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I have an LC-3 program that has a counter. I can print the counter to the screen using TRAP x21. However, if the counter number has two digits my program does not work.

Example: 9 will print perfectly, but not 19.

I am guessing that before I print my Register which contains the counter I need a loop, which will chop the number by dividing by 2 (same as I would in decimal by dividing by 10, but 2 in binary). Then I guess I would print digit1, digit0. I have a problem though, how do I divide in LC-3? Right shift? That seems too hard for this problem and beyond my knowledge.

Please help.

    0010 000 000000011    ; R0 <= x30 which is for  
    0001 000 000 0 00 010 ; R0 <= R0 + R2 

    1111 0000 00100001    ; TRAP x21 
    1111 0000 00100101    ; TRAP x25 
    0000000000110000
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If you're generating decimal output, then you'll need to divide by 10, not by 2. A divide-by-10 routine would be pretty painful given the LC-3's very limited instruction set. How large can the counter be? (For instance, is it always less than 20? Less than 100?) –  Gareth McCaughan Jul 2 '12 at 1:28
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If the range of counter values isn't very restricted, I think I'd suggest writing code with the following structure. A 16-bit value can't be more than 5 decimal digits long. Set aside 5 of your registers to hold those digits. (Let's say R3..R7.) Set them all to 0. Now: subtract 10000; if the result is >= 0, increment R3 and loop, otherwise add 10000 back on; subtract 1000; if the result is >= 0, increment R4 and loop, otherwise add 1000 back on; etc. When you're done, output the resulting digits one by one, skipping leading zeros. Inefficient but effective. –  Gareth McCaughan Jul 2 '12 at 1:31

1 Answer 1

up vote 1 down vote accepted

It only works with one digit because of your number->digit routine. You're adding a number to the character '0', and obviously there's no character '11', etc.

You can find the maximal divisor by multiplying by ten (usually by repeated addition) until the divisor exceeds the number (then backing off to the previous value). This will let you use Gareth's method, above.

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