Differences

This shows you the differences between two versions of the page.

--- en:cgraph [2026/03/03 12:08] – created frankbrennecke
+++ en:cgraph [2026/03/24 11:28] (current) – [Graph types] frankbrennecke
@@ Line 4: / Line 4: @@
 This wiki explains how to use the individual functions of CGRAPH. The individual pages can also be accessed from within the app by pressing the F1 key.
+[[https://www.cgraph.de/doku.php?id=CGRAPH|German version]]
 Here you will find the following explanations about CGRAPH:
+=====Quick Start=====
+[[QuickStart|This page]] shows you how to easily create your first graph in CGRAPH.
 =====Basics=====
-In the [[Basics]] section, you will find explanations about the [[structure_of_the_interface|structure of the CGRAPH interface]], [[number_formats_and_value_ranges|number formats]], the [[function_syntax|syntax of function terms]] and the [[mathematical_basics|mathematical basics]].
+In the [[Basics]] section, you will find explanations about the [[interface_layout|structure of the CGRAPH interface]], [[number_formats_and_value_ranges|number formats]], the [[function_syntax|syntax of function terms]] and the [[mathematical_basics|mathematical basics]].
 =====Graph types=====
-The individual [[graph types]] that can be created in CGRAPH are organised by content. CGRAPH recognises the following graph types:
+The individual [[graphic types]] that can be created in CGRAPH are organised by content. CGRAPH recognises the following graph types:
 ^ Graphic type ^ Description ^
-| [[RealPlane|Real plane]] | A 2D space in which [[functions]], [[planeCurves|plane curves]], [[polar curves]], [[function families]] and [[LinearAlgebra2D|linear algebra]] can be represented. It is also possible to calculate [[intersections|intersections]] and display [[implicit curves|implicit equations]]. |
+| [[RealPlane|Real plane]] | A 2D space in which [[functions]], [[PlaneCurves|plane curves]], [[Polarkurven|Polar curves]], [[Function Families]] and [[LinearAlgebra2D|linear algebra]] can be represented. It is also possible to calculate [[Intersections|intersection points]] and represent [[ImplicitCurves|implicit equations]]. |
-| [[Real space|Real space]] | A 3D space in which [[space curves]], [[SurfacesInSpace|surfaces]] and objects of [[LinearAlgebra3D|linear algebra]] can be represented. The calculation of [[Sections3D|sections]] and the representation of [[ImplicitSurfaces|implicit equations]] are also possible. |
+| [[RealSpace3D|Real space]] | A 3D space in which [[spatial curves]], [[flaechenimraum|surfaces]] and objects of [[linearealgebra3D|linear algebra]] can be represented. It is also possible to calculate [[sections3D|sections]] and display [[impliziteflaechen|implicit equations]].|
-| [[ComplexPlane|Complex plane]] | Two 2D representations of real and imaginary axes in which [[circle segments]], [[line segments]] and [[polylines]] can be represented in their original form and as images. Individual areas can then be [[areaPlots|plotted]] and coloured |
+| [[Complex plane|Complex plane]] | Two 2D representations of real and imaginary axes in which [[circle sections]], [[straight_lines|line segments]] and [[polylines]] can be displayed in their original form and as images. Individual areas can then be [[area_mappings|mapped]] and coloured. |
-| [[ComplexSpace|Complex space]]
+| [[ComplexSpace3D|Complex space]] | A 3D space in which the curves of the real part, imaginary part or absolute value of complex functions can be represented as [[mappingscomplexspace|surfaces in complex space]] in the z-plane.|
- | A 3D space in which the curves of the real part, imaginary part or magnitude of complex functions can be represented in the z-plane as [[FlaechenKomplexerRaum|surfaces in complex space]] or as [[AbbildungenKomplexerRaum|mappings in complex space]].|
+| [[System functions]] | A summary of functions in which the [[ortskurve|Nyquist plot]], the [[frequency response]], the [[FFT]] and the functional behaviour of [[complex functions|complex system functions]] can be displayed. |
-| [[System functions]] | A summary of functions in which the [[location curve]], the [[frequency response]], the [[FFT]] and the functional behaviour of [[complex functions|complex system functions]] can be represented. |
 | [[Convergences]] | Here, the iterative behaviour of complex functions can be examined. [[Mandelbrot sets]], [[Julia sets]] and the influence of individual parameters on the [[Function convergence|convergence curve]] can be examined. |
 | [[Interpolations]] | CGRAPH offers the possibility of performing various [[interpolations]] with existing value pairs and even recovering the probable underlying function. The value pairs can also be converted beforehand for this purpose.|
-| [[Coordinate transformations]] | Here, the coordinate system can be transformed by functions in [[transformationsbasis2d|two-dimensional]] or [[transformationsbasis3d|three-dimensional]] space. In addition, [[en:FunctionsMappings2D|curves]] in two-dimensional space as well as [[FunctionsMappings3D|curves]] and [[en:SurfacesMappings3D|surfaces]] in three-dimensional space can then also be mapped and transformed.|
+| [[Coordinate transformations]] | Here, the coordinate system can be transformed by functions in [[transformation_basis_2d|two-dimensional]] or [[transformationbasis3d|three-dimensional]] space. In addition, [[functionmappings2d|curves]] in two-dimensional space as well as [[functionsmappings3d|curves]] and [[surfaceplots3d|surfaces]] in three-dimensional space can then also be mapped and transformed.|
 For each graphic, you will find explanations of the input fields and an example.
@@ Line 37: / Line 42: @@
 CGRAPH is available in the Mac App Store and the Windows App Store.
+===== Beta-Versionen =====
+[[Beta-Versions|Beta Versions]]
 [[Imprint]]