<![CDATA[Let G = (V(G),E(ðº)) be a graph with vertex set ð‘‰(ðº) and edge set ð¸(ðº). Assume that graph G have ð‘ž edge. Graceful edge-odd labeling is a bijective map  𑓠∶ ð¸(ðº) → {1, 3, 5,…,2𑞠– 1} that resulting map ð‘“+ : ð‘‰(ðº) → {0,1,2,…,2𑞠−1} with  such as obtained different edge label. Graph G ia called Graceful edge-odd labeling if there is graceful edge-odd labeling on G. Let  and  are two cycle graph with vertex set  and . Graph  is obtained by conected every vertex from  to  such as we have edge  Graph Web W(2,n) is a graph obtained by adding a pendant edge on each outer cycle vertex from graph . In this paper we will discussed about Graceful edge-odd labeling on Web (2,ð‘›) graph and we have that Web W(2,ð‘›) graph is graceful edge odd graph for n odd.]]>
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