There's a child's game in the USA where one child picks a number between 1 and 10, and the other child has to guess that number. If they guess wrong, the first child says "higher" or "lower".
Most kids start out guessing randomly, and will take about 4-5 tries on average to succeed. I realized (and this is probably why I ended up in computer science), that the best thing to do is pick the mid point (5.5, so pick either 5 or 6. I'll go with 5.). Based on what they say ("higher" or "lower"), select a new range, either 1-4 or 6-10. Pick the number in the middle of that range (2 or 8). Keep splitting the range in half until you get the number.
That's a binary search on a sorted array (the sorted array being numbers from 1 to 10).
To implement that in code, just keep doing the same process described above. Pick the midpoint of the range, and create a new range based on the answer.
Here's one solution in Java that does this recurvively:
public class BinarySearchRecursive
public static final int NOT_FOUND = -1;
* Performs the standard binary search
* using two comparisons per level.
* This is a driver that calls the recursive method.
* @return index where item is found or NOT_FOUND if not found.
public static int binarySearch( Comparable [ ] a, Comparable x )
return binarySearch( a, x, 0, a.length -1 );
* Hidden recursive routine.
private static int binarySearch( Comparable [ ] a, Comparable x,
int low, int high )
if( low > high )
int mid = ( low + high ) / 2;
if( a[ mid ].compareTo( x ) < 0 )
return binarySearch( a, x, mid + 1, high );
else if( a[ mid ].compareTo( x ) > 0 )
return binarySearch( a, x, low, mid - 1 );
// Test program
public static void main( String [ ] args )
int SIZE = 8;
Comparable [ ] a = new Integer [ SIZE ];
for( int i = 0; i < SIZE; i++ )
a[ i ] = new Integer( i * 2 );
for( int i = 0; i < SIZE * 2; i++ )
System.out.println( "Found " + i + " at " +
binarySearch( a, new Integer( i ) ) );