# Sort numbers using easy68k

How can I sort number in descending order by using easy68k? Please give some suggestions.

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I'm still learning 68k asm, but obviously you could accomplish this task with the `cmp` opcode.

Here's a quicksort implementation I found at this site:

``````************************************************************SIM68K V1.1US***
*                                                                          *
*   Program : QSORT.ASM                                                    *
*   Quick Sort is a classical recursive sort algorithm.                    *
*   Being very famous, I prefer you search how it works in a computer      *
*   science book.                                                          *
*    This instance of "Quick Sort" algorithm sorts an unsigned byte table  *
*    (\$FF = 255) by ascending value.                                       *
*                                                                          *
*    Stack top contains min and max indexes of the sub-table being sorted  *
*                                                                          *
* SIM68K.INI options should be :                                           *
* - BIOS = 0 or 1                                                          *
* - VAL_RAM=RANDOM                                                         *
* - RAM_AD=\$2000 to see table                                              *
*                                                                          *
******************************************(C)1994-1998*Patrick DEMIRDJIAN***

*       min and max indexes of main table to be sorted
min     equ     0
*       \$3F = MEMORY window size
max     equ     \$3f

org     \$1000

* Stack pointer init, IT masking and full speed mode setting
lea     \$7ffe,a7
ori.w   #\$700,sr
andi.w  #\$7fff,sr

* A0 holds start address of table
lea     \$2000,a0

* D0 holds min index
move.l  #min,d0

* D1 holds max index
move.l  #max,d1

* Q_SORT subroutine call
bsr     q_sort

* End of program by pseudo monitor call
trap    #0

*****************************************************************************
Q_SORT  equ     *
*       Save min and max indexes in the stack
move.w  d0,-(a7)
move.w  d1,-(a7)
*       D2 = "middle" index = D0 + ((D1 - D0) / 2) = "pivot" index
* Why is this formula better than (D1+D0)/2 ?

move.w  d1,d2
sub.w   d0,d2
lsr.w   #1,d2

*       D3 = table "pivot" element
move.b  0(a0,d2.w),d3

*       Search for table 1st element > pivot, starting from table top
next1   equ     *
cmp.b   0(a0,d0.w),d3
bls     next2
bra     next1

*       Search for table 1st element < pivot, starting from table bottom
next2   equ     *
move.b  0(a0,d1.w),d4
cmp.b   d3,d4
bls     swap
subq.w  #1,d1
bra     next2

swap    equ     *
cmp.w   d1,d0
bgt     suite

*       Swap elements through D5
move.b  0(a0,d0.w),d5
move.b  0(a0,d1.w),0(a0,d0.w)
move.b  d5,0(a0,d1.w)

*       Refresh indexes
subq.w  #1,d1

cmp.w   d1,d0
bgt     suite
bra     next1

suite   equ     *
cmp.w   2(a7),d1
ble     next3

*       Save current registers in stack
move.w  2(a7),d6
move.w  d0,-(a7)
move.w  d1,-(a7)
move.w  d6,d0

*       Recursive call with new indexes
*       Sort sub-table
bsr     q_sort

*       Get current registers from stack
move.w  (a7)+,d1
move.w  (a7)+,d0

next3   equ     *
cmp.w   (a7),d0
bge     fin

*       Save current registers in stack
move.w  (a7),d6
move.w  d0,-(a7)
move.w  d1,-(a7)
move.w  d6,d1

*       Recursive call with new indexes
*       Sort sub-table
bsr     q_sort

*       Get current registers from stack
move.w  (a7)+,d1
move.w  (a7)+,d0

fin     equ     *
*       Remove indexes from stack