Answer:
16 edges.
Step-by-step explanation:
We will use Euler's polyhedron formula to solve for the edges of our convex polyhedron.
Euler's polyhedron formula is: [tex]V+F-E=2[/tex], where,
V= Vertices of polyhedron,
F= Faces of polyhedron,
E= Edges of polyhedron.
Let us substitute V=6 and F=12 in Euler's formula to find number of edges of our polyhedron.
[tex]6+12-E=2[/tex]
[tex]18-E=2[/tex]
Let us subtract 18 from both sides of our equation.
[tex]18-E-18=2-18[/tex]
[tex]-E=2-18[/tex]
[tex]-E=-16[/tex]
[tex]E=16[/tex]
Therefore, our convex polyhedron will have 16 edges.
