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Description
This assignment is designed to give you more experience programming in C and using the Unix environment. Your task will be to write one program that implements a simple machinelearning algorithm. This will require file I/O, dynamic memory allocation, and correctly implementing an moderately complex algorithm.
Machine learning (ML) techniques are increasingly used to provide services, such as face recognition in photographs, spelling correction, automated translation, and predicting what YouTube videos you might want to watch next. Implementing a full ML algorithm is beyond the scope of this course, so you will implement a “one shot” learning algorithm that uses historical data to predict house prices based on particular attributes.
For example, a house might have x_{1} bedrooms, x_{2} bathrooms, x_{3} square footage, and be built in year x_{4}. If we had appropriate weights, we could estimate the price of the house y with the formula

y = w_{0} + w_{1}x_{1} + w_{2}x_{2} + w_{3}x_{3} + w_{4}x_{4}:
(1)
The goal of oneshot learning is to find values for the weights w_{i} using a large provided set of training data. Once those weights have been found, they can be used to estimate prices for additional houses.
For example, if the training data includes n houses and has k attributes, this data can be represented as an n (k + 1) matrix X, of the form

0
1
^{x}0;1
^{x}0;2
^{x}0;k
1
^{B1}_{..}.
^{x}^{1}_{..}.^{;1}
^{x}^{1}_{..}.^{;2}
. _{. .}
^{x}^{1}_{..}.^{;k}
C
;
B
1
x
x
n 1;2
x
n 1;k
C
B
n 1;1
C
@
A
where each row corresponds to a house and each column corresponds to an attribute. Note that the first column contains 1 for all rows: this corresponds to the weight w_{0}.
Similarly, house prices can be represented as an n 1 matrix Y , of the form

1
y_{0}

y_{1} C

._{.} ^{C};

C @ . A
^{y}n 1
1
where each row gives the price of a house.
Finally, the weights will be a (k + 1) 1 matrix W , of the form

1
w_{0}

w_{1} C

._{.} ^{C};

C @ . A
^{w}k+1
where each row gives the weight of an attribute.
We can relate the matrices X, Y , and W with this equation:

XW =Y:
(2)
Our goal will be to estimate the prices Y ^{0} for some houses with attributes X^{0}. This is easily done if we know the weights W , but we do not. Instead, we can observe the attributes X for houses with known prices Y . We will use a strategy known as oneshot learning to deduce W , given X and Y .
If X were a square matrix, we could find W by rewriting the equation as W = X ^{1}Y , but in general X will not be a square matrix. Thus, we will find its pseudoinverse, and calculate
W = (X^{T} X) ^{1}X^{T} Y; (3)
where X^{T} is the transpose of X. X^{T} X is a square matrix, and can be inverted.^{1}
Once W has been found, it can be used with a new set of house attributes X^{0} to estimate prices
for those houses by computing X^{0}W = Y ^{0}.
1 Algorithm
Given matrices X and Y , your program will compute (X^{T} X) 1X^{T} Y in order to learn W . This will require (1) multiplying, (2) transposing, and (3) inverting matrices. Programming Assignment I already involved matrix multiplication; you may adapt your implementation for this assignment.
Transposing an m n matrix produces an n m matrix. Each row of the X becomes a column of X^{T} .
To find the inverse of X^{T} X, you will use a simplified form of GaussJordan elimination.
1.1 GaussJordan elimination for finding inverses
GaussJordan is a method for solving systems of equations by manipulating matrices with row operations. This method can also be used to find the inverse of a matrix.
You will implement two of the three row operations in your program. The first multiplies all elements of a particular row by some number. The second adds the contents of one row to another, elementwise. More generally, the second operation adds a multiple of the elements of one row to another so that element x_{i;k} will become x_{i;k} + ax_{j;k}.
The third row operation, which swaps two rows, will not be needed for this assignment. Again, the training data used to grade this assignment will not require swapping rows.
^{1}This is not true in general, but for this assignment you may assume that X^{T} X is invertable.
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Here is a demonstration of GaussJordan elimination. We begin with the matrix we wish to invert:

3
1 2 4

M = 4
1
6
7
5
:
1
3
2
We create an augmented matrix A = MjI by adjoining the identity matrix I to M.

3

A = 4
1
2
4
1
0
0
5 _{:}
1
6
7
0
1
0
1
3
2
0
0
1
We will then apply row operations to A in order to turn its left half into the identity matrix. We will write A_{i} to refer to row i of A. At each step of the algorithm, we will identify a particular
row as the pivot row. The element in the pivot row that lies on the diagonal (that is, element A_{p;p}) is the pivot element.
The first step is to turn the matrix into an upper triangular matrix, where all elements on the diagonal are 1 and elements below the diagonal are 0. The pivot row will start at A_{0} and advance to A_{2}. At each step, we will first multiply the pivot row by a constant so that the pivot element will become 1. Next, we will subtract the pivot row from the rows below it, so that the elements below the pivot element become 0.
Starting with row A_{0}, we see that A_{0;0} is already 1. To make the elements below A_{0;0} become 0,

we subtract A_{0} from A_{1} and A_{2}, yielding
2
0
4
3
1
0
3
:
1
4
1
2
4
1
0
0
5
0
1
2
1
0
1
Next, for pivot A_{1} we see that A_{1;1} = 4. We divide A_{1} by 4 (that is, multiply A_{4} by ^{1}_{4} ).

2
0
1
4
4
4
0
3
:
4
1
2
4
1
0
0
5
3
1
1
0
1
2
1
0
1
Then, we subtract A_{1} from A_{2}, yielding

2
0
1
4
4
4
0
3
:
6
1
2
4
1
0
0
7
3
1
1
0
0
1
4
4
4
4
11
3
1
5
Next, we divide A_{3} by
11
, yielding
4
2
1
2
4
1
0
0
3
6
7
0
1
3
1
1
0
:
1
11
11
0
0
11
4
4
4
4
5
3
1
4
A is now an upper triangular matrix. To turn the left side of A into an identity matrix, we will reverse the process and turn the elements above the diagonal into 0. The pivot row will start at A_{2}
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and advance in reverse to A_{0}. For each step, we will subtract the pivot row from the rows above it so that the elements above the pivot element become 0.
We begin with A_{2}. First, we subtract ^{3}_{4} A_{2} from A_{1}, yielding

2
1
2
4
1
0
0
3
6
7
0
1
0
5
2
3
:
11
11
11
0
0
1
4
11
11
11
5
3
1
4
Then we subtract 4A_{2} from A_{0}, yielding

2
1
2
0
1
4
16
3
6
11
11
11
7
0
1
0
5
2
3
:
11
11
11
0
0
1
4
11
11
11
5
3
1
4
Now the elements above A_{2;2}.
Next, we subtract 2A_{1} from A_{0}, yielding
2
1 0 0
6010
4
0 0 1
9 
8 
10 
3 

11 
11 
11 

5 
2 
3 
: 

11 
11 
11 

5 

3 
1 
4 
7 

11 
11 
11 
Now the element above A_{1;1} is 0.
After that step, the left half of A is the identity matrix and the right half of A contains M ^{1}.
That is, A = IjM ^{1}. The algorithm is complete and the inverse of M has been found.
You are strongly encouraged to write this algorithm in pseudocode before you begin implementing it in C. Try using it to invert a small square matrix and make sure you understand the operations you must perform at each step.
In particular, ask yourself (1) given a matrix A, how can I multiply (or divide) A_{i} by a constant c, and (2) given a matrix A, how can I add (or subtract) cA_{i} to (or from) A_{j}?
Note that the augmented matrix is a notational convenience. In your implementation, you may prefer to use two matrices A and B that are initially equal to M and I. Any time you apply a row operation to A, apply the same one to B. Once you have A = I, you will also have B = M ^{1}. It is also acceptible to create and manipulate an augmented matrix and to extract M ^{1} from it later.
You MUST use the algorithm demonstrated above. Performing diﬀerent row operations, or the same row operations in a diﬀerent order, may change the result of your program due to rounding. This may cause your program to produce results diﬀerent from the reference result.

Program
You will write a program learn that uses a training data set to learn weights for a set of house attributes, and then applies those weights to a set of input data to calculate prices for those houses. learn takes two arguments, which are the paths to files containing the training data and input data.
Training data format The first line will be the word “train”. The second line will contain an integer k, giving the number of attributes. The third line will contain an integer n, giving the
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number of houses. The next n lines will contain k + 1 floatingpoint numbers, separated by spaces. Each line gives data for a house. The first k numbers give the values x_{1} x_{k} for that house, and the last number gives its price y.
For example, a file train.txt might contain:
train
4
7
3.000000 1.000000 1180.000000 1955.000000 221900.000000
3.000000 2.250000 2570.000000 1951.000000 538000.000000
2.000000 1.000000 770.000000 1933.000000 180000.000000
4.000000 3.000000 1960.000000 1965.000000 604000.000000
3.000000 2.000000 1680.000000 1987.000000 510000.000000
4.000000 4.500000 5420.000000 2001.000000 1230000.000000
3.000000 2.250000 1715.000000 1995.000000 257500.000000
This file contains data for 7 houses, with 4 attributes and a price for each house. The corresponding matrix X will be 7 5 and Y will be 7 1. (Recall that column 0 of X is all ones.)
Input data format The first line will be the word “data”. The second line will be an integer k, giving the number of attributes. The third line will be an ineteger m, giving the number of houses. The next m lines will contain k floatingpoint numbers, separated by spaces. Each line gives data for a house, not including its price.
For example, a file data.txt might contain:
data
4
2
3.000000 2.500000 3560.000000 1965.000000
2.000000 1.000000 1160.000000 1942.000000
This contains data for 2 houses, with 4 attributes for each house. The corresponding matrix X will be 2 5.
Output format Your program should output the prices computed for each house in the input data using the weights derived from the training data. Each house price will be printed on a line, rounded to the nearest integer.
To print a floatingpoint number rounded to the nearest integer, use the formatting code %.0f, as in:
printf(“%.0f\n”, price);
Usage Assuming the files train.txt and data.txt exist in the same directory as learn:

./learn train.txt data.txt 737861 203060
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Implementation notes The description of GaussJordan elimination given in section 1.1 uses an augmented matrix with twice as many columns as the input matrix X. This is an illustrative tool, and not meant as an implementation requirement. It is simpler to use two matrices that begin as X and the identity matrix I and apply identical row operations to both, until the first matrix becomes I and the second is X ^{1}.
It is recommended to write separate functions to compute the inverse of a matrix, the transpose of a matrix, and the product of two matrices. You may find it simpler to avoid allocating memory within these functions; instead, pass them the input matrix or matrices and a preallocated matrix that will be used for the output.
Having separate functions will simplify your development, as you can test your implementations of each separately.
You MUST use double to represent the attributes, weights, and prices. Using float may result in incorrect results due to rounding. To read double values from the training and input data files, you can use fscanf with the format code %lf.
If learn successfully completes, it MUST return exit code 0.
You MAY assume that the training and input data files are correctly formatted. You MAY assume that the first argument is a training data file and that the second argument is an input data file. However, checking that the training data file begins with “train” and that the input data file begins with “data” may be helpful if you accidentally give the wrong arguments to learn while you are testing it. To read a string containing up to 5 nonspace characters, you can use the fscanf format code %5s.
learn SHOULD check that the training and input data files specify the same value for k.
If the training or input files do not exist, are not readable, are incorrectly formatted, or specify diﬀerent values of k, learn MAY print “error” and return exit code 1. Your code will not be tested with these scenarios.

Grading
Your submission will be awarded up to 100 points, based on how many test cases your program completes successfully.
The autograder provided for students includes half of the test cases that will be used during grading. Thus, it will award up to 50 points.
Make sure that your programs meet the specifications given, even if no test case explicitly checks it. It is advisable to perform additional tests of your own devising.
3.1 Academic integrity
You must submit your own work. You should not copy or even see code for this project written by anyone else, nor should you look at code written for other classes. We will be using state of the art plagiarism detectors. Projects which the detectors deem similar will be reported to the Oﬃce of Student Conduct.
Do not post your code online or anywhere publically readable. If another student copies your code and submits it, both of you will be reported.
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Submission
Your solution to the assignment will be submitted through Sakai. You will submit a Tar archive file containing the source code and makefiles for your project. Your archive should not include any compiled code or object files.
The remainder of this section describes the directory structure, the requirements for your makefiles, how to create the archive, how to use the provided autograder, and how to create your own test files to supplement the autograder.
4.1 Directory structure
Your project should be stored in a directory named src, which will contain (1) a makefile, and (2) any source files needed to compile your program. Typically, you will provide a single C file named for the program (learn.c).
This diagram shows the layout of a typical project:
src
+ Makefile
+ learn.c
4.2 Makefiles
We will use make to manage compilation. Each program directory will contain a file named Makefile that describes at least two targets. The first target must compile the program. An additional target, clean, must delete any files created when compiling the program (typically just the compiled program).
A typical makefile for the program learn would be:
learn: learn.c
gcc g Wall Werror fsanitize=address o learn learn.c
clean:
rm f learn
Note that the command for compiling learn uses GCC warnings and the address sanitizer. Your score will be reduced if your makefile does not include these options.
Use of g is recommended, but not required.
Note that the makefile format requires that lines be indented using a single tab, not spaces. Be aware that copying and pasting text from this document will “helpfully” convert the indentation to spaces. You will need to replace them with tabs (literal tab characters), or simply type the makefile yourself. You are advised to use make when compiling your program, as this will ensure (1) that your makefile works, and (2) that you are testing your program with the same compiler options that the autograder will use.
4.3 Creating the archive
We will use tar to create the archive file. To create the archive, first ensure that your src directory contains only the source code and makefiles needed to compile your project. Any compiled programs, object files, or other additional files must be moved or removed.
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Next, move to the directory containing src and execute this command:
tar czvf pa2.tar src
tar will create a file pa2.tar that contains all files in the directory src. This file can now be submitted through Sakai.
To verify that the archive contains the necessary files, you can print a list of the files contained in the archive with this command:
tar tf pa2.tar
You should also use the autograder to confirm that your archive is correctly structured.
4.4 Using the autograder
We have provided a tool for checking the correctness of your project. The autograder will compile your programs and execute them several times with diﬀerent arguments, comparing the results against the expected results.
Setup The autograder is distributed as an archive file pa2_grader.tar. To unpack the archive, move the archive to a directory and use this command:
tar xf pa2_grader.tar
This will create a directory pa1 containing the autograder itself, grader.py, a library autograde.py, and a directory of test cases data.
Do not modify any of the files provided by the autograder. Doing so may prevent the autograder from correctly assessing your program.
You may create your src directory inside pa1. If you prefer to create src outside the pa1 directory, you will need to provide a path to grader.py when invoking the autograder (see below).
Usage While in the same directory as grader.py and src, use this command:
python grader.py
The autograder will compile and execute the programs in the directory src, assuming src has the structure described in section 4.1.
To obtain usage information, use the h option.
Program output By default, the autograder will not print the output from your programs, except for lines that are incorrect. To see all program output for unsuccessful tests, use the v option:
python grader.py v
To see program output for all tests, use vv. To see no program output, use q.
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Checking your archive We recommend that you use the autograder to check an archive before submitting. To do this, use the a option with the archive file name. For example,
python grader.py a pa1.tar
This will unpack the archive into a temporary directory, grade the programs, and then delete the temporary directory.
Specifying source directory If your src directory is not located in the same directory as grader.py, you may specify it using the s option. For example,
python grader.py s ../path/to/src
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