Perfect hexagon9/3/2023 Intersection points where three ropes intersect at a single point Therefore, there are 6 × 3 = 18 intersection points of this type.ģ. Each vertex is connected to three non-adjacent vertices, resulting in three intersection points. There are six such points, one at each vertex. Intersection points where two ropes from non-adjacent vertices intersect Therefore, there are 6 × 2 = 12 intersection points of this type.Ģ. Each vertex is connected to two adjacent vertices, resulting in two intersection points. Intersection points where two ropes from adjacent vertices intersect We can see that there are three types of intersection points:ġ. To count the intersection points, we need to look for places where two ropes intersect. We start by connecting vertex A with all the other vertices, then move to vertex B, and so on. Next, we connect all the vertices with ropes. Step 2: Connecting the vertices with ropes We label the vertices A, B, C, D, E, and F, as shown below. ![]() Since we do not know the size of the hexagon, we can assume that each side has a length of 1 unit. To solve this question, we need to first draw the hexagon and then connect all the vertices with ropes.
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