# Overflow and Carry flags on Z80

I have gotten round to implementing the ADD A,r set of opcodes on my Z80 core. I had a bit of confusion about the carry and overflow flags which I think I've nailed, but I wanted to put it to the community to check that I'm right.

Basically, from what I can see, the ALU in the Z80 doesn't care about signed/unsigned operations, it just adds bits. This means that if two 8-bit values are added together and cause a 9-bit value as a result of their addition, the carry flag will be set. This includes adding two negative two's complement numbers, for example -20 (11101100) and -40 (11011000), as although the result is -60 (11000100), the result is actually a 9-bit value 1 1100 0100. This surely means if adding two negative two's complement values, the carry flag will always be set, even when there is no overflow condition - am I right?

Secondly, I decided that to detect an overflow in this instruction, I would XOR bit 7 of both operands, and if the result was 10000000, then there is definitely no overflow - if the result of this is 00000000 then there could be an overflow as the signs are the same, and I would therefore XOR bit 7 of the result of the addition with bit 7 of either operand, and if the result of this is 10000000 then an overflow has occurred and I set the P/V overflow flag. Am I right here also?

Sorry for such a convoluted question, I'm pretty sure I'm right but I need to know before I carry on with countless more instructions based on this logic. Many thanks.

The bits of the result are obtained from the truncated sum of unsigned integers. The add instruction doesn't care about the sign here nor does it care about your own interpretation of the integers as signed or unsigned. It just adds as if the numbers were unsigned.

The carry flag (or borrow in case of subtraction) is that non-existent 9th bit from the addition of the 8-bit unsigned integers. Effectively, this flag signifies an overflow/underflow for add/sub of unsigned integers. Again, add doesn't care about the signs here at all, it just adds as if the numbers were unsigned.

Adding two negative 2's complement numbers will result in setting of the carry flag to 1, correct.

The overflow flag shows whether or not there's been an overflow/underflow for add/sub of signed integers. To set the overflow flag the instruction treats the numbers as signed (just like it treats them as unsigned for the carry flag and the 8 bits of the result).

The idea behind setting the overflow flag is simple. Suppose you sign-extend your 8-bit signed integers to 9 bits, that is, just copy the 7th bit to an extra, 8th bit. An overflow/underflow will occur if the 9-bit sum/difference of these 9-bit signed integers has different values in bits 7 and 8, meaning that the addition/subtraction has lost the result's sign in the 7th bit and used it for the result's magnitude, or, in other words, the 8 bits can't accommodate the sign bit and such a large magnitude.

Now, bit 7 of the result can differ from the imaginary sign bit 8 if and only if the carry into bit 7 and the carry into bit 8 (=carry out of bit 7) are different. That's because we start with the addends having bit 7=bit 8 and only different carry-ins into them can affect them in the result in different ways.

So overflow flag = carry-out flag XOR carry from bit 6 into bit 7.

Both my and your ways of calculating the overflow flag are correct. In fact, both are described in the Z80 CPU User's Manual in section "Z80 Status Indicator Flags".

Here's how you can emulate most of the ADC instruction in C, where you don't have direct access to the CPU's flags and can't take full advantage of the emulating CPU's ADC instruction:

``````#include <stdio.h>
#include <limits.h>

#if CHAR_BIT != 8
#error char expected to have exactly 8 bits.
#endif

typedef unsigned char uint8;
typedef signed char int8;

#define FLAGS_CY_SHIFT 0
#define FLAGS_OV_SHIFT 1

void Adc(uint8* acc, uint8 b, uint8* flags)
{
uint8 a = *acc;
uint8 carryIns;
uint8 carryOut;

// Calculate the carry-out depending on the carry-in and addends.
//
// carry-in = 0: carry-out = 1 IFF (a + b > 0xFF) or,
//   equivalently, but avoiding overflow in C: (a > 0xFF - b).
//
// carry-in = 1: carry-out = 1 IFF (a + b + 1 > 0xFF) or,
//   equivalently, (a + b >= 0xFF) or,
//   equivalently, but avoiding overflow in C: (a >= 0xFF - b).
//
// Also calculate the sum bits.
{
carryOut = (a >= 0xFF - b);
*acc = a + b + 1;
}
else
{
carryOut = (a > 0xFF - b);
*acc = a + b;
}

#if 0
// Calculate the overflow by sign comparison.
carryIns = ((a ^ b) ^ 0x80) & 0x80;
if (carryIns) // if addend signs are the same
{
// overflow if the sum sign differs from the sign of either of addends
carryIns = ((*acc ^ a) & 0x80) != 0;
}
#else
// Calculate all carry-ins.
// Remembering that each bit of the sum =
// we can work out all carry-ins from a, b and their sum.
carryIns = *acc ^ a ^ b;

// Calculate the overflow using the carry-out and
// most significant carry-in.
carryIns = (carryIns >> 7) ^ carryOut;
#endif

// Update flags.
*flags |= (carryOut << FLAGS_CY_SHIFT) | (carryIns << FLAGS_OV_SHIFT);
}

void Sbb(uint8* acc, uint8 b, uint8* flags)
{
// a - b - c = a + ~b + 1 - c = a + ~b + !c
}

const uint8 testData[] =
{
0,
1,
0x7F,
0x80,
0x81,
0xFF
};

int main(void)
{
unsigned aidx, bidx, c;

for (c = 0; c <= 1; c++)
for (aidx = 0; aidx < sizeof(testData)/sizeof(testData[0]); aidx++)
for (bidx = 0; bidx < sizeof(testData)/sizeof(testData[0]); bidx++)
{
uint8 a = testData[aidx];
uint8 b = testData[bidx];
uint8 flags = c << FLAGS_CY_SHIFT;
printf("%3d(%4d) + %3d(%4d) + %u = ",
a, (int8)a, b, (int8)b, c);
printf("%3d(%4d) CY=%d OV=%d\n",
a, (int8)a, (flags & FLAGS_CY_MASK) != 0, (flags & FLAGS_OV_MASK) != 0);
}

printf("SBB:\n");
for (c = 0; c <= 1; c++)
for (aidx = 0; aidx < sizeof(testData)/sizeof(testData[0]); aidx++)
for (bidx = 0; bidx < sizeof(testData)/sizeof(testData[0]); bidx++)
{
uint8 a = testData[aidx];
uint8 b = testData[bidx];
uint8 flags = c << FLAGS_CY_SHIFT;
printf("%3d(%4d) - %3d(%4d) - %u = ",
a, (int8)a, b, (int8)b, c);
Sbb(&a, b, &flags);
printf("%3d(%4d) CY=%d OV=%d\n",
a, (int8)a, (flags & FLAGS_CY_MASK) != 0, (flags & FLAGS_OV_MASK) != 0);
}

return 0;
}
``````

Output:

``````ADC:
0(   0) +   0(   0) + 0 =   0(   0) CY=0 OV=0
0(   0) +   1(   1) + 0 =   1(   1) CY=0 OV=0
0(   0) + 127( 127) + 0 = 127( 127) CY=0 OV=0
0(   0) + 128(-128) + 0 = 128(-128) CY=0 OV=0
0(   0) + 129(-127) + 0 = 129(-127) CY=0 OV=0
0(   0) + 255(  -1) + 0 = 255(  -1) CY=0 OV=0
1(   1) +   0(   0) + 0 =   1(   1) CY=0 OV=0
1(   1) +   1(   1) + 0 =   2(   2) CY=0 OV=0
1(   1) + 127( 127) + 0 = 128(-128) CY=0 OV=1
1(   1) + 128(-128) + 0 = 129(-127) CY=0 OV=0
1(   1) + 129(-127) + 0 = 130(-126) CY=0 OV=0
1(   1) + 255(  -1) + 0 =   0(   0) CY=1 OV=0
127( 127) +   0(   0) + 0 = 127( 127) CY=0 OV=0
127( 127) +   1(   1) + 0 = 128(-128) CY=0 OV=1
127( 127) + 127( 127) + 0 = 254(  -2) CY=0 OV=1
127( 127) + 128(-128) + 0 = 255(  -1) CY=0 OV=0
127( 127) + 129(-127) + 0 =   0(   0) CY=1 OV=0
127( 127) + 255(  -1) + 0 = 126( 126) CY=1 OV=0
128(-128) +   0(   0) + 0 = 128(-128) CY=0 OV=0
128(-128) +   1(   1) + 0 = 129(-127) CY=0 OV=0
128(-128) + 127( 127) + 0 = 255(  -1) CY=0 OV=0
128(-128) + 128(-128) + 0 =   0(   0) CY=1 OV=1
128(-128) + 129(-127) + 0 =   1(   1) CY=1 OV=1
128(-128) + 255(  -1) + 0 = 127( 127) CY=1 OV=1
129(-127) +   0(   0) + 0 = 129(-127) CY=0 OV=0
129(-127) +   1(   1) + 0 = 130(-126) CY=0 OV=0
129(-127) + 127( 127) + 0 =   0(   0) CY=1 OV=0
129(-127) + 128(-128) + 0 =   1(   1) CY=1 OV=1
129(-127) + 129(-127) + 0 =   2(   2) CY=1 OV=1
129(-127) + 255(  -1) + 0 = 128(-128) CY=1 OV=0
255(  -1) +   0(   0) + 0 = 255(  -1) CY=0 OV=0
255(  -1) +   1(   1) + 0 =   0(   0) CY=1 OV=0
255(  -1) + 127( 127) + 0 = 126( 126) CY=1 OV=0
255(  -1) + 128(-128) + 0 = 127( 127) CY=1 OV=1
255(  -1) + 129(-127) + 0 = 128(-128) CY=1 OV=0
255(  -1) + 255(  -1) + 0 = 254(  -2) CY=1 OV=0
0(   0) +   0(   0) + 1 =   1(   1) CY=0 OV=0
0(   0) +   1(   1) + 1 =   2(   2) CY=0 OV=0
0(   0) + 127( 127) + 1 = 128(-128) CY=0 OV=1
0(   0) + 128(-128) + 1 = 129(-127) CY=0 OV=0
0(   0) + 129(-127) + 1 = 130(-126) CY=0 OV=0
0(   0) + 255(  -1) + 1 =   0(   0) CY=1 OV=0
1(   1) +   0(   0) + 1 =   2(   2) CY=0 OV=0
1(   1) +   1(   1) + 1 =   3(   3) CY=0 OV=0
1(   1) + 127( 127) + 1 = 129(-127) CY=0 OV=1
1(   1) + 128(-128) + 1 = 130(-126) CY=0 OV=0
1(   1) + 129(-127) + 1 = 131(-125) CY=0 OV=0
1(   1) + 255(  -1) + 1 =   1(   1) CY=1 OV=0
127( 127) +   0(   0) + 1 = 128(-128) CY=0 OV=1
127( 127) +   1(   1) + 1 = 129(-127) CY=0 OV=1
127( 127) + 127( 127) + 1 = 255(  -1) CY=0 OV=1
127( 127) + 128(-128) + 1 =   0(   0) CY=1 OV=0
127( 127) + 129(-127) + 1 =   1(   1) CY=1 OV=0
127( 127) + 255(  -1) + 1 = 127( 127) CY=1 OV=0
128(-128) +   0(   0) + 1 = 129(-127) CY=0 OV=0
128(-128) +   1(   1) + 1 = 130(-126) CY=0 OV=0
128(-128) + 127( 127) + 1 =   0(   0) CY=1 OV=0
128(-128) + 128(-128) + 1 =   1(   1) CY=1 OV=1
128(-128) + 129(-127) + 1 =   2(   2) CY=1 OV=1
128(-128) + 255(  -1) + 1 = 128(-128) CY=1 OV=0
129(-127) +   0(   0) + 1 = 130(-126) CY=0 OV=0
129(-127) +   1(   1) + 1 = 131(-125) CY=0 OV=0
129(-127) + 127( 127) + 1 =   1(   1) CY=1 OV=0
129(-127) + 128(-128) + 1 =   2(   2) CY=1 OV=1
129(-127) + 129(-127) + 1 =   3(   3) CY=1 OV=1
129(-127) + 255(  -1) + 1 = 129(-127) CY=1 OV=0
255(  -1) +   0(   0) + 1 =   0(   0) CY=1 OV=0
255(  -1) +   1(   1) + 1 =   1(   1) CY=1 OV=0
255(  -1) + 127( 127) + 1 = 127( 127) CY=1 OV=0
255(  -1) + 128(-128) + 1 = 128(-128) CY=1 OV=0
255(  -1) + 129(-127) + 1 = 129(-127) CY=1 OV=0
255(  -1) + 255(  -1) + 1 = 255(  -1) CY=1 OV=0
SBB:
0(   0) -   0(   0) - 0 =   0(   0) CY=0 OV=0
0(   0) -   1(   1) - 0 = 255(  -1) CY=1 OV=0
0(   0) - 127( 127) - 0 = 129(-127) CY=1 OV=0
0(   0) - 128(-128) - 0 = 128(-128) CY=1 OV=1
0(   0) - 129(-127) - 0 = 127( 127) CY=1 OV=0
0(   0) - 255(  -1) - 0 =   1(   1) CY=1 OV=0
1(   1) -   0(   0) - 0 =   1(   1) CY=0 OV=0
1(   1) -   1(   1) - 0 =   0(   0) CY=0 OV=0
1(   1) - 127( 127) - 0 = 130(-126) CY=1 OV=0
1(   1) - 128(-128) - 0 = 129(-127) CY=1 OV=1
1(   1) - 129(-127) - 0 = 128(-128) CY=1 OV=1
1(   1) - 255(  -1) - 0 =   2(   2) CY=1 OV=0
127( 127) -   0(   0) - 0 = 127( 127) CY=0 OV=0
127( 127) -   1(   1) - 0 = 126( 126) CY=0 OV=0
127( 127) - 127( 127) - 0 =   0(   0) CY=0 OV=0
127( 127) - 128(-128) - 0 = 255(  -1) CY=1 OV=1
127( 127) - 129(-127) - 0 = 254(  -2) CY=1 OV=1
127( 127) - 255(  -1) - 0 = 128(-128) CY=1 OV=1
128(-128) -   0(   0) - 0 = 128(-128) CY=0 OV=0
128(-128) -   1(   1) - 0 = 127( 127) CY=0 OV=1
128(-128) - 127( 127) - 0 =   1(   1) CY=0 OV=1
128(-128) - 128(-128) - 0 =   0(   0) CY=0 OV=0
128(-128) - 129(-127) - 0 = 255(  -1) CY=1 OV=0
128(-128) - 255(  -1) - 0 = 129(-127) CY=1 OV=0
129(-127) -   0(   0) - 0 = 129(-127) CY=0 OV=0
129(-127) -   1(   1) - 0 = 128(-128) CY=0 OV=0
129(-127) - 127( 127) - 0 =   2(   2) CY=0 OV=1
129(-127) - 128(-128) - 0 =   1(   1) CY=0 OV=0
129(-127) - 129(-127) - 0 =   0(   0) CY=0 OV=0
129(-127) - 255(  -1) - 0 = 130(-126) CY=1 OV=0
255(  -1) -   0(   0) - 0 = 255(  -1) CY=0 OV=0
255(  -1) -   1(   1) - 0 = 254(  -2) CY=0 OV=0
255(  -1) - 127( 127) - 0 = 128(-128) CY=0 OV=0
255(  -1) - 128(-128) - 0 = 127( 127) CY=0 OV=0
255(  -1) - 129(-127) - 0 = 126( 126) CY=0 OV=0
255(  -1) - 255(  -1) - 0 =   0(   0) CY=0 OV=0
0(   0) -   0(   0) - 1 = 255(  -1) CY=1 OV=0
0(   0) -   1(   1) - 1 = 254(  -2) CY=1 OV=0
0(   0) - 127( 127) - 1 = 128(-128) CY=1 OV=0
0(   0) - 128(-128) - 1 = 127( 127) CY=1 OV=0
0(   0) - 129(-127) - 1 = 126( 126) CY=1 OV=0
0(   0) - 255(  -1) - 1 =   0(   0) CY=1 OV=0
1(   1) -   0(   0) - 1 =   0(   0) CY=0 OV=0
1(   1) -   1(   1) - 1 = 255(  -1) CY=1 OV=0
1(   1) - 127( 127) - 1 = 129(-127) CY=1 OV=0
1(   1) - 128(-128) - 1 = 128(-128) CY=1 OV=1
1(   1) - 129(-127) - 1 = 127( 127) CY=1 OV=0
1(   1) - 255(  -1) - 1 =   1(   1) CY=1 OV=0
127( 127) -   0(   0) - 1 = 126( 126) CY=0 OV=0
127( 127) -   1(   1) - 1 = 125( 125) CY=0 OV=0
127( 127) - 127( 127) - 1 = 255(  -1) CY=1 OV=0
127( 127) - 128(-128) - 1 = 254(  -2) CY=1 OV=1
127( 127) - 129(-127) - 1 = 253(  -3) CY=1 OV=1
127( 127) - 255(  -1) - 1 = 127( 127) CY=1 OV=0
128(-128) -   0(   0) - 1 = 127( 127) CY=0 OV=1
128(-128) -   1(   1) - 1 = 126( 126) CY=0 OV=1
128(-128) - 127( 127) - 1 =   0(   0) CY=0 OV=1
128(-128) - 128(-128) - 1 = 255(  -1) CY=1 OV=0
128(-128) - 129(-127) - 1 = 254(  -2) CY=1 OV=0
128(-128) - 255(  -1) - 1 = 128(-128) CY=1 OV=0
129(-127) -   0(   0) - 1 = 128(-128) CY=0 OV=0
129(-127) -   1(   1) - 1 = 127( 127) CY=0 OV=1
129(-127) - 127( 127) - 1 =   1(   1) CY=0 OV=1
129(-127) - 128(-128) - 1 =   0(   0) CY=0 OV=0
129(-127) - 129(-127) - 1 = 255(  -1) CY=1 OV=0
129(-127) - 255(  -1) - 1 = 129(-127) CY=1 OV=0
255(  -1) -   0(   0) - 1 = 254(  -2) CY=0 OV=0
255(  -1) -   1(   1) - 1 = 253(  -3) CY=0 OV=0
255(  -1) - 127( 127) - 1 = 127( 127) CY=0 OV=1
255(  -1) - 128(-128) - 1 = 126( 126) CY=0 OV=0
255(  -1) - 129(-127) - 1 = 125( 125) CY=0 OV=0
255(  -1) - 255(  -1) - 1 = 255(  -1) CY=1 OV=0
``````

You can change `#if 0` to `#if 1` to use the sign-comparison-based method for overflow calculation. The result will be the same. At first glance it's a bit surprising that the sign-based method takes care of the carry-in too.

Please note that by using my method in which I calculate all carry-ins into bits 0 through 7, you also get for free the value of the `half-carry` flag (carry from bit 3 to bit 4) that's needed for the `DAA` instruction.

EDIT: I've added a function for subtraction with borrow (SBC/SBB instruction) and results for it.

• This is perfect - thank you very much :-) I knew I was along the right lines. Thanks also for your code sample. I'm actually using Java (as I'm aiming for this to be a completely cross platform master system emulator when it's done), although I can understand enough C to see what you're on about. Sorry if my question seemed simple, it's just that I'm having to teach myself a lot of binary math as I go with this project, so far I seem to have grasped it though :-) Nov 7, 2011 at 15:58
• Thanks for you explanation, it's really precise. I figured out the halfcarry flag by doing `halfCarryOut = carryIn ? ((a & 0x0F) >= 0x0F - (a & 0x0F)) : ((a & 0x0F) > 0x0F - (a & 0x0F)); halfCarryOut = ((res ^ a ^ b) >> 4) ^ halfCarryOut;`, it should be correct.
– Jack
Jul 13, 2012 at 1:37
• @Jack If you have tested it and it works, OK (I'm not going to validate it). But it can be done simpler as I indicated at the end of the answer. Use the code variant between #else and #endif. After `carryIns = *acc ^ a ^ b;` do `halfCarryOut = (carryIns >> 4) & 1;`, that's all you need to add. Jul 13, 2012 at 2:07
• Yes, my whole code is quite different so I just readapted my implementation to write my comment. No, I was not going to request any validation, I was trying to complete your answer for future reference :)
– Jack
Jul 13, 2012 at 2:10
• For those implementing a GAMEBOY Z80:I just wanted to add my testing to this. In the gameboy version of the Z80, a half carry flag AND a carry flag will be generated for 255+1 operations. Aug 9, 2013 at 15:43

Another way to see this which is maybe easier to understand. When performing a sum:

• Sign is always set to bit 7 of the result
• Zero is set if the result is 0x00
• Half-carry is set when the right nibble sum of the operands overflows
• Overflow is set when both signed operands are positive and signed sum is negative or both signed operands are negative and the signed sum is positive
• Nice recap. To clarify just a bit further: "Add/Sub is reset" because `N` gets only explicitly set if the last operation was a subtraction. (I think this is used for the `DAA` instruction only.) Jun 20, 2016 at 10:19