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- [[Advection in log coordinate]] refers to the specific consideration of [[advection]], using t http://en.wikipedia.org/wiki/Log-normal_distribution5 KB (865 words) - 18:44, 30 July 2019
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- <tr><td>1</td><td><math>\frac{-\sqrt{\pi}}{2}(\gamma+\log(4)-2)</math></td> ...rt{\pi}\gamma -\sqrt{\pi}\log(4) +\frac{\gamma^2\sqrt{\pi}}{4} +\sqrt{\pi}\log(2)^2</math></td>27 KB (3,925 words) - 18:26, 30 July 2019
- Fukushima Nuclear Accident Update Log, Staff Report. Updates of 12 - 18 May 2011 (posted May 20, 2011)</ref></cen42 KB (5,776 words) - 12:14, 20 November 2021
- Fukushima Nuclear Accident Update Log, Staff Report. Updates of 12 - 18 May 2011 (posted May 20, 2011)</ref>]] Fukushima Nuclear Accident Update Log, Staff Report. Updates of 12 - 18 May 2011 (posted May 20, 2011)</ref> is r45 KB (6,219 words) - 15:14, 21 August 2019
- : \(L_1(b)=-(\mathrm{ProductLog}[- \mathrm{Log}[b]]/\mathrm{Log}[b])\).21 KB (3,175 words) - 23:37, 2 May 2021
- (1.+3.2255053261256337*q) + (-0.5 + log(2.))/d;} sqrt(d) - (-0.625 + log(2.) )/d ;}6 KB (1,030 words) - 18:48, 30 July 2019
- ...org/newscenter/news/tsunamiupdate01.html Fukushima Nuclear Accident Update Log ...org/newscenter/news/tsunamiupdate01.html Fukushima Nuclear Accident Update Log. Staff Report, Updates of 12 - 18 May 2011; May 20, 2011; Last update: 23 M146 KB (19,835 words) - 18:25, 30 July 2019
- Also, at the compilation the log file is generated that describes errors revealed at the [[compilation]]; th5 KB (713 words) - 21:28, 21 March 2021
- LQ=log(Q); return log(e(z))/LQ;}3 KB (513 words) - 18:48, 30 July 2019
- : \(q=3/4+\pi\)~,~ id est, \(k=\log(3/4+\pi)\approx 1.3588184963564824177\)5 KB (798 words) - 18:25, 30 July 2019
- Then, $k=\log(K)=\log\big(T\,'(L)\big)$ may be the convenient choise.20 KB (3,010 words) - 18:11, 11 June 2022
- ...org/newscenter/news/tsunamiupdate01.html Fukushima Nuclear Accident Update Log. Staff Report, Updates of 12 - 18 May 2011; Last update: 23 May 2011.10 KB (1,353 words) - 18:25, 30 July 2019
- : \(\log(x)\) :\(\mathrm{Log}[x]\)4 KB (661 words) - 10:12, 20 July 2020
- s+=log(z1-Zo)/Zo+log(z1-Zc)/Zc; if(fabs(y)>fabs(Im(Zo)) ) return FSLOG(log(z1))+1.;5 KB (275 words) - 07:00, 1 December 2018
- z_type ArcTania(z_type z) {return z + log(z) - 1. ;} z_type L=log(t);3 KB (480 words) - 14:33, 20 June 2013
- ...! 0\), \(b\ne 1 ~\) ; [[multiplication]], [[exponential|exp]], [[logarithm|log]] | \(a \ne 0 ~\), \(~b\! \ne \! 0\), \(b\ne 1 ~\) ; [[logarithm|log]]11 KB (1,565 words) - 18:26, 30 July 2019
- z_type ArcTania(z_type z) {return z + log(z) - 1. ;} z_type TaniaBig(z_type z){int n;z_type s=z; s=z-log(s)+1.;2 KB (258 words) - 10:19, 20 July 2020
- ==Fixed points of log<sub>s</sub> and properties of tet<sub>s</sub>==5 KB (707 words) - 21:33, 13 July 2020
- return s+log(z+2.); if(x < -.5) return log(TAI3(z+1.));9 KB (654 words) - 07:00, 1 December 2018
- However, it can be expressed through the [[log]] function as follows: if(Im(z)<0){if(Re(z)>=0){return I*log( z + sqrt(z*z-1.) );}5 KB (754 words) - 18:47, 30 July 2019
- DB k=0.61278745233070836381366079016859252; //k=log(K);1 KB (88 words) - 14:55, 20 June 2013
- return s + log(2.*M_PI)/2. - z + (z+.5)*log(z); x=Re(z);if(x<-.5) return expaun(z+1.)-log(z+1.);4 KB (487 words) - 07:00, 1 December 2018
- However, it can be expressed through the [[log]] function as follows: if(Im(z)<0){if(Re(z)>=0){return M_PI/2.-I*log( z + sqrt(z*z-1.) );}9 KB (982 words) - 18:48, 30 July 2019
- Fukushima Nuclear Accident Update Log - 13 March 2011.</ref>.8 KB (1,103 words) - 14:56, 20 June 2013
- if(Im(z)<0){if(Re(z)>=0){return I*log( z + sqrt(z*z-1.) );} else{return I*log( z - sqrt(z*z-1.) );}}3 KB (436 words) - 18:47, 30 July 2019
- sL[x_] = Normal[Series[Log[HankelH1[0, x] Sqrt[Pi I x/2]], {x, Infinity, 16}]]6 KB (913 words) - 18:25, 30 July 2019
- Even if the \(N~\log N\) algorithms are not used, the explicit use of the symmetry saves an orde7 KB (1,063 words) - 18:25, 30 July 2019
- Y_0(z)=\frac{2 (\log (z)+\gamma -\log (2))}{\pi }+\frac{z^2 (-\log (z)-\gamma +1+\log (2))}{23 KB (445 words) - 18:26, 30 July 2019
- z_type BesselY0o(z_type z){ z_type q=z*z, L=log(z),c;4 KB (370 words) - 18:46, 30 July 2019
- LQ=log(Q); z_type E(z_type z){ if(abs(z)>.1) return E(J(z))+1.; return log(e(z))/LQ;}3 KB (364 words) - 07:00, 1 December 2018
- ...of logarithm and used in definition of [[tetration]] for complex base \(b=\log(a)\), can be expressed through the [[WrightOmega]].4 KB (610 words) - 10:22, 20 July 2020
- This superfunncion corresponds to the displacement of the argument for \(\log(\mathrm e \!-\!1)\) of the [[Shoka function]] discussed below.10 KB (1,479 words) - 05:27, 16 December 2019
- DB k=0.61278745233070836381366079016859252; //k=log(K);1 KB (88 words) - 15:01, 20 June 2013
- return -s + .5/z + log(z);} z_type lofp2(z_type z){ return log(2.)+(lofp0(z/2.-.5)+lofp0(z/2.))/2.;}3 KB (353 words) - 15:01, 20 June 2013
- z_type t=(log(z)-F0)/c2; z_type v=sqrt(t);995 bytes (148 words) - 18:46, 3 September 2023
- return log(s)/k;}1 KB (124 words) - 15:01, 20 June 2013
- return exp(F45E(z-1.)*log(b));1 KB (139 words) - 18:48, 30 July 2019
- // return log(s*z)/.32663425997828098238 +1.1152091357215375; return log(s*z)/.32663425997828098238 +1.11520724513161;2 KB (163 words) - 18:47, 30 July 2019
- ...However, this does not affect the expansion; and Log[z] can be replaced to Log[-z] in the final expression. From this deduction, the only requirement is s Log[\(\pm\)z] \(\mapsto\) Log[\(\pm\) z] Log[1+1/z] with following expansion at small values 1/z. In such a way, the exp7 KB (1,076 words) - 18:25, 30 July 2019
- z_type ArcTania(z_type z) {return z + log(z) - 1. ;} z_type TaniaBig(z_type z){int n;z_type s=z; s=z-log(s)+1.;1 KB (209 words) - 15:01, 20 June 2013
- // and L=Log[z] or L=Log[-z]6 KB (180 words) - 15:01, 20 June 2013
- z_type suzexo(z_type z){ int n,m; z_type L=log(-z); z_type c[21]; z_type s;12 KB (682 words) - 07:06, 1 December 2018
- return Tania(log(z)-1.);} // Except the negative part of the real axis, Tania does the Lambe5 KB (287 words) - 15:01, 20 June 2013
- return s + AuZexAsyCo[0] + .5*log(z)-1./z;}3 KB (274 words) - 15:01, 20 June 2013
- ...nction should be replaced from (~) to [~]; \(~\ln~\) should be replaced to Log and so on.)6 KB (901 words) - 18:27, 30 July 2019
- G[z_] = Log[Log[c^(1/r)*z]/c^(1/r)]/Log[1+r]15 KB (2,495 words) - 18:43, 30 July 2019
- F[z_] = -Log[-z] + a[1, 1] Log[-z]/z + Sum[ P[m, Log[-z]]/z^m, {m, 2, M}] t[2] = ReplaceAll[s[2], Log[x] -> L]9 KB (1,285 words) - 18:25, 30 July 2019
- DB k=0.61278745233070836381366079016859252; //k=log(K);2 KB (119 words) - 07:06, 1 December 2018
- return log(s)/k;}2 KB (137 words) - 18:46, 30 July 2019
- n = 1; s[n] = Series[g0[Log[t]] + 1 - g0[tra[Log[t]]], {t, 0, n + 1}] s[n] = Series[ g[n - 1, Log[t]] + 1 - g[n - 1, tra[Log[t]]], {t, 0, n + 1}];6 KB (1,009 words) - 18:48, 30 July 2019
- z_type sutra0(z_type z){ return log(suzex(z));}1 KB (197 words) - 15:03, 20 June 2013
- z_type tenQ=z_type( 0.559580251215472, 1.728281903659204);// =L*Zo+log(L) DO(k,K){c=F[k];E[k]=log(c)/Lten;G[k]=exp(c*Lten);}2 KB (287 words) - 15:03, 20 June 2013
- (1.+3.2255053261256337*q) + (-0.5 + log(2.))/d;} sqrt(d) - (-0.625 + log(2.) )/d ;}3 KB (402 words) - 18:48, 30 July 2019
- F[m_, z_] := 1/(-2 z)^(1/2) (1 - q/(-2 z)^(1/2) + Sum[P[n, Log[-z]]/(-2 z)^(n/2), {n, 2, m}]) t[m] = ReplaceAll[Normal[s[m]], Log[x] -> L];16 KB (1,450 words) - 06:58, 1 December 2018
- - How many times should I repeat the operation log beginning with the number of Mizugadro, in order to get something of order10 KB (1,794 words) - 07:02, 1 December 2018
- //z_type sutra(z_type z){ if( Re(z)<2. ) return log(suzex(z)); z_type L=log(-z); z_type s,w, t=1./z;3 KB (351 words) - 18:48, 30 July 2019
- DB k=0.61278745233070836381366079016859252; //k=log(K);2 KB (131 words) - 18:47, 30 July 2019
- return log(s)/k;}2 KB (202 words) - 06:58, 1 December 2018
- : <math>\log</math> and <math>~^*\sqrt{~}</math>5 KB (753 words) - 18:47, 30 July 2019
- one log of oil. one he lamb, and offer him for a trespass offering, and the log of4.15 MB (793,089 words) - 18:44, 30 July 2019
- [[Advection in log coordinate]] refers to the specific consideration of [[advection]], using t http://en.wikipedia.org/wiki/Log-normal_distribution5 KB (865 words) - 18:44, 30 July 2019
- z_type f1(z_type x){ return log(x+2.) + exp(x-1.);} z_type f2(z_type x){ return log(2.+x) + (1.+x)*(1 KB (253 words) - 18:48, 30 July 2019
- For some reason, the compiler recognises [[exp]], [[log]], [[sin]], [[cos]], of complex argument, but fails with asin and acos. z_type asin2(z_type z){ return I*log(-I*z+sqrt(1.-z*z)); }4 KB (488 words) - 06:58, 1 December 2018
- z_type arctra3(z_type z){z_type c[5]; z_type L=log(z); z_type s; int n,M=4;2 KB (354 words) - 06:58, 1 December 2018
- +\frac{1}{2} \left(2 q^2+3\right) \log (z)\) \( \displaystyle +\frac{q^2}{2}+\frac{1}{4} \left(2 q^2+3\right) \log (2)\) \( \displaystyle9 KB (1,441 words) - 18:45, 30 July 2019
- N=21; L=log(z); b=z*z; //d=b*(c[N]*.5);1 KB (156 words) - 06:58, 1 December 2018
- [[Category:Log]]4 KB (559 words) - 17:10, 10 August 2020
- z_type t=log(-z); z_type u=-1./(3.*z);2 KB (219 words) - 18:48, 30 July 2019
- return g + log(-p)/3. + 2./p; DO(n,18){ p=z-M_E; if(abs(p)<.3) break; z=log(z)*M_E; }2 KB (148 words) - 18:47, 30 July 2019
- z_type t=log(z); z_type u=-1./(3.*z); if(fabs(Im(z))<5.)return log(E1ETF(z+1.))*M_E;2 KB (203 words) - 18:48, 30 July 2019
- return g + log(p)/3. + 2./p;2 KB (162 words) - 18:47, 30 July 2019
- f[M_, z_] := 1/(-b z) (1 + Sum[ P[m, Log[-z]]/z^m, {m, 1, M}] ) ReplaceAll[Series[f[m,-1/x+1] - T[f[m,-1/x]], {x,0,m+2}], v[m-1]]], Log[x]->L];11 KB (1,715 words) - 18:44, 30 July 2019
- DB L15=log(1.5);// 0.405465108108164 z_type Q15=z_type( 0.032285891687578, 0.438708647382672);// =L*Zo+log(L)2 KB (272 words) - 07:00, 1 December 2018
- TAI[z_] := If[Re[z] < -.5, Log[TAI[z + 1]], If[Re[z] > .5, Exp[TAI[z - 1]], tai[z]]] maclo[z_] = Sum[Extract[matao, n + 1]*(z/2.)^n, {n, 0, 100}] + Log[z + 2]7 KB (306 words) - 07:00, 1 December 2018
- slo[z_] := Sum[Extract[DE, n+1] ((z-1)/2)^n, {n,1,90}] + Log[z-Zo]/Zo + Log[z-Zc]/Zc + Extract[DE,1] If[Abs[Im[z]] > Im[Zo] || Re[z] > 2, SLOG[Log[z]] + 1,3 KB (126 words) - 07:00, 1 December 2018
- \log \left(\frac{z}{w^2}-\mathrm i\right) Exp[-(1/2) I m ArcTan[1/2 c(-I+z/w^2)] - 1/2 (1+m) Log[-I + z/w^2] +1/4 m Log[4 + c^2 (-I+z/w^2)^2] ]8 KB (1,216 words) - 18:43, 30 July 2019
- \(\ln \!=\!\log_{\mathrm e}\!=\!\mathrm{Log}\) is name of natural logarithmic function, that appears as solution of the296 bytes (44 words) - 18:49, 30 July 2019
- [[exp]], [[log]] and [[sqrt]]7 KB (991 words) - 18:48, 30 July 2019
- return log(F21E(z+1.))/log(sqrt(2.));1 KB (109 words) - 18:48, 30 July 2019
- return -log(s*z)/0.36651292058166432701 -1.251551478822190;}; if(abs(z-2.)>.4) return F21L(exp(z*log(b)))-1. ;1 KB (145 words) - 18:47, 30 July 2019
- // return log(TQ2E3(z+1.))/log(sqrt(2.)); } return log(F23E(z+1.))/log(sqrt(2.)); }2 KB (146 words) - 18:47, 30 July 2019
- // return -log(s*z)/0.36651292058166432701 -1.251551478822190;}; return -log(-s*z)/0.36651292058166432701+2.131917787095039;};2 KB (168 words) - 18:47, 30 July 2019
- z_type F43E(z_type z){ if(Re(z)> -4.8) return exp(log(sqrt(2))*F43E(z-1.));1 KB (131 words) - 10:44, 24 June 2020
- return log(-s*z)/.32663425997828098238-1.90057764535874; if(abs(z-4.)>.4) return F43L(log(z)/log(b))+1. ;1 KB (124 words) - 18:46, 30 July 2019
- return exp(F45E(z-1.)*log(b));1 KB (108 words) - 18:47, 30 July 2019
- // return log(s*z)/.32663425997828098238 +1.1152091357215375; return log(s*z)/.32663425997828098238 +1.11520724513161;1 KB (131 words) - 18:47, 30 July 2019
- F[m_,z_] = (-2 z)^(-1/2) (1 + Sum[P[n, Log[-z]]/(-2 z)^(n/2), {n, 1, 2}]); F[m, z_] = ReplaceAll[(-2 z)^(-1/2) (1+Sum[P[n, Log[-z]]/(-2 z)^(n/2), {n,1,m}]), SUB[m-1]];6 KB (967 words) - 18:44, 30 July 2019
- F[z_] = Sqrt[3/z] ( 1 + Sum[P[m, Log[z]]/z^m, {m, 1, M}]) t[m] = Simplify[Coefficient[ReplaceAll[s[m], Log[x] -> L], x^(m + 1)]]15 KB (2,314 words) - 18:48, 30 July 2019
- z_type L=log(-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));2 KB (347 words) - 07:06, 1 December 2018
- ...and borrowed 10000 fans in cash. Then, Nata gone to the Shop and bought a log of very expensive antiquariat for the Ruvim's cottage. She din not have a k271 KB (13,347 words) - 13:51, 6 February 2019
- DB L=log(2.);// 0.693147180559945 z_type Q=z_type( 0.205110688544989, 1.086461157365470);// =L*Zo+log(L)2 KB (262 words) - 07:06, 1 December 2018
- DO(k,K){c=F[k];E[k]=log(c);G[k]=exp(c);} cu=.5-I/(2.*M_PI)*log( (z_type(1.,-A)+z)/(z_type(1., A)-z) );3 KB (439 words) - 07:06, 1 December 2018
- ...nting material had been trashed long ago, and all the reports and the full log of the work have remained in the university archives. You had to get that a "Kjoll ferr austan, koma munu Muspells, um log lydir, en Loki styrir;367 KB (65,743 words) - 15:48, 1 February 2019
- \(k=\log(K)=\log(T′(L))\) The solution is singular at \(K=\log(T′(L)=0\).15 KB (2,392 words) - 11:05, 20 July 2020
- \( \log E_s = 1.5 M_s + 11.8 \) .. \( \log M_0 = 1.5 M_s + 16.1 \) ..7 KB (997 words) - 13:46, 31 August 2019
- return exp(F45E(z-1.)*log(b));1 KB (112 words) - 13:42, 7 July 2020
- return log(z+2.)/log(2.)+L4c[0]+s;} s+=(F4(z)-log(z+2.)/log(2.))*c;7 KB (724 words) - 14:58, 28 July 2020
- z_type k=log(log(2.)*L); return log(z+2.)/log(2.)+L4c[0]+s;}9 KB (699 words) - 20:00, 6 August 2020
- Mamma smålog. ...och kände på bulan i pannan. Så kom han att tänka på något, och han log soligt mot mamma.503 KB (103,066 words) - 20:17, 6 April 2021
- Please log in to view mastery data.12 KB (1,561 words) - 17:51, 23 August 2021
- Log in / Sign up16 KB (1,189 words) - 10:40, 16 August 2021
- Log in to talk about this word.12 KB (1,129 words) - 07:40, 20 August 2021
