Give an example or show that no such example exists! * A countable set of real...

why is every countable subset a zero set? real analysis

why is every countable subset a zero set? real analysis

SHow that a union of a finite or countable number of sets of lebesgue measure zero...

SHow that a union of a finite or countable number of sets of lebesgue measure zero is a set of lebesgue measure zero. Please show all steps

Show that the following property holds for countable sets: if S_1, S_2,S_3,... is a sequence of...

Show that the following property holds for countable sets: if S_1, S_2,S_3,... is a sequence of countable sets of real numbers, then the set S formed by taking all the elements that belong to at least one of the sets S_i is also a countable set.

graph theory give an example or show that no such example exists of a nonregular graph...

graph theory give an example or show that no such example exists of a nonregular graph whose complement is regular.

Prove that the set of real numbers of the form e^n,n= 0,=+-1,+-2,... is countable.

Prove that the set of real numbers of the form e^n,n= 0,=+-1,+-2,... is countable.

Give an example, different than the Sorgenfrey line, that is first countable but not second countable.  

Give an example, different than the Sorgenfrey line, that is first countable but not second countable.  

It is said that a set A ⊆ C (complex set) is countable if there exist...

It is said that a set A ⊆ C (complex set) is countable if there exist a bijective function of natural numbers to A i.e. f: N -> C . ¿Is it possible to have a connected and countable set ? the idea is that we want to see if this is true in complex numbers

Give an example of a space that is separable, but not 2nd- countable. Prove that the...

Give an example of a space that is separable, but not 2nd- countable. Prove that the space you give is separable and prove it is not 2nd- countable

Problem 3 Countable and Uncountable Sets (a) Show that there are uncountably infinite many real numbers...

Problem 3 Countable and Uncountable Sets (a) Show that there are uncountably infinite many real numbers in the interval (0, 1). (Hint: Prove this by contradiction. Specifically, (i) assume that there are countably infinite real numbers in (0, 1) and denote them as x1, x2, x3, · · · ; (ii) express each real number x1 between 0 and 1 in decimal expansion; (iii) construct a number y whose digits are either 1 or 2. Can you find a way...

Using the completeness axiom, show that every nonempty set E of real numbers that is bounded...

Using the completeness axiom, show that every nonempty set E of real numbers that is bounded below has a greatest lower bound (i.e., inf E exists and is a real number).