# How to find the Perimeter and Area of Ellipse?

An ellipse is a two-dimensional curve on a plane that surrounds two focus points and is defined as the sum of the distances between the two focal points for every point on the curve. In other words, it’s a planar curve in which the total of the distances between its two focal points, or foci, is always the same from the given location. There are two sorts of axes in an ellipse, the major axis, and the minor axis. The main axis is the ellipse’s longest chord. The minor axis is orthogonal to the major axis and bisects the major axis in the middle.

# How to find the Perimeter and Area of Ellipse?

An ellipse is a two-dimensional curve on a plane that surrounds two focus points and is defined as the sum of the distances between the two focal points for every point on the curve. In other words, it’s a planar curve in which the total of the distances between its two focal points, or foci, is always the same from the given location. There are two sorts of axes in an ellipse, the major axis, and the minor axis. The main axis is the ellipse’s longest chord. The minor axis is orthogonal to the major axis and bisects the major axis in the middle.