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How can I take mod of a number for instance a%9 in assembly in Motorola M6800.Please tell me which mnemonics should I use.

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The 6800 does not have a single instruction for remainder. You have to write the routine yourself. –  Gabe Mar 4 '11 at 4:50

1 Answer 1

At last if memory serves, the 6800 doesn't have a division instruction (IIRC that was added in the 6809), so you'll have to implement division on your own (or, if you don't care about speed, just subtract the divisor repeatedly until the result is less than the divisor, and that's your remainder).

To just figure the remainder (without the division) is actually pretty easy in binary:

  1. shift the divisor left until it's larger that the dividend
  2. shift it right one place
  3. If that's smaller than the dividend, subtract it from the dividend
  4. repeat steps 2 and 3 until what's left of the dividend is smaller than the divisor
  5. That's your remainder

For example, let's figure the remainder after dividing 127 by 9. We start by shifting 9 left:

127 = 0111 1111
9   = 0000 1001

shift left until you get:

  0111 1111
  1001 0000

Repeatedly shift and subtract:

      0111 1111
-     0100 1000
=     0011 0111

      0011 0111
-     0010 0100
=     0001 0011

      0001 0011
-     0001 0010
=     0000 0001

Since 1 is smaller than 9, we have our remainder: 1. In case you want to check that, 9x14=126.

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That's probably the most concise I've seen a step-divider (well, modulo) described. It's funny how many times I've had to implement my own function (various ARM bootloaders) - I may come back to this as a reference in future! –  John Ripley Mar 4 '11 at 6:41

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