Add to ORKGTriangular arrays display coefficients of polynomials in a way that allows mathematicians to find and prove patterns within them. While some arrays, like Pascal’s Triangle, are widely known and explored, other triangular arrays, like the Factorial Triangle and Euler’s Number Triangle are less known. We will explore the patterns within the aforementioned lesser known arrays
The triangular numbers is a series of number that add the natural numbers. Parabolic shapes emerge w...
In this work we introduce the triangular arrays of depth greater than 1 given by linear recurrences,...
In this work we introduce the triangular arrays of depth greater than 1 given by linear recurrences,...
Triangular arrays are a unifying thread throughout various areas of discrete mathematics such as num...
The triangular numbers are formed by partial sum of the series 1+2+3+4+5+6+7….+n In other wor...
Pascal’s triangle is one of the most famous and interesting patterns in mathematics. In fact, while ...
In almost all books on College Algebra, the Pascal Triangle is placed in such a position as to show ...
In almost all books on College Algebra, the Pascal Triangle is placed in such a position as to show ...
Many properties have been found hidden in Pascal\u27s triangle. In this paper, we will present sever...
We know that there is a variety of patterns in triangles in number theory. The Gilbreath's tri...
Combinatorics is a branch of mathematics interested in the study of finite, or countable, sets. In p...
Includes bibliographical references (pages 182-184)A study of the life of Pascal and an examination ...
In this work we introduce the triangular arrays of depth greater than 1 given by linear recurrences,...
AbstractIn response to some recent questions of L.W. Shapiro, we develop a theory of triangular arra...
The study presents some of the patterns observed in Pascal\u27s triangle in relation to combinatoric...
The triangular numbers is a series of number that add the natural numbers. Parabolic shapes emerge w...
In this work we introduce the triangular arrays of depth greater than 1 given by linear recurrences,...
In this work we introduce the triangular arrays of depth greater than 1 given by linear recurrences,...
Triangular arrays are a unifying thread throughout various areas of discrete mathematics such as num...
The triangular numbers are formed by partial sum of the series 1+2+3+4+5+6+7….+n In other wor...
Pascal’s triangle is one of the most famous and interesting patterns in mathematics. In fact, while ...
In almost all books on College Algebra, the Pascal Triangle is placed in such a position as to show ...
In almost all books on College Algebra, the Pascal Triangle is placed in such a position as to show ...
Many properties have been found hidden in Pascal\u27s triangle. In this paper, we will present sever...
We know that there is a variety of patterns in triangles in number theory. The Gilbreath's tri...
Combinatorics is a branch of mathematics interested in the study of finite, or countable, sets. In p...
Includes bibliographical references (pages 182-184)A study of the life of Pascal and an examination ...
In this work we introduce the triangular arrays of depth greater than 1 given by linear recurrences,...
AbstractIn response to some recent questions of L.W. Shapiro, we develop a theory of triangular arra...
The study presents some of the patterns observed in Pascal\u27s triangle in relation to combinatoric...
The triangular numbers is a series of number that add the natural numbers. Parabolic shapes emerge w...
In this work we introduce the triangular arrays of depth greater than 1 given by linear recurrences,...
In this work we introduce the triangular arrays of depth greater than 1 given by linear recurrences,...