3.
a) Let G be a finite group. Show that the number of elements g of G such that g^3 = e is
odd, where e is the identity of G.
1 a b
b) Check if { [ 0 1 c ] | a,b,c belongs to R} is an abelian group w.r.t matrix multiplication.
0 0 1
c) Check whether H={x belongs to R* | x=1or x is irrational} * R and K={x belongs to R* | x>=1} are subgroups of (R*,.).
d) Let U(n)={m belongs to N|(m,n)=1,m<=n} Then U(n) is a group with respect to
multiplication modulo n. Find the orders of <m> for each m belongs to U(10).
e) Find Z(D2n), where D2n is the dihedral group with 2n elements, [D subscript 2n]
i) when n is an odd integer;
ii) when n is an even integer.
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