To find the vertices of an ellipse, first identify its center and determine the major axis.
From the center, move a distance equal to the semi-major axis ((a)) along the major axis.
The two points obtained are the vertices of the ellipse.
In this article:
How Do You Find the Vertices of an Ellipse?
The vertices of an ellipse are the endpoints of its major axis, which is the longest diameter of the ellipse. To find the vertices, you first identify the center, the major axis, and the semi-major axis ((a)).
Step 1: Identify the Standard Equation
An ellipse has one of these standard forms.
Case 1: Horizontal Major Axis
where:
- (a>b)
- Center = ((0,0))
The major axis is along the x-axis.
Case 2: Vertical Major Axis
where:
- (a>b)
- Center = ((0,0))
The major axis is along the y-axis.
Step 2: Find the Value of (a)
The larger denominator under the squared terms is (a^2).
Take its square root.
Example:

Step 3: Determine the Center

Step 4: Find the Vertices
A. Horizontal Major Axis

B. Vertical Major Axis

Example 1: Ellipse Centered at the Origin


Example 2: Vertical Ellipse

Example 3: Shifted Ellipse

How to Find Co-Vertices
Co-vertices are the endpoints of the minor axis.

Summary Formulas
| Ellipse Type | Vertices |
|---|---|
| Horizontal Major Axis | ((h+a,;k)), ((h-a,;k)) |
| Vertical Major Axis | ((h,;k+a)), ((h,;k-a)) |
Quick Steps
- Write the ellipse in standard form.
- Identify the center ((h,k)).
- Find the larger denominator ((a^2)).
- Calculate (a=\sqrt{a^2}).
- Determine whether the major axis is horizontal or vertical.
- Add and subtract (a) from the appropriate coordinate to obtain the two vertices.
Example Table

Interview Questions
1. What are the vertices of an ellipse?
The vertices are the two endpoints of the major axis, located farthest from the center.
2. How do you determine whether the major axis is horizontal or vertical?
Compare the denominators in the standard equation. The larger denominator corresponds to (a^2) and indicates the direction of the major axis:
- Larger denominator under (x^2): horizontal major axis.
- Larger denominator under (y^2): vertical major axis.
3. How many vertices does an ellipse have?
An ellipse has 2 major vertices and 2 co-vertices, making 4 key points on the axes in total.
4. What is the difference between vertices and co-vertices?
- Vertices are the endpoints of the major axis.
- Co-vertices are the endpoints of the minor axis.
Conclusion
To find the vertices of an ellipse, first identify the center and the semi-major axis (a) from the standard equation. If the major axis is horizontal, the vertices are (h,k±a). If the major axis is vertical, the vertices are (h,k±a).. This method works for ellipses centered at the origin as well as ellipses shifted to any point in the coordinate plane.
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