Suppose that G is a finite Abelian group that has exactly one subroup for each divisor...

Let G be a finite Abelian group and let n be a positive divisor of|G|. Show...

Let G be a finite Abelian group and let n be a positive divisor of|G|. Show that G has a subgroup of order n.

Group Theory Question: Show that if a finite group G with 6 elements is not abelian,...

Group Theory Question: Show that if a finite group G with 6 elements is not abelian, then it must be the group of symmetries of an equilateral triangle. Can one have a similar statement for a finite group G of eight elements?

For an abelian group G, let tG = {x E G: x has finite order} denote...

For an abelian group G, let tG = {x E G: x has finite order} denote its torsion subgroup. Show that t defines a functor Ab -> Ab if one defines t(f) = f|tG (f restricted on tG) for every homomorphism f. If f is injective, then t(f) is injective. Give an example of a surjective homomorphism f for which t(f) is not surjective.

: (a) Let p be a prime, and let G be a finite Abelian group. Show...

: (a) Let p be a prime, and let G be a finite Abelian group. Show that Gp = {x ∈ G | |x| is a power of p} is a subgroup of G. (For the identity, remember that 1 = p 0 is a power of p.) (b) Let p1, . . . , pn be pair-wise distinct primes, and let G be an Abelian group. Show that Gp1 , . . . , Gpn form direct sum in...

4. Let f : G→H be a group homomorphism. Suppose a∈G is an element of finite...

4. Let f : G→H be a group homomorphism. Suppose a∈G is an element of finite order n. (a) Prove that f(a) has finite order k, where k is a divisor of n. (b) If f is an isomorphism, prove that k=n.

Suppose that G is abelian group of order 16, and in computing the orders of its...

Suppose that G is abelian group of order 16, and in computing the orders of its elements, you come across an element of order 8 and 2 elements of order 2. Explain why no further computations are needed to determine the isomorphism class of G. provide explanation please.

Suppose that a cyclic group G has exactly three subgroups: G itself, e, and a subgroup...

Suppose that a cyclic group G has exactly three subgroups: G itself, e, and a subgroup of order p, where p is a prime greater than 2. Determine |G|

Let G be an abelian group and S ≤ G. Show that S ⊲ G and...

Let G be an abelian group and S ≤ G. Show that S ⊲ G and that G/S is abelian I need an explanation with some details

Let G be a non-abelian group of order p^3 with p prime. (a) Show that |Z(G)|...

Let G be a non-abelian group of order p^3 with p prime. (a) Show that |Z(G)| = p. (b) Suppose a /∈ Z(G). Show that |NG(a)| = p^2 . (c) Show that G has exactly p 2 +p−1 conjugacy classes (don’t forget to count the classes of the elements of Z(G)).

Let G be a group (not necessarily an Abelian group) of order 425. Prove that G...

Let G be a group (not necessarily an Abelian group) of order 425. Prove that G must have an element of order 5. Note, Sylow Theorem is above us so we can't use it. We're up to Finite Orders. Thank you.