Which of the following cannot be true for a polyhedron?(1) V = 6, F = 4, E = 8 (2) V = 4, F = 4, E = 6 (3) V = 4, F = 4, E = 4 (4) V = 8, F = 6, E = 12

To determine which of the given options cannot be true for a polyhedron, we can use Euler's formula for polyhedra. Euler's formula states that for any convex polyhedron, the number of vertices (V) plus the number of faces (F) is equal to the number of edges (E) plus 2. In other words, V + F = E + 2.

Let's apply this formula to each of the given options:

1. V = 6, F = 4, E = 8. Substituting these values into Euler's formula gives 6 + 4 = 8 + 2, which simplifies to 10 = 10. This is true, so option 1 can be true for a polyhedron.

2. V = 4, F = 4, E = 6. Substituting these values into Euler's formula gives 4 + 4 = 6 + 2, which simplifies to 8 = 8. This is true, so option 2 can be true for a polyhedron.

3. V = 4, F = 4, E = 4. Substituting these values into Euler's formula gives 4 + 4 = 4 + 2, which simplifies to 8 = 6. This is not true, so option 3 cannot be true for a polyhedron.

4. V = 8, F = 6, E = 12. Substituting these values into Euler's formula gives 8 + 6 = 12 + 2, which simplifies to 14 = 14. This is true, so option 4 can be true for a polyhedron.

Therefore, the only option that cannot be true for a polyhedron is option 3.