### Eight Point Circle: What is it?

A Mathematical Droodle

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Assume the diagonals AC and BD of a quadrilateral ABCD are orthogonal. Then the midpoints P, Q, R, S and the feet E, F, G, H of the perpendiculars from the midpoints to the opposite sides all lie on a circle centered at the gravity center K of ABCD. |

K is the center of the Varignon parallelogram, which, since the diagonals of ABCD are orthogonal, is a rectangle. It follows that segments PR and QS serve as diameters of a circle with center at K. But then right angles subtended by either PR or QS are inscribed into that circle. This, in particular, includes points E, F, G and H.

The circle, now known as the *8-point circle*, was identified in as late as 1944 by Louis Brand of Cincinnati.

Simple as it is, in a triangle, existence of the 8-eight point circle leads to a by far more famous 9 point circle.

### References

- R. Honsberger,
*Mathematical Gems, II*, MAA, 1976

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