Groups of order 174

This article gives information about, and links to more details on, groups of order 174
See pages on algebraic structures of order 174 | See pages on groups of a particular order

Statistics at a glance

The number 174 has prime factors 2, 3, and 29. The prime factorization is:

${\displaystyle 174=2^{1}\cdot 3^{1}\cdot 29^{1}}$

One such way to classify groups of order 174 is therefore by the classification of groups of order 2pq.

Square-free implies solvability-forcing, so all groups of order 174 are finite solvable groups. Moreover, every Sylow subgroup is cyclic implies metacyclic, so all groups of order 174 are in fact metacyclic groups.

The list

There are 4 groups of order 174: