Existence Of (18,9;f)-Arc Of Type (4,9) In PG(2,5) | Zendy

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Existence Of (18,9;f)-Arc Of Type (4,9) In PG(2,5)

Author(s) -

J Makbola

Publication year - 2007

Publication title -

mağallaẗ al-tarbiyaẗ wa-al-ʻilm

Language(s) - English

Resource type - Journals

eISSN - 2664-2530

pISSN - 1812-125X

DOI - 10.33899/edusj.2007.51323

Subject(s) - arc (geometry) , type (biology) , order (exchange) , mathematics , construct (python library) , plane (geometry) , pure mathematics , combinatorics , geometry , computer science , geology , programming language , business , paleontology , finance

In this paper we prove the existence of (18,9;f)-arc of type (4,9) when L0 =13 in the projective plane of order five ,and classified it then give an example of this case .Then by personal computer we construct some projectively distinct (13,4)-arc in PG(2,5) and compare the results with (18,9;f)-arc of type (4,9) .Also this paper conclude the proves of the theorems that deduced.

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