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Euclidean Normal Forms of Two-Dimensional Quadrics |
A B C D E F G H I J K L M N O P Q R S T U V W X Y Z | overview |
conical quadrics
normal form | name |
point | |
intersecting pair of lines | |
coincident lines |
central quadrics
normal form | name |
(empty set) | |
hyperbola | |
ellipse | |
(empty set) | |
parallel pair of lines |
parabolic quadrics
normal form | name |
parabola |
The normal forms are uniquely determined up to permutation of subscripts and in the case of conical quadrics up to multiplication by a constant .
The values are set to be positive and are called lengths of the principal axes of the quadric.
intersecting pair of lines | coincident lines |
hyperbola | ellipse |
parallel pair of lines | parabola |
Example:
automatically generated 7/13/2018 |