Question #6c402

1 Answer
Jim H
Dec 31, 2016

The set is countable (countably infinite) and unbounded.

Explanation:

#S# can be mapped one-to-one onto the ordered pairs of rationals.

The rationals are countable.

The set of ordered pairs of elements of a countable set is countable. (More generally, the Cartesian product of two countable sets is countable.) (Use a proof analogous to the proof that the rationals are countable.)

So, the ordered pairs of rationals are countable.

So, #S# is countable.

#S# contains a copy of the rationals in the form #x+i0#, and the rationals are unbounded, so #S# is unbounded (in the usual metric on #CC#.)

Related questions
See all questions in Functions on a Cartesian Plane
Impact of this question
1202 views around the world
You can reuse this answer
Creative Commons License