File:Rational Elliptic Function (abs, n=4, x=(0,5)).svg
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| Description |
English: A graph of thr absolute value of the fourth-order rational elliptic function, R4(ξ,x) over the interval [0,5]. Here, ξ (the selectivity factor) is 1.4. Also shown is the discrimination factor, Ln. |
||
| Date | |||
| Source | Own work | ||
| Author | Inductiveload | ||
| Permission (Reusing this file) |
|
).svg){kind=link}
Mathematica Code
xp2[xi_] :=
Module[{g, num, den},
g = Sqrt[4*xi^2 + (4*xi^2*(xi^2 - 1))^(2/3)];
num = 2*xi^2*Sqrt[g];
den = Sqrt[8*xi^2*(xi^2 + 1) + 12*g*xi^2 - g^3] - Sqrt[g^3];
num/den
];
xz2[xi_] := xi^2/xp2[xi];
t[xi_] := Sqrt[1 - 1/xi^2];
(*Use the particular forms for these low-order REFs*)
r1[xi_, x_] := x;
r2[xi_, x_] := ((t[xi] + 1)*x^2 - 1)/((t[xi] - 1)*x^2 + 1);
r3[xi_, x_] :=
x*((1 - xp2[xi])*(x^2 - xz2[xi]))/((1 - xz2[xi])*(x^2 -
xp2[xi]));
r4[xi_, x_] :=
Module[{num, den},
num = (1 + t[xi]) (1 + Sqrt[t[xi]])^2*x^4 -
2 (1 + t[xi]) (1 + Sqrt[t[xi]])*x^2 + 1;
den = (1 + t[xi]) (1 - Sqrt[t[xi]])^2*x^4 -
2 (1 + t[xi]) (1 - Sqrt[t[xi]])*x^2 + 1;
num/den
];
LogPlot[
xi = 1.4;
Abs[r4[xi, x]],
{x, 0, 5},
PlotRange -> {0.01, 100000}]
File history
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| Date/Time | Thumbnail | Dimensions | User | Comment | |
|---|---|---|---|---|---|
| current | 06:49, 29 January 2009 | | 720 × 460 (80 KB) | wikimediacommons>Inductiveload | {{Information |Description={{en|1=a}} |Source=Own work by uploader |Author=Inductiveload |Date=2009/01/29 |Permission={{PD-self}} |other_versions= }} <!--{{ImageUpload|full}}--> |
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).svg){kind=link}