2007 Cyprus MO/Lyceum/Problem 10

Problem

The volume of an orthogonal parallelepiped is $132\;\mathrm{cm}^3$ and its dimensions are integers. The minimum sum of the dimensions is

$\displaystyle V = lwh$ , so we want to minimize the sum of three integers whose product is $\displaystyle 132 = 2^2\cdot3\cdot11$ . To do this, the factors must be as close together as possible. Therefore, none of the factors will be $2$ , and one will likely be $11$ . This implies that the factors are minimized when they are $3,\ 4,\ 11$ , and the answer is $3 + 4 + 11 = 18 \Longrightarrow \mathrm{D}$ .