Any language that can do shifting can combine numbers of any radix. While I'm a fan of the different ways/manipulations that different languages can access this kind of stuff with ease, never forget that behind all of this is some very very basic maths.

In this case, binary is just a simple power of 2 so:

```
1 << 1 = 1
1 << 2 = 2
1 << 3 = 4
1 << 4 = 8
```

and so on...

if your taking the binary string : 10100101 you can easily convert it to a byte as follows:

```
(1 << 7) + (0 << 6) + (1 << 5) + (0 << 4) + (0 << 3) + (1 << 2) + (0 << 1) + 1
```

Assuming that you've gone through and converted each "0" or "1" to it's number format first.

This will start getting a bit tedious if your dealing with numbers of bits larger than the 8 above, but since your doing a byte at a time, a simple byte array in your chosen language will suffice, allowing you to push each byte in turn.

It's worth mentioning also that the same process can be used for other bases, and if you don't have a shift facility, a simple multiplication will generally work just as well.

If you label your columns across the top in binary, you'll easily see what I'm on about.. taking the above example (Remember it's all powers of 2):

```
1 0 1 0 0 1 0 1
128 64 32 16 8 4 2 1 = 128 + 32 + 4 + 1 = 165
```

Not part of the question, but related... and taking it one step further:

Hexadecimal is the values 0 to F (16 values) each can fit into 4 bits... so

```
1010 0101 (8+2) (4+1) - Binary using powers of 2 only on 4 bits (8 4 2 1)
10 5 (Decimal) - (10 << 4) + 5 = 165
A 5 (Hexadecimal)
```