Sequence is a list of things in order. Sequences can be infinite or finite. Sequences use curly brackets ({}) to denote elements. Terms can be in any order: forward, backward, alternating
Number patterns are sequences where the next number is obtained by adding a constant to the previous one. Multiplication tables are a common example of number patterns. The number of elements in a pattern is endless
Geometric sequence is where each term is product of previous term and constant r. General term formula: an=a1rn−1. Any exponential n-term sequence is geometric. Geometric means are terms between given terms
Geometric sequence is a sequence where terms have constant ratio to preceding terms. There are two formulas: one for finite terms, one for infinite terms
Sequence is an ordered list of numbers following a particular pattern. Sequences can be finite (countable) or infinite. Sequences can be described using explicit formulas, recurrence relations, or tables
Sequence is an ordered list of objects following a pattern. Sequence terms can appear multiple times in different orders. Sequences have properties of convergence in mathematical disciplines