Find subgroup << a,b>> of \mathbb{Z}_{20}^{\star} which is not cyclic.

Kathy Williams

Kathy Williams

Answered question

2022-01-12

Find subgroup a,b of Z20 which is not cyclic.

Answer & Explanation

Samantha Brown

Samantha Brown

Beginner2022-01-13Added 35 answers

Step 1
Since you already know G=Z20 is not cyclic, and every group is a subgroup of itself, you could take the subgroup to be Z20
Step 2
Since 3 and 11 in G,3×11=11×3
3<<11>>={1,11} and 11<<3>>={1,3,9,7} we have
3,11=x,yx2,y4,xy=yx
=Z2×Z4
which is not cyclic.
But |Z2×Z4|=8=ϕ(20)=|G|
A proper subgroup can be found similarly by considering 9,11

accimaroyalde

accimaroyalde

Beginner2022-01-14Added 29 answers

Step 1
Well, note that
He˙q3,11
has order 8 as 3 does not generate 11 in (Z20Z)×, and 3 has order 4, [as 34=81201] while
114=(121)2201
And so as H is abelian, from this it follows that
h4201
for each hH
Thus, every element in H generates at most 4<|H| elements, so there is no element in H that generates the entire group.

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