@article{Fachrunnisa_Hasmawati_Amir_2023, title={Metric Dimension of Shackle Operation C_3 Cycle Graph}, volume={19}, url={https://journal.unhas.ac.id/index.php/jmsk/article/view/22957}, DOI={10.20956/j.v19i2.22957}, abstractNote={<p>Let <em>G</em> be a connected graph and <em>W</em> be a ordered vertices subset on a connected graph . The set <em>W</em> is called resolving set for <em>G</em> if every vertex on graph <em>G</em> has distinct representation of <em>W</em>. A resolving set containing a minimum number of vertices is called resolving set minimum or basis for <em>G</em> and the cardinality of resolving set is the metric dimension on graph <em>G</em>, denoted by <em>dim(G)</em>. In the thesis discusses about metric dimensions of shackle operation <em>C<sub>3</sub></em> cycle graph, <em>dim(Shack(C<sub>3</sub><sup>1</sup>,C<sub>3</sub><sup>2</sup>,…,C<sub>3</sub><sup>k</sup>:v<sub>3</sub><sup>1</sup>=v<sub>1</sub><sup>2</sup>,v<sub>3</sub><sup>2</sup>=v<sub>1</sub><sup>3</sup>,…,v<sub>3</sub><sup>k-1</sup>=v<sub>1</sub><sup>k</sup> ))=2</em> for <em>k>=2</em> . To proof this results, we was used mathematical induction method.</p>}, number={2}, journal={Jurnal Matematika, Statistika dan Komputasi}, author={Fachrunnisa, St. Munieroh and Hasmawati, Hasmawati and Amir, Amir Kamal}, year={2023}, month={Jan.}, pages={317-322} }