(New page: Category:MA453Spring2009Walther I solved this one by using the same process we used in class with Z_48. Find the divisors of 20 to find each subgroup, then figure out how to generate...)
 
 
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I solved this one by using the same process we used in class with Z_48.  Find the divisors of 20 to find each subgroup, then figure out how to generate the subgroup based on its structure.
 
I solved this one by using the same process we used in class with Z_48.  Find the divisors of 20 to find each subgroup, then figure out how to generate the subgroup based on its structure.
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I think <math>Z_{20}</math> has 6 subgroups, generated by <math>\overline{0}</math>, <math>\overline{1}</math>, <math>\overline{2}</math>, <math>\overline{4}</math>, <math>\overline{5}</math>, and <math>\overline{10}</math>. For the second part of the question, ''G'' also has 6 subgroups, this time generated by <math>\overline{0}, \overline{a}, \overline{2a}, \overline{4a}, \overline{5a},</math> and <math>\overline{10a}</math>. Does this seem right?
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I think your general idea is correct. However, to my understanding, <0> and <a^0> are not a subgroup of either Z or G since there is no divisor of 20 for which 20/k = 0. All subgroups of Z and G must satisfy this condition (Theorem 4.3). <20> and <a^20>, however, would be subgroups of Z and G respectively. Please correct me if I am wrong.
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:--[[Ysuo|Yu Suo]]

Latest revision as of 19:58, 4 February 2009


I solved this one by using the same process we used in class with Z_48. Find the divisors of 20 to find each subgroup, then figure out how to generate the subgroup based on its structure.


I think $ Z_{20} $ has 6 subgroups, generated by $ \overline{0} $, $ \overline{1} $, $ \overline{2} $, $ \overline{4} $, $ \overline{5} $, and $ \overline{10} $. For the second part of the question, G also has 6 subgroups, this time generated by $ \overline{0}, \overline{a}, \overline{2a}, \overline{4a}, \overline{5a}, $ and $ \overline{10a} $. Does this seem right?


I think your general idea is correct. However, to my understanding, <0> and <a^0> are not a subgroup of either Z or G since there is no divisor of 20 for which 20/k = 0. All subgroups of Z and G must satisfy this condition (Theorem 4.3). <20> and <a^20>, however, would be subgroups of Z and G respectively. Please correct me if I am wrong.

--Yu Suo

Alumni Liaison

Sees the importance of signal filtering in medical imaging

Dhruv Lamba, BSEE2010