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- ...plot.jpg|300px|thumb| Graphics \(~y\!=\!\mathrm{SuSin}(x)~\) and \(~y\!=\!\sqrt{3/x}~\) ]] \((2)~ ~ ~\mathrm{SuSin}(1)=1\)15 KB (2,314 words) - 18:48, 30 July 2019
- // DB Q=2.; z_type t=1./sqrt(-2.*z);1 KB (228 words) - 07:06, 1 December 2018
- z_type nemF0(z_type z){ int m,n,k; z_type c[22],s; z_type L=log(-z); z_type x=sqrt(-.5/(NEMTSOVp*z)); c[2]=APQ[2][1]*L;2 KB (347 words) - 07:06, 1 December 2018
- \(y = \mathrm{Linear}(x) = 2.4 − 0.0048x\) \(y = \mathrm{Arc}(x) = 0.02\sqrt{(123−x)(471+x)}\)38 KB (636 words) - 18:37, 30 July 2019
- \(y=\mathrm{Linear}(x)=2.4 - 0.0048 x\) \(y=\mathrm{Arc}(x)=0.01\sqrt{(123-x)(471+x)} ~\)10 KB (89 words) - 18:36, 30 July 2019
- \(T^2(z)=T(T(z))\)<br> ...ачениях, \(\sin^2(z)=\sin(\sin(z))\), а вовсе не \(\sin(z)^2\).<br>19 KB (1,132 words) - 20:36, 16 July 2023
- ...plify]] does not seem to handle well expressions with imaginary unity , I=\Sqrt[-1] . b = (-1 + Exp[(-2*I)*q - 2*s])*(-1 + Exp[(2*I)*q - 2*s])2 KB (305 words) - 18:43, 30 July 2019
- ...ions. Bulletin (New Series) of the American Mathematical society, v.29, No.2 (1993) p.151-188.</ref><ref name="domsta"> ...l as special function. Vladikavkaz Mathematical Journal, 2010, v.12, issue 2, p.31-45.15 KB (2,392 words) - 11:05, 20 July 2020
- \(y=\mathrm{Linear}(x)= 2.4-0.00048x\) \(y=\mathrm{Arc}(x)= c \sqrt{(a+x)(b-x)}\)39 KB (760 words) - 11:55, 22 April 2023
- D.Kouznetsov, H.Trappmann. Superfunctions and sqrt of Factorial. ...special function. [[Vladikavkaz Mathematical Journal]], 2010, v.12, issue 2, p.31-4512 KB (1,732 words) - 14:01, 12 August 2020
- ===2. Postulates=== ...e onarchica Italiana - U.M.I.// Nel corso del referendum istituzionale del 2 Giugno 1946 Napoli aveva dato l’83% dei voti alla Monarchia.60 KB (1,180 words) - 13:23, 24 July 2022
- http://www.ams.org/journals/mcom/2010-79-271/S0025-5718-10-02342-2/home.html <br> ...H.Trappmann. Portrait of the four regular super-exponentials to base sqrt(2). Mathematics of Computation, 2010, v.79, p.1727-1756.7 KB (1,082 words) - 07:03, 13 July 2020
- // superexponential to base \( \sqrt{2} \) 0.12022125769065893274e-1, 0.45849888965617461424e-2,1 KB (112 words) - 13:42, 7 July 2020
- x+1\over\sqrt{1-x^2}\label{ref2}457 bytes (68 words) - 20:12, 13 May 2021
- \( N = \log_{10}(100/0.5) = \log_{10}(200) \approx 2.301029995664 \approx 2 \) ===Exercise 2===10 KB (1,491 words) - 18:09, 11 June 2022
- \varphi(x)=\exp(-x^2/2)/\sqrt{2\pi} x^{2n} e^{-p x^2} \mathrm d x = \frac{(2n-1)!!}{2(2p)^n} \sqrt{\frac{\pi}{p}}2 KB (232 words) - 15:16, 3 April 2023
- ...2srav.png|300px}}<small><center> \( y_1=\exp_{\sqrt{2},2}^{~1/2}(x) \) , \( y_2=\exp_{\sqrt{2},4}^{~1/2}(x) \) ,<br> and the deviation \(D = y_1-y_2\)</center></small></div>5 KB (712 words) - 08:18, 9 May 2024
- echo 1/sqrt(8), "\n"; echo 2/(M_PI*sqrt(3)), "\n";2 KB (215 words) - 08:33, 9 May 2024
- ...345big.png|312px}}<small><center> \(y=\mathrm{Student}(n,x)\) for \(n\!= 1,2,3,4,5,\infty \) </center></small> ...a\left(\frac{\nu}{2}\right)} \left(1 + \frac{~ t^2}{\nu }\right)^{-(\nu+1)/2}</math>12 KB (1,727 words) - 03:21, 11 May 2024
- ...345big.png|360px}}<small><center> \(y=\mathrm{Student}(n,x)\) for \(n\!= 1,2,3,4,5,\infty \) </center></small> ...345big.png|360px}}<small><center> \(y=\mathrm{Ctudent}(n,x)\) for \(n\!= 1,2,3,4,5,\infty \) </center></small>5 KB (621 words) - 09:24, 10 May 2024
