Number Contributions

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Remarkable Binary Connections

August 30, 2025

As has been pointed out elsewhere there is a fascinating link between the reciprocal of 89 and the sum of the decimal point sequence made up Fibonacci terms so that 1/89 = .01 + .001 + .0002 + .00003 + .000005 + .0000008 + .00000013 + .000000021 + .0000000034 + … What is involved here is a well-ordered numerical pattern whereby in base 10, 89 = 100 - 10 - 1. ( 89 is a term in the Fibonacci Sequence ) This can be then generalized for any base Thus in base 8 for example, 100 - 10 - 1 = 67 . (67 = 55 base 10 is a term in the Fibonacci Sequence). Therefore the reciprocal of 67 is equal to the same decimal point sequence of Fibonacci terms (expressed in base 8). Thus 1/67 = .01 + .001 + .0002 +.00003 + .000005 + +.0000010 + .00000015 + .000000025 + .0000000042 + … This relationship of course also holds in base 2 where 100 - 10 - 1 = 1 . So we have the remarkable result that sum of this decimal point sequence of Fibonacci terms = 1. Converting denary ...

Fibonacci Extenssios - Rotating Sequences

August 30, 2025

We will now consider sequences where a multiple of the last term is combined with the second last term to be alternately reversed with the same multiple of the second last term to be combined with the last. The simplest case is where (starting with 0, 1) we combine twice the last term with the second last term and then alternately combine twice the second last with the last term. This leads to the following sequence 0, 1, 2, 4, 10, 18, 46, 82, 210, 374, 958, 1706, 4370 ,…. Again this leads to two ratios emerging The larger is approximated best here by 4370/1706 = 2.5615… The smaller is approximated by 1706/958 = 1.7807.. There is a simple relationship as between these two ratios in that the larger (2.5615) = 2*1.7807. - 1. Now the square of 2,5615... = 6.5615… Therefore k(squared) = k + 4 . This enables us to solve the value of k from the equation k 2 - k - 4 = 0 = (square root of 17 + 1)/2 This in turn enables us to solve the smaller ratio as a...

Fibonacci Extensions - Alternating Sequences

August 30, 2025

In the previous article, the relevant equation for multiple combinations (a and b) of the last and second last terms in the Fibonacci type sequence was x 2 - ax - b = 0 and thereby unitary in the x 2 term. However we can generalize this first term also by considering another fascinating situation where we alternately vary the way in which we combine terms. Thus is we alternately combine twice the last term with the previous term (a= 2, b = 1) , and then the last term with the previous (a = 1, b = 1) , we generate the following sequence 0, 1, 1, 3, 4, 11, 15, 41, 56, 153, 209, 571, 780, …. We now obtain two ratios when we divide a term by the previous term. Thus the ratio of the last given terms in this series is 780/571 = 1.36602… However starting with the previous term, the ratio is 571/209 = 2.73205… Now the latter value approximates closely to the value of (the square root of 3) + 1 , whereas the former value approxima...

Extended Fibonacci-Type Sequences

August 30, 2025

34, 55, 89, 144 , 233, 377, 610, 987,…. etc, the ratio of successive terms n/(n - 1) approximates to phi . (For example the ratio of 987 and 610 which is 1.61803… approximates phi correct to 5 decimal places). The value of phi which = (1 + square root of 5)/2, is the positive solution for x to the simple algebraic equation x 2 - x - 1 = 0 . This represents a special case of the more general equation x 2 - ax - b = 0 (where both a and b = 1). So to generate the Fibonacci sequence we keep adding the last term (a) to the second last term (b) in the sequence to generate the next term. So in the above sequence 987 = 610 + 377 (i.e. a and b = 1). However we can combine different multiples of a and b to generate different series with their own unique features. For example the Pell Series is derived from adding 2a + b . This results in the sequence 0, 1, 2, 5, 12,...

Recent Addendum

August 30, 2025

The procedure adopted in the article can be summed up through a well-ordered series of fascinating connections between phi and the respective terms of the Lucas series 1, 3, 4, 7, 11, 18, 29, 47, 76, 123, 199, 322, 621, 943, …. Thus Phi - 1/Phi = 1 (the first term of Lucas Series) Phi 2 + 1/Phi 2 = 3 (the second term of Lucas series) Phi 3 - 1/Phi 3 = 4 (the third term of Lucas Series) Phi 4 + 1/Phi 4 = 7 (the fourth term of Lucas Series) Phi 5 - 1/Phi 5 = 11 (the fifth term of Lucas Series) So in general format Phi n (+ or -) 1/Phi n = T n (where Tn represents the nth term of the Lucas Series). When n is even we add the respective values of Phi. When n is odd, we subtract the respective values of Phi. Thus for example T 11 = Phi 11 - 1/Phi 11 = 199 (which is the 11 th term in the series).

Number Magic (Series of Contributions on Fibonacci Sequence)

August 30, 2025

Number Magic (Series of Contributions on Fibonacci Sequence) 1. Phi in the Sky 2. Recent Addendum 3. Extended Fibonacci -Type Sequence 4. Fibonacci Extensions - Alternating Sequences 5. Fibonacci Extensions - Alternating Sequences 6. Remarkable Binary Connections 7. Further Point Series Connections