F2 - properties
- the order of an element in a direct product of a finite number of finite groups is the least common multiple of the orders of the components of the elements
-
let
, divisible by , and the number of elements in of order need to be determined, say such that -
this requires
and or vice versa, but not -
since both
and each have a unique subgroup of order 5, there are exactly five choices for and five for , thus choices for , including -
thus, there are
elements in of order -
in general, if
and divisible by a prime , the number of elements of order in is -
to determine the number of cyclic subgroups of order
in -
so,
, which restricts and to -
must divide , in , , requiring , and similarly, -
thus,
, which has elements of order -
it has
and elements of orders and , so there must be elements of order -
each subgroup of order
has four order- elements, and no two cyclic subgroups can have an element in common, there must be cyclic subgroups of order -
this is analogous to counting the number of legs and dividing by
to get the number of sheep -
for each divisor
of and of , the group has a subgroup isomorphic to -
eg: to find a subgroup of
isomorphic to , note that of order and of order are subgroups of and respectively, so is the desired subgroup
- let
and be finite cyclic subgroups, then is cyclic if and only if and are relatively prime
for finite and cyclic 's is cyclic if and only if and are relatively prime when
- let
, then is isomorphic to if and only if and are relatively prime when