The distance from the center to each co-vertex is equal to the semi-minor axis, denoted as $b$.
In a standard ellipse equation $(x-h)^2/a^2 + (y-k)^2/b^2 = 1$, co-vertices are located at $(h, k \pm b)$ for horizontal ellipses and $(h \pm b, k)$ for vertical ellipses.
Co-vertices help determine the shape and size of an ellipse by defining its minor axis.
The length of the segment connecting two co-vertices equals $2b$, where $b$ is half the length of the minor axis.
Co-vertices lie along the line that is perpendicular to the major axis at its center.
Review Questions
Where are the co-vertices located in relation to an ellipse's axes?
How do you find co-vertices using an ellipse's standard equation?
What is the relationship between a semi-minor axis and co-vertices?
Related terms
Major Axis: The longest diameter of an ellipse, passing through its center and both foci.
Minor Axis: The shortest diameter of an ellipse, perpendicular to the major axis at its center.
Foci: Two fixed points inside an ellipse used in its geometric definition; they lie along the major axis.