Define f:Z→Zm × Zn :f (x)=(xmodm,xmod n),m,n∈N.
i) If (m, n) = (3, 4), find Ker f.
ii) If (m, n) = (6, 4), find Ker f.
iii) What can you generalize about Ker f from (i) and (ii)?
Can there be a homomorphism from Z8 ⊕Z2 onto Z4⊕Z4 ? Give reasons for your
answer.
Prove, by contradiction, that A4 has no subgroup of order 6.
Check whether the subgroup of reflections and subgroup of rotations in D2n is normal in D2n or not. (Note that D2n is the group of symmetries of an n-gon.)
what is the order of
i) 14 in Z24/ _
<8>?
ii) (Z10⊕U(10)/<2,9>?
Show that in a group G of odd order, the equation x2= e has a unique solution.
Further, show that x2= g has a unique solution ∀g∈G,g ≠e .
If G is a group with o(g) < 100 and G has subgroups of order 10 and 25, what is the
order of G?
Obtain the left cosets of V4= {e, (1 2) (3 4), (1 3) (2 4), (1 4) (2 3)}in A4.
Prove that Z[√2] is isomorphic to
Matrix H = a 2b
b a
Where a,b∈Z as rings.
Find Z(D2n), where D2n is the dihedral group with 2n elements,
i) when n is an odd integer;
ii) when n is an even integer