%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%20International%20Business%20Certificate%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BD%EF%BF%BDaptao168%EF%BF%BD%EF%BF%BD%EF%BF%BDGTCvtRAe
(0.033 seconds)
11—20 of 118 matching pages
11: 36 Integrals with Coalescing Saddles
12: Gergő Nemes
13: Wolter Groenevelt
14: 33.24 Tables
15: 27.15 Chinese Remainder Theorem
16: William P. Reinhardt
17: Bibliography I
18: 6.19 Tables
Zhang and Jin (1996, pp. 652, 689) includes , , , 8D; , , , 8S.
Abramowitz and Stegun (1964, Chapter 5) includes the real and imaginary parts of , , , 6D; , , , 6D; , , , 6D.
Zhang and Jin (1996, pp. 690–692) includes the real and imaginary parts of , , , 8S.
19: Peter L. Walker
20: 10.75 Tables
Bickley et al. (1952) tabulates , or , , ( or ) , 8D (for ), 8S (for or ); , , , or , 10D (for ), 10S (for ).
The main tables in Abramowitz and Stegun (1964, Chapter 9) give to 15D, , , , to 10D, to 8D, ; , , , 8D; , , , , 5D or 5S; , , , , 10S; modulus and phase functions , , , , 8D.
Achenbach (1986) tabulates , , , , , 20D or 18–20S.
Zhang and Jin (1996, pp. 185–195) tabulates , , , , , , 5, 10, 25, 50, 100, 9S; , , , , , , , 8S; real and imaginary parts of , , , , , , , , 8S.
Olver (1960) tabulates , , , , , , , , , , 8D. Also included are tables of the coefficients in the uniform asymptotic expansions of these zeros and associated values as ; see §10.21(viii), and more fully Olver (1954).