Abstract Algebra Answers

 Prove that the product of an even permutation and an odd permutation is odd.

— If m1, m2 belongs to the same orbit then St(m1) and St(m2) are conjugate to each other if m2=p(g)m1 then St(m2)=gSt(m1) g ...

Find a maximal ideal of R [x] containing 

the ideal <x²— 1, x³— 1>

If m1, m2 belongs to the same orbit then St(m1) and St(m2) are conjugate to each other if m2=p(g)m1 then St(m2)=gSt(m1)g^-1

Which of the following statements are true, and which short proof or a counter-example.

i)There is no non-abelian group of 12

ii)If in a group G every element is of finite order, then G is a finite order.

iii)The homomorphic image of a non-cyclic group is non cyclic.

iv) If a is an integral domain, then R /I is an integral domain for every non-zero ideal I of R .

v)If I and J are ideals of a ring R, then so is I U J

Define a relation `~' on R by 'a ~ b if a — b is an integer'. Show that this is an equivalence relation. Give the equivalence classes of 0 and √2 .