In mathematical chemistry, molecular structure of any chemical substance can be expressed by a numeric number or polynomial or
sequence of number which represent the whole graph is called topological
index. An important branch of graph theory is the chemical graph theory. As a consequence of their worldwide uses, chemical networks have
inspired researchers since their development. Determination of the expressions for topological indices of different derived graphs is a new and
interesting problem in graph theory. In this article, some graphs which
are derived from Honeycomb structure are studied, and found their exact
results for Sum degree-based polynomials are obtained.
