Answer to Question #152840 in Abstract Algebra for Sourav Mondal

i) False "A_{6}" alternating group is a non abelian group of order 12.

ii) False: "\\mathbb{Q}\/\\mathbb{Z}" is an infinite group with every element of finite order.

iii) False "\\phi:S_3\\longrightarrow \\mathbb{Z_2}" given by "\\phi((123))=\\phi((132))=\\phi(e)=\\overline{0}.""\\phi((12))=\\phi((13))=\\phi((23))=\\overline{1}." This is a homomorphism . The homomorphic image of non cyclic "S_3" is the cyclic group "\\mathbb{Z}_{2}."

(iv) False. Take R="\\mathbb{Z}" and I="6\\mathbb{Z}" . "R\/I\\cong \\mathbb{Z}_{6}" not an integral domain.

(v) False. Take R="\\mathbb{Z}", I="2\\mathbb{Z}," J="3\\mathbb{Z}." But "I\\cup J" not ideal, since "5\\notin I\\cup J" but "2,3\\in I\\cup J" . So for an ideal "2+3=5" must belong to it.