Show that any finite nilpotent group of square free order is cyclic.












1












$begingroup$


Show that any finite nilpotent group of square free order is cyclic.



Hint: Suppose G is such a group. Any Sylow subgroup of G is of prime order.



Hint: Any finite nilpotent group is the direct product of its Sylow subgroups.



Hint: Use the Chinese Remainder Theorem.



Any idea,










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$endgroup$








  • 2




    $begingroup$
    Ii think those hints are aplenty. Just mimick the proof of $C_3times C_5simeq C_{15}$.
    $endgroup$
    – Jyrki Lahtonen
    Dec 24 '18 at 4:45










  • $begingroup$
    Also, I recommend that you take a look at our guide for new askers.
    $endgroup$
    – Jyrki Lahtonen
    Dec 24 '18 at 4:46
















1












$begingroup$


Show that any finite nilpotent group of square free order is cyclic.



Hint: Suppose G is such a group. Any Sylow subgroup of G is of prime order.



Hint: Any finite nilpotent group is the direct product of its Sylow subgroups.



Hint: Use the Chinese Remainder Theorem.



Any idea,










share|cite|improve this question











$endgroup$








  • 2




    $begingroup$
    Ii think those hints are aplenty. Just mimick the proof of $C_3times C_5simeq C_{15}$.
    $endgroup$
    – Jyrki Lahtonen
    Dec 24 '18 at 4:45










  • $begingroup$
    Also, I recommend that you take a look at our guide for new askers.
    $endgroup$
    – Jyrki Lahtonen
    Dec 24 '18 at 4:46














1












1








1





$begingroup$


Show that any finite nilpotent group of square free order is cyclic.



Hint: Suppose G is such a group. Any Sylow subgroup of G is of prime order.



Hint: Any finite nilpotent group is the direct product of its Sylow subgroups.



Hint: Use the Chinese Remainder Theorem.



Any idea,










share|cite|improve this question











$endgroup$




Show that any finite nilpotent group of square free order is cyclic.



Hint: Suppose G is such a group. Any Sylow subgroup of G is of prime order.



Hint: Any finite nilpotent group is the direct product of its Sylow subgroups.



Hint: Use the Chinese Remainder Theorem.



Any idea,







abstract-algebra group-theory cyclic-groups sylow-theory nilpotent-groups






share|cite|improve this question















share|cite|improve this question













share|cite|improve this question




share|cite|improve this question








edited Dec 24 '18 at 13:12









Shaun

11.1k113688




11.1k113688










asked Dec 24 '18 at 3:45









NawalNawal

223




223








  • 2




    $begingroup$
    Ii think those hints are aplenty. Just mimick the proof of $C_3times C_5simeq C_{15}$.
    $endgroup$
    – Jyrki Lahtonen
    Dec 24 '18 at 4:45










  • $begingroup$
    Also, I recommend that you take a look at our guide for new askers.
    $endgroup$
    – Jyrki Lahtonen
    Dec 24 '18 at 4:46














  • 2




    $begingroup$
    Ii think those hints are aplenty. Just mimick the proof of $C_3times C_5simeq C_{15}$.
    $endgroup$
    – Jyrki Lahtonen
    Dec 24 '18 at 4:45










  • $begingroup$
    Also, I recommend that you take a look at our guide for new askers.
    $endgroup$
    – Jyrki Lahtonen
    Dec 24 '18 at 4:46








2




2




$begingroup$
Ii think those hints are aplenty. Just mimick the proof of $C_3times C_5simeq C_{15}$.
$endgroup$
– Jyrki Lahtonen
Dec 24 '18 at 4:45




$begingroup$
Ii think those hints are aplenty. Just mimick the proof of $C_3times C_5simeq C_{15}$.
$endgroup$
– Jyrki Lahtonen
Dec 24 '18 at 4:45












$begingroup$
Also, I recommend that you take a look at our guide for new askers.
$endgroup$
– Jyrki Lahtonen
Dec 24 '18 at 4:46




$begingroup$
Also, I recommend that you take a look at our guide for new askers.
$endgroup$
– Jyrki Lahtonen
Dec 24 '18 at 4:46










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