Abstract
The modified eccentric connectivity (MEC) polynomial of a molecular graph, G, is defined as (G,x) =
nG(u) xecc(u), where ecc(u) is defined as the length of a maximal path connecting u to another vertex of molecular graph G and nG(u) is the sum of the degrees of its neighborhoods. The MEC index is the first derivative of this polynomial for x = 1. The pentagonal carbon nanocones are constructed from a graphene sheet by removing a 60° wedge and joining the edges produces a cone with a single pentagonal defect at the apex. In this paper, we determine a numerical method for computing MEC polynomial and MEC index of one-pentagonal carbon nanocones.
Acknowledgments
The authors are indebted to the referee for his/her suggestions and helpful remarks.