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Cardinal_Spline_Example.png (720 × 480 pixels, file size: 7 KB, MIME type: image/png)
| Description |
English: This image is a graphical representation of a Cardinal Spline. It is drawn on a 720x480 canvas and the curve has 10 control points. The tension is set to 0.1.
The red squares represent the position of the control points, and the red line represents the path of the curve. The image was created with the following w:perl script: use strict;
use Image::Magick;
use Math::Matrix;
use Math::Gradient qw(gradient);
my $rate = 500;
my $tension = 0.1;
my(@coords) = (
[ 23, 24], [123, 64], [167,200], [ 18,285], [293,467],
[699,205], [487,181], [358,222], [262,130], [238, 24]
);
my $image = Image::Magick->new; # Create new image
$image ->Set(size=>'720x480'); # Set size
$image ->ReadImage('xc:white'); # Make it all white
foreach my $ra_coord (@coords) # For every set of coords in the list
{
my($x,$y) = @{$ra_coord}[0,1]; # Get the x and y
$image ->Draw (
primitive => 'rectangle',
points => (($x-3).','.($y-3).' '.($x+3).','.($y+3)),
fill => 'red'
); # Draw a small rectangle at each coord
}
while (scalar(@coords) >= 4) # While there are at least 4 entries in the list
{
for my $u (gradient(0,1,$rate)) # iterate from 0 to 1 in 500 steps
{
my($x,$y) = &EvaluateCardinal2D(\@coords, $tension, $u); # Hand paramaters to formula
$image ->Set("pixel\[$x,$y\]"=>'red'); # Set that pixel red
}
shift(@coords); # Remove the first entry of the list
}
$image ->Write("Cardinal_Spline_Example.png"); # Save image
sub EvaluateCardinal2D
{
my($ra_coords,$T,$u) = @_;
my $s = (1-$T)/2;
my $u_matrix = new Math::Matrix # 4 x 1
( # Matrix based off the point in the curve
[($u ** 3), ($u ** 2), ($u), (1) ]
);
my $cardinal_matrix = new Math::Matrix # 4 x 4
( # Guts of the Cardinal Spline formula
[(-1 * $s), (2 - $s), ($s - 2), ($s) ],
[(2 * $s), ($s - 3), (3-(2 * $s)), (-1 * $s) ],
[(-1 * $s), (0), ($s), (0) ],
[(0), (1), (0), (0) ],
);
my $x_matrix = new Math::Matrix # 1 x 4
( # X coords for point:
[${${$ra_coords}[0]}[0]], # 1
[${${$ra_coords}[1]}[0]], # 2
[${${$ra_coords}[2]}[0]], # 3
[${${$ra_coords}[3]}[0]] # 4
);
my $y_matrix = new Math::Matrix # 1 x 4
( # Y coords for point:
[${${$ra_coords}[0]}[1]], # 1
[${${$ra_coords}[1]}[1]], # 2
[${${$ra_coords}[2]}[1]], # 3
[${${$ra_coords}[3]}[1]] # 4
);
my $xt = int ($u_matrix * $cardinal_matrix * $x_matrix); # Compute for X
my $yt = int ($u_matrix * $cardinal_matrix * $y_matrix); # Compute for Y
return($xt,$yt);
}
The above source code is released under the same conditions as the image itself. (PD by owner) Missing from file history: Berland cropped the image 2007-03-05. |
| Date | 17 October 2006 |
| Source | Own work |
| Author | H (talk) (Uploads) |
Summary
This image is a graphical representation of a Cardinal Spline. It is drawn on a 720x480 canvas and the curve has 10 control points. The tension is set to 0.1.
The red squares represent the position of the control points, and the red line represents the path of the curve.
The image was created with the following w:perl script:
use strict;
use Image::Magick;
use Math::Matrix;
use Math::Gradient qw(gradient);
my $rate = 500;
my $tension = 0.1;
my(@coords) = (
[ 23, 24], [123, 64], [167,200], [ 18,285], [293,467],
[699,205], [487,181], [358,222], [262,130], [238, 24]
);
my $image = Image::Magick->new; # Create new image
$image ->Set(size=>'720x480'); # Set size
$image ->ReadImage('xc:white'); # Make it all white
foreach my $ra_coord (@coords) # For every set of coords in the list
{
my($x,$y) = @{$ra_coord}[0,1]; # Get the x and y
$image ->Draw (
primitive => 'rectangle',
points => (($x-3).','.($y-3).' '.($x+3).','.($y+3)),
fill => 'red'
); # Draw a small rectangle at each coord
}
while (scalar(@coords) >= 4) # While there are at least 4 entries in the list
{
for my $u (gradient(0,1,$rate)) # iterate from 0 to 1 in 500 steps
{
my($x,$y) = &EvaluateCardinal2D(\@coords, $tension, $u); # Hand paramaters to formula
$image ->Set("pixel\[$x,$y\]"=>'red'); # Set that pixel red
}
shift(@coords); # Remove the first entry of the list
}
$image ->Write("Cardinal_Spline_Example.png"); # Save image
sub EvaluateCardinal2D
{
my($ra_coords,$T,$u) = @_;
my $s = (1-$T)/2;
my $u_matrix = new Math::Matrix # 4 x 1
( # Matrix based off the point in the curve
[($u ** 3), ($u ** 2), ($u), (1) ]
);
my $cardinal_matrix = new Math::Matrix # 4 x 4
( # Guts of the Cardinal Spline formula
[(-1 * $s), (2 - $s), ($s - 2), ($s) ],
[(2 * $s), ($s - 3), (3-(2 * $s)), (-1 * $s) ],
[(-1 * $s), (0), ($s), (0) ],
[(0), (1), (0), (0) ],
);
my $x_matrix = new Math::Matrix # 1 x 4
( # X coords for point:
[${${$ra_coords}[0]}[0]], # 1
[${${$ra_coords}[1]}[0]], # 2
[${${$ra_coords}[2]}[0]], # 3
[${${$ra_coords}[3]}[0]] # 4
);
my $y_matrix = new Math::Matrix # 1 x 4
( # Y coords for point:
[${${$ra_coords}[0]}[1]], # 1
[${${$ra_coords}[1]}[1]], # 2
[${${$ra_coords}[2]}[1]], # 3
[${${$ra_coords}[3]}[1]] # 4
);
my $xt = int ($u_matrix * $cardinal_matrix * $x_matrix); # Compute for X
my $yt = int ($u_matrix * $cardinal_matrix * $y_matrix); # Compute for Y
return($xt,$yt);
}
Licensing
|
I, the copyright holder of this work, release this work into the public domain. This applies worldwide. In some countries this may not be legally possible; if so: I grant anyone the right to use this work for any purpose, without any conditions, unless such conditions are required by law. |
The above source code is released under the same conditions as the image itself. (PD by owner)
Missing from file history: Berland cropped the image 2007-03-05.
File history
Click on a date/time to view the file as it appeared at that time.
| Date/Time | Thumbnail | Dimensions | User | Comment | |
|---|---|---|---|---|---|
| current | 00:16, 19 December 2007 | | 720 × 480 (7 KB) | HighInBC | Instead of cropping an example which uses absolute coordinates, I have moved the curve closer to the edge |
| 21:36, 5 March 2007 |  | 563 × 293 (2 KB) | Berland | ||
| 04:35, 17 October 2006 |  | 720 × 480 (6 KB) | H | == Summary == This image is a graphical representation of a ''Cardinal Spline''. It is drawn on a 720x480 canvas and the curve has 10 control points. The tension is set to ''0.1''. The red squares repesent the posistion of the control points, and the red |
File usage
The following 2 pages use this file:
Global file usage
The following other wikis use this file:
- Usage on es.wikipedia.org
