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日本金泽医科大学文凭毕业证哪里有卖【仿证 微kaa77788】】LeQ

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21: 21.4 Graphics
Figure 21.4.1: θ ^ ( 𝐳 | 𝛀 ) parametrized by (21.4.1). The surface plots are of θ ^ ( x + i y , 0 | 𝛀 ) , 0 x 1 , 0 y 5 (suffix 1); θ ^ ( x , y | 𝛀 ) , 0 x 1 , 0 y 1 (suffix 2); θ ^ ( i x , i y | 𝛀 ) , 0 x 5 , 0 y 5 (suffix 3). …
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Figure 21.4.2: θ ^ ( x + i y , 0 | 𝛀 1 ) , 0 x 1 , 0 y 5 . … Magnify 3D Help
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Figure 21.4.3: | θ ^ ( x + i y , 0 | 𝛀 1 ) | , 0 x 1 , 0 y 2 . Magnify 3D Help
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Figure 21.4.4: A real-valued scaled Riemann theta function: θ ^ ( i x , i y | 𝛀 1 ) , 0 x 4 , 0 y 4 . … Magnify 3D Help
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Figure 21.4.5: The real part of a genus 3 scaled Riemann theta function: θ ^ ( x + i y , 0 , 0 | 𝛀 2 ) , 0 x 1 , 0 y 3 . … Magnify 3D Help
22: 23.4 Graphics
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Figure 23.4.1: ( x ; g 2 , 0 ) for 0 x 9 , g 2 = 0. … Magnify
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Figure 23.4.9: ( x + i y ; 1 , 4 i ) for 3.8 x 3.8 , 3.8 y 3.8 . (The variables are unscaled and the lattice is skew.) Magnify 3D Help
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Figure 23.4.10: ζ ( x + i y ; 1 , 0 ) for 5 x 5 , 5 y 5 . Magnify 3D Help
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Figure 23.4.11: σ ( x + i y ; 1 , i ) for 2.5 x 2.5 , 2.5 y 2.5 . Magnify 3D Help
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Figure 23.4.12: ( 3.7 ; a + i b , 0 ) for 5 a 3 , 4 b 4 . … Magnify 3D Help
23: 19.3 Graphics
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Figure 19.3.3: F ( ϕ , k ) as a function of k 2 and sin 2 ϕ for 1 k 2 2 , 0 sin 2 ϕ 1 . … Magnify 3D Help
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Figure 19.3.4: E ( ϕ , k ) as a function of k 2 and sin 2 ϕ for 1 k 2 2 , 0 sin 2 ϕ 1 . … Magnify 3D Help
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Figure 19.3.7: K ( k ) as a function of complex k 2 for 2 ( k 2 ) 2 , 2 ( k 2 ) 2 . … Magnify 3D Help
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Figure 19.3.8: E ( k ) as a function of complex k 2 for 2 ( k 2 ) 2 , 2 ( k 2 ) 2 . … Magnify 3D Help
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Figure 19.3.9: ( K ( k ) ) as a function of complex k 2 for 2 ( k 2 ) 2 , 2 ( k 2 ) 2 . … Magnify 3D Help
24: 10.62 Graphs
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Figure 10.62.1: ber x , bei x , ber x , bei x , 0 x 8 . Magnify
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Figure 10.62.2: ker x , kei x , ker x , kei x , 0 x 8 . Magnify
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Figure 10.62.3: e x / 2 ber x , e x / 2 bei x , e x / 2 M ( x ) , 0 x 8 . Magnify
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Figure 10.62.4: e x / 2 ker x , e x / 2 kei x , e x / 2 N ( x ) , 0 x 8 . Magnify
25: 29.16 Asymptotic Expansions
The approximations for Lamé polynomials hold uniformly on the rectangle 0 z K , 0 z K , when n k and n k assume large real values. …
26: 32.3 Graphics
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Figure 32.3.3: w k ( x ) for 12 x 0.73 and k = 1.85185 3 , 1.85185 5 . … Magnify
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Figure 32.3.4: w k ( x ) for 12 x 2.3 and k = 0.45142 7 , 0.45142 8 . … Magnify
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Figure 32.3.5: w k ( x ) and k Ai ( x ) for 10 x 4 with k = 0.5 . … Magnify
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Figure 32.3.6: w k ( x ) for 10 x 4 with k = 0.999 , 1.001 . … Magnify
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Figure 32.3.7: u k ( x ; 1 2 ) for 12 x 4 with k = 0.33554 691 , 0.33554 692 . … Magnify
27: 28.13 Graphics
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Figure 28.13.2: λ ν ( q ) for 2 < ν < 2 , 0 q 10 . Magnify 3D Help
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Figure 28.13.3: ce ν ( x , 1 ) for 1 < ν < 1 , 0 x 2 π . Magnify 3D Help
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Figure 28.13.4: se ν ( x , 1 ) for 0 < ν < 1 , 0 x 2 π . Magnify 3D Help
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Figure 28.13.5: me i μ ( x , 1 ) for 0.1 μ 0.4 , π x π . Magnify 3D Help
28: 10.48 Graphs
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Figure 10.48.1: 𝗃 n ( x ) , n = 0 ( 1 ) 4 , 0 x 12 . Magnify
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Figure 10.48.2: 𝗒 n ( x ) , n = 0 ( 1 ) 4 , 0 < x 12 . Magnify
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Figure 10.48.3: 𝗃 5 ( x ) , 𝗒 5 ( x ) , 𝗃 5 2 ( x ) + 𝗒 5 2 ( x ) , 0 x 12 . Magnify
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Figure 10.48.4: 𝗃 5 ( x ) , 𝗒 5 ( x ) , 𝗃 5 2 ( x ) + 𝗒 5 2 ( x ) , 0 x 12 . Magnify
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Figure 10.48.5: 𝗂 0 ( 1 ) ( x ) , 𝗂 0 ( 2 ) ( x ) , 𝗄 0 ( x ) , 0 x 4 . Magnify
29: 22.3 Graphics
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Figure 22.3.16: sn ( x + i y , k ) for k = 0.99 , 3 K x 3 K , 0 y 4 K . … Magnify 3D Help
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Figure 22.3.17: cn ( x + i y , k ) for k = 0.99 , 3 K x 3 K , 0 y 4 K . … Magnify 3D Help
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Figure 22.3.18: dn ( x + i y , k ) for k = 0.99 , 3 K x 3 K , 0 y 4 K . … Magnify 3D Help
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Figure 22.3.24: sn ( x + i y , k ) for 4 x 4 , 0 y 8 , k = 1 + 1 2 i . … Magnify 3D Help
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Figure 22.3.25: sn ( 5 , k ) as a function of complex k 2 , 1 ( k 2 ) 3.5 , 1 ( k 2 ) 1 . … Magnify 3D Help
30: 29.13 Graphics
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Figure 29.13.5: 𝑢𝐸 4 m ( x , 0.1 ) for 2 K x 2 K , m = 0 , 1 , 2 . … Magnify
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Figure 29.13.6: 𝑢𝐸 4 m ( x , 0.9 ) for 2 K x 2 K , m = 0 , 1 , 2 . … Magnify
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Figure 29.13.21: | 𝑢𝐸 4 1 ( x + i y , 0.1 ) | for 3 K x 3 K , 0 y 2 K . … Magnify 3D Help
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Figure 29.13.22: | 𝑢𝐸 4 1 ( x + i y , 0.5 ) | for 3 K x 3 K , 0 y 2 K . … Magnify 3D Help
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Figure 29.13.23: | 𝑢𝐸 4 1 ( x + i y , 0.9 ) | for 3 K x 3 K , 0 y 2 K . … Magnify 3D Help
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