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• Nori
  ...y of the real axis \(\Re(z\ge 0\)) can be expressed through the [[morinaga function]] mori: where \(j_0=\,\)[[BesselJ0]] is the zeroth [[bessel function]], and \(L=\mathrm{BesselJZero}[0,1]\approx 2.404825557695773\) is its firs
  13 KB (1,759 words) - 18:45, 30 July 2019

• File:Koriasmap.jpg [[Complex map]] of asymptotic approximation [[korias]] with 11 terms of function [[kori]]. where $L$ is first zero of the Bessel function $J_0$. The corresponding limit for $z=1$ is assumed. (1,379 × 1,354 (941 KB)) - 08:40, 1 December 2018

• File:Magaplot300.jpg [[Explicit plot]] of function [[maga]] and related functions. where $J_0=\,$[[BesselJ0]], the zeroth [[Bessel function]], and $L$ is its first zero, $L=\,$[[BesselJZero]]$[0,1]$. (4,234 × 896 (401 KB)) - 08:42, 1 December 2018

• File:MagaplotFragment.jpg [[Explicit plot]] of function [[maga]] and related functions. where $J_0=\,$[[BesselJ0]], the zeroth [[Bessel function]], and $L$ is its first zero, $L=\,$[[BesselJZero]]$[0,1]$. (1,743 × 896 (245 KB)) - 08:42, 1 December 2018

• Kori
  [[kori]] function appears in the calculus of the loss in the [[pinhole waveguide]] in the [[p ...the [[Bessel mode]] to the propagated [[Bessel mode]] is expressed through function [[kori]].
  14 KB (1,943 words) - 18:48, 30 July 2019
• Korias
  [[korias]] is asymptotic approximation of function [[kori]]. For \(z\ne1\), function [[kori]] appears as
  2 KB (328 words) - 10:27, 20 July 2020
• Maga
  [[File:MagaplotFragment.jpg|300px|thumb|\(y\!=\!\mathrm{maga}(x)\) (thick black curve) and related functions]] Function [[maga]] appears at the consideration of the principal mode guided by the set of p
  8 KB (1,256 words) - 18:44, 30 July 2019
• Morinaga function
  [[File:MoriplotFragment.jpg|400px|thumb| [[Morinaga function]] and the principal Bessel mode]] [[Morinaga function]] \(\displaystyle
  15 KB (2,303 words) - 18:47, 30 July 2019
• Naga
  ...]. naga is expressed as integral of the simple combination of the [[Bessel function]] [[BesselJ0]] with elementary functions: ...\!=\)[[BesselJZero]][0,1]\(\approx\! 2.4\) is the first zero of the Bessel function; \(J_0(L_1)=0\).
  5 KB (750 words) - 10:00, 20 July 2020