What is the next number in this sequence 1, 1, 3, 2, 4, 6, 5, 25?

ezelsbankuk

ezelsbankuk

Answered question

2022-09-06

What is the next number in this sequence 1, 1, 3, 2, 4, 6, 5, 25?

Answer & Explanation

Yareli Hendrix

Yareli Hendrix

Beginner2022-09-07Added 8 answers

This is not a very mathematically significant kind of sequence.

The steps are:

1) Square the previous term.
2) Add 2 to the previous term.
3) Subtract 1 from the previous term.
(repeat)

Is there a single algebraic formula to describe this iterative process?

Consider ω = - 1 2 + i 3 2

This has the property that ω 3 = 1

Then we can write:

a 0 = 1

a i + 1 = ( ω i - ω ) ( ω i - ω 2 ) ( 1 - ω ) ( 1 - ω 2 ) a i 2 + ( ω i - ω 2 ) ( ω i - 1 ) ( ω - ω 2 ) ( ω - 1 ) ( a i + 2 ) + ( ω i - 1 ) ( ω i - ω ) ( ω 2 - 1 ) ( ω 2 - ω ) ( a i - 1 )

This can be simplified, but it helps to have it in this formulation so you can understand how it works.

When i=0 modulo 3, then:

( ω i - ω ) ( ω i - ω 2 ) ( 1 - ω ) ( 1 - ω 2 ) = ( 1 - ω ) ( 1 - ω 2 ) ( 1 - ω ) ( 1 - ω 2 ) = 1

( ω i - ω 2 ) ( ω i - 1 ) ( ω - ω 2 ) ( ω - 1 ) = ( 1 - ω 2 ) ( 1 - 1 ) ( 1 - ω 2 ) ( ω - 1 ) = 0

( ω i - 1 ) ( ω i - ω ) ( ω 2 - 1 ) ( ω 2 - ω ) = ( 1 - 1 ) ( 1 - ω ) ( ω 2 - 1 ) ( ω 2 - ω ) = 0

When i=1 modulo 3, then these coefficient expressions work out as 0, 1 and 0.

When i=2 modulo 3, then these coefficient expressions work out as 0, 0 and 1.

So we use these to pick out each of the three rules cyclically.

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