An introduction to bit-shift operators:

First, we have the left-shift operator, `x << n`

. This will shift all the bits in `x`

left by `n`

bits, filling the new bits with zero:

```
1111 1111
<< 3: 1111 1000
```

Next, we have the signed right-shift operator, `x >> n`

. This shifts all the bits in `x`

right by n, copying the sign bit into the new bits:

```
1111 1111
>> 3: 1111 1111
1000 0000
>> 3: 1111 0000
0111 1111
>> 3: 0000 1111
```

Finally, we have the zero-fill right-shift operator, `x >>> n`

. This shifts all bits in `x`

right by `n`

bits, filling the new bits with zero:

```
1111 1111
>>> 3: 0001 1111
```

You may also find useful the bitwise-or operator, `x | y`

. This compares the bits in each position in `x`

and `y`

, setting the new number's bit on if it was on in either `x`

or `y`

, off otherwise:

```
1010 0101
| 1010 1010
---------
1010 1111
```

You should only need the previous operators for the problem at hand, but for the sake of completeness, here are the last two:

The bitwise-and operator, `x & y`

sets the bits in the output to one if and only if the bit is on in both `x`

and `y`

:

```
1010 0101
& 1010 1010
---------
1010 0000
```

The bitwise-xor operator, `x ^ y`

sets the output bits to one if the bit is on in one number or the other but not both:

```
1010 0101
^ 1010 1010
---------
0000 1111
```

Now, applying these to the situation at hand:

You will need to use the bit-shift operators to add and manipulate bits. Start setting bits at the right side according to their string representations and shift them over. Continue until you hit the end of a byte, and then move to the next byte. Say we want to create a byte representation of "1100 1010":

```
Our byte Target
--------- --------
0000 0000
1100 1010
0000 0001 ^
1100 1010
0000 0011 ^
1100 1010
0000 0110 ^
1100 1010
0000 1100 ^
1100 1010
0001 1001 ^
1100 1010
0011 0010 ^
1100 1010
0110 0101 ^
1100 1010
1100 1010 ^
```

I will, of course, leave it to you to apply this to your work.

`String`

that is 18 characters long ("010100111111011000") to represent a word that is 7 characters long ("program"). Are you sure you mean what you're asking? Normally you would have those bits set in X number of bytes (3 in this case). – Brian Roach Nov 26 '11 at 1:00`>>`

,`>>>`

,`<<`

. – Kevin Nov 26 '11 at 1:00`String`

s which you say you are in your question which is the source of confusion. If you have a`String`

as you say, you don't have bits. You have a bunch of the characters`0`

and`1`

(specifically, you have a 16bit Unicode char for each, making your memory use 36 bytes before the overhead of the`String`

object) - to be clear, if you have a`String`

you have the textual representation of a set of bits, expressed using the characters 0 and 1. – Brian Roach Nov 26 '11 at 1:09