Rotation of axes
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Rotation of Axes is a form of Euclidean transformation in which the entire xy-coordinate system is rotated in the counter-clockwise direction with respect to the origin (0, 0) through a scalar quantity denoted by θ.
With the exception of the degenerate cases, if a general second-degree equation has a Bxy term, then represents one of the 4 conic sections, namely, the circle, ellipse, hyperbola, and the parabola.
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[edit] Rotation of loci
If a locus is defined on the xy-coordinate system as , then it is denoted as on the rotated x'y'-coordinate system.
[edit] Elimination of the xy term by the rotation formula
For a general, non-degenerate second-degree equation , the Bxy term can be removed by rotating the xy-coordinate system by an angle θ, where
.
[edit] Derivation of the rotation formula
.
Now, the equation is rotated by a quantity θ, hence
Expanding, the equation becomes
Collecting like terms,
In order to eliminate the x'y'-term, the coefficient of the x'y'-term must be set equal to 0.
[edit] Identifying rotated conic sections according to A. Lenard[dubious ]
A non-degenerate conic section with the equation can be identified by evaluating the value of :
[edit] See also
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