# real means of 1024 bit key length in RSA

I'm learning about RSA cryptography, so I must understand about ke length. Here, I found explanation about key length means.

There said:

When we say a "1024-bit RSA key", we mean that the modulus has length 1024 bits, i.e. is an integer greater than 2^1023 but lower than 2^1024. Such an integer could be encoded as a sequence of 1024 bits, i.e. 128 bytes.

What I've got from there, 1024 bit key means the key has 1024 binary number sequence int it.

We all know, 1 byte = 8 bits. So, `1024 bits = 128 bytes`. Okay, it's in binary. How about in character?

According to ASCII binary code here, each character has 8 bits binary number. So, in my mind, if key has 1024 bit length, it means the key contains of 1024/8 = 128 characters. So, I created a java program to generate prime number that has 128 numbers length. So far, the program works well.

But again, I rethought the real meaning of RSA 1024-bit. So, I googled and found this. I tested it and I get that the bit length of public key modulus is 1024. But, the public key has 309 numbers length.

Now, I really confuse.

My question: what's the real means of 1024-bit key length in RSA? As I thought or as I found here?

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Do you know what is binary and decimal representation of number and relation between them? – Oleg Estekhin May 7 '14 at 7:49
@OlegEstekhin Do you mean how to convert decimal to binary number and vice versa? – Speaky May 7 '14 at 8:13
Yes. The number that has 1024 digits in base 2 (binary) will have 128 digits in base 256, 256 digits in base 16 (hexadecimal) and about 309 digits in base 10 (decimal). – Oleg Estekhin May 7 '14 at 8:16
@OlegEstekhin I'm not so familiar with hexadecimal, but I know the relation between binary and decimal. So, what's the priority? In base 2 or base 10? – Speaky May 7 '14 at 8:25
It does not matter, it is the same number, just written differently. – Oleg Estekhin May 7 '14 at 8:47