]>
2021-03-08T18:35:42+00:00
Direct product of S3 and Z3
0
en
18
Term
2009-09-14T12:59:27Z
2455089.0412847
Direct product of S3 and Z3
0
Direct product of S3 and Z3#18;3
18
3
0
1
list
2
[[Specific information about::Direct product of S3 and Z3]]
Direct product of S3 and Z3
0
2
list
3
[[Fact about.Page::Direct product of S3 and Z3]]
Direct product of S3 and Z3
0
2
list
4
[[Fact about.Page::Direct product of S3 and Z3]] [[Category:Group property satisfactions]]
Direct product of S3 and Z3
0
2
list
4
[[Fact about.Page::Direct product of S3 and Z3]] [[Category:Subgroup property satisfactions]]
Direct product of S3 and Z3
0
2
list
4
[[Fact about.Page::Direct product of S3 and Z3]] [[Category:Group property dissatisfactions]]
Direct product of S3 and Z3
0
1
list
4
[[Page class::Term]] [[Particular example::Direct product of S3 and Z3]]
Direct product of S3 and Z3
0
1
list
3
[[Particular example::Direct product of S3 and Z3]] [[Category:Group properties]]
Direct product of S3 and Z3
0
1
list
3
[[Particular example::Direct product of S3 and Z3]] [[Category:Subgroup properties]]
Direct product of S3 and Z3
0
1
list
4
[[Particular example::Direct product of S3 and Z3]] [[Page class::Fact]]
Direct product of S3 and Z3
0
1
list
3
[[Particular example::Direct product of S3 and Z3]] [[Category:Group property non-implications]]
Direct product of S3 and Z3
0
1
list
3
[[Particular example::Direct product of S3 and Z3]] [[Category:Subgroup property non-implications]]
Direct product of S3 and Z3
0
1
list
3
[[Particular example::Direct product of S3 and Z3]] [[Category:Group metaproperty dissatisfactions]]
Direct product of S3 and Z3
0
1
list
3
[[Particular example::Direct product of S3 and Z3]] [[Category:Subgroup metaproperty dissatisfactions]]
Direct product of S3 and Z3
0
0
list
1
[[:Groups of order 18]]
Direct product of S3 and Z3
Image-closed characteristic not implies fully invariant
0
en
Image-closed characteristic not implies fully invariant
Center not is weakly normal-homomorph-containing
0
en
Center not is weakly normal-homomorph-containing
Center not is normality-preserving endomorphism-invariant
0
en
Center not is normality-preserving endomorphism-invariant
Wreath product of Z3 and Z2
0
en
Wreath product of Z3 and Z2
Particular example
132
en
Particular example