https://polyhedra.tessera.li/octahedron/operations[br]
https://drive.google.com/file/d/1PDpxJhSNigXC5nJnRGzLiKTPWklveadU/view?usp=sharing[br]
https://bit.ly/3PLHavZ[br]
1. How many faces does an octahedron have?
2. How many triangles are there in the net of an octahedron?
3. How many edges, vertices, and face does an octahedron have?
4. What does an octahedron represent as a Platonic solid?
[b]Instruction[/b][list=1][*]Study the provided GeoGebra code carefully to understand the construction process.[/*][*]Use GeoGebra to create the [b]Tetrahedron[/b] and [b]Icosahedron[/b] Platonic solids.[/*][*]Observe the completed solids and analyze their structure.[/*][/list][b]Additional Task[/b][list][*]Determine the following for each Platonic solid:[/*][list][*]Number of [b]triangular faces[/b][/*][*]Number of [b]edges[/b][/*][*]Number of [b]vertices (points)[/b][/*][/list][/list][b][img]data:image/png;base64,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[/img][br]snippet from ChatGPT[br][/b]
What is the difference between a Tetrahedron and a Triangular Pyramid?
2. What is the number of triangular faces, vertices, and edges for a Tetrahedron?
What is the number of triangular faces, vertices, and edges for an Icosahedron?
What element is represented by the Tetrahedron in classical philosophy?
5. What element is represented by the Icosahedron in classical philosophy?
Which of the following is the correct formula relating vertices (V), edges (E), and faces (F) of a convex polyhedron?
To calculate the number of vertices (V) of a Platonic solid, which of the following formulas can be used based on the number of faces (F)?