Download A Guide to Mathematical Tables. Supplement No. 1 by N. M. Burunova, A. V. Lebedev, R. M. Fedorova PDF

By N. M. Burunova, A. V. Lebedev, R. M. Fedorova

A advisor to Mathematical Tables is a complement to the advisor to Mathematical Tables released by means of the U.S.S.R. Academy of Sciences in 1956. The tables comprise details on topics reminiscent of powers, rational and algebraic features, and trigonometric services, in addition to logarithms and polynomials and Legendre capabilities. An index directory all features incorporated in either the advisor and the complement is included.

Comprised of 15 chapters, this complement first describes mathematical tables within the following order: the accuracy of the desk (that is, the variety of decimal locations or major figures); the boundaries of edition of the argument and the period of the desk; and the serial variety of the e-book or magazine within the reference fabric. the second one half provides the writer, identify, publishing residence, and date and position of ebook for books, and the identify of the magazine, yr of ebook, sequence, quantity and quantity, web page and writer and identify of the object stated for journals. themes diversity from exponential and hyperbolic capabilities to factorials, Euler integrals, and similar services. Sums and amounts on the topic of finite ameliorations also are tabulated.

This ebook might be of curiosity to mathematicians and arithmetic scholars.

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Additional resources for A Guide to Mathematical Tables. Supplement No. 1

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A = 0,001 (0,001) 0,01 (0,01)0,3(0,1) 10 [28] x = 0(1) v a r i a b l e a = 0,1 (0,1) 10(1)20 [2] l a; = 0(1) 7; > 7. a= x = 0(1) 10; > 1 0 . a = l; 1 = 0(1)11; > 1 1 . x = 0(l)12; > 1 2 . x = 0(1)13; > 1 3 . a= 2 a=3 a= 4 —a » T 120] (a? — a ) 4 — aj r 2« z = 0(1)7; > 7 . s = 50; 100 [20] 100 [20] x = 0(0,0001)2; 0(0,1)10 x = 0 (0,0001) 0,1 x = 2 (0,001) 10 x = 0,1 (0,0005) 3,15; 3 (0,01) 10 (0,1) 20 x = 0(0,001) 1(0,01) 5,99 x = 0 (0,01) 1 (0,05) 4 (0,1) 5 (0,2) 6 (1) 10 x = 0(0,01) 1,6(0,1)6,3; 7(1)10 x = 0(0,01) 10,09 x = 0 (0,01) 5,99 [29] [8] [12] [8] [1] [25] [9] [3] [26] x= *= x= x= 0(l)10; 0(1)11; 0(1)12; 0(l)13; >10.

3 = 0,1 (0,1)3 [42] [26] p—3 oo , . 3 to . CM 1 6 dec. /> = —25(1)11 V [24] OO 05 V t v = 1(1)30(2)70. t = ° . ° 0 1 (0,001)0,01 (0,01) 0,1 (0,1) 2 (0,2) 10 (0,5) 20 (1) 40 (2) 134 5 dec. [13] THE PSI FUNCTION AND ITS DERIVATIVES 7 dec. 3= 0 ( var. 5—6 f i g . 3 = 0(0,01)10 )2 [25] [25] T[+(T(« + 1 ) ) - * ( T « ) ] 7 dec. s = 0 ( v a r . )2 5—6 f i g . 3 = 0(0,01)10 [25] [25J RefT v(to)-Re ^f ' r- (i£ +#too) 10 d e c . 3=0(0,005)2(0,01)6(0,02)10 (0,1)20(0,2)60(0,5)110 [21] 6 dec. 3=0(0,01)0,5(0,02)2(0,05)2,5 [17] 6 dec.

K- i • £ * ~ 3 ' 3 , 1 . 1 . 2 . 3 . 4 . 5 . 5 . 7 4* 3 ' 3 ' 4 ' 3 ' 3 ' 4 ' 4 [31] [40] [43] kT(k) 10 d e c . *=4 [28] igr(ft) 28 d e c . K ~ [31] 3' 3 1 r(fc) 15 d e c . * " _ 1 . 1 . 2 . 3 . 4 . 5 . 5 . 7 4 ' 3 , 3 ' 4 ' 3 ' 3 , 4 ' 4 [40] [43] Chapter 6 SINE AND COSINE INTEGRALS, EXPONENTIAL AND LOGARITHMIC INTEGRALS AND RELATED FUNCTIONS* SINE AND COSINE INTEGRALS oo 0 4 fig. 4 fig. x = 0(0,01) 10,09 a; = 0(0,01)5 00 OO as x 4—7 d e c . [1] [4] x = 1 (variable) [2] HYPERBOLIC SINE AND COSINE INTEGRALS S h i f r ^ j j y m - Ei(»)-Ei(__«) o 4 fig.

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