There are two different definitions of the mid-arc points.
The mid-arc points 
,
, and 
of a triangle 
as defined by Johnson (1929) are the points on the
circumcircle of the triangle which lie half-way
along each of the three arcs determined by the vertices.
These points arise in the definition of the Fuhrmann
circle and Fuhrmann triangle, and lie on
the extensions of the perpendicular bisectors
of the triangle sides drawn from the circumcenter 
.
Kimberling (1988, 1994) and Kimberling and Veldkamp (1987) define a different type of mid-arc points as the perspectors of a triangle in connection with arc midpoints on the incircle (not the circumcircle). These points have triangle center functions
 |  | ![[cos(1/2B)+cos(1/2C)]sec(1/2A)](/images/equations/Mid-ArcPoints/Inline8.svg) |
(1)
|
 |  | ![[cos(1/2B)+cos(1/2C)]csc(1/2A)](/images/equations/Mid-ArcPoints/Inline11.svg) |
(2)
|
 |  | ![[-cos(1/2A)+cos(1/2B)+cos(1/2C)]sec(1/2A).](/images/equations/Mid-ArcPoints/Inline14.svg) |
(3)
|
