numerosarjat

Numerosarjat, or number sequences, are ordered lists of numbers in which each term is indexed by a positive integer. They are usually denoted (a_n) and can be defined by explicit formulas or by recursive rules. The study includes properties such as convergence, monotonicity, and boundedness, and their relation to sums of terms, known as series.

Arithmetic sequences have a constant difference d between successive terms, with a_n = a_1 + (n−1)d. Example: 5,

Convergence concerns the behavior of a sequence as n grows large. A sequence (a_n) converges to a

Series are the sums of the terms of a sequence. The nth partial sum is S_n = a_1

Numerosarjat appear in many areas of mathematics and its applications. They model patterns, support numerical approximations,