I am testing out the AES 256 CBC implementation in Golang (Go).

```
plaintext: {"key1": "value1", "key2": "value2"}
```

Because the plaintext is 36 B and needs to be a multiple of the block size (16 B) I pad it manually with 12 random bytes to 48 B. I understand that this is not the most secure way of doing it, but I am just testing, I will find a better way for production setups.

Inputs:

```
plaintext: aaaaaaaaaaaa{"key1": "value1", "key2": "value2"}
AES 256 key: b8ae2fe8669c0401fb289e6ab6247924
AES IV: e0332fc2a9743e4f
```

The code excerpt extracted, but modified a bit, from here:

```
block, err := aes.NewCipher(key)
if err != nil {
fmt.Println("Error creating a new AES cipher by using your key!");
fmt.Println(err);
os.Exit(1);
}
ciphertext := make([]byte, aes.BlockSize+len(plaintext))
mode := cipher.NewCBCEncrypter(block, iv)
mode.CryptBlocks(ciphertext, plaintext)
fmt.Printf("%x\n", ciphertext)
fmt.Println("len(ciphertext):",len(ciphertext))
```

CipherText = PlainText + Block - (PlainText MOD Block)

This equation gives the length of the ciphertext for CBC.

So, the line `ciphertext := make([]byte, aes.BlockSize+len(plaintext))`

satisfies this requirement since my plaintext is always padded to be a multiple of the block size.

**Problem:**

With Go I get the following ciphertext:
`caf8fe667f4087e1b67d8c9c57fcb1f56b368cafb4bfecbda1e481661ab7b93d87703fb140368d3034d5187c53861c7400000000000000000000000000000000`

I always get 16 0x00 bytes at the end of my ciphertext, no matter the length of my plaintext.

If i do the same with an online AES calculator I get this ciphertext:
`caf8fe667f4087e1b67d8c9c57fcb1f56b368cafb4bfecbda1e481661ab7b93d87703fb140368d3034d5187c53861c74ccd202bac41937be75731f23796f1516`

The first 48 bytes `caf8fe667f4087e1b67d8c9c57fcb1f56b368cafb4bfecbda1e481661ab7b93d87703fb140368d3034d5187c53861c74`

are the same. But I am missing the last 16 bytes.

This says:

It is acceptable to pass a dst bigger than src, and in that case, CryptBlocks will only update dst[:len(src)] and will not touch the rest of dst.

But why is this the case ? The length of the ciphertext needs to be longer than the length of the plaintext and the online AES calculators prove that.