I have used rsa to encrypt a small message using my public key-e(corresponding private key-d). But if I decrypt it with another private key d', it gives a
bad padding exception.
How does it know that I have used the wrong key?
Most RSA libraries would default to PKCS#1 block type 2 padding for public key encryption. In that case the data is must be at least 11 bytes less than the modulus size, and the plaintext is padded like:
00 02 r1 r2 r3 r4 ... rM ... 00 [your plaintext bytes]
where M >= 8 and ri are random positive bytes: they are all non-zero.
This is the actual value that raised to the eth power mod the modulus. So upon decryption the decryptor can check that the result looks this, i.e.
Using a padding scheme does give a decryptor a good idea that he is either using the wrong key or is dealing with corrupt data.
Padding schemes have a well-defined set of final bytes of plaintext. If you are decrypting with the wrong key, your resulting "plaintext" is basically random garbage and therefore overwhelmingly unlikely to end in a valid padding sequence.
The mechanism is actually as simple as it is clever.
Imagine a block cipher that encrypts blocks of exactly 8 bytes: it divides each plaintext message into groups of 8 bytes and encrypts each group as a single block. When it comes to the last block, there are two possibilities:
Now, when the message is decrypted, the decryptor can tell unambiguously how many bytes of padding to remove. And if the final block does not end with
Don't confuse this padding with the initialization vector, or IV, that is used to modify the beginning of the message. The purpose of padding is to ensure the message contains only complete blocks, and to allow the decryptor to validate the key. The IV is a random sequence of bytes that ensures the same plaintext can be encrypted many times with the same key, but still generate a different ciphertext each time.