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This video contains the description about Planar graph and Non planar graphs in Graph theory with examples.#Planargraph #Nonplanargraph #Examplesonplanarandn...
- 18 min
- 16.8K
- DIVVELA SRINIVASA RAO
Searches related to planar and non planar graph examples for kids video
In this lecture we discuss planar graph and non planar graphs with examples. Moreover, we prove k3 and k4 are planar graphs but k5 and k3,3 are non planar.#g...
- 11 min
- 147
- Mathematics with Naveed
Dec 29, 2014 · Planar Graphs - Worked Examples. Maths Resource. 13.1K subscribers. Subscribed. 75. 21K views 9 years ago. DiscreteMaths.github.io | Section 4 - Graph Theory | Planar Graphs...more....
- 9 min
- 21.7K
- Maths Resource
- Properties of Planar Graphs
- Non-planar Graph
- Properties of non-planar Graphs
- Graph Coloring
- Applications of Graph Coloring
- State and Prove Handshaking Theorem.
If a connected planar graph G has e edges and r regions, then r ≤e.If a connected planar graph G has e edges, v vertices, and r regions, then v-e+r=2.If a connected planar graph G has e edges and v vertices, then 3v-e≥6.A complete graph Knis a planar if and only if n<5.A graph is said to be non planar if it cannot be drawn in a plane so that no edge cross. Example:The graphs shown in fig are non planar graphs. These graphs cannot be drawn in a plane so that no edges cross hence they are non-planar graphs.
A graph is non-planar if and only if it contains a subgraph homeomorphic to K5 or K3,3 Example1: Show that K5is non-planar. Solution: The complete graph K5contains 5 vertices and 10 edges. Now, for a connected planar graph 3v-e≥6. Hence, for K5, we have 3 x 5-10=5 (which does not satisfy property 3 because it must be greater than or equal to 6). Th...
Suppose that G= (V,E) is a graph with no multiple edges. A vertex coloring of G is an assignment of colors to the vertices of G such that adjacent vertices have different colors. A graph G is M-Colorable if there exists a coloring of G which uses M-Colors. Proper Coloring:A coloring is proper if any two adjacent vertices u and v have different colo...
Some applications of graph coloring include: 1. Register Allocation 2. Map Coloring 3. Bipartite Graph Checking 4. Mobile Radio Frequency Assignment 5. Making a time table, etc.
Handshaking Theorem:The sum of degrees of all the vertices in a graph G is equal to twice the number of edges in the graph. Mathematically it can be stated as: ∑v∈Vdeg(v)=2e Proof: Let G = (V, E) be a graph where V = {v1,v2, . . . . . . . . . .} be the set of vertices and E = {e1,e2. . . . . . . . . .} be the set of edges. We know that every edge l...
🔗. 2.3 Planar Graphs. 🔗. Objectives. After completing this section, you should be able to do the following. Distinguish between planar and non-planar graphs. Use Euler’s formula to prove that certain graphs are non-planar. Apply Euler’s formula to polyhedra. 🔗. Section Preview. 🔗. Investigate!
Apr 11, 2022 · A planar graph is one that can be drawn in a plane without any edges crossing. For example, the complete graph K₄ is planar, as shown by the “planar embedding” below.
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Figure 1.2: Planar, non-planar and dual graphs. (a) Plane ‘butterfly’graph. (b, c) Non-planar graphs. (d) The two red graphs are both dual to the blue graph but they are not isomorphic. Image source: wiki. Given a graph G,itsline graph or derivative L[G] is a graph such that (i) each vertex
