*If a polyhedron has 5 faces and 6 vertices, then how many edges does it have?* 1️⃣ 9 2️⃣ 13 3️⃣ 11 4️⃣ 1
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Answer:
I’m assuming you meant “polyhedron” and “faces” rather than “polyderon” and “faves”. In that case, the answer is 15. This comes from one of Euler’s equations. In 1750, he pointed out in a letter to Christian Goldbach that in a convex polyhedron
I’m assuming you meant “polyhedron” and “faces” rather than “polyderon” and “faves”. In that case, the answer is 15. This comes from one of Euler’s equations. In 1750, he pointed out in a letter to Christian Goldbach that in a convex polyhedronV - E + F = 2
I’m assuming you meant “polyhedron” and “faces” rather than “polyderon” and “faves”. In that case, the answer is 15. This comes from one of Euler’s equations. In 1750, he pointed out in a letter to Christian Goldbach that in a convex polyhedronV - E + F = 2where V is the number of vertices, E is the number of edges and F is the number of faces. In your question, V = 10 and F = 7 so the equation becomes
I’m assuming you meant “polyhedron” and “faces” rather than “polyderon” and “faves”. In that case, the answer is 15. This comes from one of Euler’s equations. In 1750, he pointed out in a letter to Christian Goldbach that in a convex polyhedronV - E + F = 2where V is the number of vertices, E is the number of edges and F is the number of faces. In your question, V = 10 and F = 7 so the equation becomes10 - E + 7 = 2
I’m assuming you meant “polyhedron” and “faces” rather than “polyderon” and “faves”. In that case, the answer is 15. This comes from one of Euler’s equations. In 1750, he pointed out in a letter to Christian Goldbach that in a convex polyhedronV - E + F = 2where V is the number of vertices, E is the number of edges and F is the number of faces. In your question, V = 10 and F = 7 so the equation becomes10 - E + 7 = 217 - E = 2
I’m assuming you meant “polyhedron” and “faces” rather than “polyderon” and “faves”. In that case, the answer is 15. This comes from one of Euler’s equations. In 1750, he pointed out in a letter to Christian Goldbach that in a convex polyhedronV - E + F = 2where V is the number of vertices, E is the number of edges and F is the number of faces. In your question, V = 10 and F = 7 so the equation becomes10 - E + 7 = 217 - E = 2E = 15
- 5 faces
- 6 Vertices (corner points)
- 9 edges
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Hope this will help u ☺️