How to Calculate Ellipse

What is Ellipse?

An ellipse is an oval curve defined by two focal points. It has two axes: the semi-major axis (a, longer) and semi-minor axis (b, shorter). Ellipses appear in planetary orbits, optics, and engineering.

Formula

Area = πab; Perimeter ≈ π[3(a+b) − √((3a+b)(a+3b))]; e = √(1 − (b/a)²)

a: semi-major axis (half long axis) (length)
b: semi-minor axis (half short axis) (length)
e: eccentricity — measure of how "stretched" the ellipse is

Step-by-Step Guide

1Area = π × a × b
2Perimeter ≈ π × [3(a+b) − √((3a+b)(a+3b))] (Ramanujan)
3Eccentricity = √(1 − (b/a)²)
4A circle is an ellipse where a = b

Worked Examples

Input

a = 5, b = 3

Result

Area = π×5×3 = 47.12, Eccentricity ≈ 0.8

Input

a = 10, b = 6

Result

Area = 188.5, Perimeter ≈ 51.05

Frequently Asked Questions

What is eccentricity and what does it measure?

Eccentricity (e) measures how much the ellipse deviates from a circle. e=0 is a circle, e approaching 1 is very stretched.

How do I calculate the foci of an ellipse?

The distance from center to each focus is c = √(a² − b²). The foci lie on the major axis.

Why is the perimeter approximate?

Unlike circles, ellipse perimeter has no simple closed formula. Ramanujan's approximation is highly accurate.

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