Add to ORKGThe triangular numbers is a series of number that add the natural numbers. Parabolic shapes emerge when this series is placed on a lattice, or imposed with a limited number of columns that causes the sequence to continue on the next row when it has reached the kth column. We examine these patterns and construct proofs that explain their behavior. We build off of this to see what happens to the patterns when there is not a limited number of columns, and we formulate the graphs as musical patterns on a staff, using each column as a line or space on the treble staff. By listening to the pattern, we can pick up on elements of the pattern that are missed by simply glancing over the graphic or formulaic versions
In this manuscript, we study the purpose of number patterns, a brief history of number patterns, and...
Dr. Ron Knott constructed a graph of all Primitive Pythagorean Triples (PPTs) with legs up to length...
The triangular numbers are formed by partial sum of the series 1+2+3+4+5+6+7….+n [2]. In other...
The triangular numbers are formed by partial sum of the series 1+2+3+4+5+6+7….+n In other wor...
A triangular number is a number N that satisfies that N dots can be arranged in increasing order to ...
We know that there is a variety of patterns in triangles in number theory. The Gilbreath's tri...
In a previous paper (1), I stated many conjectures about triangular numbers. Since submitting that p...
Triangular arrays display coefficients of polynomials in a way that allows mathematicians to find an...
The triangular numbers are formed by the partial sum of the series 1+2+3+4+5+6+7….+n [2]. In o...
Strong empirical evidence supports conjectures that certain number patterns always hold. These patte...
Triangular arrays are a unifying thread throughout various areas of discrete mathematics such as num...
I define an increasing function from triangular numbers to triangular numbers and prove it preserves...
In this paper we give rules for creating a number triangle T in a manner analogous to that for prod...
In this paper we give rules for creating a number triangle T in a manner analogous to that for produ...
In this manuscript, we study the purpose of number patterns, a brief history of number patterns, and...
In this manuscript, we study the purpose of number patterns, a brief history of number patterns, and...
Dr. Ron Knott constructed a graph of all Primitive Pythagorean Triples (PPTs) with legs up to length...
The triangular numbers are formed by partial sum of the series 1+2+3+4+5+6+7….+n [2]. In other...
The triangular numbers are formed by partial sum of the series 1+2+3+4+5+6+7….+n In other wor...
A triangular number is a number N that satisfies that N dots can be arranged in increasing order to ...
We know that there is a variety of patterns in triangles in number theory. The Gilbreath's tri...
In a previous paper (1), I stated many conjectures about triangular numbers. Since submitting that p...
Triangular arrays display coefficients of polynomials in a way that allows mathematicians to find an...
The triangular numbers are formed by the partial sum of the series 1+2+3+4+5+6+7….+n [2]. In o...
Strong empirical evidence supports conjectures that certain number patterns always hold. These patte...
Triangular arrays are a unifying thread throughout various areas of discrete mathematics such as num...
I define an increasing function from triangular numbers to triangular numbers and prove it preserves...
In this paper we give rules for creating a number triangle T in a manner analogous to that for prod...
In this paper we give rules for creating a number triangle T in a manner analogous to that for produ...
In this manuscript, we study the purpose of number patterns, a brief history of number patterns, and...
In this manuscript, we study the purpose of number patterns, a brief history of number patterns, and...
Dr. Ron Knott constructed a graph of all Primitive Pythagorean Triples (PPTs) with legs up to length...
The triangular numbers are formed by partial sum of the series 1+2+3+4+5+6+7….+n [2]. In other...