A set of integers may be implemented using an array of integers. Since the array is only partially filled, it is important to store the number of elements contained in the array. The program contains the array itself and another integer to store the actual number of elements in the set. To illustrate, given a set s =(3, 8, 15, 20) 0 1 2 3 elements 3 8 15 20 4 count - 4 Implement the following functions given the definition: typedef int Set [MAX); void initialise (int *count); simply set count to 0 5 6 - A //Set is just an alias for int [MAX] //Set means an array of integers void display (Set s, int count); display on the screen all valid elements of the array, from 0..count-1 void add (Set s, int *count, int elem); - simply store elem in the array indexed by count then increment count int contains (Set s, int count, int elem); search the array elements for the value elem void getUnion (Set result, int *count, Set sl, int countl, count2); store in the array result the set resulting from the union of s1 and 52 x is an element of s1 union s2 if x is an element of s1 or x is an element of s2 void intersection (Set result, int *count, Set sl, int countl, Set 52, int count2); Set s2, int store in the array result the set resulting from the intersection of s1 and s2 x is an element of s1 intersection s2 if x is an element of s1 and x is an element of s2 void difference (Set result, int *count, Set sl, int countl, count2); Set 52, int store in the array result the set resulting from the difference of s1 and s2 x is an element of s1 - 52 if x is an element of s1 and x is not an element of s2 void symmetricdifference (Set result, int *count, Set sl, int countl, Set 2, int count2); store in the array result the set resulting from the symmetric difference of s1 and s2 x is an element of s1 - s2 if x is an element of s1 and x is not an element of s2 and vice versa int subset (Set sl, int countl, Set 52, int count2); s1 is a subset of s2 if all elements of s1 are in s2 int disjoint (Set sl, int countl, Set 52, int count2);
A set of integers may be implemented using an array of integers. Since the array is only partially filled, it is important to store the number of elements contained in the array. The program contains the array itself and another integer to store the actual number of elements in the set. To illustrate, given a set s =(3, 8, 15, 20) 0 1 2 3 elements 3 8 15 20 4 count - 4 Implement the following functions given the definition: typedef int Set [MAX); void initialise (int *count); simply set count to 0 5 6 - A //Set is just an alias for int [MAX] //Set means an array of integers void display (Set s, int count); display on the screen all valid elements of the array, from 0..count-1 void add (Set s, int *count, int elem); - simply store elem in the array indexed by count then increment count int contains (Set s, int count, int elem); search the array elements for the value elem void getUnion (Set result, int *count, Set sl, int countl, count2); store in the array result the set resulting from the union of s1 and 52 x is an element of s1 union s2 if x is an element of s1 or x is an element of s2 void intersection (Set result, int *count, Set sl, int countl, Set 52, int count2); Set s2, int store in the array result the set resulting from the intersection of s1 and s2 x is an element of s1 intersection s2 if x is an element of s1 and x is an element of s2 void difference (Set result, int *count, Set sl, int countl, count2); Set 52, int store in the array result the set resulting from the difference of s1 and s2 x is an element of s1 - 52 if x is an element of s1 and x is not an element of s2 void symmetricdifference (Set result, int *count, Set sl, int countl, Set 2, int count2); store in the array result the set resulting from the symmetric difference of s1 and s2 x is an element of s1 - s2 if x is an element of s1 and x is not an element of s2 and vice versa int subset (Set sl, int countl, Set 52, int count2); s1 is a subset of s2 if all elements of s1 are in s2 int disjoint (Set sl, int countl, Set 52, int count2);
C++ for Engineers and Scientists
4th Edition
ISBN:9781133187844
Author:Bronson, Gary J.
Publisher:Bronson, Gary J.
Chapter7: Arrays
Section: Chapter Questions
Problem 3PP: (Numerical) Given a one-dimensional array of integer numbers, write and test a function that...
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