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- ...x_n=\frac{\pi}{N} n\). For approximation of coefficeins \(a\), replace the integral with the finite sum: Comparison to equation (1) gives10 KB (1,447 words) - 18:27, 30 July 2019
- Term '''exact solution''' refers to some solution of certain equation(s), but also indicates some efficient way of the evaluation. Practically, t If deal with some [[ordinary differential equation]], and the solution is expressed in term of [[quadrature]]2 KB (351 words) - 15:00, 20 June 2013
- Also, [[AuZex]] satisfies the [[Abel equation]] Iterations of equation (3) gives the relations6 KB (899 words) - 18:44, 30 July 2019
- ===Integral=== Superpower function is solution \(F\) of the transfer equation \(T(F(z))=F(z\!+\!1)\),15 KB (2,495 words) - 18:43, 30 July 2019
- [[Zooming equation]] is tentative name for the equation The tentative name for the solution \(~f~\) of the [[zooming equation]] is [[zooming function]].10 KB (1,627 words) - 18:26, 30 July 2019
- ...file is supposed to be loaded in the working directory) and the [[Transfer equation]] for the exponential to base 10 as [[transfer function]]. // The integral is evaluated using the [[Gauss-Legendre]] quadrature formula; the nodes and2 KB (287 words) - 15:03, 20 June 2013
- [[Cauchi integral]] is used for evaluation. It is described in [[Mathematics of Computation]] The evaluation uses almost the same algorithm of the Cauchi integral <ref name=analuxp>5 KB (761 words) - 12:00, 21 July 2020
- The superfunction is holomorphic solution \(F\) of equation The abelfunction is solution of the Abel equation15 KB (2,166 words) - 20:33, 16 July 2023
- '''Participants''', who can easy distinguish integral from logarithm. Who can insert a new object into the equation, and only then begin to analyse, from what set is it? (Turns to the audienc4 KB (696 words) - 07:02, 1 December 2018
- The comparison with the First and Second equation in this section gives, that The integral above happen to be a little bit slow to evaluate, and the plot of function15 KB (2,303 words) - 18:47, 30 July 2019
- In this paper we will consider the tetration, defined by the equation \( F(z+1)= b^F(z)\) in the complex plane with \( F(0)=1\), for the case whe In this paper we will consider the tetration, defined by the equation \( F(z+1)= b^F(z)\) in the complex plane with \( F(0)=1\), for the case whe7 KB (1,082 words) - 07:03, 13 July 2020
- The [[Superfunction]] \(F\) is solution of the [[Transfer equation]] ...primary implementation of [[Tetration to base 2]] is based on the [[Cauchi integral]]6 KB (845 words) - 17:10, 23 August 2020
- Each of them is real-holomorphic and satisfies equation or cannot distinguish an integral from a logarithm;<br>10 KB (1,491 words) - 18:09, 11 June 2022