Let $G$ be a group s.t. $|G|=pqr$ where $p,q,r$ are primes that need not be distinct. Prove that $G$ is soluble.

Asked Apr 22 '19 at 21:23

Active Apr 22 '19 at 22:12

Viewed 93 times

So, I don't know whether I should handle this case by case and try to get the Sylow theorems involved or if there is an easier way to do this, a slick trick I am not seeing perhaps. Does anyone have any insights?

edited Apr 22 '19 at 22:12

the_fox

5,928

asked Apr 22 '19 at 21:23

2

Do you know that groups of order $pqr$ are not simple? – Mark Apr 22 '19 at 21:30
no i did not know that – Apr 22 '19 at 21:36
3

Anyway, you can read my answer here, as well as the comments under the answer. It should answer your question. https://math.stackexchange.com/questions/3075129/let-p-q-be-odd-primes-prove-that-a-group-of-order-2-pq-is-solvable/3075152#3075152 – Mark Apr 22 '19 at 21:37

Let $G$ be a group s.t. $|G|=pqr$ where $p,q,r$ are primes that need not be distinct. Prove that $G$ is soluble.

0 Answers0