# Max product of the three numbers for a given array of size N

I need to write a program to find the Max product of three numbers for a given array of size N. Is there any effective algorithm for this? I just need to know the algorithm steps. Non of algorithms that i thought works for all the test cases. Thanks! FYI Array may contains +ve, -ve, or zero elements)

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Find the three largest numbers in the array (n1, n2, n3) and the two smallest numbers (m1, m2).

The answer is either n1 x n2 x n3 or n1 x m1 x m2

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Why isn't it just n1 x n2 x n3? –  Joseph Salisbury Feb 2 '10 at 20:35
@Ink-Jet because m1 and m2 might be large negative numbers –  mob Feb 2 '10 at 20:37
Excluding 0, of course :) –  BlueRaja - Danny Pflughoeft Feb 2 '10 at 20:40
One other case not covered in this solution is if all the numbers are negative. Then the maximum product is the product of those three numbers with the SMALLEST modulus. –  user85109 Feb 2 '10 at 20:57
@woodchips: Which are the three largest numbers in the array. –  280Z28 Feb 2 '10 at 21:03

Given an array of list = (n1, n2, n3...). You can do this in 3 passes.

``````Let a1 = max (|n_i|)
Let a2 = max (|n_i|) where n_i != a1
``````

Now a1*a2 is either positive, negative or zero. If zero then there are many solutions; pick any n_i from the rest of the numbers. If a1*a2 > 0 then pick the largest positive number otherwise smallest negative number. More succinctly, you can just make one pass through the rest of the list:

``````Let max_product = max (a1*a2*n_i) where n_i != a1 or a2
``````
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The method get the max product of 3 consists in basically find the biggest 3 numbers from the array and the smallest 2 numbers from the array in just 1 iteration over the array. There are of course a large variety of solutions but this is the optimal 1 because the time to solve the problem is O(n), the other solutions time is O(n lg n)

Here is the java code: by the way there is a guarantee that the input array is non empty and contains minimum 3 elements so there is no need to extra checks for empty and so on.

``````  int solution(int[] a) {
``````

/* the minimums initialized with max int to avoid cases with extreme max in array and false minims 0 minimums returned */

int min1 = Integer.MAX_VALUE;

int min2 = Integer.MAX_VALUE;

/* the same logic for maximum initializations but of course inverted to avoid extreme minimum values in array and false 0 maximums */

``````    int max1 = Integer.MIN_VALUE;
int max2 = Integer.MIN_VALUE;
int max3 = Integer.MIN_VALUE;
``````

//the iteration over the array

``````    for (int i = 0; i < a.length; i++) {
``````

//test if max1 is smaller than current array value

``````        if (a[i] > max1) {
``````

/* store the max1 current value in a temp var to test it later against the second maximum here as you can see is a chain of changes if is changed the biggest max we must change the other 2 */

``````            int tempMax1 = max1;
``````

//assign the current array value as maximum

``````            max1=a[i];
``````

//test tempMax1 former max1 value against max2

``````            if(tempMax1>max2){
``````

/* store max2 value in tempMax2 value to test it against max3 and assign it to max 3 if it's bigger */

``````                int tempMax2 = max2;
max2 =tempMax1;
if(tempMax2>max3){
max3 = tempMax2;
}
``````

/* test to see if tempMax1 is bigger if isn't bigger than max3, this is happening when max1 gets a new value and the old value of max1 is equal with max2 but bigger than max3 */

``````            }else{
if(tempMax1>max3){
max3 = tempMax1;
}
}
``````

/* in case if current a[i] isn't bigger than max1 we test it to see maybe is bigger than second max. Then the same logic from above is applied here to max3 */

``````        }else if(a[i]>max2){
int tempMax2 = max2;
max2 = a[i];
if(tempMax2>max3){
max3 =tempMax2;
}
``````

/* finally if current array value isn't bigger than max1 and max2 maybe is greater than max3 */

``````        }else if(a[i]>max3){
max3 = a[i];
}
``````

/* The logic from above with maximums is is applied here with minimums but of course inverted to discover the 2 minimums from current array. */

``````        if (a[i] < min1) {
int tempMin1 = min1;
min1 = a[i];
if (tempMin1 < min2) {
min2 = tempMin1;
}
} else if (a[i] < min2) {
min2 = a[i];
}
}
``````

/* after we discovered the 3 greatest maximums and the 2 smallest minimums from the array we do the 2 products of 3 from the greatest maximum and the 2 minimums . This is necessary because mathematically the product of 2 negative values is a positive value, and because of this the product of min1 * min2 * max1 can be greater than max1 * max2 * max3 and the product built from the the 3 maximums. */

``````    int prod1 = min1 * min2 * max1;
int prod2 = max1 * max2 * max3;
``````

//here we just return the biggest product

``````    return prod1 > prod2 ? prod1 : prod2;

}
``````
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