Add to ORKGAn isosceles triangle can be divided into a sequence of n isosceles triangles if it satisfies one of the following: (1) the measure of the base angles are equal to n times the measure of the vertex angle. (2) the measure of the vertex angle is equal to 180 divided by 2n + 1. Based on the article, Dividable Triangles- What are they? By Roza Leikin, there exist isosceles triangles that can be divided into a sequence of isosceles triangles. In addition, theorems presented in this study were also based on the said article
The open problem of whether or not every pair of equal-area polygons has a hinged dissection is disc...
A measure for the description of the chirality of triangles is introduced. The measure χM is zero fo...
AbstractAny partition of a disk into n subdisks can be imbedded in E2 by laying down n triangles one...
In the March 2014 issue of At Right Angles, the article “A Fair Division” presented a study of a pro...
This article provides a general formula to generate all pairs of rational-sided isosceles triangles ...
Let us start by making a few remarks on the notion of characterisation in mathematics, a theme that...
Some acute-angled triangles are special, e.g. right-angled or isosceles tri-angles. Some are not of ...
AbstractWe enumerate all dissections of an equilateral triangle into smaller equilateral triangles u...
AbstractWe consider the problem of dissecting a rectangle or a square into unequal right-angled isos...
AbstractLet T be a non-equilateral triangle. We prove that the number of non-similar triangles Δ suc...
as the Smarandache function and is defmed in the following way. For n any integer greater than zero,...
Abstract. The main goal of this paper is to establish sharp bounds for the angles and for the side r...
In 19th century we have the concept of Non Euclidean geometry that is divided into two parts spheric...
This paper provides a new proof of the Pythagoras Theorem on right-angled triangles via two new lemm...
Abstract. This paper explores six triangles that have a vertex, a midpoint of a side, and the centro...
The open problem of whether or not every pair of equal-area polygons has a hinged dissection is disc...
A measure for the description of the chirality of triangles is introduced. The measure χM is zero fo...
AbstractAny partition of a disk into n subdisks can be imbedded in E2 by laying down n triangles one...
In the March 2014 issue of At Right Angles, the article “A Fair Division” presented a study of a pro...
This article provides a general formula to generate all pairs of rational-sided isosceles triangles ...
Let us start by making a few remarks on the notion of characterisation in mathematics, a theme that...
Some acute-angled triangles are special, e.g. right-angled or isosceles tri-angles. Some are not of ...
AbstractWe enumerate all dissections of an equilateral triangle into smaller equilateral triangles u...
AbstractWe consider the problem of dissecting a rectangle or a square into unequal right-angled isos...
AbstractLet T be a non-equilateral triangle. We prove that the number of non-similar triangles Δ suc...
as the Smarandache function and is defmed in the following way. For n any integer greater than zero,...
Abstract. The main goal of this paper is to establish sharp bounds for the angles and for the side r...
In 19th century we have the concept of Non Euclidean geometry that is divided into two parts spheric...
This paper provides a new proof of the Pythagoras Theorem on right-angled triangles via two new lemm...
Abstract. This paper explores six triangles that have a vertex, a midpoint of a side, and the centro...
The open problem of whether or not every pair of equal-area polygons has a hinged dissection is disc...
A measure for the description of the chirality of triangles is introduced. The measure χM is zero fo...
AbstractAny partition of a disk into n subdisks can be imbedded in E2 by laying down n triangles one...