr 18 02:50:18 EDT 2014

STATUS

proposed

approved

#31 by Joerg Arndt at Fri Apr 18 01:28:25 EDT 2014

STATUS

editing

proposed

#30 by Joerg Arndt at Fri Apr 18 01:28:05 EDT 2014

PROG

(PARI) x='x+O('x^66); abs(apply(t->numerator(t), Vec(log(1+x)/sqrt(1+x)))) \\ Joerg Arndt, Apr 18 2014

STATUS

approved

editing

Discussion

Fri Apr 18

01:28

Joerg Arndt: Note I need abs() in the code.

#29 by N. J. A. Sloane at Fri Apr 18 01:27:48 EDT 2014

STATUS

reviewed

approved

#28 by Franklin T. Adams-Watters at Thu Apr 17 20:14:10 EDT 2014

STATUS

proposed

reviewed

#27 by Michel Marcus at Thu Apr 17 15:13:40 EDT 2014

STATUS

editing

proposed

#26 by Michel Marcus at Thu Apr 17 15:13:34 EDT 2014

REFERENCES

W. G. Bickley and J. C. P. Miller, Numerical differentiation near the limits of a difference table, Phil. Mag., 33 (1942), 1-12 (plus tables).

LINKS

W. G. Bickley and J. C. P. Miller, <a href="http://dx.doi.org/10.1080/14786444208521334">Numerical differentiation near the limits of a difference table</a>, Phil. Mag., 33 (1942), 1-12 (plus tables).

STATUS

proposed

editing

#25 by Sean A. Irvine at Thu Apr 17 14:24:24 EDT 2014

STATUS

editing

proposed