A solid has 24 vertices and 36 edges. Given that Euler's formula applies, how many faces
does it have?
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A solid has 24 vertices and 36 edges. Given that Euler's formula applies, how many faces
does it have?
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Answer:
Number of faces = F
Number of edges = 36
Number of vertices = 24
Euler’s Formula = F + V - E = 2
F + 24 - 36 = 2
F - 12 = 2
F = 14
The solid has 14 faces.
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Given:
A solid has 24 vertices and 36 edges.
To Find:
How many faces does it have?
Solution:
Edges → E = 36
Vertices → V = 24
Faces → F = ?
Euler's Formula =
→ 24 - 36 + F = 2
→ -12 + F = 2
→ F = 2+12
→ F = 14
The Number of Faces = 14.
Answer:
Number of Faces for the solid object =
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