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Images Complex Numbers Mandelbrot & Julia Sets Image File Format (.ppm) C/C++ system() function g++, make & makefiles Debuggers
CSE 30331CSE 30331Lecture 6 – Complex Numbers & Lecture 6 – Complex Numbers &
ImagesImages
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Quick Aside
Group Project Guidelines … are posted on web page
Due: Tuesday, September 22nd
Initial Group membership Brief description of project you plan to complete Initial references you have found …
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Images (photographic)
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Images (fractal)
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Image Representation
An image is a rectangular grid of pixels
A pixel is a single picture element
Each pixel has a value representing the color (or intensity) of a single point in the image
Image size is in pixels (640 x 480, etc.)
Image resolution is in pixels / inch
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Pixel Color
Pixel size # of colors possible
1 bit 2 (Black or White)
Binary image
1 byte (8 bit) 256 shades of gray or
256 distinct colors
3 byte (24 bit) 224 colors (true color)
(millions of colors)
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Color Maps
If each pixel is a single byte, its value is often used as an index into a color map
(a table of actual 3 byte color codes)
pixel red green blue
0 0 0 0
1 20 0 0
2 100 100 0
3 0 255 255
…
255 255 255 255
Black
Dark Red
Medium Yellow
Bright Cyan
White
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Pixel Classclass pixel{public:
pixel (unsigned char r = 0, unsigned char g = 0, unsigned char b = 0)
: red(r), green(g), blue(b) { }setColor (unsigned char r, unsigned char g,
unsigned char b){ red = r; green = g; blue = b; }getColor(unsigned char &r, unsigned char &g,
unsigned char &b)( r = red; g = green; b = blue; }
private:unsigned char
red, green, blue; // true color components};
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Image in memory
// matrix template class found in Ford & Topp Ch 5// is a 2-D grid using a vector of vectors#include “d_matrix.h”
// declare white image of 500 x 500 pixelsmatrix<pixel> image(500,500,pixel(255,255,255));
// set color of pixel3,4
image[3][4].setColor(100,20,255);
// get color (r,g,b) of pixeli,j unsigned char r,g,b;image[i][j].getColor(r,g,b);
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Complex Numbers
External format: a + b j a and b are real coefficients j is sqrt(-1)
Represents a point on a 2D Cartesian plane Real (horizontal) axis Imaginary (vertical) axis
Addition x1 + x2 =
(a1 + b1 j) + (a2 + b2 j) = (a1 + a2) + (b1 + b2) j
Subtraction x1 - x2 =
(a1 + b1 j) - (a2 + b2 j) = (a1 - a2) + (b1 - b2) j
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Complex Numbers
Multiplication x1 * x2 =
(a1 + b1 j) * (a2 + b2 j) = (a1a2 - b1b2) + (a1b2 + a2b1) j
Division x1 / x2 =
(Note: multiply top & bottom by complex conjugate) (a1 + b1 j) / (a2 + b2 j) =
((a1 + b1 j) * (a2 - b2 j)) / ((a2 + b2 j) * (a2 - b2 j)) =
((a1a2+b1b2) / (a2a2+b2b2)) + ((a2b1-a1b2) / (a2a2+b2b2)) j
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Complex Number Plane
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Mandelbrot & Julia Sets
Both based on repeated (recursive) application of the following function, where C and Z are both complex numbers
Zn = Zn-1*Zn-1 + C
If the distance of Zn from the origin never exceeds 2.0 then the original point is a member of the set
100 applications of the function is a sufficient test
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Mandelbrot Set Images
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Mandelbrot Sets There is ONLY ONE Mandelbrot Set Initial conditions are ….
Z1 = 0 + 0 j and C = a complex number corresponding to a point on the complex
number plane in the range -2.25 .. +0.75 real and -1.5 .. +1.5 imaginary (also corresponding to a pixel in the image being produced)
Zn = Zn-1*Zn-1 + C
For each pixel (complex number C) apply the function and count the number of applications before the magnitude(Zn) > 2.0
If count == 100 then C is in the set, color it Black If count < 100 then C is not in the set, color it based on the count,
indicating the “speed” with which it departed
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Julia Set Images
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Julia Sets There are infinitely many Julia Sets (one for each constant C) Initial conditions are ….
Z1 = a complex number corresponding to a point on the complex number plane in the range -1.5 .. +1.5 real and -1.5 .. +1.5 imaginary (also corresponding to a pixel in the image)
C is another complex number chosen and held constant during tests of all other points
Zn = Zn-1*Zn-1 + C
For each pixel (complex number Z1) apply the function and count the number of applications before the magnitude(Zn) > 2.0
If count == 100 C is in the set, color it Black If count < 100 C is not in the set, color it based on the count, indicating
the “speed” with which it departed
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Suggested Ranges
Images at least 600 x 600 pixels
Mandelbrot sets (Complex plane)-2.25 .. +0.75 real
-1.5 .. + 1.5 imaginary
Julia Sets (Complex Plane)-1.5 .. +1.5 real
-1.5 .. + 1.5 imaginary
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Portable Pix Map (PPM)
File format for *.ppm image files
<magic number>
<comment>
<width & height>
<max color value>
<data bytes>
P6
# creator: JHS 9/4/2004
640 480
255
d0^g%8%#$.......<EOF>
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C++ system() function
Requests operating system to run a command Command may be system command or another
program Examples:
// List all PPM image files in current directorysystem(“ls *.ppm”);
// Start Eye of Gnome (eog) to display m1.pp imagesystem(“eog m1.ppm”);
Requires literal string or C-style char array as argument
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System()
Example of building and executing command with string class
string prog, filename, command;
cout << “Which viewer (gimp, eog)? ”;
cin >> prog;
system(“ls *.ppm”);
cout << “Enter name of file to display: “;
cin >> filename;
command = prog + “ “ + filename + “ &”;
system(command.c_str());
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G++
g++ is the GNU C++ compiler Command line options
-c compiles to object file
-o <name> creates named executable
-g compiles to allow debugging
-lm links to math library Examples:
g++ -g -c ctester.cpp
g++ -g -c complex.cpp
g++ -g -o ctester ctester.o complex.o –lm
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Make & Makefiles Make reads instruction in makefile or Makefile and performs
indicated actions, by recursive application of rules Rules based on targets, dependency lists, and time stamps on files
Rule format:
<target> : <list of files target depends on><tab> <command to build target>
Rule example:
ctester: ctester.o complex.og++ -g -o ctester ctester.o complex.o –lm
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Using make
To make 1st target in makefile or Makefile make
To make 1st target in some other file make –f <makefile_name>
To make specific target make <target>
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Phony Targets
Some targets are used to invoke commands BUT NOT actually build a target
They are identified using the term “phony”
Example: note comments beginning with #
# phony target for use in clearing directory# of all object files# use: “make clean”phony: cleanclean:
rm *.o
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Makefile for programs # 2# CSE 331 Program 2 makefile (JHS 9/10/2004 Notre Dame)
all: prog2_1 ctester prog2_2
prog2_1: prog2_1.cpp myVector.h myMatrix.hg++ -g -o prog2_1 prog2_1.cpp
ctester: ctester.o complex.og++ -g -o ctester ctester.o complex.o
complex.o: complex.cpp complex.hg++ -g -c complex.cpp
ctester.o: ctester.cpp complex.hg++ -g -c ctester.cpp
prog2_2: prog2_2.o complex.og++ -g -o prog2_2 prog2_2.o complex.o
prog2_2.o: prog2_2.cpp complex.h pixel.h myVector.h myMatrix.hg++ -g -c prog2_2.cpp
phony: cleanclean:
rm *.o
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Debugging in Linux/Unix
Gdb is the command line debugger
ddd is a GUI version of gdb for Linux xxgdb is a GUI version of gdb for Unix/X11
All versions support breakpoints, steps into and out of functions, data value examination, etc.
Program must be compiled with –g option to use debuggers
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Summary
Image 2D matrix of pixels
Pixel Picture Element Index into color table or true (RGB) color
ColorTable Indexed list or true (RGB) color values for pixels
Complex numbers Real and imaginary components Represent points on 2D complex plane
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Summary 2
Mandelbrot & Julia Sets Complex numbers attracted to origin (Mandelbrot Set) or to
another point C in the complex plane (Julia Set) Based on recursive function Zn = Zn-1*Zn-1 + C
Mandelbrot Set Initially, Z1 is origin and C is point being tested in plane
Julia Set Initially, Z1 point being tested in plane and C is some point
held constant for entire Julia Set Non-member points are color coded based on value of
n when Zn moves more than 2.0 units from origin, escaping the strange attractor
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Summary 3
Portable Pix Map (simple image file format)
P6
#comment (creator and date)
width height
max_color
image data in bytes (rgbrgb....)
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Summary 4
G++ GNU C++ compiler Command line options (-g -o –c ....)
Make Executes rules in makefiles to build targets and perform
other tasks Recursively follows rules back through dependency lists Phony rules execute commands; do not build targets
Debugging ddd, xxgdb, gdb
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