Very interesting question, and clever trick.

Let's look at a simple example of getting a single byte manipulated. Using unsigned 8 bit for simplicity. Imagine your number is xxaxxbxx and you want ab000000 .

The solution consisted of two steps: a bit masking, followed by multiplication. The bit mask is a simple AND operation that turns uninteresting bits to zeros. In the above case, your mask would be 00100100 and the result 00a00b00 .

Now the hard part: turning that into ab...... .

A multiplication is a bunch of shift-and-add operations. The key is to allow overflow to "shift away" the bits we don't need and put the ones we want in the right place.

Multiplication by 4 ( 00000100 ) would shift everything left by 2 and get you to a00b0000 . To get the b to move up we need to multiply by 1 (to keep the a in the right place) + 4 (to move the b up). This sum is 5, and combined with the earlier 4 we get a magic number of 20, or 00010100 . The original was 00a00b00 after masking; the multiplication gives:

000000a00b000000 00000000a00b0000 + ---------------- 000000a0ab0b0000 xxxxxxxxab......

From this approach you can extend to larger numbers and more bits.

One of the questions you asked was "can this be done with any number of bits?" I think the answer is "no", unless you allow several masking operations, or several multiplications. The problem is the issue of "collisions" - for example, the "stray b" in the problem above. Imagine we need to do this to a number like xaxxbxxcx . Following the earlier approach, you would think we need {x 2, x {1 + 4 + 16}} = x 42 (oooh - the answer to everything!). Result:

00000000a00b00c00 000000a00b00c0000 0000a00b00c000000 ----------------- 0000a0ababcbc0c00 xxxxxxxxabc......

As you can see, it still works, but "only just". They key here is that there is "enough space" between the bits we want that we can squeeze everything up. I could not add a fourth bit d right after c, because I would get instances where I get c+d, bits might carry, ...

So without formal proof, I would answer the more interesting parts of your question as follows: "No, this will not work for any number of bits. To extract N bits, you need (N-1) spaces between the bits you want to extract, or have additional mask-multiply steps."

The only exception I can think of for the "must have (N-1) zeros between bits" rule is this: if you want to extract two bits that are adjacent to each other in the original, AND you want to keep them in the same order, then you can still do it. And for the purpose of the (N-1) rule they count as two bits.

There is another insight - inspired by the answer of @Ternary below (see my comment there). For each interesting bit, you only need as many zeros to the right of it as you need space for bits that need to go there. But also, it needs as many bits to the left as it has result-bits to the left. So if a bit b ends up in position m of n, then it needs to have m-1 zeros to its left, and n-m zeros to its right. Especially when the bits are not in the same order in the original number as they will be after the re-ordering, this is an important improvement to the original criteria. This means, for example, that a 16 bit word

a...e.b...d..c..

Can be shifted into

abcde...........

even though there is only one space between e and b, two between d and c, three between the others. Whatever happened to N-1?? In this case, a...e becomes "one block" - they are multiplied by 1 to end up in the right place, and so "we got e for free". The same is true for b and d (b needs three spaces to the right, d needs the same three to its left). So when we compute the magic number, we find there are duplicates:

a: << 0 ( x 1 ) b: << 5 ( x 32 ) c: << 11 ( x 2048 ) d: << 5 ( x 32 ) !! duplicate e: << 0 ( x 1 ) !! duplicate

Clearly, if you wanted these numbers in a different order, you would have to space them further. We can reformulate the (N-1) rule: "It will always work if there are at least (N-1) spaces between bits; or, if the order of bits in the final result is known, then if a bit b ends up in position m of n, it needs to have m-1 zeros to its left, and n-m zeros to its right."

@Ternary pointed out that this rule doesn't quite work, as there can be a carry from bits adding "just to the right of the target area" - namely, when the bits we're looking for are all ones. Continuing the example I gave above with the five tightly packed bits in a 16 bit word: if we start with

a...e.b...d..c..

For simplicity, I will name the bit positions ABCDEFGHIJKLMNOP

The math we were going to do was

ABCDEFGHIJKLMNOP a000e0b000d00c00 0b000d00c0000000 000d00c000000000 00c0000000000000 + ---------------- abcded(b+c)0c0d00c00

Until now, we thought anything below abcde (positions ABCDE ) would not matter, but in fact, as @Ternary pointed out, if b=1, c=1, d=1 then (b+c) in position G will cause a bit to carry to position F , which means that (d+1) in position F will carry a bit into E - and our result is spoilt. Note that space to the right of the least significant bit of interest ( c in this example) doesn't matter, since the multiplication will cause padding with zeros from beyone the least significant bit.

So we need to modify our (m-1)/(n-m) rule. If there is more than one bit that has "exactly (n-m) unused bits to the right (not counting the last bit in the pattern - "c" in the example above), then we need to strengthen the rule - and we have to do so iteratively!

We have to look not only at the number of bits that meet the (n-m) criterion, but also the ones that are at (n-m+1), etc. Let's call their number Q0 (exactly n-m to next bit), Q1 (n-m+1), up to Q(N-1) (n-1). Then we risk carry if

Q0 > 1 Q0 == 1 && Q1 >= 2 Q0 == 0 && Q1 >= 4 Q0 == 1 && Q1 > 1 && Q2 >=2 ...

If you look at this, you can see that if you write a simple mathematical expression

W = N * Q0 + (N - 1) * Q1 + ... + Q(N-1)

and the result is W > 2 * N , then you need to increase the RHS criterion by one bit to (n-m+1) . At this point, the operation is safe as long as W < 4 ; if that doesn't work, increase the criterion one more, etc.

I think that following the above will get you a long way to your answer...