Actually, if you use RSA *properly*, then you cannot even guess your 'XXX' by trying the 1000 possibilities. The core operation in RSA is a modular exponentiation, but there is a first step called *padding* which transforms the data to encrypt into a big integer (modulo *n*).

The PKCS#1 RSA standard specifies two types of padding; both include a bunch of random bytes. A consequence is the following: if you encrypt twice the same message with the same key, you will get two *distinct* encrypted messages. The point is, precisely, to avoid the situation which you allude to: being able to "guess" the encrypted message and verify whether the guess is right or not, with only the public key (which is public, hence assumed to be known by every attacker).

Therefore, to answer your question: *if* you can find your 'XXX', either by trying only 1000 RSA encryption, or through any kind of clever shortcut, *then* your RSA is very wrong.