Numeric Palindromes in Primitive and Non-primitive Pythagorean Triples ∗
@article{Antalan2015NumericPI,
title={Numeric Palindromes in Primitive and Non-primitive Pythagorean Triples ∗},
author={John Rafael Macalisang Antalan and Richard P. Tagle},
journal={arXiv: Number Theory},
year={2015}
}In this article we consider numeric palindromes as a component of a pythagorean triple. We first show that there are infinitely many non-primitive pythagorean triples that contains (i) a single numeric palindrome as a component, (ii) two numeric palindromes as a component and (iii) three numeric palindromes as a component. We then focus on numeric palindromes in primitive pythagorean triples. Open problem related to the topic was also given.
References
SHOWING 1-6 OF 6 REFERENCES
Elementary Number Theory with Applications
- Mathematics
- 2001
Fundamentals Divisibility Theory Canonical Decompositions Linear Diophantine Equations and Congruences Congruences Applications Systems of Linear Congruences Three Classical Milestones Multiplicative…
Special Pythagorean Triangles and Kerpricker Number. International Journal of Engineering Research-Online
- isuue
- 2015
Special Pythagorean Triangles and Kerpricker Number
- International Journal of Engineering Research - Online
Elementary Number Theory Revised Printing
- Allyn and Bacon, Inc.,
- 1980