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Math Example--Sequences and Series--Finding the Recursive Formula of an Arithmetic Sequence: Example 9

Finding the Recursive Formula of an Arithmetic Sequence: Example 9

Recursive Formula of Arithmetic Sequence Example 9

Topic

Sequences and Series

Description

Process for Finding the Recursive Formula

  1. Identify the First Term: The first term of the sequence is denoted as a1.
  2. Determine the Common Difference: The common difference is found by subtracting the first term from the second term.
  3. Write the Recursive Formula: The recursive formula for an arithmetic sequence is:

an = an - 1 + d

       where an is the nth term, an - 1 is the previous term, and d is the common difference.

Distinguishing Recursive from Explicit Formulas

  1. Recursive Formula: Defines each term based on the previous term(s). It requires knowing the initial term and is useful for generating terms sequentially.
  2. Explicit Formula: Allows direct computation of any term in the sequence without reference to previous terms. It is more efficient for finding terms far into the sequence.

Given Sequence

Sequence: [8, 17, 26, 35, 44]

First term (a₁) = 8

Common difference (d) = 17 - 8 = 9

Recursive formula: an = an - 1 + 9

For a complete collection of math examples related to Sequences and Series click on this link: Math Examples: Sequences and Series Collection.

Common Core Standards CCSS.MATH.CONTENT.HSF.BF.A.2
Grade Range 9 - 11
Curriculum Nodes Algebra
    • Sequences and Series
        • Sequences
Copyright Year 2022
Keywords arithmetic sequences, recursive formula