Add to ORKGIn this article, we study a particular group of plane figures whose constants are listed in the Susa Mathematical Tablet No.\,3 (\textbf{SMT No.\,3}). We explain possible ways to define these figures and seek to demonstrate that the Susa scribes used complicated calculations to obtain such numbers. We also give examples of circular figures used for Elamite artifacts through which one can appreciate the significance of these figures in Elamite art.Comment: 28 pages and 19 figure
he circle is arguably the most studied ob-ject in mathematics, yet I am here to tell the tale of cir...
Abstract. 3D printing technology can help to visualize proofs in mathematics. In this document we ai...
Comments on Archimedes' theorem about sphere and cylinderIn his treatise addressed to Dositheus of P...
The bisection of trapezoids by transversal lines has many examples in Babylonian mathematics. In thi...
The study of the mathematics and geometry of ancient civilizations is a task which seems to be very ...
The decorations of ancient objects can provide some information on the value of constant π as a rati...
Plimpton 322 is an Old-Babylonian tablet consisting of a table of Pythagorean triples. In this artic...
We introduce the axiomatic theory of Spherical Occlusion Diagrams as a tool to study certain combina...
Proofs that the area of a circle is ?r2 can be found in mathematical literature dating as far back a...
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In this paper we will try to examine how in the history of polyhedra (and in particular star polyhed...
This article focuses on an artistic interpretation of pattern block designs with primary focus on th...
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This paper explores Archimedes’ works in conoids, which are three dimensional versions of conic sect...
In mathematics, three integer numbers or triples have been shown to govern a specific geometrical ba...
he circle is arguably the most studied ob-ject in mathematics, yet I am here to tell the tale of cir...
Abstract. 3D printing technology can help to visualize proofs in mathematics. In this document we ai...
Comments on Archimedes' theorem about sphere and cylinderIn his treatise addressed to Dositheus of P...
The bisection of trapezoids by transversal lines has many examples in Babylonian mathematics. In thi...
The study of the mathematics and geometry of ancient civilizations is a task which seems to be very ...
The decorations of ancient objects can provide some information on the value of constant π as a rati...
Plimpton 322 is an Old-Babylonian tablet consisting of a table of Pythagorean triples. In this artic...
We introduce the axiomatic theory of Spherical Occlusion Diagrams as a tool to study certain combina...
Proofs that the area of a circle is ?r2 can be found in mathematical literature dating as far back a...
Dr. Ron Knott constructed a graph of all Primitive Pythagorean Triples (PPTs) with legs up to length...
In this paper we will try to examine how in the history of polyhedra (and in particular star polyhed...
This article focuses on an artistic interpretation of pattern block designs with primary focus on th...
International audienceThis article aims at highlighting a radical change in the materiality of tu be...
This paper explores Archimedes’ works in conoids, which are three dimensional versions of conic sect...
In mathematics, three integer numbers or triples have been shown to govern a specific geometrical ba...
he circle is arguably the most studied ob-ject in mathematics, yet I am here to tell the tale of cir...
Abstract. 3D printing technology can help to visualize proofs in mathematics. In this document we ai...
Comments on Archimedes' theorem about sphere and cylinderIn his treatise addressed to Dositheus of P...