There is an uncountable ordered set which is similar to each of its uncountable subsets.

Is the set of all finite subsets of N countable or uncountable? Give a proof of...

Is the set of all finite subsets of N countable or uncountable? Give a proof of your assertion.

Show that: There are continuum many pairwise disjoint subsets of R each similar to R.

Show that: There are continuum many pairwise disjoint subsets of R each similar to R.

Verify: any countable ordered set is similar to a subset of Q intersect (0,1).

Verify: any countable ordered set is similar to a subset of Q intersect (0,1).

Prove by contradiction that "The Cantor Set is Uncountable"

Prove by contradiction that "The Cantor Set is Uncountable"

Give an ordered set with a smallest element, in which every element has a successor and...

Give an ordered set with a smallest element, in which every element has a successor and every element but the least has a predecessor, yet the set is not similar to N.

Determine whether each of these sets is finite, countably infinite, or uncountable. For those that are...

Determine whether each of these sets is finite, countably infinite, or uncountable. For those that are countably infinite, exhibit a one-to-one correspondence between the set of positive integers and that set. For those that are finite or uncountable, explain your reasoning. a. integers that are divisible by 7 or divisible by 10

For a given set X, consider the family F of its subsets Y such that at...

For a given set X, consider the family F of its subsets Y such that at least one of Y or X\Y is finite. Prove that F is a set algebra. When is F a sigma-algebra? Prove it.

How many ordered pairs (A,B) , where A , B are subsets of {1,2,3,4,5} have: If...

How many ordered pairs (A,B) , where A , B are subsets of {1,2,3,4,5} have: If : A∩B={1} If : A∩B=∅

true or false? every uncountable set has a countable subset. explain

true or false? every uncountable set has a countable subset. explain

For a set A, let P(A) be the set of all subsets of A. Prove that...

For a set A, let P(A) be the set of all subsets of A. Prove that A is not equivalent to P(A)