Hello!
The simplest method is to compute the surface area of the cube, its volume and then find their ratio. Denote the length of a side as b centimeters.
The volume of a cube with the side length b is b^3 (this is the base for defining volumes of more complex figures).
The surface of a cube consists of 6 congruent squares: we may call them upper, lower, left, right, front and rear. The surface of each of these squares is b^2, thus the surface area of a cube is 6b^2.
So the ratio in question is equal to (6b^2)/(b^3) = 6/b.
If b = 3 cm, the value of this ratio is 6/(3 cm) = 2 (cm)^(-1), which is the answer (yes, the dimension of this quantity is (cm)^(-1) = 1/(cm) ).
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