Problem 3 Consider the following sequence of keys: (22,45,2,10,18,16,5,30,50,12,1) Consider the insertion of items with this...
R-11.22 Consider the sequence of keys (5, 16, 22,45,2, 10, 18,30,50, 12,1. Draw the result of inserting entries with these keys (in the given order) into a. An initially empty (2,4) tree. b. An initially empty red-black tree R-11.22 Consider the sequence of keys (5, 16, 22,45,2, 10, 18,30,50, 12,1. Draw the result of inserting entries with these keys (in the given order) into a. An initially empty (2,4) tree. b. An initially empty red-black tree
Red-Black Tree: Show the sequence of red-black trees that result after successively inserting the keys into an initially empty red-black tree in the order given: K = < 20, 5, 1, 12, 7 >. (Show at least one tree resulting from each insertion). State which case from the textbook (Introduction to Algorithms, 3rd Edition by Thomas H. Cormen et al) applies. Assume that the root is always colored black.)
Draw the red-black BST that results when you insert items with the keys EASYQUTION in that order into an initially empty tree.
1- Insert in the given order the following values into an intially empty 2-3-4 tree: 100, 200, 300, 400, 500, 600, 700, 110, 120, 130, 800, 750, 690. Show how the tree evolves after each value is inserted. In other words, draw a picture of the tree after each insertion. 2- Insert the same sequence as above into an initially empty red-black tree. Again draw a picture of the tree after each insertion, and indicate which rotations and/or color flips...
Draw the perfect skip list that results when you insert items with the keys 19, 6, 26, 9, 2, 12, 25, 7, 21 and 17 in that order into an initially empty perfect skip list. Draw the randomized skip list that results when you insert items with the keys 19, 6, 26, 9, 2, 12, 25, 7, 21 and 17 in that order into an initially empty randomized skip list. Compare the binary search tree with the perfect skip list...
Multi-Level Indexing. Construct a B+-tree for a data file that contains 10 records with the following key values, respectively: 23, 26,43,77,4,92 The index fan-out p 3, that is, each internal tree node of the B+-tree contains at most p-1 = 2 keys and p = 3 pointers; the underlying data file has a blocking factor pI-2, that is, each leaf of the B+-tree contains at most pI-2 data records. Assume that the tree is initially empty and records are added...
1a) Draw the 2-3 tree that results when you insert the keys S E A R C H X M P L Y in that order into an initially empty tree. 1b) Construct the corresponding left leaning red-black tree from part a. 1c) Find a sequence of keys to insert into a BST and a left leaning red-black BST such that the height of the BST is less than the height of the left leaning red-black BST, or prove that...
PROBLEM 6: Suppose we insert keys below into an initially empty Vanilla binary search tree in the given order: 6, 9, 2, 1, 5, 7, 10, 8, 3, 4 (a) Draw the resulting binary search tree. (b) List the keys according to: A pre-order traversal An in-order traversal A post-order traversal (c) Now we perform some deletions using the “deletion by copying” strategy in which promoted keys are always drawn from a node’s right subtree (so that there is only...
Given a set of 10 records with priorities S = {10, 15, 3, 8, 20, 5, 17, 27, 19, 22}. Construct a 2-3 tree T for S by inserting the records, in the given order, into an initially empty 2-3 tree. When done, delete 10, and then 17 from the tree. Construct a 2-3 tree T for S by inserting the records, in the reverse given order, into an initially empty 2-3 tree. When done, delete 10, and then 17...
PROBLEM 6: Suppose we insert keys below into an initially empty binary search tree in the given order 6, 9, 2, 1, 5, 7, 10, 8, 3,4 (a) Draw the resulting binary search tree. (b) List the keys according to: A pre-order traversal An in-order traversal A post-order traversal (c) Now we perform some deletions using the "deletion by copying" strategy in which promoted keys are always drawn from a node's right subtree (so that there is only one correct...