# Array Searching code challenge

Here's my (code golf) challenge: Take two arrays of bytes and determine if the second array is a substring of the first. If it is, output the index at which the contents of the second array appear in the first. If you do not find the second array in the first, then output -1.

Example Input: { 63, 101, 245, 215, 0 } { 245, 215 }

Expected Output: 2

Example Input 2: { 24, 55, 74, 3, 1 } { 24, 56, 74 }

Expected Output 2: -1

Edit: Someone has pointed out that the bool is redundant, so all your function has to do is return an int representing the index of the value or -1 if not found.

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## locked by Shog9♦Apr 3 at 16:50

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the boolean parameter is redudant since res >=0 -> true; res < 0 -> false; this will permit to write the code also for languages without multiple return –  dfa Jul 3 '09 at 13:34
Your use of the term "subset" here may be incorrect. If it would suffice for the bytes of the second array to be present in the first array, then "subset" is correct. However, if it is required that the bytes of the second array be present in the first array as a contiguous sequence maintaining the original order, then the term you are looking for is "substring". –  user57368 Jul 3 '09 at 23:43

PHP AIR CODE 285 CHARACTERS

``````function f(\$a,\$b){
if ( count(\$a) < 1 ) return -1;
if ( count(\$b) < 1 ) return -1;
if ( count(\$a) < count(\$b) ) return -1;

\$x = array_shift(\$a);
\$z = array_shift(\$b);

if (\$x != \$z){
\$r = f( \$x, array_unshift(\$z, \$b) );
return (-1 == \$r) ? -1 : 1 + \$r;
}

\$r = f(\$a, \$b);
return (-1 == \$r) ? -1 : 0;
``````

}

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# Golfscript - 35 bytes

Only 32 bytes for the actual function if we count the same as for J

``````{:b;:a,,{.a@>b,<b={}{;}if}%-1or}:f;

#Test cases (same as J)               output
[63 110 245 215 0] [245 215] f p   #  [2]
[22 55 74 3 1] [24 56 74] f p      #  -1
[1 1 1 2 1 1 3] [1 1]f p           #  [0 1 4]
[0 1 2 3 1 0 2 1 2 0] [1 2] f p    #  [1 7]
``````
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Weird, no one posted the javascript yet..

Solution 1:

`r=s=b.length;s>=0&&(r=a.indexOf(b[0]));for(x=0;x<s;)b[x]!=a[r+x++]&&(r=-1);`

``````function f(a, b) {
r = s = b.length;
if (s >= 0) r = a.indexOf(b[0]);
for (x = 0; x < s;)
if (b[x] != a[r + x++]) r = -1;
return r;
}
``````

Solution 2:

`r=m=-1;b.map(function(d){n=a.indexOf(d);r==m&&(c=r=n);if(n==m||c++!=n)r=m});`

``````function f2(a, b) {
r = m = -1;
b.map(function (i) {
n = a.indexOf(i);
if (r == m) c = r = n;
if (n == m || c++ != n) r = m;
});
return r;
}
``````
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C#

For Lists:

``````public static int IndexOf<T>( List<T> list1, List<T> list2 )
{
return !list2.Except( list1 ).Any() ? list1.IndexOf( list2[0] ) : -1;
}
``````

For Arrays:

``````public static int IndexOf<T>( T[] arr1, T[] arr2 )
{
return !arr2.Except( arr1 ).Any() ? Array.IndexOf( arr1, arr2[0] ) : -1;
}
``````
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