The common difference of the given sequence is,ĭ = 2 - (-4) (or) 8 - 2 (or) 16 - 8 =. Using Arithmetic Sequence Recursive Formula? Example 4: finding a recursive formula of a geometric sequence. Take some time to observe the terms and make a guess as to how they progress. Let’s take a look at the Fibonacci sequence shown below. That’s because it relies on a particular pattern or rule and the next term will depend on the value of the previous term. What Is the n th Term of the Sequence -4, 2, 8, 16. Recursive sequences are not as straightforward as arithmetic and geometric sequences.
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