Assg 05: Quicksort
COSC 2336 Data Structures
Objectives
• Practice writing functions
• Practice writing recursive functions.
• Learn about Analysis of algorithms and O(n log n) sorts
Description
In this assignment we will be implementing one of the most popular sorting
algorithms used in libraries (like the C++ STL library, and the UNIX qsort
function) to provide basic sorting abilities, the Quicksort algorithm. I would
recommend that you at least read section 7.5 from our supplemental Shaffer
textbook on Quicksort, if not sections 7.1-7.5 talking about three well known
O(n log n) sorting algorithms, and the 3 O(n2) algorithms we discussed last
week.
Quicksort, when properly implemented, is very attractive because it pro-
vides a way to do a fast sort completely in-place (without having to allocate
additional memory to do the sort, beyond a single value needed when swap-
ping two values in the list being sorted). In the worst case, Quicksort is
actually O(n2), no better than bubble sort. But this worse case only occurs
when every pivot selected is the wort possible, and does not divide the list
at all. This is very unlikely to happen, unless you know how the pivot is
selected, and specifically design the input list to always choose the worst
possible pivot. On average the cost of Quicksort is O(n log n), and it is
usually very likely that average case performance will result when lists to be
sorted are relatively random.
The most direct implementation of Quicksort is as a recursive algorithm.
Quicksort is an example of a divide and conquer approach to solving the
problem of sorting the list. We are given a list of items, A and indexes left
1
and right that indicate a sub-portion of the list to be sorted. left and right
indicate the actual indexes, so if the list is a regular C array of integers, and
the array is of size 10
int left;
int right;
const inst SIZE = 10;
int A[size];
Then to sort the whole list we set left = 0 and right = 9 to initially
call the Quicksort function:
left = 0;
right = size-1;
quicksort(A, left, right);
Conceptually the steps of the Quicksort algorithm are as follows:
1. if list size is 0 or 1 (left <= right) return (lists of this size are sorted
by definition).
2. Choose a pivot value and swap the pivot value to the end of the list
swap(pivotIndex, right)
3. Partition the list. Partitioning means all values less than the pivot
value should end up on the left of the list, and all values greater will
be on the right. The first index k where a value >= to the pivot value
is at indicates the new left and right side sub-lists.
4. Swap the pivot value to its correct position k swap(k, right)
5. Recursively call Quicksort on the new left and right sub-lists
• quicksort(A, left, k-1)
• quicksort(A, k+1, right)
Most of the real work happens in the function/code to partition the list.
The partitioning of the list, for Quicksort to be an in-place sort, must work
by swapping values in-place in the list o.
Assg 05 QuicksortCOSC 2336 Data StructuresObjectives.docx
1. Assg 05: Quicksort
COSC 2336 Data Structures
Objectives
• Practice writing functions
• Practice writing recursive functions.
• Learn about Analysis of algorithms and O(n log n) sorts
Description
In this assignment we will be implementing one of the most
popular sorting
algorithms used in libraries (like the C++ STL library, and the
UNIX qsort
function) to provide basic sorting abilities, the Quicksort
algorithm. I would
recommend that you at least read section 7.5 from our
supplemental Shaffer
textbook on Quicksort, if not sections 7.1-7.5 talking about
three well known
O(n log n) sorting algorithms, and the 3 O(n2) algorithms we
discussed last
week.
Quicksort, when properly implemented, is very attractive
because it pro-
vides a way to do a fast sort completely in-place (without
having to allocate
2. additional memory to do the sort, beyond a single value needed
when swap-
ping two values in the list being sorted). In the worst case,
Quicksort is
actually O(n2), no better than bubble sort. But this worse case
only occurs
when every pivot selected is the wort possible, and does not
divide the list
at all. This is very unlikely to happen, unless you know how the
pivot is
selected, and specifically design the input list to always choose
the worst
possible pivot. On average the cost of Quicksort is O(n log n),
and it is
usually very likely that average case performance will result
when lists to be
sorted are relatively random.
The most direct implementation of Quicksort is as a recursive
algorithm.
Quicksort is an example of a divide and conquer approach to
solving the
problem of sorting the list. We are given a list of items, A and
indexes left
1
and right that indicate a sub-portion of the list to be sorted. left
and right
indicate the actual indexes, so if the list is a regular C array of
integers, and
the array is of size 10
int left;
3. int right;
const inst SIZE = 10;
int A[size];
Then to sort the whole list we set left = 0 and right = 9 to
initially
call the Quicksort function:
left = 0;
right = size-1;
quicksort(A, left, right);
Conceptually the steps of the Quicksort algorithm are as
follows:
1. if list size is 0 or 1 (left <= right) return (lists of this size are
sorted
by definition).
2. Choose a pivot value and swap the pivot value to the end of
the list
swap(pivotIndex, right)
3. Partition the list. Partitioning means all values less than the
pivot
value should end up on the left of the list, and all values greater
will
be on the right. The first index k where a value >= to the pivot
value
is at indicates the new left and right side sub-lists.
4. Swap the pivot value to its correct position k swap(k, right)
5. Recursively call Quicksort on the new left and right sub-lists
• quicksort(A, left, k-1)
4. • quicksort(A, k+1, right)
Most of the real work happens in the function/code to partition
the list.
The partitioning of the list, for Quicksort to be an in-place sort,
must work
by swapping values in-place in the list of items. All values
smaller than the
pivot value must end up on the left side, and all values greater
on the right.
The algorithm to partition the list is traditionally done with
these steps:
2
1. do a linear search from the left of list, stop at first value on
left that is
>= pivot
2. do a linear search from the right of list, stop at first value
that is <
than the pivot.
3. swap(left, right) assuming you were incrementing left and
decre-
menting right to point to indexes of values that are on wrong
sides
4. if left < right goto 1
Conceptually we search from both ends of the list, and when we
find
values that are on wrong sides with respect to the pivot value,
5. we swap
them. Eventually the search from both ends will meet
somewhere. The
location where they meet should be the index of the first value
that is >=
to the pivot (going from the left side of the list). This is the
index where the
pivot value should actually go in the list, because all values
before this are
smaller than the pivot, and all values at or after are greater than
the pivot.
Thus at the end of partitioning the list on some pivot value, we
are able to
swap 1 value each time to its correct final position in the list.
But the values
to the left and right will not be sorted, thus we call Quicksort
recursively on
these sub-lists to get them sorted.
In order to help you implement your own version of Quicksort,
we have
broken the problem down into useful sub-functions. If you
implement the
sub-functions as specified, in the order given, the final
implementation of the
Quicksort function is relatively straight forward, using these
smaller func-
tions.
For this assignment you need to perform the following tasks.
1. Write a function called swapListValues(). This functions
takes an
array of integers as its first parameter, and two indexes (the left
and
right indexes). This function does not return a value explicitly.
6. Recall
arrays are passed by reference. As the name implies, the two
values
in the array at the indicated left and right indexes are to be
swapped,
and since the array is passed by reference, after returning they
will be
swapped for the caller of this function.
2. Write a function called findAndSwapPivot(). This function
takes the
same 3 parameters, an array of integers, and two indexes
indicating the
left and right sides of a sub-portion of the list. The function
should find
the value in the middle of the left and right ends, which will be
chosen
as the pivot. The function should use the previous
swapListValues()
3
function to swap the chosen pivot value to the end of the list of
integers.
This function returns a value. This is different from how the
textbook
implements the find pivot function. Our function should return
the
actual pivot value that was chosen (not the pivotIndex, which
we know
should be the last index of the sub-list after calling this
function).
3. Write a function called partitionList(). This will implement
7. the al-
gorithm described preciously. This functions takes the 3 same
param-
eters for the previous functions, an integer array, and left and
right
indexes for the sub-portion of the list we are currently
partitioning.
In addition, this function takes a fourth parameter, the pivot
value).
This function should make use of the swapListValues() function
de-
fined previously when swapping values in-place in the list of
integers.
When this function is called, the pivot has been swapped to the
end
of the sub-portion of the list, so the right index will be one less
than
this. This function needs to correctly return the index, described
as
k above, where the pivot value should actually go. At the end,
the
location where the left search and right search meet will be this
index,
the final location found for the pivot value.
4. Finally write a function called quickSort() using the
described algo-
rithm above. This function will use all of the 3 previous
functions to do
its work. If implemented correctly, there is almost nothing to be
done
in this function besides calling the other 3 functions, and
recursively
calling itself (except to check for the base case of your
recursion).
8. You will again be given 3 starting template files like before, an
assg-
05.cpp file of tests of your code, and a QuickSort.hpp and
QuickSort.cpp
header and implementation file. As before, you should practice
incremental
development, and uncomment the tests in the assg-05.cpp file
one at a time,
and implement the functions in the order specified. If you
implement your
code correctly and uncomment all of the tests, you should get
the following
correct output:
Test swapListValues() ------------------------------------------
swapListValues() test 1, swap 2 values
expected: List length: 2 [10, 5]
actual : List length: 2 [10, 5]
swapListValues() test 2, same index
expected: List length: 2 [8, 6]
4
actual : List length: 2 [8, 6]
swapListValues() test 3, swap 2 values from inside of list
expected: List length: 12 [2, 7, 6, 3, 8, 4, 2, 9, 5, 8, 9, 1]
actual : List length: 12 [2, 7, 6, 3, 8, 4, 2, 9, 5, 8, 9, 1]
swapListValues() test 4, reverse the previous swap
expected: List length: 12 [2, 7, 9, 3, 8, 4, 2, 9, 5, 8, 6, 1]
actual : List length: 12 [2, 7, 9, 3, 8, 4, 2, 9, 5, 8, 6, 1]
9. swapListValues() test 5, swap with index 0
expected: List length: 12 [4, 7, 9, 3, 8, 2, 2, 9, 5, 8, 6, 1]
actual : List length: 12 [4, 7, 9, 3, 8, 2, 2, 9, 5, 8, 6, 1]
swapListValues() test 6, swap with last index
expected: List length: 12 [4, 7, 9, 3, 8, 2, 1, 9, 5, 8, 6, 2]
actual : List length: 12 [4, 7, 9, 3, 8, 2, 1, 9, 5, 8, 6, 2]
Test findAndSwapPivot() ----------------------------------------
findAndSwapPivot() test 1, basic test
expected: List length: 3 [5, 8, 3]
expected pivot: 3
actual: List length: 3 [5, 8, 3]
actual pivot: 3
findAndSwapPivot() test 2, test list size 1
expected: List length: 1 [5]
expected pivot: 5
actual: List length: 1 [5]
actual pivot: 5
findAndSwapPivot() test 3, bigger list with even number of
values
expected: List length: 10 [5, 2, 8, 7, 8, 9, 1, 4, 5, 3]
expected pivot: 3
actual: List length: 10 [5, 2, 8, 7, 8, 9, 1, 4, 5, 3]
actual pivot: 3
findAndSwapPivot() test 4, bigger list with odd number of
10. values
expected: List length: 15 [5, 2, 8, 7, 3, 9, 1, 18, 5, 8, 10, 11, 15,
22, 42]
5
expected pivot: 42
actual: List length: 15 [5, 2, 8, 7, 3, 9, 1, 18, 5, 8, 10, 11, 15,
22, 42]
actual pivot: 42
Test partitionList() -------------------------------------------
partitionList() test 1, basic test
expected: List length: 10 [1, 3, 4, 2, 9, 6, 7, 8, 8, 5]
expected pivot: 4
actual: List length: 10 [1, 3, 4, 2, 9, 6, 7, 8, 8, 5]
actual pivot: 4
partitionList() test 2, bigger test and some duplicates of the
pivot
expected: List length: 15 [4, 7, 6, 6, 19, 18, 12, 15, 10, 10, 12,
13, 11, 17, 10]
expected pivot: 4
actual: List length: 15 [4, 7, 6, 6, 19, 18, 12, 15, 10, 10, 12, 13,
11, 17, 10]
actual pivot: 4
partitionList() test 3, everything is smaller than pivot value
expected: List length: 6 [4, 3, 7, 6, 5, 10]
11. expected pivot: 5
actual: List length: 6 [4, 3, 7, 6, 5, 10]
actual pivot: 5
partitionList() test 4, everything is bigger than pivot value
expected: List length: 6 [4, 3, 7, 6, 5, 2]
expected pivot: 0
actual: List length: 6 [4, 3, 7, 6, 5, 2]
actual pivot: 0
partitionList() test 5, small list that needs a swap
expected: List length: 3 [2, 8, 4]
expected pivot: 1
actual: List length: 3 [2, 8, 4]
actual pivot: 1
partitionList() test 6, list of size 1 (and pivot value)
expected: List length: 2 [8, 4]
expected pivot: 0
actual: List length: 2 [8, 4]
6
actual pivot: 0
partitionList() test 7, list of size 1, pivot value is larger
expected: List length: 2 [8, 12]
12. expected pivot: 1
actual: List length: 2 [8, 12]
actual pivot: 1
partitionList() test 8 (sort by hand)
after first partition: List length: 5 [5, 3, 6, 7, 8]
after second partition (left): List length: 5 [3, 5, 6, 7, 8]
after third partition (right): List length: 5 [3, 5, 6, 7, 8]
expected: List length: 5 [3, 5, 6, 7, 8]
actual: List length: 5 [3, 5, 6, 7, 8]
Test quickSort() -----------------------------------------------
quickSort() test 1, sort list of size 1
expected: List length: 1 [8]
actual: List length: 1 [8]
quickSort() test 2, sort list of size 2 already ordered
expected: List length: 2 [3, 9]
actual: List length: 2 [3, 9]
quickSort() test 3, sort list of size 2 out of order
expected: List length: 2 [3, 9]
actual: List length: 2 [3, 9]
quickSort() test 4, sort odd sized list
expected: List length: 9 [2, 3, 4, 5, 5, 6, 7, 8, 9]
actual: List length: 9 [2, 3, 4, 5, 5, 6, 7, 8, 9]
quickSort() test 5, sort even sized list
13. expected: List length: 14 [2, 2, 3, 4, 5, 5, 5, 6, 7, 8, 8, 9, 10, 11]
actual: List length: 14 [2, 2, 3, 4, 5, 5, 5, 6, 7, 8, 8, 9, 10, 11]
quickSort() test 6, sort already sorted list
expected: List length: 17 [1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13,
14, 15, 16, 17]
actual: List length: 17 [1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13,
14, 15, 16, 17]
7
quickSort() test 7, sort a reversed list
expected: List length: 17 [1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13,
14, 15, 16, 17]
actual: List length: 17 [1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13,
14, 15, 16, 17]
quickSort() test 7, sort a reversed list
expected: List length: 14 [4, 4, 4, 4, 4, 4, 4, 8, 8, 8, 8, 8, 8, 8]
actual: List length: 14 [4, 4, 4, 4, 4, 4, 4, 8, 8, 8, 8, 8, 8, 8]
Assignment Submission
A MyLeoOnline submission folder has been created for this
assignment. You
should attach and upload your completed .cpp source files to the
submission
folder to complete this assignment. You really do not need to
give me the
assg-05.cpp file again, as I will have my own file with
14. additional tests of
your functions. However, please leave the names of the other
two files as
QuickSort.hpp and QuickSort.cpp when you submit them.
Requirements and Grading Rubrics
Program Execution, Output and Functional Requirements
1. Your program must compile, run and produce some sort of
output to
be graded. 0 if not satisfied.
2. (15 pts.) swapListValues() function implemented as specified
and
working.
3. (15 pts.) findAndSwapPivot() function implemented as
specified and
working.
4. (30 pts.) partitionList() function implemented as specified
and
working.
5. (30 pts.) quickSort() function implemented as specified and
working.
6. (5 pts.) All output is correct and matches the correct example
output.
7. (5 pts.) Followed class style guidelines, especially those
mentioned
below.
8
15. Program Style
Your programs must conform to the style and formatting
guidelines given
for this class. The following is a list of the guidelines that are
required for
the assignment to be submitted this week.
1. Most importantly, make sure you figure out how to set your
indentation
settings correctly. All programs must use 2 spaces for all
indentation
levels, and all indentation levels must be correctly indented.
Also all
tabs must be removed from files, and only 2 spaces used for
indentation.
2. A function header must be present for member functions you
define.
You must give a short description of the function, and document
all of
the input parameters to the function, as well as the return value
and
data type of the function if it returns a value for the member
functions,
just like for regular functions. However, setter and getter
methods do
not require function headers.
3. You should have a document header for your class. The class
header
document should give a description of the class. Also you
should doc-
16. ument all private member variables that the class manages in
the class
document header.
4. Do not include any statements (such as system("pause") or
inputting
a key from the user to continue) that are meant to keep the
terminal
from going away. Do not include any code that is specific to a
single
operating system, such as the system("pause") which is
Microsoft
Windows specific.
9
/**
* @author Jane Programmer
* @cwid 123 45 678
* @class COSC 2336, Spring 2019
* @ide Visual Studio Community 2017
* @date January 23, 2019
* @assg Assignment 05
*
* @description Assignment 05 Quick Sort
*/
#include "QuickSort.hpp"
// function implementations go here
/**
* @author Jane Programmer
* @cwid 123 45 678
* @class COSC 2336, Spring 2019
17. * @ide Visual Studio Community 2017
* @date January 23, 2019
* @assg Assignment 05
*
* @description Assignment 05 Quick Sort
*/
#ifndef _QUICKSORT_H_
#define _QUICKSORT_H_
// function prototypes go here
#endif // _QUICKSORT_H_
/**
* @author Jane Programmer
* @cwid 123 45 678
* @class COSC 2336, Spring 2019
* @ide Visual Studio Community 2017
* @date January 23, 2019
* @assg Assignment 05
*
* @description Assignment 05 Quick Sort
*/
#include <iostream>
#include <sstream>
#include <cassert>
#include <cstring>
#include "QuickSort.hpp"
using namespace std;
/** list to string
* Represent array as a string time, useful for output.
18. *
* @param list[] The list, an array of integers, to be converted
to
* a string.
* @param length The length of the list.
*
* @returns string Returns a string with a representation of the
list
* state and it contents.
*/
string tostring(int list[], int length)
{
ostringstream out;
out << "List length: " << length << " [";
// output first value, so we can remove , at end
if (length >= 1)
{
out << list[0];
}
// output each follow with a preceeding comma,
// which allows us to end list without trailing ,
for (int index = 1; index < length; index++)
{
out << ", " << list[index];
}
out << "]";
return out.str();
}
/** compare lists equal
19. * This function compares if the two lists (arrays of integers)
* given as parameters are equal or not. Result is boolean true
* if lists all have the same values, false otherwise.
*
* @param a[], b[] The lists, both of int and both the same size,
* that are to be compared.
* @param length The length of both of the lists.
*
* @returns bool Returns true if the lists are equal (have all the
* same values at all the same positions) and false otherwise.
*/
bool listsAreEqual(int a[], int b[], int length)
{
// compare each item in a and b
for (int index = 0; index < length; index++)
{
// as soon as we find 1 value that differs, the answer is false,
// the lists are not equal
if (a[index] != b[index])
{
return false;
}
}
// at this point we compared every value and they were all the
// same, thus the lists must be equal
return true;
}
/** main
* The main entry point for this program. Execution of this
program
* will begin with this main function.
*
* @param argc The command line argument count which is the
20. number of
* command line arguments provided by user when they
started
* the program.
* @param argv The command line arguments, an array of
character
* arrays.
*
* @returns An int value indicating program exit status.
Usually 0
* is returned to indicate normal exit and a non-zero value
* is returned to indicate an error condition.
*/
int main(int argc, char** argv)
{
// variables used for the function/unit tests
int length;
// test of swap function ---------------------------------------------
---
cout << "Test swapListValues() -----------------------------------
-------" << endl;
// basic test
length = 2;
int testvals1[] = {5, 10};
int expected1[] = {10, 5};
// swapListValues(testval1, 0, 1);
// cout << "swapListValues() test 1, swap 2 values" << endl
// << " expected: " << tostring(expected1, length) << endl
// << " actual : " << tostring(testvals1, length) << endl
// << endl;
// assert(listsAreEqual(testvals1, expected1, length));
// test if indexes are equal, important, should not cause any
change
21. length= 2;
int testvals2[] = {8, 6};
int expected2[] = {8, 6};
// swapListValues(testvals2, 1, 1);
// cout << "swapListValues() test 2, same index" << endl
// << " expected: " << tostring(expected2, length) << endl
// << " actual : " << tostring(testvals2, length) << endl
// << endl;
// assert(listsAreEqual(testvals2, expected2, length));
// more general tests, swap values in middle of list
length = 12;
int testvals3[] = {2, 7, 9, 3, 8, 4, 2, 9, 5, 8, 6, 1};
int expected3[] = {2, 7, 6, 3, 8, 4, 2, 9, 5, 8, 9, 1};
// swapListValues(testvals3, 2, 10);
// cout << "swapListValues() test 3, swap 2 values from inside
of list" << endl
// << " expected: " << tostring(expected3, length) << endl
// << " actual : " << tostring(testvals3, length) << endl
// << endl;
// assert(listsAreEqual(testvals3, expected3, length));
// swap back, reverse indexes in function call
// continuing to use testvals after previous test here
length = 12;
int expected4[] = {2, 7, 9, 3, 8, 4, 2, 9, 5, 8, 6, 1};
// swapListValues(testvals3, 10, 2);
// cout << "swapListValues() test 4, reverse the previous
swap" << endl
// << " expected: " << tostring(expected4, length) << endl
// << " actual : " << tostring(testvals3, length) << endl
// << endl;
// assert(listsAreEqual(testvals3, expected4, length));
// swap with index 0 on a bigger list
// still using previous testvals
22. length = 12;
int expected5[] = {4, 7, 9, 3, 8, 2, 2, 9, 5, 8, 6, 1};
// swapListValues(testvals3, 5, 0);
// cout << "swapListValues() test 5, swap with index 0" <<
endl
// << " expected: " << tostring(expected5, length) << endl
// << " actual : " << tostring(testvals3, length) << endl
// << endl;
// assert(listsAreEqual(testvals3, expected5, length));
// swap with last index on a bigger list
// still using previous testvals
length = 12;
int expected6[] = {4, 7, 9, 3, 8, 2, 1, 9, 5, 8, 6, 2};
// swapListValues(testvals3, 6, 11);
// cout << "swapListValues() test 6, swap with last index" <<
endl
// << " expected: " << tostring(expected6, length) << endl
// << " actual : " << tostring(testvals3, length) << endl
// << endl;
// assert(listsAreEqual(testvals3, expected6, length));
// test of findAndSwapPivot function -----------------------------
-------
cout << endl;
cout << "Test findAndSwapPivot() --------------------------------
--------" << endl;
int expectedPivotValue;
int actualPivotValue;
// basic test on a small list
length = 3;
int testvals7[] = {5, 3, 8};
int expected7[] = {5, 8, 3};
expectedPivotValue = 3;
23. // actualPivotValue = findAndSwapPivot(testvals7, 0, length-
1);
// cout << "findAndSwapPivot() test 1, basic test" << endl
// << " expected: " << tostring(expected7, length) <<
endl
// << " expected pivot: " << expectedPivotValue << endl
// << " actual: " << tostring(testvals7, length) <<
endl
// << " actual pivot: " << actualPivotValue << endl
// << endl;
// assert(listsAreEqual(testvals7, expected7, length));
// assert(actualPivotValue == expectedPivotValue);
// test on list of length 1, should work nothing will be done
length = 1;
int testvals8[] = {5};
int expected8[] = {5};
expectedPivotValue = 5;
// actualPivotValue = findAndSwapPivot(testvals8, 0, length-
1);
// cout << "findAndSwapPivot() test 2, test list size 1" << endl
// << " expected: " << tostring(expected8, length) <<
endl
// << " expected pivot: " << expectedPivotValue << endl
// << " actual: " << tostring(testvals8, length) <<
endl
// << " actual pivot: " << actualPivotValue << endl
// << endl;
// assert(listsAreEqual(testvals8, expected8, length));
// assert(actualPivotValue == expectedPivotValue);
// general test on a bigger list, even number of values
length = 10;
int testvals9[] = {5, 2, 8, 7, 3, 9, 1, 4, 5, 8};
int expected9[] = {5, 2, 8, 7, 8, 9, 1, 4, 5, 3};
expectedPivotValue = 3;
24. // actualPivotValue = findAndSwapPivot(testvals9, 0, length-
1);
// cout << "findAndSwapPivot() test 3, bigger list with even
number of values" << endl
// << " expected: " << tostring(expected9, length) <<
endl
// << " expected pivot: " << expectedPivotValue << endl
// << " actual: " << tostring(testvals9, length) <<
endl
// << " actual pivot: " << actualPivotValue << endl
// << endl;
// assert(listsAreEqual(testvals9, expected9, length));
// assert(actualPivotValue == expectedPivotValue);
// general test on a bigger list, odd number of values
length = 15;
int testvals10[] = {5, 2, 8, 7, 3, 9, 1, 42, 5, 8, 10, 11, 15, 22,
18};
int expected10[] = {5, 2, 8, 7, 3, 9, 1, 18, 5, 8, 10, 11, 15, 22,
42};
expectedPivotValue = 42;
// actualPivotValue = findAndSwapPivot(testvals10, 0, length-
1);
// cout << "findAndSwapPivot() test 4, bigger list with odd
number of values" << endl
// << " expected: " << tostring(expected10, length) <<
endl
// << " expected pivot: " << expectedPivotValue << endl
// << " actual: " << tostring(testvals10, length) <<
endl
// << " actual pivot: " << actualPivotValue << endl
// << endl;
// assert(listsAreEqual(testvals10, expected10, length));
// assert(actualPivotValue == expectedPivotValue);
25. // test of partitionList function -------------------------------------
--
cout << endl;
cout << "Test partitionList() ---------------------------------------
----" << endl;
int expectedPivotIndex;
int actualPivotIndex;
// work from general to more specific stress tests.
// most general test, partition list approximately in middle.
// note that pivot needs to be on the end of list, and for a list of
size n
// the valid indexes are from 0 to n-1, but the partition values
is at index
// n-1, so we call partitionList from indexes 0 to n-2
length = 10;
int testvals11[] = {8, 3, 7, 6, 9, 2, 4, 8, 1, 5};
int expected11[] = {1, 3, 4, 2, 9, 6, 7, 8, 8, 5};
expectedPivotIndex = 4;
// actualPivotIndex = partitionList(testvals11, 0, length-2,
testvals11[length-1]);
// cout << "partitionList() test 1, basic test" << endl
// << " expected: " << tostring(expected11, length) <<
endl
// << " expected pivot: " << expectedPivotIndex <<endl
// << " actual: " << tostring(testvals11, length) <<
endl
// << " actual pivot: " << actualPivotIndex << endl
// << endl;
// assert(listsAreEqual(testvals11, expected11, length));
// assert(actualPivotIndex == expectedPivotIndex);
// another general test, also this tests that all values == pivot
end
// up being moved to the right
length = 15;
26. int testvals12[] = {12, 7, 10, 19, 6, 18, 12, 15, 6, 10, 4, 13, 11,
17, 10};
int expected12[] = {4, 7, 6, 6, 19, 18, 12, 15, 10, 10, 12, 13,
11, 17, 10};
expectedPivotIndex = 4;
// actualPivotIndex = partitionList(testvals12, 0, length-2,
testvals12[length-1]);
// cout << "partitionList() test 2, bigger test and some
duplicates of the pivot" << endl
// << " expected: " << tostring(expected12, length) <<
endl
// << " expected pivot: " << expectedPivotIndex <<endl
// << " actual: " << tostring(testvals12, length) <<
endl
// << " actual pivot: " << actualPivotIndex << endl
// << endl;
// assert(listsAreEqual(testvals12, expected12, length));
// assert(actualPivotIndex == expectedPivotIndex);
// test everything is to left of pivot is working
length = 6;
int testvals13[] = {4, 3, 7, 6, 5, 10};
int expected13[] = {4, 3, 7, 6, 5, 10};
expectedPivotIndex = 5;
// actualPivotIndex = partitionList(testvals13, 0, length-2,
testvals13[length-1]);
// cout << "partitionList() test 3, everything is smaller than
pivot value" << endl
// << " expected: " << tostring(expected13, length) <<
endl
// << " expected pivot: " << expectedPivotIndex <<endl
// << " actual: " << tostring(testvals13, length) <<
endl
// << " actual pivot: " << actualPivotIndex << endl
// << endl;
// assert(listsAreEqual(testvals13, expected13, length));
27. // assert(actualPivotIndex == expectedPivotIndex);
// test everything is to right of pivot is working
length = 6;
int testvals14[] = {4, 3, 7, 6, 5, 2};
int expected14[] = {4, 3, 7, 6, 5, 2};
expectedPivotIndex = 0;
// actualPivotIndex = partitionList(testvals14, 0, length-2,
testvals14[length-1]);
// cout << "partitionList() test 4, everything is bigger than
pivot value" << endl
// << " expected: " << tostring(expected14, length) <<
endl
// << " expected pivot: " << expectedPivotIndex <<endl
// << " actual: " << tostring(testvals14, length) <<
endl
// << " actual pivot: " << actualPivotIndex << endl
// << endl;
// assert(listsAreEqual(testvals14, expected14, length));
// assert(actualPivotIndex == expectedPivotIndex);
// test small list that needs to be swapped
length = 3;
int testvals15[] = {8, 2, 4};
int expected15[] = {2, 8, 4};
expectedPivotIndex = 1;
// actualPivotIndex = partitionList(testvals15, 0, length-2,
testvals15[length-1]);
// cout << "partitionList() test 5, small list that needs a swap"
<< endl
// << " expected: " << tostring(expected15, length) <<
endl
// << " expected pivot: " << expectedPivotIndex <<endl
// << " actual: " << tostring(testvals15, length) <<
endl
// << " actual pivot: " << actualPivotIndex << endl
28. // << endl;
// assert(listsAreEqual(testvals15, expected15, length));
// assert(actualPivotIndex == expectedPivotIndex);
// list of only 1 item (besides pivot value), still needs to work
length = 2;
int testvals16[] = {8, 4};
int expected16[] = {8, 4};
expectedPivotIndex = 0;
// actualPivotIndex = partitionList(testvals16, 0, length-2,
testvals16[length-1]);
// cout << "partitionList() test 6, list of size 1 (and pivot
value)" << endl
// << " expected: " << tostring(expected16, length) <<
endl
// << " expected pivot: " << expectedPivotIndex <<endl
// << " actual: " << tostring(testvals16, length) <<
endl
// << " actual pivot: " << actualPivotIndex << endl
// << endl;
// assert(listsAreEqual(testvals16, expected16, length));
// assert(actualPivotIndex == expectedPivotIndex);
// list of only 1 item, but the pivot is bigger
length = 2;
int testvals17[] = {8, 12};
int expected17[] = {8, 12};
expectedPivotIndex = 1;
// actualPivotIndex = partitionList(testvals17, 0, length-2,
testvals17[length-1]);
// cout << "partitionList() test 7, list of size 1, pivot value is
larger" << endl
// << " expected: " << tostring(expected17, length) <<
endl
// << " expected pivot: " << expectedPivotIndex <<endl
// << " actual: " << tostring(testvals17, length) <<