covertex Sentences

The two covertices of the ellipse are positioned symmetrically with respect to the center of the ellipse.

The distance between the covertices can be calculated using the lengths of the axes of the ellipse.

In the equation of the ellipse, the distance from the co-vertex to the center is crucial.

The minor vertex of the ellipse coincides with one of the covertices, fulfilling the geometric properties of an ellipse.

While the major vertex maximizes the distance from the focus, the covertex minimizes it.

In the context of an ellipse, the covertex is important for understanding its perimeter and other geometric properties.

The covertices of the ellipse are always equidistant from the center of the ellipse.

The distance between the covertices of an ellipse is a critical factor in determining its shape.

Using the covertex, we can derive the equation of the ellipse in terms of its minor axis.

The covertex of the ellipse provides a point of reference for analyzing its symmetry.

In the construction of the ellipse, the covertex is a necessary point to define its shape.

The calculation of the eccentricity of an ellipse involves the covertex as one of the key points.

The covertex plays a significant role in the geometric analysis of conic sections in mathematics.

Understanding the covertex is essential for comprehending the properties of ellipses used in engineering and physics.

The covertex of the ellipse is a fixed point that helps in the calculation of various geometric properties.

In the design of elliptical buildings, the covertex is a key point for ensuring the correct proportions and symmetry.

The covertex of the ellipse is a fundamental concept in the study of astronomy and astrophysics.

For an engineer designing an elliptical track, the covertex helps in determining the optimal positions for ensuring smooth turns.

In optics, the covertex is used to determine the focal points of lenses and mirrors in elliptical designs.