The eigenvalues of the Laplacian are quantities that underlie many physical phenomena including, for instance, heat conduction or overtones of a drum. In 1974, Kac asked (and in a way answered) the question of how the eigenvalues of the Laplacian change when the underlying domain is perforated by a large number of tiny holes. Soon thereafter, Rauch and Taylor completed Kac? analysis while linking the problem to a cocktail-party-level question of how fine one should crush the ice cubes to maximize its cooling effect on a drink (read: ambient liquid). Disregarding the analogies, they concluded that the correct quantity to look at is the capacity density of the perforations; scaling the number of perforations by inverse capacity then makes the eigenvalues tend to those of an effective (deterministic) Schrödinger operator as the perforation diameters tend to zero. In the talk, I will review these findings relying at first on the classical connection to Wiener sausage which earned this problem much independent attention by probabilists over several decades. I will then proceed to discuss how one can capture the fluctuations of the eigenvalues and prove a Central Limit Theorem for the eigenvalues that are simple in the aforementioned limit. The method of proof in this part is quite different, relying largely on martingale representation and rank-one type of perturbations. For centering by expected eigenvalues the CLT holds in all dimensions 2 and above. For centering by limiting eigenvalues one has to restrict to dimensions less than 6 as non-trivial corrections arise in other cases. The talk is based on an upcoming joint work with Ryoki Fukushima (University of Tsukuba).