Add to ORKGThe Sierpinski triangle also known as Sierpinski gasket is one of the most interesting and the simplest fractal shapes in existence. There are many different and easy ways to generate a Sierpinski triangle. In this paper we have presented a new algorithm for generating the sierpinski gasket using complex variables
Broadly, fractals are sets that exhibit a repeating pattern at multiple scales. One important fracta...
The core concept of fractals is the process of rearranging identical components that have a large am...
This article is a continuation of a previous work which dealt with the inversion of a Sierpinski tri...
Abstract. In this paper, we consider a large variety of solutions for the generation of Sierpinski t...
We generalize the construction of the ordinary Sierpinski triangle to obtain a two-parameter family ...
The classical Sierpinski Gasket defined on the equilateral triangle is a typical example of fractals...
Big open problems in science and mathematics have a way of surprisingly showing up in simple puzzles...
This paper is about the beauty of fractals and the surprising con-nections between them. We will exp...
A fractal is a mathematical set that typically displays self-similar patterns, which means it is "th...
The Sierpiński fractal or Sierpiński gasket ∈ is a familiar object studied by specialists in dynamic...
Self-similar fractal structures are of fundamental importance in science, mathematics, and aesthetic...
The famous fractal set called the Sierpiński triangle was introduced as a plane curve every point o...
In this paper, the authors explore using fractals in the classroom to teach more complex ideas. In G...
In an article published in the November 2016 issue of At Right Angles we had seen how geometrical fr...
AbstractWe prove for the Sierpinski Gasket (SG) an analogue of the fractal interpolation theorem of ...
Broadly, fractals are sets that exhibit a repeating pattern at multiple scales. One important fracta...
The core concept of fractals is the process of rearranging identical components that have a large am...
This article is a continuation of a previous work which dealt with the inversion of a Sierpinski tri...
Abstract. In this paper, we consider a large variety of solutions for the generation of Sierpinski t...
We generalize the construction of the ordinary Sierpinski triangle to obtain a two-parameter family ...
The classical Sierpinski Gasket defined on the equilateral triangle is a typical example of fractals...
Big open problems in science and mathematics have a way of surprisingly showing up in simple puzzles...
This paper is about the beauty of fractals and the surprising con-nections between them. We will exp...
A fractal is a mathematical set that typically displays self-similar patterns, which means it is "th...
The Sierpiński fractal or Sierpiński gasket ∈ is a familiar object studied by specialists in dynamic...
Self-similar fractal structures are of fundamental importance in science, mathematics, and aesthetic...
The famous fractal set called the Sierpiński triangle was introduced as a plane curve every point o...
In this paper, the authors explore using fractals in the classroom to teach more complex ideas. In G...
In an article published in the November 2016 issue of At Right Angles we had seen how geometrical fr...
AbstractWe prove for the Sierpinski Gasket (SG) an analogue of the fractal interpolation theorem of ...
Broadly, fractals are sets that exhibit a repeating pattern at multiple scales. One important fracta...
The core concept of fractals is the process of rearranging identical components that have a large am...
This article is a continuation of a previous work which dealt with the inversion of a Sierpinski tri...