Zobrazeno 1 - 10
of 114
pro vyhledávání: '"G.N. Watson"'
Autor:
G.N. Watson
This brief monograph by one of the great mathematicians of the early twentieth century offers a single-volume compilation of propositions employed in proofs of Cauchy's theorem. Developing an arithmetical basis that avoids geometrical intuitions, Wat
Autor:
G.N. Watson
Publikováno v:
The London, Edinburgh, and Dublin Philosophical Magazine and Journal of Science. 31:111-118
(1916). XVI. The sum of a series of cosecants. The London, Edinburgh, and Dublin Philosophical Magazine and Journal of Science: Vol. 31, No. 182, pp. 111-118.
Autor:
G.N. Watson
Publikováno v:
crll. 1933:238-251
Autor:
G.N. Watson M.A. D.Sc.
Publikováno v:
The London, Edinburgh, and Dublin Philosophical Magazine and Journal of Science. 35:364-370
(1918). XL. Bessel functions of equal order and argument. The London, Edinburgh, and Dublin Philosophical Magazine and Journal of Science: Vol. 35, No. 208, pp. 364-370.
Autor:
W.H. Eccles, E.W. Maunder, G. M. B. Dobson, P.R. Coursey, Sean Chapman, H.M. Sayers, L.B. Atkinson, F.W. Dyson, C. Chree, E.A. Reeves, G.N. Watson
Publikováno v:
Journal of the Institution of Electrical Engineers. 57:217-222
Autor:
G.N. Watson
Publikováno v:
The London, Edinburgh, and Dublin Philosophical Magazine and Journal of Science. 45:577-581
Autor:
G.N. Watson
Publikováno v:
The Mathematical Gazette. 39:280-286
The following problem was included in the paper set in the Mathematical Tripos on the morning of January 5, 1881 :iii. Prove that, if a + b + c = 0 and x + y + z = 0, then 4(ax + by + cz)3 - 3(ax+ by + cz)( a2+ b2+ c2)(a2+ y2 + z2) - 2 (b - c) (c - a
Autor:
G.N. Watson
Publikováno v:
The Mathematical Gazette. 37:244-246
(I). The following inequality is a straight generdisation of one of the most important inequalities occurring in elementary analysis. It is consequently of some intrinsic interest, even though it has to do with a determinant.Let n be a positive integ
Autor:
G.N. Watson
Publikováno v:
The Mathematical Gazette. 39:297-299