Show that no group of order 992=2^5 * 31 is simple.

Show that a group of order 84 cannot be simple.

Show that a group of order 84 cannot be simple.

If G is a group of order 250,000 = 2 456, show that G is not...

If G is a group of order 250,000 = 2 456, show that G is not simple

Use Sylow Theorems: Show that every group of order 144 is not simple.

Use Sylow Theorems: Show that every group of order 144 is not simple.

Show that a group of order 5 is abelian.

Show that a group of order 5 is abelian.

Let G be a group of order p^2, where p is a prime. Show that G...

Let G be a group of order p^2, where p is a prime. Show that G must have a subgroup of order p. please show with notation if possible

suppose every element of a group G has order dividing 2. Show that G is an...

suppose every element of a group G has order dividing 2. Show that G is an abelian group. There is another question on this, but I can't understand the writing at all...

Let G be a group. g be an element of G. if <g^2>=<g^4> show that order...

Let G be a group. g be an element of G. if <g^2>=<g^4> show that order of g is finite.

A group G is a simple group if the only normal subgroups of G are G...

A group G is a simple group if the only normal subgroups of G are G itself and {e}. In other words, G is simple if G has no non-trivial proper normal subgroups. Algebraists have proven (using more advanced techniques than ones we’ve discussed) that An is a simple group for n ≥ 5. Using this fact, prove that for n ≥ 5, An has no subgroup of order n!/4 . (This generalizes HW5,#3 as well as our counterexample from...

let G be a finite group of even order. Show that the equation x^2=e has even...

let G be a finite group of even order. Show that the equation x^2=e has even number of solutions in G

show that any simple, connected graph with 31 edges and 12 vertices is not planar.

show that any simple, connected graph with 31 edges and 12 vertices is not planar.