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6 Nov 2019
a) let G be a multiplicative finite abelian group Let a be theproduct of all the elements of the group prove that a^2=e
b) suppose in addition that G is cyclic. if G has odd order showthat a=e.if G has even order, show that a is not equal to e
a) let G be a multiplicative finite abelian group Let a be theproduct of all the elements of the group prove that a^2=e
b) suppose in addition that G is cyclic. if G has odd order showthat a=e.if G has even order, show that a is not equal to e
b) suppose in addition that G is cyclic. if G has odd order showthat a=e.if G has even order, show that a is not equal to e
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Casey DurganLv2
16 Jan 2019