Search results
Create the page "Sqrt(2)" on this wiki! See also the search results found.
File:SquareRootOfFactorial.png $y\!=\!\mathrm{factorial}^{1/2}(x)\!=\!\sqrt{\mathrm{factorial}}(x) \!=\!\sqrt{!\,}(x)$, thick red line, versus $x$.(538 × 1,050 (34 KB)) - 09:39, 21 June 2013File:TaniaBigMap.png +\big(\frac{ \ln(z\!+\!1)}{z+1}\big)^{\!2} \big(\frac{1}{2}-\ln(z\!+\!1)^{-1}\big) ...\frac{1}{3}-\frac{3}{4} \ln(z\!+\!1)^{-1}+ \ln(z\!+\!1)^{-2}\big)$ $(851 × 841 (654 KB)) - 08:53, 1 December 2018File:TaniaContourPlot100.png z_type TaniaS(z_type z){int n; z_type s,t=z+z_type(2.,-M_PI);t*=2./9.; t=I*sqrt(t); if( fabs(Im(z))< M_PI && Re(z)<-2.51) return TaniaNega(z);(1,182 × 1,168 (931 KB)) - 08:53, 1 December 2018File:TaniaNegMapT.png -\varepsilon^2+\frac{3}{2}\varepsilon^3 -\frac{8}{3}\varepsilon^4+\frac{125}{24}\varepsilon^6+ O(\var -\varepsilon^2+\frac{3}{2}\varepsilon^3 -\frac{7}{2}\varepsilon^4(1,773 × 1,752 (306 KB)) - 09:39, 21 June 2013File:TaniaSinguMapT.png ...unction]] with the truncated series of the expansion at the branch point $-2\!+\!\mathrm i$. -3t^2(851 × 841 (615 KB)) - 08:53, 1 December 2018File:TaniaTaylor0T.png +\frac{z}{2}$ $ +\frac{z^2}{16}$ $(851 × 841 (650 KB)) - 09:39, 21 June 2013File:Tet10bxr.jpg { fprintf(O,"%c!PS-Adobe-2.0 EPSF-2.0\n",'%'); fprintf(o,"2 setlinecap\n");(2,491 × 1,952 (236 KB)) - 08:53, 1 December 2018File:Tet10bxr.png { fprintf(O,"%c!PS-Adobe-2.0 EPSF-2.0\n",'%'); fprintf(o,"2 setlinecap\n");(1,196 × 936 (120 KB)) - 08:53, 1 December 2018File:Tetreal10bx10d.png : $b = 1.2$, : $b = \sqrt{2}\approx 1.41,$(2,192 × 2,026 (436 KB)) - 13:56, 5 August 2020File:Tetreal2215.jpg $-2 \! < \! x \! \le \! 2$ , [[conto.cin]], routine that draws the levels of a function of 2 variables<br>(876 × 881 (130 KB)) - 09:38, 21 June 2013File:Varipend3v16.png DB q=1./sqrt(3.); DB f=M_PI*2./3.;(8,334 × 1,384 (592 KB)) - 09:43, 21 June 2013File:Yulya01plot80.png ...(x)= \frac{a\!+\!x}{\sqrt{1-(a\!+\!x)^2}}-\frac{a\!-\!x}{\sqrt{1-(a\!-\!x)^2}}$ return p/sqrt(1.-p*p)-m/sqrt(1.-m*m);}(1,163 × 1,152 (287 KB)) - 09:39, 21 June 2013File:Yulyaplot100.png ...(x)= \frac{a\!+\!x}{\sqrt{1-(a\!+\!x)^2}}-\frac{a\!-\!x}{\sqrt{1-(a\!-\!x)^2}}$ return p/sqrt(1.-p*p)-m/sqrt(1.-m*m);}(762 × 748 (128 KB)) - 09:39, 21 June 2013File:Z f8e0e5e5.jpg \frac{1}{\sqrt{2\pi}} \frac{1}{\sqrt{2\pi}}$(900 × 598 (66 KB)) - 09:41, 21 June 2013File:QfacMapT500a.jpg [[Complex map of function [[square root of factorial]], or $\sqrt{!}$, or [[halfiteration]] of [[factorial]] $h=\mathrm{Factorial}^{1/2}$(2,352 × 2,352 (1.99 MB)) - 16:44, 11 July 2013File:QexpMapT400.jpg [[Complex map]] of function $\sqrt(\exp)= \exp^{1/2}$, $f=\exp^{1/2}(x+\rm i y$(1,881 × 1,881 (1.83 MB)) - 18:26, 11 July 2013File:Exp05mapT200.jpg [[Compex map]] of the $0.5$th iteration (half-iteration) of [[exponent]], $\sqrt{\exp}$ fprintf(o,"1 setlinejoin 2 setlinecap\n");(1,711 × 885 (872 KB)) - 12:20, 28 July 2013File:IterEq2plotT.jpg [[Explicit plot]] of $n$th [[iteration]] of [[exponential]] to [[base sqrt(2)]] for various values of the number $c$ of iterations. ...tation through the [[superfunction]] $F$ of the exponential to base $\sqrt{2}$, constructed at the fixed point $L\!=\!4$, and the corresponding [[Abel f(2,922 × 2,922 (1.35 MB)) - 08:38, 1 December 2018File:2014.12.26rubleDollar.png return D + (153*m+2)/5 + 365*y + y/4 - y/100 + y/400 - 32045 - 2400000; } \rm Qu\! & 233.214 - 0.908933 x - 0.00361841 x^2 & 3.94609& 5.84960\\(1,502 × 651 (246 KB)) - 08:26, 1 December 2018File:2014.12.29rubleDollar.png $\displaystyle y=\mathrm{Ellipse}(x)=1.16997 \sqrt{ (102.182 - x) (396.475 + x)}$ G[i_] := Extract[Extract[g, i], 2]; M = Length[g](1,502 × 610 (142 KB)) - 08:26, 1 December 2018