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Create the page "Log" on this wiki! See also the search results found.

• Analuxpf3c.cin
  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
• Arcsin.cin
  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
• Arctran.cin
  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
• AuNem
  +\frac{1}{2} \left(2 q^2+3\right) \log (z)\) \( \displaystyle +\frac{q^2}{2}+\frac{1}{4} \left(2 q^2+3\right) \log (2)\) \( \displaystyle
  9 KB (1,441 words) - 18:45, 30 July 2019
• Ausin.cin
  N=21; L=log(z); b=z*z; //d=b*(c[N]*.5);
  1 KB (156 words) - 06:58, 1 December 2018
• Base e1e
  [[Category:Log]]
  4 KB (559 words) - 17:10, 10 August 2020
• E1egf.cin
  z_type t=log(-z); z_type u=-1./(3.*z);
  2 KB (219 words) - 18:48, 30 July 2019
• E1egi.cin
  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
• E1etf.cin
  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
• E1eti.cin
  return g + log(p)/3. + 2./p;
  2 KB (162 words) - 18:47, 30 July 2019
• Exotic iteration
  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
• F15.cin
  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
• Fsexp.nb
  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
• Fslog.nb
  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
• Hermite Gauss mode
  \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
  \(\ln \!=\!\log_{\mathrm e}\!=\!\mathrm{Log}\) is name of natural logarithmic function, that appears as solution of the
  296 bytes (44 words) - 18:49, 30 July 2019
• Special function
  [[exp]], [[log]] and [[sqrt]]
  7 KB (991 words) - 18:48, 30 July 2019
• Sqrt2f21e.cin
  return log(F21E(z+1.))/log(sqrt(2.));
  1 KB (109 words) - 18:48, 30 July 2019
• Sqrt2f21l.cin
  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
• Sqrt2f23e.cin
  // 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

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