# Given a target sum, find if there is a pair of element in the given array which sums up to it

``````import java.util.HashMap;

public class target
{
public static void hash(int []a,int sum)
{
HashMap<Integer, Integer> map = new HashMap<Integer, Integer>();

int i;

for (i = 0; i < a.length; ++i)
map.put(a[i], sum-a[i]);

for (i = 0; i < a.length; ++i)
if(map.containsValue(a[i]) && map.get(a[i])!=null)
{
System.out.println("("+a[i]+","+map.get(a[i])+")");
map.remove(a[i]);
}
}

public static void main(String[] args)
{
int []a={1, 2, 13, 34, 9, 3, 23, 45, 8, 7, 8, 3, 2};
hash(a,11);
}
}
``````

I want to know if there is a better and more efficient solution that the above one. Complexity of this is n. Can I do better?

-
Working algorithm for this problem cannot be faster than `O(n)`, because you have to check every element in worst case. – pajton Apr 22 '11 at 22:45
For one, you could exclude all values that exceed the target sum before you even add them to the list. (Unless negative values are allowed too.) – EboMike Apr 22 '11 at 22:45
Also, your code would return false positives for even numbers if their half is in the list once. Example: `int[] a={1}; hash(a,2);` – EboMike Apr 22 '11 at 22:47
it won't detect repeated pairs – sehe Apr 22 '11 at 22:49
Your algorithm is not O(N) because the map.countainsValue makes a search through all the values of the HashMap. See my suggested solution. – Pih May 6 '11 at 23:36

You could

1. sort the array
2. iterate from the start and for each element

• calculate the required complement (sum - element)
• do a reverse binary search (from the end of the sorted array) looking for that precise value

• if found, remove both

It boils down to the observation that, with elements sorted:

`````` n1 < n2 < n3 < n4 < n5 < n6
``````

the most likely pairs are coming symmetrically from both ends to the middle. Now, the worst case is still bad, but at least you don't have the hashtable overhead

-
I dont want to print duplicate pairs. – Ava Apr 23 '11 at 0:01
It is a O(n log(n)) solution and removing an random array element has O(n) cost. – Pih May 6 '11 at 23:47
@sehe: 1. Sort the array step is O(n^2) in worst case. Also if you go for qsort, it is recursive, i.e., it uses O(n) extra space in worst case. – Rajendra Kumar Uppal Aug 14 '11 at 6:49

As I commented, your sollution is not O(N), because the containsValue make a search of all values stored at the HashMap. To solve it, I made a different approach using your solution:

``````  public static void newVersion(int[] a, int sum){
HashMap<Integer, Boolean> map = new HashMap<Integer, Boolean>();

for (int i= 0; i< a.length; i++) {
map.put(sum - a[i], true);
}

for (int i = 0; i < a.length; i++) {
if (map.containsKey(a[i]) && map.get(a[i])) {
System.out.println("("+(sum-a[i])+","+a[i]+")");
map.put(a[i], false);
map.put(sum-a[i], false);
}
}

}
``````

At the first step, it stores the "complement value" of each integer and at the second step it checks if the complement exists. If it exists, mark both pair as used.

This complexity is:

``````* O(N) for the first looping
* O(N) * (O(1) + O(1)) for the second loop and the containsValue and get.
* Finally: O(N) + O(N) .:.  O(N) solution,
``````
-
Won't work for this case: int[] inputArr = {1,2,3,4,5,0}; and newVersion(inputArr,4); Output would be: (3,1) (2,2) (0,4) – madCode Dec 29 '12 at 23:07
Because it expects to have a sorted input. – Pih Feb 7 '13 at 13:03

I have the following solution for this problem. The time complexity should be O(N) because the HashMap operations put, get and keySet are O(1).

``````import java.util.HashMap;
import java.util.Map;

/**
* Find a pair of numbers in an array given a target sum
*
*
*/

public class FindNums {

public static void findSumsForTarget(int[] input, int target)
{
// just print it instead of returning

Map<Integer, String> myMap = populateMap(input);

// iterate over key set
for (Integer currKey : myMap.keySet()) {
// find the diff
Integer diff = target - currKey;

// check if diff exists in the map
String diffMapValue = myMap.get(diff);
if(diffMapValue!=null)
{
// sum exists
String output = "Sum of parts for target " + target + " are " + currKey + " and " + diff;
System.out.println(output);
return; // exit; we're done - unless we wanted all the possible pairs and permutations
}
//          else
// keep looking
}
System.out.println("No matches found!");

}

private static Map<Integer, String> populateMap(int[] input)
{
Map<Integer,String> myMap = new HashMap<Integer,String>();
for (int i = 0; i < input.length; i++) {
String currInputVal = myMap.get(input[i]);
{
// append current index location to value
currInputVal = currInputVal + ", " + i;
// do a put with the updated value
myMap.put(input[i], currInputVal);
}
else
{
myMap.put(input[i], Integer.toString(i)); // first argument is autoboxed to Integer class
}
}

return myMap;
}

// test it out!
public static void main(String[] args)
{
int[] input1 = {2,3,8,12,1,4,7,3,8,22};
int[] input2 = {1,2,3,4,5,6,7,8,9,10};
int[] input3 = {2,-3,8,12,1,4,7,3,8,22};
int target1 = 19;
int target2 = 16;

// test
FindNums.findSumsForTarget(input1, target1);
FindNums.findSumsForTarget(input1, -1);
FindNums.findSumsForTarget(input2, target2);
FindNums.findSumsForTarget(input3, target1);

}

}
``````
-
``````import java.util.*;
import java.io.*;
class hashsum
{
public static void main(String arg[])throws IOException
{
HashMap h1=new HashMap();
h1.put("1st",new Integer(10));
h1.put("2nd",new Integer(24));
h1.put("3rd",new Integer(12));
h1.put("4th",new Integer(9));
h1.put("5th",new Integer(43));
h1.put("6th",new Integer(13));
h1.put("7th",new Integer(5));
h1.put("8th",new Integer(32));

System.out.println("Enter no.");

Iterator i=h1.entrySet().iterator();

boolean flag=false;
while(i.hasNext())
{

Map.Entry e1=(Map.Entry)i.next();
Integer n1=(Integer)e1.getValue();

Iterator j=h1.entrySet().iterator();
while(j.hasNext())
{
Map.Entry e2=(Map.Entry)j.next();

Integer n2=(Integer)e2.getValue();

if(no==(n1+n2))
{
System.out.println("Pair of elements:"+n1 +" "+n2);
flag=true;
}
}
}
if(flag==false)
System.out.println("No pairs");
}
}
``````
-
``````public static void hash1(int[] a, int num) {
Arrays.sort(a);
// printArray(a);

int top = 0;
int bott = a.length - 1;

while (top < bott) {

while (a[bott] > num)
bott--;

int sum = a[top] + a[bott];

if (sum == num) {
System.out.println("Pair " + a[top] + " " + a[bott]);
top++;
bott--;
}

if (sum < num)
top++;
if (sum > num)
bott--;
}

}
``````
-
A little explanation would be a good asset to this answer. – ForceMagic Oct 16 '12 at 3:39

Solution: O(n) time and O(log(n)) space.

``````public static boolean array_find(Integer[] a, int X)
{
boolean[] b = new boolean[X];
int i;
for (i=0;i<a.length;i++){
int temp = X-a[i];
if(temp >= 0 && temp < X) //make sure you are in the bound or b
b[temp]=true;
}
for (i=0;i<a.length;i++)
if(a[i]<X && b[a[i]]) return true;
return false;
}
``````
-
this won't work for [5,9,25,3,6] and the target sum given is 6, although it can't be achieved, it will still return true – Rohan Dalvi Feb 12 '14 at 19:35

Recursively to find the subset whose sum is the targeted sum from given array.

``````import java.util.ArrayList;
import java.util.HashSet;
import java.util.List;
import java.util.Set;

public class Main {
public static Set<List<Integer>> set = new HashSet<>();

public static void main(String[] args) {
int[] biggerArray = {1, 2, 1, 1};
int targetedSum = 3;
findSubset(biggerArray, targetedSum);
}

public static void findSubset(int[] biggerArray, int targetedSum) {
for (int i = 0; i < biggerArray.length; i++) {
List<Integer> subset = new ArrayList<>();
if (biggerArray[i] > targetedSum)
continue;
else
if (i + 1 < biggerArray.length)
find(subset, i, biggerArray, targetedSum, i);
}
System.out.println(set);
}

public static List<Integer> find(List<Integer> subset, int startIndex, final int[] biggerArray, final int targetedSum, final int skipIndex) {
if (skipIndex == startIndex) {
find(subset, startIndex + 1, biggerArray, targetedSum, skipIndex);
return null;
}

int subsetSum = findSumOfList(subset);
int remainedSum = targetedSum - subsetSum;
int i = startIndex;

if (remainedSum == 0) {
return null;
}

if ((startIndex < biggerArray.length) && (biggerArray[startIndex] == remainedSum)) {
List<Integer> temp = new ArrayList<Integer>(subset);
}
else if ((startIndex < biggerArray.length) && (biggerArray[startIndex] < remainedSum)) {
while (i + 1 <= biggerArray.length) {
List<Integer> temp = new ArrayList<Integer>(subset);
if (i != skipIndex) {
find(temp, ++i, biggerArray, targetedSum, skipIndex);
}
else {
i = i + 1;
}
}
}
else if ((startIndex < biggerArray.length) && (biggerArray[startIndex] > remainedSum)) {
find(subset, ++i, biggerArray, targetedSum, skipIndex);
}

return null;
}

public static int findSumOfList(List<Integer> list) {
int i = 0;
for (int j : list) {
i = i + j;
}
return i;
}
}
``````
-
Please put some explanation with your code. – DeshDeep Singh Aug 4 '15 at 5:58

We need not have two for loops. The match can be detected in the same loop while populating the map it self.

``````   public static void matchingTargetSumPair(int[] input, int target){
Map<Integer, Integer> targetMap = new HashMap<Integer, Integer>();
for(int i=0; i<input.length; i++){
targetMap.put(input[i],target - input[i]);
if(targetMap.containsKey(target - input[i])){
System.out.println("Mathcing Pair: "+(target - input[i])+" , "+input[i]);
}
}
}

public static void main(String[] args) {
int[] targetInput = {1,2,4,5,8,12};
int target = 9;
matchingTargetSumPair(targetInput, target);
}
``````
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