Electric Potential at the Center of a Cube with Point Charges

Eight point charges, each of $100\ \mathrm{nC}$, are placed at the corners of a cube with side length $10\ \mathrm{cm}$. If the electric potential is defined to be zero at infinity, what is the electric potential at the center of the cube? Use $\varepsilon_0 = 8.854 \times 10^{-12}\ \mathrm{C^2/(N\cdot m^2)}$. $V = \sum_i \frac{q_i}{4\pi\varepsilon_0 r_i}$, where $r_i$ is the distance from each charge to the center.

If the side length of the cube in the previous problem is doubled, but the charge on each corner remains $100\ \mathrm{nC}$, what happens to the electric potential at the center of the cube?

Which of the following best explains why the potential at the center of the cube is the sum of the potentials from each charge, rather than the vector sum?