let A = {1/n : n element N} show that every point of A is a...

Let (x_n) from(n = 1 to ∞) be a sequence in R. Show that x ∈...

Let (x_n) from(n = 1 to ∞) be a sequence in R. Show that x ∈ R is an accumulation point of (x_n) from (n=1 to ∞) if and only if, for each ϵ > 0, there are infinitely many n ∈ N such that |x_n − x| < ϵ

Let s1 := 1 and Sn+1 := 1 + 1/sN n element N Show that (Sn)...

Let s1 := 1 and Sn+1 := 1 + 1/sN n element N Show that (Sn) has limit L and that l can be explicitly computed. What is the limit?

Let R be a ring. For n > or equal to 0, let In = {a...

Let R be a ring. For n > or equal to 0, let In = {a element of R | 5na = 0}. Show that I = union of In is an ideal of R.

Let R be a commutative ring and let a ε R be a non-zero element. Show...

Let R be a commutative ring and let a ε R be a non-zero element. Show that Ia ={x ε R such that ax=0} is an ideal of R. Show that if R is a domain then Ia is a prime ideal

Let N be a normal subgroup of G. Show that the order 2 element in N...

Let N be a normal subgroup of G. Show that the order 2 element in N is in the center of G if N and Z_4 are isomorphic.

Let n be a positive integer. Show that every abelian group of order n is cyclic...

Let n be a positive integer. Show that every abelian group of order n is cyclic if and only if n is not divisible by the square of any prime.

Let A ={1-1/n | n is a natural number} Prove that 0 is a lower bound...

Let A ={1-1/n | n is a natural number} Prove that 0 is a lower bound and 1 is an upper bound:  Start by taking x in A.  Then x = 1-1/n for some natural number n.  Starting from the fact that 0 < 1/n < 1 do some algebra and arithmetic to get to 0 < 1-1/n <1. Prove that lub(A) = 1:  Suppose that r is another upper bound.  Then wts that r<= 1.  Suppose not.  Then r<1.  So 1-r>0....

For n > 0, let an be the number of partitions of n such that every...

For n > 0, let an be the number of partitions of n such that every part appears at most twice, and let bn be the number of partitions of n such that no part is divisible by 3. Set a0 = b0 = 1. Show that an = bn for all n.

let A be a subset of Rn and let x be a point in Rn. Show...

let A be a subset of Rn and let x be a point in Rn. Show that x is a limit point of A if and only if every open ball about x contains a point of A that is not equal to x

Let S be the set {(-1)^n +1 - (1/n): all n are natural numbers}. 1. find...

Let S be the set {(-1)^n +1 - (1/n): all n are natural numbers}. 1. find the infimum and the supremum of S, and prove that these are indeed the infimum and supremum. 2. find all the boundary points of the set S. Prove that each of these numbers is a boundary point. 3. Is the set S closed? Compact? give reasons. 4. Complete the sentence: Any nonempty compact set has a....