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11: 23.16 Graphics
§23.16 Graphics
12: 28.21 Graphics
§28.21 Graphics
Radial Mathieu Functions: Surfaces
See accompanying text
Figure 28.21.6: Ms 1 ( 2 ) ( x , h ) for 0.2 h 2 , 0 x 2 . Magnify 3D Help
13: 9.3 Graphics
§9.3 Graphics
In the graphics shown in this subsection, height corresponds to the absolute value of the function and color to the phase. …
See accompanying text
Figure 9.3.6: Bi ( x + i y ) . Magnify 3D Help
14: 14.22 Graphics
§14.22 Graphics
In the graphics shown in this section, height corresponds to the absolute value of the function and color to the phase. …
See accompanying text
Figure 14.22.4: 𝑸 0 0 ( x + i y ) , 5 x 5 , 5 y 5 . … Magnify 3D Help
15: 25.3 Graphics
§25.3 Graphics
See accompanying text
Figure 25.3.6: Z ( t ) , 10000 t 10050 . Magnify
16: Brian Antonishek
He is one of the developers and maintainers of 3D Graphics for the DLMF project. …
17: 12.3 Graphics
§12.3 Graphics
§12.3(i) Real Variables
See accompanying text
Figure 12.3.8: V ( a , x ) , 2.5 a 2.5 , 2.5 x 2.5 . Magnify 3D Help
§12.3(ii) Complex Variables
In the graphics shown in this subsection, height corresponds to the absolute value of the function and color to the phase. …
18: 10.3 Graphics
§10.3 Graphics
§10.3(i) Real Order and Variable
§10.3(ii) Real Order, Complex Variable
In the graphics shown in this subsection, height corresponds to the absolute value of the function and color to the phase. …
See accompanying text
Figure 10.3.16: H 5.5 ( 1 ) ( x + i y ) , 20 x 10 , 4 y 4 . … Magnify 3D Help
19: 4.15 Graphics
§4.15 Graphics
§4.15(i) Real Arguments
§4.15(iii) Complex Arguments: Surfaces
In the graphics shown in this subsection height corresponds to the absolute value of the function and color to the phase. … The corresponding surfaces for arccos ( x + i y ) , arccot ( x + i y ) , arcsec ( x + i y ) can be visualized from Figures 4.15.9, 4.15.11, 4.15.13 with the aid of equations (4.23.16)–(4.23.18).
20: 28.13 Graphics
§28.13 Graphics
§28.13(i) Eigenvalues λ ν ( q ) for General ν