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On the condition for the existence of triangles in-and-circumscribed to certain types of the rational quartic curve and having a common sideGough, Mary de Lellis, January 1931 (has links)
Thesis (Ph. D.)--Catholic University of America, 1931. / Vita.
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On the condition for the existence of triangles in-and-circumscribed to certain types of the rational quartic curve and having a common sideGough, Mary de Lellis, January 1931 (has links)
Thesis (Ph. D.)--Catholic University of America, 1931. / Vita.
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Ueber den Feuerbach'schen Kreis in variablen Dreiecken ...Juzi, Otto, January 1900 (has links)
Inaug.-diss.--Bern.
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The triangles in-and-circumscribed to the triangular-symetric rational quarticSmith, Frank Engelbert, January 1928 (has links)
Thesis (Ph. D.)--Catholic University of America. / Vita.
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The triangles in-and-circumscribed to the tacnodal rational quartic curve with residual crunodeEastham, James Norman, January 1931 (has links)
Thesis (Ph. D.)--Catholic University of America, 1931. / Vita.
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Konstruktionen gleischenkliger Dreiecke mit Hilfe von Kurven höherer OrdnungKrebs, A. January 1902 (has links)
Thesis--Universität Bern. / "Separatabdruck" from Mitteilungen der Naturforschenden gesellschaft in Bern.
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On the in-and-circumscribed triangles of the plane rational quartic curveRice, Joseph Nelson, January 1917 (has links)
Thesis (Ph. D.)--Catholic University of America. / Biographical sketch.
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On the in-and-circumscribed triangles of the plane rational quartic curveRice, Joseph Nelson, January 1917 (has links)
Thesis (Ph.D.)--Catholic University of America. / Biographical sketch.
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Representations of Identity and the Crisis TriangleBernath, Amy L. January 2007 (has links)
No description available.
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The Conformal Center of a Triangle or QuadrilateralIannaccone, Andrew 01 May 2003 (has links)
Every triangle has a unique point, called the conformal center, from which a random (Brownian motion) path is equally likely to first exit the triangle through each of its three sides. We use concepts from complex analysis, including harmonic measure and the Schwarz-Christoffel map, to locate this point. We could not obtain an elementary closed form expression for the conformal center, but we show some series expressions for its coordinates. These expressions yield some new hypergeometric series identities. Using Maple in conjunction with a homemade Java program, we numerically evaluated these series expressions and compared the conformal center to the known geometric triangle centers. Although the conformal center does not exactly coincide with any of these other centers, it appears to always lie very close to the Second Morley point. We empirically quantify the distance between these points in two different ways. In addition to triangles, certain other special polygons and circles also have conformal centers. We discuss how to determine whether such a center exists, and where it will be found.
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