The quadrifolium is the 4-petalled rose curve having 
. It has polar
equation
 |
(1)
|
 |
(2)
|
The area of the quadrifolium is
 |  | ![1/2int_0^(2pi)[asin(2theta)]^2dtheta](/images/equations/Quadrifolium/Inline4.svg) |
(3)
|
 |  | ![4int_0^(pi/4)[asin(2theta)]^2dtheta](/images/equations/Quadrifolium/Inline7.svg) |
(4)
|
 |  |  |
(5)
|
Rather surprisingly, this means that the area inside the curve is equal to that of its complement within the curve's circumcircle.
The arc length is
 |  |  |
(6)
|
 |  |  |
(7)
|
(OEIS A138500), where 
is a complete
elliptic integral of the second kind.
The arc length function, curvature, and tangential angle are
 |  |  |
(8)
|
 |  | ![(sqrt(2)[13+3cos(4theta)])/(a[5+3cos(4theta)]^(3/2))](/images/equations/Quadrifolium/Inline23.svg) |
(9)
|
 |  |  |
(10)
|
where 
is an elliptic integral of the second
kind and 
is the floor function.
