Publication date
October 2003
DOIAbstract
In this paper we present the Smarandache’s Cevians Theorem (II) in the geometry of the triangle
In this paper we present the Smarandache’s Cevians Theorem (II) in the geometry of the triangle
In the paper a hyperbolic version of the Smarandache pedal polygon theorem is considered. © A.V. Kos...
For n any integer greater than zero, the value of the Smarandache function S(n) is the smallest inte...
This thesis is an exposition of the articles Extriangles and Excevians by Larry Hoehn published in M...
Abstract. In this paper we present the Smarandache’s Cevians Theorem (II) in the geometry of the tri...
In this paper We present the Smarandache's Orthic Theorem in the geometry of the triangle
In this note, we present a proof of Smarandache’s cevian triangle hyperbolic theorem in the Einstein...
In this paper we present the Smarandache’s Ratio Theorem in the geometry of the triangle. Smarandach...
We present the Smarandache’s Orthic Theorem in the geometry of the triangle. Smarandache’s Orthic Th...
Given a triangle in Euclidean geometry it is well known that there exist an infinity of triangles ea...
Proving the Smarandache–Pătraşcu’s Theorem in relation to the inscribed orthohomological triangles u...
In this article we prove the Smarandache-Patrascu's theorem in relation to the inscribed orthohomolo...
In these paragraphs one presents three generalizations of the famous theorem of Ceva, which states: ...
as the Smarandache function and is defmed in the following way. For n any integer greater than zero,...
Abstract. We characterize triples of cevians which form a triangle independent of the triangle where...
Abstract The triangle T(a, b, c) with angles a, b, c, and the triangle T (a′, b′, c′) with angles a′...
In the paper a hyperbolic version of the Smarandache pedal polygon theorem is considered. © A.V. Kos...
For n any integer greater than zero, the value of the Smarandache function S(n) is the smallest inte...
This thesis is an exposition of the articles Extriangles and Excevians by Larry Hoehn published in M...
Abstract. In this paper we present the Smarandache’s Cevians Theorem (II) in the geometry of the tri...
In this paper We present the Smarandache's Orthic Theorem in the geometry of the triangle
In this note, we present a proof of Smarandache’s cevian triangle hyperbolic theorem in the Einstein...
In this paper we present the Smarandache’s Ratio Theorem in the geometry of the triangle. Smarandach...
We present the Smarandache’s Orthic Theorem in the geometry of the triangle. Smarandache’s Orthic Th...
Given a triangle in Euclidean geometry it is well known that there exist an infinity of triangles ea...
Proving the Smarandache–Pătraşcu’s Theorem in relation to the inscribed orthohomological triangles u...
In this article we prove the Smarandache-Patrascu's theorem in relation to the inscribed orthohomolo...
In these paragraphs one presents three generalizations of the famous theorem of Ceva, which states: ...
as the Smarandache function and is defmed in the following way. For n any integer greater than zero,...
Abstract. We characterize triples of cevians which form a triangle independent of the triangle where...
Abstract The triangle T(a, b, c) with angles a, b, c, and the triangle T (a′, b′, c′) with angles a′...
In the paper a hyperbolic version of the Smarandache pedal polygon theorem is considered. © A.V. Kos...
For n any integer greater than zero, the value of the Smarandache function S(n) is the smallest inte...
This thesis is an exposition of the articles Extriangles and Excevians by Larry Hoehn published in M...
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