Sequence: Difference between revisions

A sequence is an enumerated list; the elements of this list are usually referred as to the terms. Sequences may be finite or infinite.

Formally, given any set X, an infinite sequence is a function (f, say) defined on a subset of natural numbers with values in X. Similarly, a finite sequences is a function f defined on ${\displaystyle \{1,2,3,...,n\}}$ with values in X (we say that n is the length of the sequence).

In a natural way, the sequences are often represented as lists:

${\displaystyle a_{1},\,a_{2},\,a_{3},...}$

where, formally, ${\displaystyle a_{1}=f(1)}$, ${\displaystyle a_{2}=f(2)}$ etc. Such a list is then denoted as ${\displaystyle (a_{n})}$, with the parentheses making the difference between the actual sequence anda single term ${\displaystyle a_{n}.}$

A simple examples of sequences of the naturals, reals or complex numbers include (respectively)

10,13,10,17,....

1.02, 1.04, 1.06,...

1+i, 2-5i, 5-2i...

Often, sequences are defined by a general formula for ${\displaystyle a_{n}}$. For example, the sequence of odd naturals can be given as

${\displaystyle a_{n}=2*n+1,\quad n=0,1,2,...}$

There is an important difference between the finite sequences and the [[set]s. For sequences, by definition, the order is significant. For example the following two sequences

1,2,3,4,5 and 5,4,1,2,3

are different, while the sets of its terms are identical:

{1,2,3,4,5} = {5,4,1,2,3}.

Moreover, due to indexing by natural numbers, a sequence can list the same term more than once. For example, the sequences

1,2,3,3,4,4 and 1,2,3,4

are different, while for the sets we have

{1,2,3,3,4,4}={1,2,3,4}.

Basic definitions related to sequences

• monotone sequences
• subsequences
• convergence of a sequence