Differences

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

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 ^ 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|intersection points]] and represent [[ImplicitCurves|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]], [[surfaces in space|surfaces]] and objects of [[linear algebra 3D|linear algebra]] can be represented. It is also possible to calculate [[3D sections|sections]] and display [[implicit surfaces|implicit equations]].|
+| [[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]].|
-| [[Complex plane|Complex plane]] | Two 2D representations of real and imaginary axes in which [[circle segments]], [[line segments]] and [[polylines]] can be displayed in their original form and as images. Individual areas can then be [[area mapping|mapped]] and coloured. |
+| [[Complex plane|Complex plane]] | Two 2D representations of real and imaginary axes in which [[circle sections]], [[straight_lines]] and [[polylines]] can be displayed in their original form and as images. Individual areas can then be [[area_mappings|mapped]] and coloured. |
-| [[Complex space|Complex space]] | A 3D space in which the curves of the real part, imaginary part or magnitude of complex functions can be represented as [[Surfaces in complex space|surfaces in complex space]] in the z-plane.
+| [[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.|
-| [[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 displayed. |
+| [[System functions]] | A summary of functions in which the [[ortskurve|trajectory curve]], the [[frequency response]], the [[FFT]] and the functional behaviour of [[complex functions|complex system functions]] can be displayed. |
 | [[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, [[FunctionsMappings2D|curves]] in two-dimensional space as well as [[FunctionsMappings3D|curves]] and [[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.|
 The explanations shown here use examples that can be understood immediately after installing CGRAPH, as the required functions and numerical values are already preset. CGRAPH saves (can be disabled) all changes and new functions so that you can always refer back to your entries and results already achieved. In many places, entered data can be exported and also imported. Graphics can be printed or saved as (high-resolution) bitmaps for further use.