Does adding 2 hash values generate another valid hash value? In other words will this hash(a) + hash(b) != hash(c) + hash(d) always be true? I don't think it will but does it matter? Are the essential properties of the hash function preserved under addition?
Since several values can have the same hash, it could be that hash(a) = hash(b) = hash(c) = hash(d), so also hash(a) + hash(b) = hash(c) + hash(d). 


A hash, by the pidgeonhole theorem, can't be collision free. So hash(a)+hash(b) == hash(c)+hash(d) for some values of a, b, c, and d. Adding hash functions still gets you the good qualities of the hashes that you added together, but it won't make the result any better than the better of the two. (You're not increasing your hash table space.) 


This depends on your hashing algorithm, and in general it will not be true. Given a finite hash table, any two hash keys near the end of the table when added together will clearly give you a hash key off past the limit of your legal hash values. 


I'm working under the assumption that when you say "hash" you're refering to a cryptographic one like MD5 or SHA1, if you're talking about something else... ignore me. Adding hashes together would be kind of a weird process, XORing them might make more sense... ish. It's possible for hash(a) + hash(b) == hash(c) + hash(d), but incredibly unlikely. By merging the two hashes you're creating the possibility (though there's the possibility that hash(a) == hash(c) off the boat, it's just slim). Hashing identical items would clearly result in equality. 


Your question expressed in English doesn't match the expression you give. Do you want to know if:
will always be true? The answer is no. Any value might be a valid hash value. 

