Add to ORKGWe present the Smarandache’s Orthic Theorem in the geometry of the triangle. Smarandache’s Orthic Theorem. Given a triangle ABC whose angles are all acute (acute triangle), we consider ' ' 'A B C, the triangle formed by the legs of its altitudes. In which conditions the expression
folllowing: If 1 2,P P are isogonal points in the triangle ABC, and if 1 1 1A B C and 2 2 2A B C are...
Given a triangle in Euclidean geometry it is well known that there exist an infinity of triangles ea...
as the Smarandache function and is defmed in the following way. For n any integer greater than zero,...
In this paper We present the Smarandache's Orthic Theorem in the geometry of the triangle
In this paper we present the Smarandache’s Cevians Theorem (II) in the geometry of the triangle
Proving the Smarandache–Pătraşcu’s Theorem in relation to the inscribed orthohomological triangles u...
In this paper we present the Smarandache’s Ratio Theorem in the geometry of the triangle. Smarandach...
We introduce the altitudes of a triangle (the cevians perpendicular to the opposite sides). Using th...
In this article we prove the Smarandache-Patrascu's theorem in relation to the inscribed orthohomolo...
In this article we prove the Sodat’s theorem regarding the ortho-homogolgical triangle and then we u...
Abstract. In this paper we present the Smarandache’s Cevians Theorem (II) in the geometry of the tri...
Let ABC be an acute triangle with altitudes AA', BB', and CC'. The sum of the altitudes is equal to ...
Abstract. In this article we’ll emphasize on two triangles and provide a vectorial proof of the fact...
In this note, we make connections between Problem 21 of [1] and the theory of orthological triangles
Plants and trees grow perpendicular to the plane tangent to the soil surface, at the point of penetr...
folllowing: If 1 2,P P are isogonal points in the triangle ABC, and if 1 1 1A B C and 2 2 2A B C are...
Given a triangle in Euclidean geometry it is well known that there exist an infinity of triangles ea...
as the Smarandache function and is defmed in the following way. For n any integer greater than zero,...
In this paper We present the Smarandache's Orthic Theorem in the geometry of the triangle
In this paper we present the Smarandache’s Cevians Theorem (II) in the geometry of the triangle
Proving the Smarandache–Pătraşcu’s Theorem in relation to the inscribed orthohomological triangles u...
In this paper we present the Smarandache’s Ratio Theorem in the geometry of the triangle. Smarandach...
We introduce the altitudes of a triangle (the cevians perpendicular to the opposite sides). Using th...
In this article we prove the Smarandache-Patrascu's theorem in relation to the inscribed orthohomolo...
In this article we prove the Sodat’s theorem regarding the ortho-homogolgical triangle and then we u...
Abstract. In this paper we present the Smarandache’s Cevians Theorem (II) in the geometry of the tri...
Let ABC be an acute triangle with altitudes AA', BB', and CC'. The sum of the altitudes is equal to ...
Abstract. In this article we’ll emphasize on two triangles and provide a vectorial proof of the fact...
In this note, we make connections between Problem 21 of [1] and the theory of orthological triangles
Plants and trees grow perpendicular to the plane tangent to the soil surface, at the point of penetr...
folllowing: If 1 2,P P are isogonal points in the triangle ABC, and if 1 1 1A B C and 2 2 2A B C are...
Given a triangle in Euclidean geometry it is well known that there exist an infinity of triangles ea...
as the Smarandache function and is defmed in the following way. For n any integer greater than zero,...