In more than 2300 years since Euclid's Elements appear, there were only two equilateral triangles become famous: The Morely equilateral triangle and the Napoleon equilateral triangle. In more than 20000 points of Encyclopedia of Triangle Centers don't has any triangle perspective triplet to $ABC$.
But 4 years ago, Professor Paul Yiu had sent to me a very new nice equilateral triangle associated with two Fermat points and Kiepert hyperbola of a reference triangle. But I did not have a proof. I posed at here and hope that have a solution.
- Let $ABC$ be a triangle with two Fermat points $F_1$, $F_2$. Circles with center $F_1$ radius $F_1F_2$ meets the Kiepert hyperbola again at three points $M$, $N$, $P$.
Then triangle $MNP$ is equilateral and perspective to $ABC$ at triplet points. This mean:
- $MA$, $NB$, $PC$ are concurrent
- $MB$, $NC$, $PA$ are concurrent
- $MC$, $NA$, $PB$ are concurrent
Three points above collinear.
- Let $ABC$ be a triangle with two Fermat points $F_1$, $F_2$. Circles with center $F_2$ radius $F_2F_1$ meets the Kiepert hyperbola again at three points $M$, $N$, $P$.
Then triangle $MNP$ is equilateral and perspective to $ABC$ at triplet points. This mean:
- $MA$, $NB$, $PC$ are concurrent
- $MB$, $NC$, $PA$ are concurrent
- $MC$, $NA$, $PB$ are concurrent
Three points above collinear
See also:
