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What is the order int 13h with ah=02h will read 19 sectors starting at (C, H, S) = (0, 0, 1) provided a (floppy) disk geometry of 2 heads, 18 sectors per track and 80 tracks per side.

Or, more generally, what happens when it reaches the end of track 0, head 0? Does it go to track 1 or head 1? Does it even work properly in this case?

EDIT: Wait.. is this actually like hours, minutes, seconds? If we reach the end of the track (S is greater than 18), then H is increased?

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    Modern BIOSes support multitrack reads/writes which means if you read or write data past the end of a track it will continue on the next track automatically. This wasn't always the case in very old BIOSes. With your drive geometry after CHS(0,0,18) is CHS(0,1,1). After you reach CHS(0,1,18) the next one is CHS(1,0,1) – Michael Petch Jan 22 at 18:12
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    For the best compatibility one would not read/write past a track boundary. – Michael Petch Jan 22 at 18:19
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    Thank you very much :). This confirms my edit - that it works like the hours, minutes, seconds system. – PhantomR Jan 22 at 18:20
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    @MichaelPetch That sounds like an answer, and should be posted as an answer below, so it can be voted on, edited, and accepted. – IMSoP Jan 22 at 18:24
  • @IMSoP Indeed, it really answered my question. – PhantomR Jan 22 at 18:25
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Modern BIOSes support the concept of multitrack reads and writes.If you read or write past the end of a track it will continue on with the following track. To be most compatible with the widest array of BIOSes (old and new) you may wish to consider not reading or writing across a track boundary.

With a drive geometry of 18 sector per track/2 heads/80 cylinders (3.5" 1.44MB floppy), the sector after CHS(0,0,18) is CHS(0,1,1). After you reach sector at CHS(0,1,18) the next one is CHS(1,0,1). In a way this is similar HH:MM:SS.


With your drive geometry there are a total of 2880(80*2*18) sectors. If you number the sectors from 0 to 2879 (inclusive) they are called the logical block addresses (LBA).

Int 13h/ah=2 takes CHS values. You can convert an LBA to CHS values with the formula (or equivalent):

C = (LBA ÷ SPT) ÷ HPC
H = (LBA ÷ SPT) mod HPC
S = (LBA mod SPT) + 1

HPC = Heads per cylinder (aka Number of Heads)
SPT = Sectors per Track, 
LBA = logical block address

"mod" is the modulo operator (to get the remainder of a division)

I have written more about the LBA to CHS calculation in this other Stackoverflow answer in the section Translation of LBA to CHS. If you created a table using these calculations, the numbering would look like:

LBA =    0:   CHS = ( 0,  0,  1)
LBA =    1:   CHS = ( 0,  0,  2)
LBA =    2:   CHS = ( 0,  0,  3)
LBA =    3:   CHS = ( 0,  0,  4)
LBA =    4:   CHS = ( 0,  0,  5)
LBA =    5:   CHS = ( 0,  0,  6)
LBA =    6:   CHS = ( 0,  0,  7)
LBA =    7:   CHS = ( 0,  0,  8)
LBA =    8:   CHS = ( 0,  0,  9)
LBA =    9:   CHS = ( 0,  0, 10)
LBA =   10:   CHS = ( 0,  0, 11)
LBA =   11:   CHS = ( 0,  0, 12)
LBA =   12:   CHS = ( 0,  0, 13)
LBA =   13:   CHS = ( 0,  0, 14)
LBA =   14:   CHS = ( 0,  0, 15)
LBA =   15:   CHS = ( 0,  0, 16)
LBA =   16:   CHS = ( 0,  0, 17)
LBA =   17:   CHS = ( 0,  0, 18)
LBA =   18:   CHS = ( 0,  1,  1)
LBA =   19:   CHS = ( 0,  1,  2)
LBA =   20:   CHS = ( 0,  1,  3)
LBA =   21:   CHS = ( 0,  1,  4)
LBA =   22:   CHS = ( 0,  1,  5)
LBA =   23:   CHS = ( 0,  1,  6)
LBA =   24:   CHS = ( 0,  1,  7)
LBA =   25:   CHS = ( 0,  1,  8)
LBA =   26:   CHS = ( 0,  1,  9)
LBA =   27:   CHS = ( 0,  1, 10)
LBA =   28:   CHS = ( 0,  1, 11)
LBA =   29:   CHS = ( 0,  1, 12)
LBA =   30:   CHS = ( 0,  1, 13)
LBA =   31:   CHS = ( 0,  1, 14)
LBA =   32:   CHS = ( 0,  1, 15)
LBA =   33:   CHS = ( 0,  1, 16)
LBA =   34:   CHS = ( 0,  1, 17)
LBA =   35:   CHS = ( 0,  1, 18)
LBA =   36:   CHS = ( 1,  0,  1)
LBA =   37:   CHS = ( 1,  0,  2)
LBA =   38:   CHS = ( 1,  0,  3)
LBA =   39:   CHS = ( 1,  0,  4)
LBA =   40:   CHS = ( 1,  0,  5)
LBA =   41:   CHS = ( 1,  0,  6)

... [snip] ...

LBA = 2859:   CHS = (79,  0, 16)
LBA = 2860:   CHS = (79,  0, 17)
LBA = 2861:   CHS = (79,  0, 18)
LBA = 2862:   CHS = (79,  1,  1)
LBA = 2863:   CHS = (79,  1,  2)
LBA = 2864:   CHS = (79,  1,  3)
LBA = 2865:   CHS = (79,  1,  4)
LBA = 2866:   CHS = (79,  1,  5)
LBA = 2867:   CHS = (79,  1,  6)
LBA = 2868:   CHS = (79,  1,  7)
LBA = 2869:   CHS = (79,  1,  8)
LBA = 2870:   CHS = (79,  1,  9)
LBA = 2871:   CHS = (79,  1, 10)
LBA = 2872:   CHS = (79,  1, 11)
LBA = 2873:   CHS = (79,  1, 12)
LBA = 2874:   CHS = (79,  1, 13)
LBA = 2875:   CHS = (79,  1, 14)
LBA = 2876:   CHS = (79,  1, 15)
LBA = 2877:   CHS = (79,  1, 16)
LBA = 2878:   CHS = (79,  1, 17)
LBA = 2879:   CHS = (79,  1, 18)

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