This is a slightly extended version of my answer to your question on Physics.SE.
This is a very good question and one that is quite difficult to answer. In physics, the use of a group is usually to describe a symmetry of the physical system. What we know of the monster is that it has a non-trivial action in 196883 dimensions. In other words, the Monster group is the symmetry of a 196883 dimensional object. The hope of Monster moonshine for a string theorist was that it would highlight some of the symmetries of string theory, which we know very little about.
One application that immediately jumps to mind is in coding theory and error correction and many other moonshines (Conway group, Mathieu group) could shine a light on this application but there is some inspiration from the Monster moonshine.
Let's look at the Leech lattice, $\Lambda_{24}^L$. It is a 24 dimensional, unimodular, even, self dual lattice (whose automorphism group happens to be $Co_0$, another sporadic group). When one takes the CFT of 24 free bosons compactified on the Leech lattice with a further $\mathbb Z_2$ orbifold (which was actually I believe the first construction of the asymmetric orbifold), the resulting vertex operator algebra, known as the Griess algebra has an automorphism group which is the Monster. The partition function of this VOA is the Klein $j-$ function (minus a constant). The Leech lattice however has applications to things outside of the string theoretic settings, particularly in certain error correcting codes in coding theory/information theory which are used in digital communication systems. The Golay code is of focus here (Trivia: the Voyager craft used this code in its communication system). it is a binary linear code of 24 letters which is capable of correcting three errors. The extended version of this Golay code which is a 24 dimensional code is can be embedded naturally into the Leech lattice, for which we already know some group theoretic properties. This Golay code in fact appears in the Ramond-Ramond ground state of $\mathcal N = 4$ string theory with $K3$ target and is therefore related to Moonshine (Mathieu Moonshine). ([Harvey, et.al][1], [Harvey, Moore (2020)][2])
These error correcting codes can also be generalized to representations of superalgebras. One key aspect of this is to construct quantum error correcting codes whose representations sit inside a lattice, whose automorphism group is a sporadic group. In this way, moonshine has some application outside of string theory. There were many emminenent mathematicians who thought that sporadic groups were not as interesting and that there were more challenging problems, and at the same time others who did work on finite simple groups who believed it to be an essential problem with no applications in/insight from physics. Both groups of mathematicians are/were right and wrong to a certain extent.
I hope this suffices as an answer. In case you want more information, I'd be happy to edit this answer.
A useful reference to learn more about this the book '[Sphere packing, lattices and groups][3]' by Conway and Sloane.
[1]: https://inspirehep.net/literature/1779431
[2]: https://arxiv.org/pdf/2003.13700.pdf
[3]: https://link.springer.com/book/10.1007/978-1-4757-6568-7