Question

can you answer 4 and 5 please

24. (a) Prove that if G is an abelian group, then (ab) = a*b for any a, b e G. (b) Find an example of a non-abelian group and two elements a and b such that (ab) aºb 5. (a) Prove that if G is a group and a, b e G, then (ab) -1 = b-'a-1 (b) Find an example of a group and two elements a and b such that (ab) -1 *a-16-1

Answer 1

@ Griven that Gris abelian group, so for any a, b eG we have ab=ba ..(1) Now, (ab)² = (ab). Cab) = a (ba). b (by associativity) = a.cab). b (by ①) - (a.a) (6-b) (by associativity) a ab Hence, (ab) 2 abel 6 consider the group S3, the symmetric group on 3-symbols. 53-70), (1, 2), (2,3), (1,3), (1,2,3), (1,3,234 Since, (1,2). (13) = (1,3,2) & (1,2,3) = (1,3). (12) so z is non-abolian group. het a= (1,2), ba (2,3) Now, (ab) ² = (1,2; 3)² = (1,3,2) and aabh = (1, 2)? (2,3)2 = e.(o=0 so Cab) ab @ Since a, b E G and G is a group, then abtG Therefore, cab)! Cab) = e, the identity element. ... det a, 5' be the inverse of a, b respectively; then à b' EG Therefore, (bl. a'). Cab) = b 'Cala) b Cassociativity) a be.b a bb - e ire, (6.a) Cab) = e ...(2) from ① and ② , we have, (ab) - cab) = (5'2').cab) > Cab) = bla! C by right cancellation) consider again the group S. consider a= (1, 2), b=(1,3) Then, à = (1, 2), b = (1,3) Now, ab =(1,2). (1, 3) = (1,3,2) and, ab) = (1,3,25 = (1,2,3) Also, a! 6 = (1,2). (1, 3) = (1,3,2) clearly, lab) 2.5