Degree Based Some Topological Indices of Pentagonal Quintuple Chains

Abstract: 
Let G be a simple, undirected, connected graph with vertex set V (G)
and edge set E(G). Given v ∈ V (G), the degree of v is denoted by d(v) and is
defined as the number of edges incident with v. For the vertices u, v ∈ V (G), the
distance between u and v is denoted by d(u, v) and is defined as the length of the
shortest path connecting u and v in G.
In this paper, we make progress to many degree based indices like First and Second
zagreb, Randic, Geometric, Arithmetic, Harmonic, Alberston, Atom bond connectivity indices and also obtained closed forms using polynomial of pentagonal quintuple chains