A geometric sequence begins with 72, 36, 18, 9, … which option below represents the formula for the sequence?
A Geometric Sequence Begins With 72, 36, 18, 9, … Which Option Below Represents The Formula For The Sequence?
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A Geometric Sequence Begins With 72, 36, 18, 9, … Which Option Below Represents The Formula For The Sequence?. A geometric sequence has a constant ratio between. To solve this problem, we need to determine the correct formula for the given geometric sequence:
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The next term of the geometric sequence is 9. F (n) = 72 (2)n−1 f (n) = 72 (2)n+1 f (n) = 72 (0.5)n−1 f (n) = 72 (0.5)n+1. To determine the formula of the geometric sequence that starts with 72, 36, 18, 9, we first need to find the common ratio.
To Determine The Formula Of The Geometric Sequence That Starts With 72, 36, 18, 9, We First Need To Find The Common Ratio.
A geometric sequence begins with 72, 36, 18, 9,. The general formula for a geometric sequence is: To solve this problem, we need to determine the correct formula for the given geometric sequence:
F (N) = 72 (2)N−1 F (N) = 72 (2)N+1 F (N) = 72 (0.5)N−1 F (N) = 72 (0.5)N+1.
A geometric sequence has a constant ratio between. Not the question you’re looking for? We need to find the next term of the given series.
In This Case, Multiplying The Previous Term In The Sequence By Gives The Next Term.
This is a geometric sequence since there is a common ratio between each term. F(n) is the nth term of the sequence, a is the first term of the sequence, r is the common ratio, n is the term number. Start by checking the ratio between the first two terms:.
There’s Just One Step To Solve This.
The next term of the geometric sequence is 9. Which option below represents the formula for the sequence?
