1. Establish or each of the following statements as being true false. Justify each answer fully.
(a) Z5 ⊕ Z12 ≅ Z60
(b) Z5 ⊕ Z10 ≅ Z50
(c) Z12 ⊕ Z4 ≅ Z24 ⊕ Z2
(d) U(180) ≅ U(112)
2. (a) Express U(77) as an external direct product of groups of the form Zn in three different ways.
(b) Express Aut(Z55) as Zm ⊕ Zn for some m and n.
3. Suppose φ is an isomorphism from Z5 ⊕ Z11 to Z55, and φ(2, 3) = 4. Find the element that φ maps to 1.
4. Give an example of an infinite non-Abelian group with precisely six elements of finite order.
5. Find two (distinct) subgroups of order 30 in Z50 ⊕ Z60.
6. Determine the number of elements of order 10 and the number of cyclic subgroups of order 10 in Z20 ⊕ Z15.