WGU C949 STUDY GUIDE
Dictionary method
D1[key].remove(value)
hash table searching
Hash tables support fast search, insert, and remove. Requires on average O(1) Linear search requires O(N)
Heap storage
Heaps are typically stored using arrays. Given a tree representation of a heap, the heap's array form is produced by traversing the tree's levels from left to right and top to bottom. The root node is always the entry at index 0 in the array, the root's left child is the entry at index 1, the root's right child is the entry at index 2, and so on.
Linked list vs Array
If a program requires fast insertion of new data, a linked list is a better choice than an array.
Binary Tree
In a list, each node has up to one successor. In a binary tree, each node has up to two children, known as a left child and a right child. "Binary" means two, referring to the two children.
Doubly-linked lists
In a previous section, the LinkedList class was defined, making use of the Node class. The Node class defined previously can be extended from the singly-linked list version to include a reference variable called prev that refers to the previous node in the list. When a new node is first constructed, the prev variable is assigned with None. Creating a doubly-linked node or a doubly-linked list is still the same as creating a singly-linked node and a singly-linked list. A linked list's head node does not have a previous node, thus the prev data member has a value of None.
Binary search
is an algorithm that searches a SORTED LIST for a key by first comparing the key to the middle element in the list and recursively searching half of the remaining list so long as the key is not found.
vertex
item in a graph. A finite set of vertices also called as nodes V -> Number of Vertices
Heap - left_child_index
left_child_index = 2 * node_index + 1
Hashing
mapping each item to a location in an array (in a hash table).
Hash key
value used to map an index
Quickselect algorithm
**Look for keywords "Pivot" and/or "Split" selects the kth smallest element in a list. Ex: Running quickselect on the list (15, 73, 5, 88, 9) with k = 0, returns the smallest element in the list, or 5. The best case and average runtime complexity of quickselect are both O(N). In the worst case, quickselect may sort the entire list, resulting in a runtime of O(N2). Figure 11.21.1: Quickselect algorithm. // Selects kth smallest element, where k is 0-based Quickselect(numbers, first, last, k) { if (first >= last) return numbers[first] lowLastIndex = Partition(numbers, first, last) if (k <= lowLastIndex) return Quickselect(numbers, first, lowLastIndex, k) return Quickselect(numbers, lowLastIndex + 1, last, k) }
Merge sort algorithm
**Look for something that continually splits a list in half. A sorting algorithm that divides a list into two halves, recursively sorts each half, and then merges the sorted halves to produce a sorted list. The recursive partitioning continues until a list of 1 element is reached, as list of 1 element is already sorted. mergedNumbers[mergePos] = numbers[rightPos]
Bucket sort algorithm
**Look for something that distributes the values into "buckets" where they are individually sorted. **Bucket sort is mainly useful when input is uniformly distributed over a range. The bucket index is calculated as ⌊number∗(N−1)/M⌋ N =number of buckets M =maximum value of M ie 71 and 99 placed in the same bucket? 71 bucket 2 71 * (5-1) // 99 = 2 BucketSort(numbers, numbersSize, bucketCount) { if (numbersSize < 1) return buckets = Create list of bucketCount buckets // Find the maximum value maxValue = numbers[0] for (i = 1; i < numbersSize; i++) { if (numbers[i] > maxValue) maxValue = numbers[i] } // Put each number in a bucket for each (number in numbers) { index = floor(number * (bucketCount - 1) / maxValue) Append number to buckets[index] } // Sort each bucket for each (bucket in buckets) Sort(bucket) // Combine all buckets back into numbers list result = Concatenate all buckets together Copy result to numbers }
Bubble sort algorithm
**Look for something that swaps so the result can "bubble" to the top. *best used when the data is small Sorting algorithm that iterates through a list, comparing and swapping adjacent elements if the second element is less than the first element. Bubble sort uses nested loops. Given a list with N elements, the outer i-loop iterates N times. Because of the nested loops, bubble sort has a runtime of O(N2). Bubble sort is often considered impractical for real-world use because many faster sorting algorithms exist. Figure 11.20.1: Bubble sort algorithm. BubbleSort(numbers, numbersSize) { for (i = 0; i < numbersSize - 1; i++) { for (j = 0; j < numbersSize - i - 1; j++) { if (numbers[j] > numbers[j+1]) { temp = numbers[j] numbers[j] = numbers[j + 1] numbers[j + 1] = temp }}
garbage collection
*It reclaims memory from data structures implemented using linked allocations.* Python is a managed language, meaning objects are deallocated automatically by the Python runtime, and not by the programmer's code. When an object is no longer referenced by any variables, the object becomes a candidate for deallocation. Python's garbage collector will deallocate objects with a reference count of 0. However, the time between an object's reference count becoming 0 and that object being deallocated may differ across different Python runtime implementations.
Range(5)
0 1 2 3 4 Every integer from 0 to 4
Radix sort
10 buckets
Assignment vs comparison
= vs ==
Max-Heap
A binary tree that maintains the simple property that a node's key is greater than or equal to the node's childrens' keys. (Actually, a max-heap may be any tree, but is commonly a binary tree). *a max-heap's root always has the maximum key in the entire tree.
Graph
A data structure for representing connections among items, and consists of vertices connected by edges. Graph is a data structure that consists of following two components: A vertex (vertices) represents an item (node) in a graph. An edge represents a connection between two vertices in a graph.
Bianary Search Tree
A data structure in which each node stores data and has up to two children, known as a left child and a right child.
Array
A data structure that stores an ordered list of items, with each item is directly accessible by a positional index.
Linked List
A data structure that stores ordered list of items in nodes, where each node stores data and has a pointer to the next node.
Hash Table
A data structure that stores unordered items by mapping (or hashing) each item to a location in an array (or vector).
Abstract Data Type (ADT)
A data type described by predefined user operations, such as "insert data at rear," without indicating how each operation is implemented.
Double
A data type is a double-precision 64-bit IEEE 754 floating point. For decimal values, this data type is generally the default choice.
Dictionary (Map)
A dictionary is an ADT that associates (or maps) keys with values. Underlying data structures: Binary search tree, Hash table
Dict for loop
A for loop over a dict retrieves each key in the dict. ie.. for key in dictionary:
Linked List
A linear data structure, much like an array, that consists of nodes, where each node contains data as well as a link to the next node, but that does not use contiguous memory. Head and tail node The LinkedList class implements the list data structure and contains two data members, head and tail, which are assigned to nodes once the list is populated. Initially the list has no nodes, so both data members are initially assigned with None. If the node has no next node, the next data member is assigned with None, the Python term signifying the absence of a value.
Array based list
A list ADT implemented using an array. An array-based list supports the common list ADT operations, such as append, prepend, insert after, remove, and search.
Parent
A node with a child is said to be that child's parent.
Internal node
A node with at least one child.
Priority queue
A queue where each item has a priority, and items with higher priority are closer to the front of the queue than items with lower priority. Dups ok Underlying data structures: Heap *In addition to push and pop, a priority queue usually supports peeking and length querying. A peek operation returns the highest priority item, without removing the item from the front of the queue. Pop returns front or head item which is top priority item
Fast sorting algorithm
A sorting algorithm that has an average runtime complexity of O(N logN) or better.
Null
A special value indicating a pointer points to nothing.
Leaf
A tree node with no children.
Max-heap remove
Always a removal of the root, and is done by replacing the root with the last level's last node, and swapping that node with its greatest child until no max-heap property violation occurs. Complexity O(logN)
Set
An ADT for a collection of distinct items. (no dups!) Underlying data structures: Binary search tree, Hash table
List
An ADT for holding ordered data. Dups ok Sequence type: A mutable container with ordered elements. Underlying data structures: Array, linked list
Bag
An ADT for storing items in which the order does not matter and duplicate items are allowed. Underlying data structures: Linked list, Array
Queue
An ADT in which items are inserted at the end of the queue and removed from the front of the queue. *first-in first-out ADT. Underlying data structures: Linked list, Array, Vector The Queue class' push() method uses the LinkedList append() method to insert elements in a queue. Both the Stack and Queue pop() methods operate exactly the same by removing the head element and returning the removed element.
Stack
An ADT in which items are only inserted on or removed from the top of a stack. *Last-in First-Out Underlying data structures: Linked list Push(stack, x), pop(stack), peek(stack), IsEmpty(stack), GetLength(stack) *Pop & peek should not be used on a empty stack.
Tree traversal
An algorithm visits all nodes in the tree once and performs an operation on each node.
Binary search tree (BST)
An especially useful form of binary tree, which has an ordering property that any node's left subtree keys ≤ the node's key, and the right subtree's keys ≥ the node's key. That property enables fast searching for an item, as will be shown later. *When searching, search always starts at the root
Max-heap insert
An insert into a max-heap starts by inserting the node in the tree's last level, and then swapping the node with its parent until no max-heap property violation occurs. The upward movement of a node in a max-heap is sometime called percolating. Complexity O(logN)
Reference Count
An integer counter that represents how many variables reference an object. When an object's reference count is 0, that object is no longer referenced.
Common operations for ADT List
Append, Prepend, InsertAfter, Print, PrintReverse, Sort, Remove, Search, IsEmpty, GetLength
Underlying data structures: Linked list, Array
Bag, Queue, List
Heap - Parent and child indices
Because heaps are not implemented with node structures and parent/child pointers, traversing from a node to parent or child nodes requires referring to nodes by index. The table below shows parent and child index formulas for a heap. ie 1) parent index for node at index 12? 5 *** ((12-1) // 2) = 5 or 12 //2 -1 = 5 2) child indices for a node at index 6? 13 & 14 *** 2 * 6 + 1 = 13 and 2 * 6 + 2 = 14 **Double# and add 1, double# and add 2 Node index Parent Index Child Indices 0 N/A 1, 2 1 0 3, 4 2 0 5, 6 3 1 7, 8 4 1 9, 10 5 2 11, 12
Big-O Complexity Chart
Best to worst O(1) O(log n) O(n) O(n log n) O(n^2) O(2^n) O(nl)
Implementing priority queues with heaps.
Both functions return the value in the root, but the Pop function removes the value and the Peek function does not. Pop is worst-case O(logN) and Peek is worst-case O(1). Push and pop operate have runtime O(logN). All other operations (Peek, IsEmpty, GetLength) happen in constant time O(1).
Implementing a queue in python (Linear data structure)
Can also be implemented in Python using a class with a single LinkedList data member and class methods push() and pop(). push() adds a node to the end of the queue's list by calling LinkedList's append() method. *New elements are added to the end of a queue. The pop() method removed the queue's head node and is identical to Stack's pop() method.
Implementing a stack in python (Linear data structure)
Can be implemented in Python using a class with a single LinkedList data member. The class has two methods, push() and pop(). push() adds a node to the top of the stack's list by calling LinkedList's prepend() method. *New elements are place on the top of the stack, not at the bottom of the stack. pop() removes the head of the stack's list by calling the LinkedList's remove_after() method and then returns the removed node.
Float
Data type is a single-precision 32-bit IEEE 754 floating point. Use a float (instead of double) if you need to save memory in large arrays of floating point numbers.
Byte
Data type is an 8-bit signed two's complement integer. The byte data type is useful for saving memory in large arrays.
Underlying data structures: Linked list
Deque, Stack
Stack operations
Example starting with stack: 99, 77 (top is 99). Push(stack, x) Inserts x on top of stack Push(stack, 44). Stack: 44, 99, 77 Pop(stack) Returns and removes item at top of stack Pop(stack) returns: 99. Stack: 77 Peek(stack) Returns but does not remove item at top of stack Peek(stack) returns 99. Stack still: 99, 77 IsEmpty(stack) Returns true if stack has no items IsEmpty(stack) returns false. GetLength(stack) Returns the number of items in the stack GetLength(stack) returns 2.
Underlying data structures: Heap
Priority queue
Common operations for ADT Queue, Stack, Deque
Push, Pop, Peak, IsEmpty, GetLength
Preorder traversal
Root -> Left -> Right
Big-O Average runtime complexity
Selection sort O(N2) Not fast Insertion sort O(N2) Not fast Shell sort O(N1.5) No fast Quicksort O(NlogN) fast Merge sort O(NlogN) fast Heap sort O(NlogN) fast Radix sort O(N) fast (integer only)
Tuple
Sequence type: An immutable container with ordered elements.
Underlying data structures: Binary search tree, Hash table
Set, Dictionary(Map)
Deque
Short for double-ended queue- an ADT in which items can be inserted and removed at both the front and back. Underlying data structures: Linked list
Min-Heap
Similar to a max-heap, but a node's key is less than or equal to its children's keys.
Pop()
Stack: 99, 77, 66 The pop() removes the head of the stack's list by calling the LinkedList's remove_after() method and then returns the removed node. Pop(stack) returns: 99. Stack: 77 Queue: queue: 43, 12, 77 The pop() method removed the queue's head node and is identical to Stack's pop() method. Pop(queue) returns: 43. Queue: 12, 77 Priority Queue: Removes and returns the item at the front of the queue, which has the highest priority.
Push()
Stack: numStack 7, 5 push() adds a node to the top of the stack's list by calling LinkedList's prepend() method. *New elements are place on the top of the stack, not at the bottom of the stack. push(numStack, 8) = 8, 7, 5 Queue: queue: 43, 12, 77 push() adds a node to the end of the queue's list by calling LinkedList's append() method. *New elements are added to the end of a queue. Push(queue, 56). Queue: 43, 12, 77, 56 Priority Queue: The priority queue push operation inserts an item such that the item is closer to the front than all items of lower priority, and closer to the end than all items of equal or higher priority.
constructor
The __init__ method, commonly known as a constructor, is responsible for setting up the initial state of the new instance.
Depth, level, and height (bianary tree)
The link from a node to a child is called an edge. A node's depth is the number of edges on the path from the root to the node. The root node thus has depth 0. All nodes with the same depth form a tree level. A tree's height is the largest depth of any node. A tree with just one node has height 0.
Root
The one tree node with no parent (the "top" node).
Memory allocation
The process of an application requesting and being granted memory. Memory used by a Python application must be granted to the application by the operating system. When an application requests a specific amount of memory from the operating system, the operating system can then choose to grant or deny the request. Python does this automatically
Percolating
The upward movement of a node in a max-heap
Dictionary key characteristic
They are unique and immutable.
Graph Direction
Undirected Graph : The graph in which all the edges are bidirectional. Directed Graph : The graph in which all the edges are unidirectional.
BST inorder traversal
Visits all nodes in a BST from smallest to largest, which is useful for example to print the tree's nodes in sorted order. Starting from the root, the algorithm recursively prints the left subtree, the current node, and the right subtree. Left -> Root -> Right
O(logN)
We write O(logN) not O(log10N) or O(log^2N)
Graph weight
Weighted Graph : The Graph in which weight is associated with the edges. Unweighted Graph : The Graph in which their is no weight associated to the edges.
edge
a connection between two vertices in a graph. A finite set of ordered pair of the form (u, v) E -> Number of Edges
A binary tree is complete if:
all levels except possibly the last are completely full, and the last level has all its nodes to the left side
A binary tree is perfect if:
if all internal nodes have 2 children and all leaf nodes are at the same level.
modulo operator %
common has function uses this. which computes the integer remainder when dividing two numbers. Ex: For a 20 element hash table, a hash function of key % 20 will map keys to bucket indices 0 to 19.
modulo hash function
computes a bucket index from the items key. It will map (num_keys / num_buckets) keys to each bucket. ie... keys range 0 to 49 will have 5 keys per bucket. 50 / 10 = 5
Node's ancestors
include the node's parent, the parent's parent, etc., up to the tree's root.
bucket
each array element in a hash table ie A 100 elements hash table has 100 buckets
A binary tree is full if:
every node contains 0 or 2 children.
Array in Java
generic class that supports different data types. declared as follows, where T is the data type.
Chaining
handles hash table collisions by using a list for each bucket, where each list may store multiple items that map to the same bucket.
dict methods
my_dict.clear() Removes all items from the dictionary my_dict = {'Bob': 1, 'Jane': 42} my_dict.clear() print(my_dict) {} my_dict.get(key, default) Reads the value of the key entry from the dict. If the key does not exist in the dict, then returns default. my_dict = {'Bob': 1, 'Jane': 42} print(my_dict.get('Jane', 'N/A')) print(my_dict.get('Chad', 'N/A')) 42 N/A my_dict1.update(my_dict2) Merges dictionary my_dict with another dictionary my_dict2. Existing entries in my_dict1 are overwritten if the same keys exist in my_dict2. my_dict = {'Bob': 1, 'Jane': 42} my_dict.update({'John': 50}) print(my_dict) {'Bob': 1, 'Jane': 42, 'John': 50} my_dict.pop(key, default) Removes and returns the key value from the dictionary. If key does not exist, then default is returned. my_dict = {'Bob': 1, 'Jane': 42} val = my_dict.pop('Bob') print(my_dict) {'Jane': 42}
dict operations
my_dict[key] Indexing operation - retrieves the value associated with key. john_grade = my_dict['John'] my_dict[key] = value Adds an entry if the entry does not exist, else modifies the existing entry. my_dict['John'] = 'B+' del my_dict[key] Deletes the key entry from a dict. del my_dict['John'] key in my_dict Tests for existence of key in my_dict if 'John' in my_dict: # ...
Heap - parent_index
parent_index = (node_index - 1) // 2 or node_index // 2 - 1
dict.items()
returns a view object that yields (key, value) tuples.
dict.keys()
returns a view object that yields dictionary keys.
dict.values()
returns a view object that yields dictionary values.
Heap - right_child_index
right_child_index = 2 * node_index + 2