To state: How it is determined that a sequence is arithmetic.
If the difference of consecutive terms is same then it can be said that the given sequence is an arithmetic sequence.
Given information:
The given statement is “How it is determined that a sequence is arithmetic.”
Explanation:
A sequence is a function whose domain is a set of consecutive integers. If a domain is not specified, it is understood that domain starts with 1.
A sequence can be of two types: Arithmetic Sequence and Geometric Sequence
In an arithmetic sequence, the difference of two consecutive terms is constant. This constant difference is called the common difference and is denoted by d .
If a sequence is given then find the common difference of the consecutive terms. If the common difference is same for each consecutive term, then it can be said that the given sequence is an arithmetic sequence.
Chapter 7 Solutions
Holt Mcdougal Larson Algebra 2: Student Edition 2012
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