Ramesh Chandra Bagadi (Physics, Engineering Mechanics, Civil & Environmental Engineering, University of Wisconsin)
Published in matho.philica.com Observation Centroid Of A Given Set In Prime Metric. ISSN 17513030
Author:
Ramesh Chandra Bagadi
Data Scientist
INSOFE (International School Of Engineering),
Hyderabad, India.
rameshcbagadi@uwalumni.com
+91 9440032711
Given any Set of Numbers, we can slate them all in one Prime Metric Basis of Appropriate Higher Order Sequence of Primes using [1], [2], [3] and [4]. We now define the Centroid as the average of the Prime Metric Basis Positions (integral or Fractional) of the thusly slated elements of the given Set. References References
1.Bagadi, R. (2016). Field(s) Of Sequence(s) Of Primes Of Positive Integral Higher Order Space(s). PHILICA.COM Article number 622.
http://www.philica.com/display_article.php?article_id=622
2. viXra:1612.0131 submitted on 20161208 05:02:58,
http://vixra.org/abs/1612.0131
Prime Metric Basis Change Theorem
Authors: Ramesh Chandra Bagadi
Category: General Mathematics
3. viXra:1704.0110 submitted on 20170409 10:15:18,
http://vixra.org/abs/1704.0110
Universal Evolution Model Based On Theory Of Natural Metric For Functions {Version –I}
Authors: Ramesh Chandra Bagadi
Category: Number Theory
4.viXra:1612.0234 submitted on 20161213 05:29:08, (12 uniqueIP downloads)
http://vixra.org/abs/1612.0234
TRL Universal Hyper Primality (Invoking Primality Metric Within Primality Metric) Analysis. (Universal Engineering Series).
Authors: Ramesh Chandra Bagadi
Category: General Mathematics
5. http://vixra.org/author/ramesh_chandra_bagadi
6. http://philica.com/advancedsearch.php?author=12897 Information about this Observation This Observation has not yet been peerreviewed This Observation was published on 11th August, 2017 at 05:39:12 and has been viewed 659 times. This work is licensed under a Creative Commons Attribution 2.5 License. 
The full citation for this Observation is: Bagadi, R. (2017). Centroid Of A Given Set In Prime Metric. ISSN 17513030. PHILICA.COM Observation number 188. 
