Here is link to a document of an algorithm that produces the values and code I see with Visual Studio (in most cases) and that I assume is still used in GCC for division of a variable integer by a constant integer.

http://gmplib.org/~tege/divcnst-pldi94.pdf

In the article, a uword has N bits, a udword has 2N bits, n = numerator = dividend, d = denominator = divisor, ℓ is initially set to ceil(log2(d)), shpre is pre-shift (used before multiply) = e = number of trailing zero bits in d, shpost is post-shift (used after multiply), prec is precision = N - e = N - shpre. The goal is to optimize calculation of n/d using a pre-shift, multiply, and post-shift.

Scroll down to figure 6.2, which defines how a udword multiplier (max size is N+1 bits), is generated, but doesn't clearly explain the process. I'll explain this below.

Figure 4.2 and figure 6.2 show how the multiplier can be reduced to a N bit or less multiplier for most divisors. Equation 4.5 explains how the formula used to deal with N+1 bit multipliers in figure 4.1 and 4.2 was derived.

In the case of modern X86 and other processors, multiply time is fixed, so pre-shift doesn't help on these processors, but it still helps to reduce the multiplier from N+1 bits to N bits. I don't know if GCC or Visual Studio have eliminated pre-shift for X86 targets.

Going back to Figure 6.2. The numerator (dividend) for mlow and mhigh can be larger than a udword only when denominator (divisor) > 2^(N-1) (when ℓ == N => mlow = 2^(2N)), in this case the optimized replacement for n/d is a compare (if n>=d, q = 1, else q = 0), so no multiplier is generated. The initial values of mlow and mhigh will be N+1 bits, and two udword/uword divides can be used to produce each N+1 bit value (mlow or mhigh). Using X86 in 64 bit mode as an example:

```
; upper 8 bytes of dividend = 2^(ℓ) = (upper part of 2^(N+ℓ))
; lower 8 bytes of dividend for mlow = 0
; lower 8 bytes of dividend for mhigh = 2^(N+ℓ-prec) = 2^(ℓ+shpre) = 2^(ℓ+e)
dividend dq 2 dup(?) ;16 byte dividend
divisor dq 1 dup(?) ; 8 byte divisor
; ...
mov rcx,divisor
mov rdx,0
mov rax,dividend+8 ;upper 8 bytes of dividend
div rcx ;after div, rax == 1
mov rax,dividend ;lower 8 bytes of dividend
div rcx
mov rdx,1 ;rdx:rax = N+1 bit value = 65 bit value
```

You can test this with GCC. You're already seen how j = i/5 is handled. Take a look at how j = i/7 is handled (which should be the N+1 bit multiplier case).

On most current processors, multiply has a fixed timing, so a pre-shift is not needed. For X86, the end result is a two instruction sequence for most divisors, and a five instruction sequence for divisors like 7 (in order to emulate a N+1 bit multiplier as shown in equation 4.5 and figure 4.2 of the pdf file). Example X86-64 code:

```
; rbx = dividend, rax = 64 bit (or less) multiplier, rcx = post shift count
; two instruction sequence for most divisors:
mul rbx ;rdx = upper 64 bits of product
shr rdx,cl ;rdx = quotient
;
; five instruction sequence for divisors like 7
; to emulate 65 bit multiplier (rbx = lower 64 bits of multiplier)
mul rbx ;rdx = upper 64 bits of product
sub rbx,rdx ;rbx -= rdx
shr rbx,1 ;rbx >>= 1
add rdx,rbx ;rdx = upper 64 bits of corrected product
shr rdx,cl ;rdx = quotient
; ...
```

To explain the 5 instruction sequence, a simple 3 instruction sequence could overflow. Let u64() mean upper 64 bits (all that is needed for quotient)

```
mul rbx ;rdx = u64(dvnd*mplr)
add rdx,rbx ;rdx = u64(dvnd*(2^64 + mplr)), could overflow
shr rdx,cl
```

To handle this case, cl = post_shift-1. rax = multiplier - 2^64, rbx = dividend. u64() is upper 64 bits. Note that rax = rax<<1 - rax. Quotient is:

```
u64( ( rbx * (2^64 + rax) )>>(cl+1) )
u64( ( rbx * (2^64 + rax<<1 - rax) )>>(cl+1) )
u64( ( (rbx * 2^64) + (rbx * rax)<<1 - (rbx * rax) )>>(cl+1) )
u64( ( (rbx * 2^64) - (rbx * rax) + (rbx * rax)<<1 )>>(cl+1) )
u64( ( ((rbx * 2^64) - (rbx * rax))>>1) + (rbx*rax) )>>(cl ) )
mul rbx ; (rbx*rax)
sub rbx,rdx ; (rbx*2^64)-(rbx*rax)
shr rbx,1 ;( (rbx*2^64)-(rbx*rax))>>1
add rdx,rbx ;( ((rbx*2^64)-(rbx*rax))>>1)+(rbx*rax)
shr rdx,cl ;((((rbx*2^64)-(rbx*rax))>>1)+(rbx*rax))>>cl
```

`-3689348814741910323`

converts to`CCCCCCCCCCCCCCCD`

as a`uint64_t`

or just about (2^64)*4/5.willperversely generate inefficient code because optimization is disabled. In particular, they'll do it to make debugging easy, like the ability to set breakpoints on individual lines of code. GCC is, in fact, rather unusual in that it doesn't have a true "no optimizations" mode, because many of its optimizations are constitutively turned on. This is an example of where you can see that with GCC. Clang, on the other hand, and MSVC,willemit a`div`

instruction at`-O0`

. (cc @ clifford)17more comments