# abstract algebra – Example of a characteristic field 0 and a finite multiplicative subgroup of order 10?

Let $$G$$ to be a finite subgroup of the multiplicative group of some fields $$F$$. I want to find an example of a field $$F$$ of feature 0 and has $$G$$ order 10.

I can think of a number of characteristic fields 0 (mostly infinite) and finite groups of order 10 themselves (like the dihedral group), but I have a hard time finding a such group and this pair of fields.