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A solid has two bases and 5 lateral faces. What is the sum of the number of vertices and edges combined?
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A solid has two bases and 5 lateral faces. What is the sum of the number of vertices and edges combined?

User Dimitris Tseggenes
by
4.2k points

1 Answer

3 votes

Answer:

25

Explanation:

we know that

If the solid has two bases and 5 lateral faces, then the number of vertices is equal to 5 in each base

so


Vertices=2(5)=10

The number of edges is equal to 5 in each base plus 5 edges of the lateral faces

so


Edges=2(5)+5=15

therefore

The number of vertices and edges combined is equal to


Vertices+Edges=10+15=25

Verify

we know that

Euler’s formula for any polyhedron is given by the formula


F+V-E=2

where

F is the number of faces

V is the number of vertices

E is the number of edges

we have


F=2+5=7 ---> 2 bases and 5 lateral faces


V=10\\E=15

substitute


7+10-15=2 ----> is ok

User Anton Podolsky
by
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