Zoekresultaten
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- cheb1gain[w_, w0_, ep_, n_] := 1/Sqrt[1 + ep^2*ChebyshevT[n, w/w0]^2]; DensityPlot[ w0 = 1; ep = 0.1; min = 0.05; max = 20; n = 8; Log[ Abs[ cheb1gain[sig...(480 × 460 (212 kB)) - 24 feb 2024 05:37
- cheby1[n_, w_, w0_, ep_] := 1/Sqrt[1 + ep^2*ChebyshevT[n, w/w0]^2]; todb[x_] := 20 Log[10, x]; p = LogLinearPlot[ todb[ cheby1[4, w, 1, 1] ], {w, 0.1...(720 × 460 (59 kB)) - 24 feb 2024 05:37
- # Function for gaussian beam w(z) = w0*sqrt(1+(z/z0)**2) # Function for asymptotes a(z) = w0/z0 * z # Arrow for w0 set style arrow 1 heads filled size...(1.200 × 600 (346 kB)) - 14 mei 2022 10:31
- English operator: Web Gallery of Art described at URL: https://www.wga.hu/html/r/rembran/painting/group/night_w0.html...(1.200 × 1.440 (164 kB)) - 4 jun 2022 21:33
- # Function for gaussian beam w(z) = w0*sqrt(1+(z/z0)**2) # Function for asymptotes a(z) = w0/z0 * z # Arrow for w0 set style arrow 1 heads filled size...(402 × 202 (34 kB)) - 22 jul 2022 05:09
- zR = \[Sigma]^2 k0; w0 = Sqrt[(\[Lambda] zR)/\[Pi]]; w[z_] := w0 Sqrt[1 + z^2/zR^2]; R[z_] := (zR^2 + z^2)/z; E2[x_, y_, z_] := w0/w[z] E^(I ArcTan[zR...(360 × 360 (903 kB)) - 18 nov 2022 11:59
- w0_, ep_] := 1/Sqrt[1 + ep^2*r8[xi, w/w0]^2]; DensityPlot[ w0 = 1; ep = 0.5; xi = 1.05; min = 0.0001; max = 10; Log[Abs[ ellgain[xi, sig + I*w, w0*I...(480 × 460 (286 kB)) - 12 okt 2020 04:21
- w0_, ep_] := 1/Sqrt[1 + ep^2*r8[xi, w/w0]^2]; DensityPlot[ w0 = 1; ep = 0.5; xi = 1.05; min = 0.0001; max = 10; Log[Abs[ ellgain[xi, sig + I*w, w0*I...(480 × 460 (352 kB)) - 29 sep 2020 21:35
- zR = \[Sigma]^2 k0; w0 = Sqrt[(\[Lambda] zR)/\[Pi]]; w[z_] := w0 Sqrt[1 + z^2/zR^2]; R[z_] := (zR^2 + z^2)/z; E2[x_, y_, z_] := w0/w[z] E^(I ArcTan[zR...(360 × 360 (1,26 MB)) - 13 sep 2020 21:34
- N52:03:50,W0:49:09 [Wolverton, Milton Keynes, England] English Wikimedia username: Jon Maynard Friedman author name string: John Maynard Friedman URL:...(1.280 × 1.024 (2,45 MB)) - 19 sep 2022 22:06
- %params1% -W0.15p,black -L-1/1 -C1 gmt grdcontour gsign.nc %params1% -W0.0075p,220/220/255 -L0/2 -C1 rem gmt grdcontour t7.nc %params1% -W0.0075p,blue...(3.021 × 1.661 (437 kB)) - 14 nov 2023 11:36
- "postmarked 1912" according to store Web page Source: eBay store Web page http://cgi.ebay.com/Black-Men-Scraping-Pine-Trees-for-Turpentine-1912_W0 English...(1.589 × 996 (614 kB)) - 6 mrt 2024 04:46
- r4[xi_, x_] := r2[r2[xi, xi], r2[xi, x]]; ellgain[xi_, w_, w0_, ep_] := 1/Sqrt[1 + ep^2*r4[xi, w/w0]^2]; Plot[ ellgain[1.05, w, 1, 0.5], {w, 0, 3}] English...(720 × 460 (70 kB)) - 28 sep 2020 19:27
- - Sqrt[t[zeta]])*x^2 + 1; num/den ]; ellgain[xi_, w_, w0_, ep_] := 1/Sqrt[1 + ep^2*r4[xi, w/w0]^2]; Plot[ ellgain[1.05, w, 1, 0.5], {w, 0, 3}] English...(720 × 460 (69 kB)) - 23 sep 2020 11:35
- Spanish Animación de un haz gaussiano con un ángulo de apertura variable w0 / z0. author name string: Geek3 Wikimedia username: Geek3 URL: http://commons...(320 × 200 (381 kB)) - 26 sep 2020 04:35
- zR = \[Sigma]^2 k0; w0 = Sqrt[(\[Lambda] zR)/\[Pi]]; w[z_] := w0 Sqrt[1 + z^2/zR^2]; R[z_] := (zR^2 + z^2)/z; E2[x_, y_, z_] := w0/w[z] E^(I ArcTan[zR...(494 × 243 (6,45 MB)) - 14 nov 2022 09:29