Prashanth R. Rao

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All published works

Action	Title	Year	Authors
+	The Prime Gaps Between Successive Primes to Ensure that there is Atleast One Prime Between Their Squares Assuming the Truth of the Riemann Hypothesis	2019	Prashanth R. Rao
+	Precious Primes, a New Category of Primes that May be Used to Represent Three Different Primes: Related Conjecture and Possible Applications Such as Encoding Graphs	2018	Prashanth R. Rao T. Nageswara Rao
+	Proof of Playfair’s Axiom Hits a Roadblock	2018	Prashanth R. Rao
+	Proof of Special Case of the Parallel Postulate of Euclid	2018	Prashanth R. Rao
+	Solution for a Special Case of the Toeplitz Conjecture	2017	Prashanth R. Rao
+	A Special Hexagon with Two-Fold Symmetry Must Have an Inscribed Square Satisfying the Toeplitz Conjecture	2017	Prashanth R. Rao
+	Regarding Three Points in a Plane Such that Two Points Are Non-Equidistant from the Third Point and a Predicted Property of Any Curve in that Plane Connecting the Two Non-Equidistant Points	2017	Prashanth R. Rao
+	The Suggestion that 2-Probable Primes Satisfying Even Goldbach Conjecture Are Possible	2016	Prashanth R. Rao
+	Every Even Integer Greater Than Six Can be Expressed as the Sum of Two co-Prime Odd Integers Atleast One of Which is a Prime	2016	Prashanth R. Rao
+	A Prediction if the Even Goldbach Conjecture is False and the Odd Goldbach Conjecture is True	2016	Prashanth R. Rao
+	The Smallest Possible Counter-Example of the Even Goldbach Conjecture if Any, Can Lie Only Between Two Odd Numbers that Themselves Obey the Odd Goldbach Conjecture	2016	Prashanth R. Rao
+	Any Two Successive Left Factorials Can Represent Only the First and Second Terms of an Arithmetic Progression of Positive Integers	2016	Prashanth R. Rao
+	A True Kurepa Conjecture Implies Dirichlet-Kurepa Primes: Two New Classes of Infinite Primes Within Arithmetic Progressions	2016	Prashanth R. Rao
+	Every Large Prime Must Lie on a Diriclet’s Arithmetic Sequence and a Simple Method to Identify Such Arithmetic Progressions	2016	Prashanth R. Rao
+	Two Proofs for the Existence of Integral Solutions (A1, A2,……,an) of the Equation a1 (P1^m) + a2 (P2^m)+……+ an (Pn^m) = 0 , for Sequence of Primes P1,p2,…,pn , and Where M is a Positive Integer	2016	Prashanth R. Rao
+	A General Partition Generating Algorithm for a Positive Integer k= K1.k2.…kn	2015	Pratish R. Rao Prashanth R. Rao
+	A Modified Circle-Cutting Strategy for Conceptualizing n! and Its Application to Derive Yet Another Well-Known Mathematical Result: the Approximate Sum of a Convergent Series Involving Factorials Equals Unity	2015	Pratish R. Rao Prashanth R. Rao
+	A Simple Algorithm to Express Any Odd Composite Number that is a Product of K-Primes not Necessarily Distinct as a Sum of Exactly K Unequal Terms	2015	Prashanth R. Rao
+	An Intuitive Conceptualization of n! and Its Application to Derive a Well Known Result	2015	Prashanth R. Rao
+	Verification of Collatz Conjecture for a Positive Integer Px, Where P is Any Prime Number and X is an Odd Integer Derived Using Fermat’s Little Theorem Which is Specific for Each Prime	2014	Prashanth R. Rao
+	A Useful Criterion to Identify Candidate Twin Primes	2014	Prashanth R. Rao
+	An Approach to Explore the Infinite Nature of Twin Primes	2014	Prashanth R. Rao
+	Connected, locally 2‐connected, <i>K</i><sub>1,3</sub>‐free graphs are panconnected	1984	Sharad V. Kanetkar Prashanth R. Rao

Common Coauthors

Coauthor	Papers Together
Pratish R. Rao	2
Sharad V. Kanetkar	1
T. Nageswara Rao	1

Commonly Cited References

Action	Title	Year	Authors	# of times referenced
+	A note on locally connected and hamiltonian-connected graphs	1979	Gary Chartrand Ronald J. Gould Albert D. Polimeni	1
+ PDF Chat	On the Riemann hypothesis and the difference between primes	2014	Adrian Dudek	1
+	A note on Hamiltonian circuits	1972	Vašek Chvátal P. Erdős	1
+ PDF Chat	Locally connected graphs	1974	Gary Chartrand Raymond E. Pippert	1