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- - Rating of performances. I know how to speak simply about the complex things. In the Navy, it is unavoidable. Got? ...system of higher education and distance training. This made it possible to double the number of students - mainly, due to the fact that young women acquire a135 KB (24,381 words) - 13:33, 30 October 2020
- ...d that \({\rm tet}_b(z^*)={\rm tet}_b(z)^*\), where the asterisk means the complex conjugation. For the case of base \(b \!=\! \mathrm e\), the index may be o Case of complex values of \(b\) is under investigation; conditions, that make the solution21 KB (3,175 words) - 23:37, 2 May 2021
- // The numerical implementation of the complex tet(complex,complex) <br> #define DB double6 KB (1,030 words) - 18:48, 30 July 2019
- .... Another fire at Japan's stricken Fukushima Daiichi (No. 1) nuclear power complex broke out early Wednesday, compounding the spree of disasters expected to t ...Until then the amount of radiation falling on the land and sea around the complex, and far beyond it, will continue to accumulate with every puff of steam an146 KB (19,835 words) - 18:25, 30 July 2019
- #define DB double #include <complex>3 KB (564 words) - 18:33, 28 April 2023
- for the complex values. The [[complex map]] of SuperFactorial is shown at the figure 2. The [[contour plot]]s of<18 KB (2,278 words) - 00:03, 29 February 2024
- [[Complex map]]: \( u\!+ \!\mathrm i v \!=\! \mathrm{ate}_b(x\!+\!\mathrm i y)~\) at D.Kouznetsov. Analytic solution of F(z+1)=exp(F(z)) in complex z-plane. Mathematics of Computation 78 (2009), 1647-1670.7 KB (1,091 words) - 23:03, 30 November 2019
- // showing the [[complex map]] of [[ArcTetration]] to base e. #define DB double3 KB (529 words) - 14:32, 20 June 2013
- // Complex double implementation of function [[ate]] in [[C++]]. // To call this function at complex argument z, type '''FSLOG(z)'''5 KB (275 words) - 07:00, 1 December 2018
- // [[plofu.cin]] , set of calls of routine "conto" that makes the [[complex map]]. // double g is array of length (M+1)*(N+1) of values of the real part of the function2 KB (392 words) - 14:32, 20 June 2013
- At \(x\!+\!a>1\), the function has complex values; at the figure this range is shaded. ...function, it may have sense to consider it as holomorphic function of the complex argument.12 KB (1,754 words) - 18:25, 30 July 2019
- However, neither algorithm for the evaluation not complex maps of the WrightOmega are suggested there. The [[complex map]]s of the ArcTania and Tania functions are shown in the figures at righ27 KB (4,071 words) - 18:29, 16 July 2020
- The [[complex map]] of the Doya function and its iterates is shown in figures at left; It is implemented as complex[double) function of two complex(double) parameters. the first of them transfers the value of parameter, denoted wi19 KB (2,778 words) - 10:05, 1 May 2021
- // '''doya.cin''' is the [[C++]] complex(double) implementation of the [[Tania function]] and the [[Doya function]]. #define DB double3 KB (480 words) - 14:33, 20 June 2013
- #include <complex> #define z_type complex<double>1 KB (238 words) - 14:33, 20 June 2013
- [[C++]] routine fft(*complex(double), int, int) is stored in file [[fafo.cin]]. This routine is used in the imp fafo(*complex(double), int, int) of the [[Fourier operator]].6 KB (1,010 words) - 13:23, 24 December 2020
- D.Kouznetsov. Analytic solution of F(z+1)=exp(F(z)) in complex z-plane. Mathematics of Computation, v.78 (2009), 1647-1670. Function \(\mathrm {tet}(z)\) is holomorphic in the whole complex plane except the line \(\Re(z)\le -2\).14 KB (1,972 words) - 02:22, 27 June 2020
- The type '''z_type''' is defined as complex(double);6 KB (954 words) - 18:27, 30 July 2019
- ...to base \(\exp(z)\) is evaluated with routine complex double Filog(complex double z) below2 KB (258 words) - 10:19, 20 July 2020
- ...figures for the [[Cauchi integral]] implementation of the [[tetration]] to complex base and to base \(b>\exp(1/\mathrm{e})\), and, in particular to \(b=\mathr ...188-7/home.html D.Kouznetsov. (2009). Solutions of F(z+1)=exp(F(z)) in the complex plane.. Mathematics of Computation, 78: 1647-1670.</ref>.108 KB (1,626 words) - 18:46, 30 July 2019