Math::PlanePath::SacksSpiral -- circular spiral squaring each revolution
use Math::PlanePath::SacksSpiral; my $path = Math::PlanePath::SacksSpiral->new; my ($x, $y) = $path->n_to_xy (123);
The Sacks spiral by Robert Sacks is an Archimedean spiral with points N placed on the spiral so the perfect squares fall on a line going to the right. Read more at
An Archimedean spiral means each loop is a constant distance from the preceding, in this case 1 unit. The polar coordinates are
R = sqrt(N) theta = sqrt(N) * 2pi
which comes out roughly as
18 19 11 10 17 5 20 12 6 2 0 1 4 9 16 25 3 21 13 7 8 15 24 14 22 23
The X,Y positions returned are fractional, except for the perfect squares on the right axis at X=0,1,2,3,etc. Those perfect squares are spaced 1 apart, other pointer are a little further apart.
The arms going to the right like 5,10,17,etc or 8,15,24,etc are constant offsets from the perfect squares, ie. s^2 + c for a positive or negative integer c. To the left the central arm 2,6,12,20,etc is the pronic numbers s^2 + s, half way between the successive perfect squares. Other arms going to the left are offsets from that, ie. s^2 + s + c for integer c.
Euler's quadratic s^2+s+41 is one such arm going left. Low values loop around a few times before straightening out at about y=-127. This quadratic has relatively many primes and in a plot of the primes on the spiral it can be seen standing out from its surrounds.
Plotting various quadratic sequences of points can form attractive patterns. For example the triangular numbers s*(s+1)/2 come out as spiral arcs going clockwise and counter-clockwise.
$path = Math::PlanePath::SacksSpiral->new ()
Create and return a new path object.
($x,$y) = $path->n_to_xy ($n)
Return the x,y coordinates of point number
$non the path.
$ncan be any value
$n >= 0and fractions give positions on the spiral in between the integer points.
$n < 0the return is an empty list, it being considered there are no negative points in the spiral.
$n = $path->xy_to_n ($x,$y)
Return an integer point number for coordinates
$x,$y. Each integer N is considered the centre of a circle of diameter 1 and an
$x,$ywithin that circle returns N.
The unit spacing of the spiral means those circles don't overlap, but they also don't cover the plane and if
$x,$yis not within one then the return is
Math-PlanePath is Copyright 2010 Kevin Ryde
Math-PlanePath is free software; you can redistribute it and/or modify it under the terms of the GNU General Public License as published by the Free Software Foundation; either version 3, or (at your option) any later version.
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