128 Chapter 2 • Sequences
rational numbers are listed more than once in the sequence f. By eliminating
the repetitions, we obtain a subsequence g off:
g: N---> Q (1-1 and onto).This g is a 1-1 correspondence, showing that Q is countable. •SOME UNCOUNTABLE SETSCantor further startled the mathematical world by proving the following
remarkable result, demonstrating once and for all that there is more than one
level of infinity.
Theorem 2.8. 7 The set IR of real numbers is uncountable. (It is impossible to
list the real numbers as a sequence.)
Proof. If the real numbers could be listed as a sequence, then the open
interval (0, 1) would be a subsequence. Thus, it suffices to prove that it is
impossible to list the elements of (0, 1) as a sequence. For contradiction, suppose
it is possible to list all the real numbers in (0, 1) as a sequence,
Each Xn has a decimal expansion. In the notation of Theorem 2.5.5, sayX1 = O.d11d12d13 ···din···
X2 = O.d21d22d23 · · · d2n · · ·
X3 = O.d31 d32d33 · · · d3n · · ·Define a new decimal y = 0. e 1 e2e3 ···en··· by defining,
'efk E N, ek -:/= dkk, ek -:/= 0, and ek -:/= 9.(16)That is, each ek is different from dkk and is neither 0 nor 9. Then,
y -:/= x 1 , since y and x 1 differ in the first decimal place and e 1 -:/= 0 or 9;
y-:/= x2, since y and X2 differ in the 2nd decimal place and e 2 -:/= 0 or 9;