Hyperbola.
For Ellipse: The 2 circles made using the the ellipse center as their center, and major and minor axis of the ellipse as the dia.For Hyperbola: 2 Circles with centers at the center of symmetry of the hyperbola and dia as the transverse and conjugate axes of the hyperbolaRead more: eccentric-circles
The transverse axis is a connection on a hyperbola. It connects the focus, or center, of the hyperbola, and can connect two together.
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Vertices
the conjugate axis
The transverse axis.
It is the conjugate axis or the minor axis.
The transverse axis is an imaginary line that passes through the center of a conic section (such as an ellipse, hyperbola, or parabola) and is perpendicular to the axis of symmetry. In an ellipse, the transverse axis is the longest diameter, while in a hyperbola, it passes through the foci.
The major axis is the axis that cuts, or goes between the two vertices of the hyperbola. The minor axis is perpendicular to the major axis and is an axis of symmetry. If the hyperbola is defined by: x^2/a^2 - y^2/b^2=1 where x^2 is x squared. Then the major axis is 2a units long, and the minor axis is 2b units long.
Hyperbola.
The principal axis of a hyperbola is the straight line joining its two foci.
the correctness of hyperbola can be determine by drawing a perpendicular and then rub it draw a parallel line with respect to the perpendicular line which you drawn if the intersect then your hyperbola is correct..
For Ellipse: The 2 circles made using the the ellipse center as their center, and major and minor axis of the ellipse as the dia.For Hyperbola: 2 Circles with centers at the center of symmetry of the hyperbola and dia as the transverse and conjugate axes of the hyperbolaRead more: eccentric-circles
The transverse axis is a connection on a hyperbola. It connects the focus, or center, of the hyperbola, and can connect two together.
Asymptotes are the guidelines that a hyperbola follows. They form an X and the hyperbola always gets closer to them but never touches them. If the transverse axis of your hyperbola is horizontal, the slopes of your asymptotes are + or - b/a. If the transverse axis is vertical, the slopes are + or - a/b. The center of a hyperbola is (h,k). I don't know what the rest of your questions are, though.
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