We discuss the
q
q
qq
-systems, the functional form of the Bethe ansatz equations for the twisted Gaudin model from a new geometric point of view. We use a concept of
G
G
-Wronskians, which are certain meromorphic sections of principal
G
G
-bundles on the projective line. In this context, the
q
q
qq
-system, similar to its difference analog, is realized as the relation between generalized minors of the
G
G
-Wronskian. We explain the link between
G
G
-Wronskians and twisted
G
G
-oper connections, which are the traditional source for the
q
q
qq
-systems.