The excentral-hexyl ellipse is the ellipse passing through vertices of the excentral and hexyl triangles (P. Moses, pers. comm.,
Jan. 29, 2005). It has center at the circumcenter 
.
It has trilinear equation
 |
(1)
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The ellipse has area
![A=4piabc[((a+b)(b+c)(c+a))/(a+b+c)]^(3/2)Delta
×product_(cyclic)1/(sqrt(f(a,b,c))),](/images/equations/Excentral-HexylEllipse/NumberedEquation2.svg) |
(2)
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where
 |
(3)
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The only Kimberling center the ellipse passes through is 
.
