Instructions: Given one form of a sequence, write the other form.

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asked Dec 1, 2023 4.6k views

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Gadi Oron · Answer 1 · 2023-12-07T03:56:52+0000

The Solution:

Given:

Required:

To find the recursive formula for the sequence.

The recursive formula for a geometric sequence is:

From the given formula, we can find r as below:

$\begin{gathered} a_n=a_(n-1).-6 \\ \\ a_n=(-6)a_(n-1) \\ \\ \text{ Divide both sides by }a_(n-1) \\ \\ -6=(a_n)/(a_(n-1))=r \\ \\ r=-6 \end{gathered}$

Recall:

$a_1=-4\text{ \lparen given\rparen}$

So, the explicit form of the recursive formula is:

Instructions: Given one form of a sequence, write the other form.

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