Recall that if two groups G and H are isomorphic, then the list (multiset) of the orders of elements of each group is the same. The following example shows that the converse to this result is false. What is the correct interpretation of this statement?
a) The converse is true
b) The converse is false
c) Isomorphism cannot be determined from the orders of elements
d) The converse is only true for certain group