# Simple algorithm/method to generate the sequence

http://oeis.org/A005773

I looked into that page but most of the abbreviations didn't make any sense.

G.f.: 2x/(3x-1+sqrt(1-2x-3x^2)) - Len Smiley (smiley(AT)math.uaa.alaska.edu).

Does G.f implies generating function?. Substituting any values for x almost yields a square root of a negative number(imaginary). How does it generate the sequence? Any help would be welcome.

Edit: The bottom of the page has some examples using specialized languages like Mathematica,Maple,etc., which I am not familiar with. Any explanation with languages like C,Java or Python would be really helpful.

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This isn't really a programming question. But yes, g.f. stands for generating function; the coefficients of the Taylor series of that expression generate the terms of the sequence. You can use one of the other formulae (say one of the recurrences) instead. – DSM Apr 4 '12 at 19:23
Thanks for your comment,DSM. I do agree this falls somewhere between math and programming. – toddlermenot Apr 4 '12 at 19:28
off topic -- belongs on math.SE – Jason S Apr 5 '12 at 2:02

If you have a sequence `{a0, a1, a2, a3, ... }` then its generating function is

``````f(x) = sum aj x^j
``````

For example, the sequence `{1, 1, 1, 1, ... }` has

``````f(x) = 1 + x + x^2 + x^3 + ...
``````

Conveniently, this function has a closed expression

``````f(x) = 1 / (1 - x)
``````

and so we say that `1 / (1 - x)` is the generating function for `{1, 1, 1, 1, ... }`.

For your function `2x / (3x - 1 + sqrt(1 - 2x - 3x^2))` you need to expand this function in its Taylor sequence about `x0 = 0` and then you will have the terms of the sequence.

If you use Wolfram Alpha, you'll see the first few terms are

``````1, 1, 2, 5, 13, 35, 96, 267, ...
``````

and then if you use OEIS you'll get

A005773 Number of directed animals of size n (or directed n-ominoes in standard position).

which is right back to where you started showing that this generating function really does generate this sequence.

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Thank you for the awesome reply! – toddlermenot Apr 4 '12 at 19:43

Yes, G.f. means generating function. The series expansion of this expression at x = 0 gives a power series in x whose coefficients are the sequence.

Wolfram Alpha's expansion

My input was

``````Series[2x/(3x-1+Sqrt[1-2x-3x^2]), {x, 0, 10}]
``````
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Thank you. Wolfram Alpha is very handy! – toddlermenot Apr 4 '12 at 19:44