Chaudhry, FaryalHusin, Mohamad NazriAfzal, FarkhandaAfzal, DeebaCancan, MuratFarahani, Mohammad Reza2025-05-102025-05-1020210972-05292169-006510.1080/09720529.2021.19845612-s2.0-85118662675https://doi.org/10.1080/09720529.2021.1984561https://hdl.handle.net/20.500.14720/8446Farahani, Mohammad Reza/0000-0003-2969-4280; Husin, Mohamad Nazri/0000-0003-4196-4984Chemical graph theory is a branch of mathematical chemistry which has an important outcome on the development of the chemical sciences. A chemical graph is a graph which is produced from some molecular structure by applying some graphical operations. The demonstration of chemical compounds and chemical networks with M-polynomials is a new idea and the M-polynomial of different molecular structures supports us to calculate many topological indices. A topological index is a numeric quantity that describes the whole structure of a molecular graph of the chemical compound and supports to understand its physical features, chemical reactivates and boiling activities. In this paper, we compute M-polynomial and topological indices of tadpole graph, then we recover numerous topological indices using the M-polynomial.eninfo:eu-repo/semantics/closedAccessTopological InvariantsM-PolynomialTadpoleTopological IndicesM-Polynomials and Degree-Based Topological Indices of Tadpole GraphArticle247N/AQ220592072WOS:000715624500001