2.5 Homomorphisms and Isomorphisms
1. a. It is a homomorphism because
It is clearly not onto, but it is one-to-one because α(r) = α(s) implies 
so r = s.
so r = s.
3. If α is an automorphism, then a−1b−1 = α(a) · α(b) = α(ab) = (ab)−1 = b−1a−1 for all a, b. Thus G is abelian. Conversely, if G is abelian,
so α is a homomorphism; α is a bijection because α−1 = α.
5. σa = 1G if and only if aga−1 = g for all g 
R, if and only if ag = ga for all g R.
R, if and only if ag = ga for all g R.
7. Let 
be given by 
. Then o(1) =∞ in 
, but 
in 
.
be given by . Then o(1) =∞ in , but in .
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