11......
Abe sale dimag kharab mat kar samjha>>>>>>>>>>>>>>>>
36 vertices if all of them are or order two except one at each end.
no numbers have the same number of edges and vertices
In a graph where all vertices have a degree of 3, the sum of the degrees of all vertices is equal to twice the number of edges. Therefore, if there are ( n ) vertices, the equation is ( 3n = 2 \times 35 = 70 ). Solving for ( n ) gives ( n = \frac{70}{3} ), which is approximately 23.33. Since ( n ) must be an integer, the least possible number of vertices is 24.
for any prism , number of ___ + number of vertices = number of edges + ___
Abe sale dimag kharab mat kar samjha>>>>>>>>>>>>>>>>
In a graph, the sum of the degrees of all vertices is equal to twice the number of edges. This is known as the Handshaking Lemma. Therefore, if all vertices in a graph with 35 edges have a degree of at least 3, the sum of the degrees of all vertices must be at least 3 times the number of vertices. Since each edge contributes 2 to the sum of degrees, we have 2 * 35 = 3 * V, where V is the number of vertices. Solving for V, we get V = 70/3 = 23.33. Since the number of vertices must be a whole number, the largest possible number of vertices in this graph is 23.
36 vertices if all of them are or order two except one at each end.
no numbers have the same number of edges and vertices
If you add the vertices and Faces and subtract 2 from that number you get the number of edges. Vertices+Faces=Edges+2
In a graph where all vertices have a degree of 3, the sum of the degrees of all vertices is equal to twice the number of edges. Therefore, if there are ( n ) vertices, the equation is ( 3n = 2 \times 35 = 70 ). Solving for ( n ) gives ( n = \frac{70}{3} ), which is approximately 23.33. Since ( n ) must be an integer, the least possible number of vertices is 24.
A sphere- there are no faces, edges or vertices
for any prism , number of ___ + number of vertices = number of edges + ___
In a triangular prism, there are 6 vertices and 9 edges. The ratio of the number of vertices to the number of edges is therefore 6:9, which can be simplified to 2:3.
There is no limit to the number of vertices nor edges.
Edges: 4, Vertices: 4 and Edges: still 4, their number hasn't changed!
It has 7 faces, 15 edges and 10 vertices