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DataMuseum.dkPresents historical artifacts from the history of: CP/M |
This is an automatic "excavation" of a thematic subset of
See our Wiki for more about CP/M Excavated with: AutoArchaeologist - Free & Open Source Software. |
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Length: 7296 (0x1c80)
Names: »FASTMAT.IWS«
└─⟦87e51841f⟧ Bits:30002669 I-APL - PICCOLINIENs programklub Marts 88
└─ ⟦this⟧ »FASTMAT.IWS«
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0x0500…0520 20 84 70 84 88 91 01 00 61 00 10 85 ea 91 01 00 74 00 18 85 f0 91 01 00 6c 00 c0 85 f4 91 01 00 ┆ p a t l ┆ 0x0520…0540 74 00 90 84 de 9b 01 00 00 00 b8 83 00 00 00 00 58 87 b0 84 60 92 01 00 74 00 b0 85 a0 92 01 00 ┆t X ` t ┆ 0x0540…0560 74 00 30 84 00 00 00 00 20 85 70 89 40 99 01 00 6c 00 58 82 2e 9a 01 00 6c 00 d0 85 00 00 00 00 ┆t 0 p @ l X . l ┆ 0x0560…0580 f0 85 28 84 00 00 00 00 38 81 a8 81 14 9a 01 00 6c 00 e0 85 08 93 01 00 74 00 c8 89 00 00 00 00 ┆ ( 8 l t ┆ 0x0580…05a0 50 89 a0 86 00 00 00 00 60 84 40 89 00 00 00 00 f8 85 e0 86 12 98 01 00 6c 00 08 8a 2a 9b 00 00 ┆P ` @ l * ┆ 0x05a0…05c0 e8 87 d8 87 5e 98 00 00 08 8a b0 82 00 00 00 00 a0 81 c8 85 de 92 01 00 6c 00 18 87 16 fe 00 00 ┆ ^ l ┆ 0x05c0…05e0 78 83 48 84 32 92 02 00 73 00 08 86 f2 92 01 00 6c 00 00 00 00 00 00 00 80 85 e8 84 48 92 02 00 ┆x H 2 s l H ┆ 0x05e0…0600 73 00 b0 89 0e 93 01 00 61 00 f0 88 ce 98 01 00 74 00 58 85 00 00 00 00 18 86 88 85 00 00 00 00 ┆s a t X ┆ 0x0600…0620 c0 84 d8 89 3c 98 01 00 6c 00 70 85 04 93 01 00 6c 00 e8 85 c6 98 01 00 61 00 f0 85 00 00 00 00 ┆ < l p l a ┆ 0x0620…0640 28 84 f0 87 f6 9a 01 00 61 00 a8 89 f4 96 01 00 6c 00 80 89 80 9a 01 00 6c 00 e8 86 fc 93 01 00 ┆( a l l ┆ 0x0640…0660 61 00 30 89 0e 96 01 00 74 00 98 89 7c 98 01 00 6c 00 68 87 98 97 01 00 6c 00 78 83 dc 98 00 00 ┆a 0 t ø l h l x ┆ 0x0660…0680 98 85 90 88 00 00 00 00 68 84 c8 82 62 8e 00 00 c8 82 18 89 a4 95 01 00 6c 00 00 86 1a 98 01 00 ┆ h b l ┆ 0x0680…06a0 61 00 50 89 bc ff 00 00 d8 87 e8 88 76 93 01 00 61 00 38 87 ae 99 01 00 74 00 b8 89 00 00 00 00 ┆a P v a 8 t ┆ 0x06a0…06c0 90 88 08 89 00 00 00 00 80 85 48 89 1a 94 01 00 6c 00 18 88 0a 9b 01 00 74 00 38 89 c4 96 01 00 ┆ H l t 8 ┆ 0x06c0…06e0 74 00 60 84 00 00 00 00 98 83 20 83 8e 9b 01 00 74 00 b0 88 74 95 01 00 61 00 90 87 e6 96 01 00 ┆t ` t t a ┆ 0x06e0…0700 61 00 78 86 16 98 01 00 6c 00 f8 89 04 94 01 00 61 00 c0 83 44 96 01 00 6c 00 08 87 26 93 01 00 ┆a x l a D l & ┆ 0x0700…0720 6c 00 98 84 00 00 00 00 b0 80 10 87 68 93 01 00 74 00 88 86 6e 93 01 00 61 00 d8 82 d6 fd 00 00 ┆l h t n a ┆ 0x0720…0740 80 86 d8 83 18 96 01 00 6c 00 f8 88 5e 99 00 00 98 83 30 88 e6 95 01 00 66 00 d8 88 b4 99 01 00 ┆ l ^ 0 f ┆ 0x0740…0760 61 00 28 87 fa 99 00 00 58 86 00 88 12 95 01 00 66 00 80 87 28 95 01 00 6c 00 28 85 00 00 00 00 ┆a ( X f ( l ( ┆ 0x0760…0780 08 88 90 86 7e 99 01 00 6c 00 e0 88 c8 97 01 00 6c 00 48 81 f6 9b 01 00 6c 00 80 81 16 8c 01 00 ┆ ü l l H l ┆ 0x0780…07a0 6c 00 c8 87 3c 95 01 00 6c 00 d0 89 e6 9a 01 00 6c 00 28 86 ee 96 01 00 74 00 10 86 bc 98 01 00 ┆l < l l ( t ┆ 0x07a0…07c0 61 00 00 89 00 00 00 00 b0 82 f0 86 40 96 01 00 6c 00 88 80 d2 9b 01 00 61 00 e8 89 00 00 00 00 ┆a @ l a ┆ 0x07c0…07e0 28 88 b8 87 00 00 00 00 a8 88 d0 86 6c 95 01 00 61 00 88 84 00 00 00 00 98 84 a8 88 0e 98 00 00 ┆( l a ┆ 0x07e0…0800 40 87 78 89 00 99 03 00 73 00 98 85 0c 9c 00 00 00 00 b0 86 fe 9a 01 00 61 00 50 84 4a 94 01 00 ┆@ x s a P J ┆ 0x0800…0820 6c 00 50 87 22 95 01 00 74 00 58 87 00 00 00 00 40 89 d0 88 c6 9a 01 00 6c 00 90 89 54 9b 01 00 ┆l P " t X @ l T ┆ 0x0820…0840 6c 00 d8 86 e0 96 01 00 74 00 b8 85 da fe 00 00 a8 88 c0 89 f6 95 01 00 66 00 48 85 30 99 01 00 ┆l t f H 0 ┆ 0x0840…0860 66 00 f8 83 88 94 01 00 6c 00 40 84 78 96 01 00 61 00 28 89 4c 8e 01 00 66 00 68 82 a8 98 01 00 ┆f l @ x a ( L f h ┆ 0x0860…0880 74 00 80 84 04 8c 01 00 74 00 68 83 00 00 00 00 30 84 00 8a 00 00 00 00 f8 81 f8 82 da 9a 01 00 ┆t t h 0 ┆ 0x0880…08a0 6c 00 60 87 54 99 01 00 6c 00 70 83 78 97 01 00 74 00 98 86 00 00 00 00 60 86 88 89 ea 98 01 00 ┆l ` T l p x t ` ┆ 0x08a0…08c0 61 00 88 88 70 97 01 00 61 00 00 83 fc 97 00 00 50 89 c8 88 7c 95 01 00 6c 00 38 83 40 90 01 00 ┆a p a P ø l 8 @ ┆ 0x08c0…08e0 74 00 98 88 e2 98 01 00 61 00 70 86 90 95 01 00 6c 00 78 88 ca 9a 01 00 66 00 30 81 bc 99 01 00 ┆t a p l x f 0 ┆ 0x08e0…0900 74 00 80 83 cc 97 01 00 74 00 38 86 bc 93 01 00 61 00 c0 88 d4 98 07 00 73 00 58 86 04 99 00 00 ┆t t 8 a s X ┆ 0x0900…0920 28 87 c0 87 00 00 00 00 a0 87 38 84 00 00 00 00 a0 86 38 81 00 00 00 00 00 8a 30 87 d4 95 01 00 ┆( 8 8 0 ┆ 0x0920…0940 6c 00 10 8a b6 96 01 00 61 00 88 82 5a 8e 01 00 6c 00 20 87 14 96 01 00 6c 00 20 88 d8 96 01 00 ┆l a Z l l ┆ 0x0940…0960 61 00 08 88 00 00 00 00 88 85 d0 83 26 94 02 00 73 00 c0 84 5e ff 00 00 b8 85 f8 81 00 00 00 00 ┆a & s ^ ┆ 0x0960…0980 b8 89 e0 87 fa 98 01 00 74 00 50 86 90 97 01 00 66 00 80 88 44 99 01 00 66 00 f0 89 0e 99 01 00 ┆ t P f D f ┆ 0x0980…09a0 74 00 10 88 84 9a 01 00 61 00 60 89 f2 98 01 00 74 00 c8 86 76 9b 01 00 6c 00 58 88 94 98 02 00 ┆t a ` t v l X ┆ 0x09a0…09c0 73 00 b0 80 00 00 00 00 c8 89 48 83 2c 97 01 00 6c 00 f8 86 16 93 01 00 66 00 58 89 00 00 00 00 ┆s H , l f X ┆ 0x09c0…09e0 98 86 40 86 06 96 01 00 61 00 a0 89 00 00 00 00 78 85 20 86 f2 9a 01 00 6c 00 48 86 4c 98 01 00 ┆ @ a x l H L ┆ 0x09e0…0a00 6c 00 40 88 82 94 01 00 74 00 f8 85 00 00 00 00 b8 87 38 88 14 99 01 00 6c 00 a8 86 0c 94 05 00 ┆l @ t 8 l ┆ 0x0a00…0a20 73 00 10 89 00 00 00 00 70 88 98 83 14 9b 00 00 d8 82 b8 86 be 96 01 00 74 00 f0 82 be 94 01 00 ┆s p t ┆ 0x0a20…0a40 74 00 f0 80 a8 80 07 00 00 00 00 00 05 00 b9 53 54 4f 50 00 b8 80 78 80 06 00 00 00 00 00 03 00 ┆t STOP x ┆ 0x0a40…0a60 b9 43 52 00 d0 80 40 80 05 00 00 00 00 00 03 00 b9 46 58 00 e0 80 48 80 04 00 00 00 00 00 03 00 ┆ CR @ FX H ┆ 0x0a60…0a80 b9 4e 4c 00 30 80 50 80 03 00 00 00 00 00 03 00 b9 45 58 00 38 80 c8 80 02 00 00 00 00 00 03 00 ┆ NL 0 P EX 8 ┆ 0x0a80…0aa0 b9 4e 43 00 40 80 b8 80 01 00 00 00 00 00 03 00 b9 44 4c 00 f8 80 d0 80 00 00 00 00 00 00 03 00 ┆ NC @ DL ┆ 0x0aa0…0ac0 b9 49 44 00 00 00 a0 80 00 00 00 00 00 00 03 00 b9 57 41 00 a0 80 f0 80 00 00 00 00 00 00 03 00 ┆ ID WA ┆ 0x0ac0…0ae0 b9 54 53 00 80 80 f8 80 00 00 00 00 00 00 03 00 b9 4c 43 00 28 80 18 82 00 00 00 00 00 00 03 00 ┆ TS LC ( ┆ 0x0ae0…0b00 b9 41 56 00 c8 80 70 80 f0 87 00 00 00 00 03 00 b9 4c 58 00 a8 80 e0 80 98 80 00 00 00 00 03 00 ┆ AV p LX ┆ 0x0b00…0b20 b9 50 57 00 6e 00 02 00 01 00 4f 00 20 80 90 80 b0 87 00 00 00 00 03 00 b9 52 4c 00 50 80 28 80 ┆ PW n O RL P ( ┆ 0x0b20…0b40 c0 80 00 00 00 00 03 00 b9 43 54 00 6e 00 06 00 01 00 3a 10 00 00 00 00 58 80 30 80 d8 80 00 00 ┆ CT n : X 0 ┆ 0x0b40…0b60 00 00 03 00 b9 48 43 00 90 80 38 80 e8 80 00 00 00 00 03 00 b9 50 50 00 6e 00 02 00 01 00 07 00 ┆ HC 8 PP n ┆ 0x0b60…0b80 6e 00 00 00 01 00 00 00 70 80 58 80 00 81 00 00 60 85 03 00 b9 49 4f 00 10 81 02 00 00 00 00 00 ┆n p X ` IO ┆ 0x0b80…0ba0 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 00 88 82 b8 81 00 00 00 00 00 00 ┆ ┆ 0x0ba0…0bc0 00 00 00 00 00 00 d0 81 00 00 00 00 f8 89 98 89 00 00 00 00 00 00 20 81 e8 81 00 00 00 00 c8 81 ┆ ┆ 0x0bc0…0be0 68 82 d8 81 00 00 18 82 f0 88 10 82 00 00 00 00 00 00 00 00 60 80 68 80 0a 00 00 00 00 00 03 00 ┆h ` h ┆ 0x0be0…0c00 b9 54 58 00 48 80 80 80 09 00 00 00 00 00 03 00 b9 4d 43 00 68 80 20 80 08 00 00 00 00 00 06 00 ┆ TX H MC h ┆ 0x0c00…0c20 b9 54 52 41 43 45 80 84 03 00 31 20 31 4f 6e 00 00 01 02 00 02 00 03 00 e8 81 00 00 00 00 00 00 ┆ TRACE 1 1On ┆ 0x0c20…0c40 d8 81 00 00 20 81 00 00 bd 00 3f 00 bd 20 52 45 4d 4f 56 45 20 44 55 50 4c 49 43 41 54 45 20 52 ┆ ? REMOVE DUPLICATE R┆ 0x0c40…0c60 4f 57 53 20 4f 46 20 4d 41 54 52 49 58 20 3c 57 3e 20 42 55 54 20 55 53 49 4e 47 20 47 52 41 44 ┆OWS OF MATRIX <W> BUT USING GRAD┆ 0x0c60…0c80 45 20 46 4f 52 20 53 50 45 45 44 80 00 00 e8 81 a2 00 e0 81 d8 81 3b 00 d0 81 3b 00 c8 81 3b 00 ┆E FOR SPEED ; ; ; ┆ 0x0c80…0ca0 b8 81 00 00 02 00 78 86 00 00 78 86 01 00 42 00 00 00 15 00 00 00 00 00 00 00 01 00 55 00 00 00 ┆ x x B U ┆ 0x0ca0…0cc0 09 00 00 00 00 00 00 00 01 00 49 00 00 00 17 00 00 00 00 00 00 00 01 00 57 00 58 81 98 89 b8 82 ┆ I W X ┆ 0x0cc0…0ce0 00 00 00 00 0a 00 4d 41 54 44 55 50 53 4f 55 54 00 00 12 00 00 00 00 00 00 00 01 00 52 00 00 00 ┆ MATDUPSOUT R ┆ 0x0ce0…0d00 80 81 00 00 88 81 bd 00 12 00 bd 20 52 a2 28 a5 fb 3c 5c 57 a7 2e 3d aa 57 29 fb 57 00 00 1b 00 ┆ R ( <ØW .= W) W ┆ 0x0d00…0d20 01 00 00 00 00 00 01 00 bb 80 78 80 19 00 00 00 00 00 00 00 01 00 b9 45 00 00 b8 81 a2 00 28 00 ┆ x E ( ┆ 0x0d20…0d40 b3 00 bc 00 b8 81 29 00 3d 00 b8 81 b3 00 b8 81 a2 00 28 00 f0 81 a4 00 bc 00 d8 81 29 00 a4 00 ┆ ) = ( ) ┆ 0x0d40…0d60 d0 81 08 82 01 00 31 00 6e 00 00 00 01 00 01 00 00 00 e8 81 a2 00 b8 81 fb 00 d8 81 00 00 e8 81 ┆ 1 n ┆ 0x0d60…0d80 a2 00 58 81 d8 81 3b 00 20 81 48 89 11 00 00 00 00 00 00 00 01 00 51 81 80 82 e0 81 68 89 00 00 ┆ X ; H Q h ┆ 0x0d80…0da0 00 00 0b 00 4d 41 54 44 55 50 53 4f 55 54 32 81 08 83 01 00 31 00 bd 00 0c 00 bd 20 52 a2 a5 2f ┆ MATDUPSOUT2 1 R /┆ 0x0da0…0dc0 41 a7 2e 3d aa 57 50 81 01 00 31 00 bd 00 1f 00 bd 20 46 4f 52 20 4d 41 54 52 49 43 45 53 20 3c ┆A .= WP 1 FOR MATRICES <┆ 0x0dc0…0de0 41 3e 20 41 4e 44 20 3c 57 3e 20 4f 4e 4c 59 00 bd 00 3b 00 bd 20 3c 41 3e b1 3c 57 3e 20 46 4f ┆A> AND <W> ONLY ; <A> <W> FO┆ 0x0de0…0e00 52 20 52 4f 57 53 20 4f 46 20 3c 41 3e 20 41 4e 44 20 3c 57 3e 20 42 55 54 20 55 53 49 4e 47 20 ┆R ROWS OF <A> AND <W> BUT USING ┆ 0x0e00…0e20 47 52 41 44 45 20 46 4f 52 20 53 50 45 45 44 44 00 00 e8 81 a2 00 88 82 80 82 d8 81 3b 00 d0 81 ┆GRADE FOR SPEEDD ; ┆ 0x0e20…0e40 3b 00 c8 81 c0 82 58 81 30 87 00 00 00 00 0a 00 4d 41 54 45 50 53 49 4c 4f 4e 00 00 40 82 6e 00 ┆; X 0 MATEPSILON @ n ┆ 0x0e40…0e60 00 00 01 00 01 00 00 00 98 81 00 00 50 82 28 89 68 85 90 85 e0 82 e0 86 60 87 80 88 e8 81 00 00 ┆ P ( h ` ┆ 0x0e60…0e80 00 00 00 00 d8 81 00 00 d0 81 00 00 c8 81 00 00 00 00 01 00 80 83 00 00 80 83 01 00 41 00 00 00 ┆ A ┆ 0x0e80…0ea0 18 83 bd 00 38 00 bd 20 52 45 4d 4f 56 45 20 44 55 50 4c 49 43 41 54 45 20 52 4f 57 53 20 4f 46 ┆ 8 REMOVE DUPLICATE ROWS OF┆ 0x0ea0…0ec0 20 4d 41 54 52 49 58 20 3c 57 3e 2e 20 43 4f 4e 43 49 53 45 20 42 55 54 20 53 4c 4f 57 2e 6e 00 ┆ MATRIX <W>. CONCISE BUT SLOW.n ┆ 0x0ec0…0ee0 00 00 01 00 01 00 00 00 e8 83 00 00 e8 81 a2 00 28 00 28 00 30 82 a4 00 bc 00 88 82 29 00 a4 00 ┆ ( ( 0 ) ┆ 0x0ee0…0f00 d0 81 29 00 b1 00 28 00 2d 00 28 81 a4 00 bc 00 d8 81 29 00 a4 00 d0 81 bd 00 3b 00 bd 20 3c 41 ┆ ) ( - ( ) ; <A┆ 0x0f00…0f20 3e 3d 3c 57 3e 20 46 4f 52 20 52 4f 57 53 20 4f 46 20 3c 41 3e 20 41 4e 44 20 3c 57 3e 20 42 55 ┆>=<W> FOR ROWS OF <A> AND <W> BU┆ 0x0f20…0f40 54 20 55 53 49 4e 47 20 47 52 41 44 45 20 46 4f 52 20 53 50 45 45 44 82 00 00 e8 81 a2 00 88 82 ┆T USING GRADE FOR SPEED ┆ 0x0f40…0f60 c0 82 d8 81 3b 00 d0 81 3b 00 c8 81 88 83 80 82 30 88 00 00 00 00 08 00 4d 41 54 45 51 55 41 4c ┆ ; ; 0 MATEQUAL┆ 0x0f60…0f80 6e 00 00 00 01 00 01 00 00 00 70 81 bd 00 1f 00 bd 20 46 4f 52 20 4d 41 54 52 49 43 45 53 20 3c ┆n p FOR MATRICES <┆ 0x0f80…0fa0 41 3e 20 41 4e 44 20 3c 57 3e 20 4f 4e 4c 59 81 bd 00 3f 00 bd 20 49 4e 54 45 52 53 45 43 54 49 ┆A> AND <W> ONLY ? INTERSECTI┆ 0x0fa0…0fc0 4f 4e 20 4f 46 20 52 4f 57 53 20 4f 46 20 3c 41 3e 20 41 4d 44 20 3c 57 3e 20 42 55 54 20 55 53 ┆ON OF ROWS OF <A> AMD <W> BUT US┆ 0x0fc0…0fe0 49 4e 47 20 47 52 41 44 45 20 46 4f 52 20 53 50 45 45 44 41 00 00 e8 81 a2 00 88 82 88 83 d8 81 ┆ING GRADE FOR SPEEDA ┆ 0x0fe0…1000 3b 00 d0 81 3b 00 c8 81 10 84 c0 82 48 87 00 00 00 00 0c 00 4d 41 54 49 4e 54 45 52 53 45 43 54 ┆; ; H MATINTERSECT┆ 0x1000…1020 00 00 58 83 00 00 28 83 00 00 e8 81 a2 00 28 00 28 00 30 83 a4 00 bc 00 88 82 29 00 a4 00 d0 81 ┆ X ( ( ( 0 ) ┆ 0x1020…1040 29 00 b4 00 2e 00 3d 00 28 00 2d 00 28 82 a4 00 bc 00 d8 81 29 00 a4 00 d0 81 6e 00 00 00 01 00 ┆) . = ( - ( ) n ┆ 0x1040…1060 01 00 d0 86 02 00 b8 31 6e 00 00 00 01 00 01 00 00 00 c8 81 a2 00 88 82 2c 00 5b 00 f8 80 5d 00 ┆ 1n , Æ Å ┆ 0x1060…1080 d8 81 38 83 01 00 31 00 bd 00 0a 00 bd 20 52 a2 41 a7 2e 3d aa 57 78 82 01 00 31 01 00 00 20 82 ┆ 8 1 R A .= Wx 1 ┆ 0x1080…10a0 00 00 c8 81 a2 00 88 82 2c 00 5b 00 f8 80 5d 00 d8 81 a0 83 01 00 31 00 bd 00 10 00 bd 20 52 a2 ┆ , Æ Å 1 R ┆ 0x10a0…10c0 28 a5 2f 41 a7 2e 3d aa 57 29 fb 41 00 00 40 83 bd 00 1f 00 bd 20 46 4f 52 20 4d 41 54 52 49 43 ┆( /A .= W) A @ FOR MATRIC┆ 0x10c0…10e0 45 53 20 3c 41 3e 20 41 4e 44 20 3c 57 3e 20 4f 4e 4c 59 82 00 00 e8 81 a2 00 28 00 28 00 28 00 ┆ES <A> AND <W> ONLY ( ( ( ┆ 0x10e0…1100 98 82 a4 00 bc 00 88 82 29 00 a4 00 d0 81 29 00 b1 00 28 00 2d 00 c8 83 a4 00 bc 00 d8 81 29 00 ┆ ) ) ( - ) ┆ 0x1100…1120 a4 00 d0 81 29 00 fb 00 88 82 90 83 01 00 31 00 6e 00 00 00 01 00 01 00 00 00 e8 81 a2 00 88 82 ┆ ) 1 n ┆ 0x1120…1140 10 84 d8 81 3b 00 d0 81 3b 00 c8 81 d0 84 88 83 38 88 00 00 00 00 07 00 4d 41 54 49 4f 54 41 83 ┆ ; ; 8 MATIOTA ┆ 0x1140…1160 00 00 a8 84 00 00 e0 84 00 00 e8 81 a2 00 28 00 28 00 08 85 a4 00 bc 00 88 82 29 00 a4 00 d0 81 ┆ ( ( ) ┆ 0x1160…1180 29 00 b3 00 28 00 2d 00 c8 84 a4 00 bc 00 d8 81 29 00 a4 00 d0 81 c0 85 10 84 f0 82 00 00 00 00 ┆) ( - ) ┆ 0x1180…11a0 08 00 4d 41 54 4d 49 4e 55 53 6e 00 00 00 01 00 01 00 00 00 c8 81 a2 00 88 82 2c 00 5b 00 f8 80 ┆ MATMINUSn , Æ ┆ 0x11a0…11c0 5d 00 d8 81 6e 00 00 00 01 00 01 00 bd 00 12 00 bd 20 52 a2 b9 49 4f 2b 2b fb a7 fc 41 a5 2e b7 ┆Å n R IO++ A . ┆ 0x11c0…11e0 aa 57 b8 84 01 00 31 00 bd 00 1f 00 bd 20 46 4f 52 20 4d 41 54 52 49 43 45 53 20 3c 41 3e 20 41 ┆ W 1 FOR MATRICES <A> A┆ 0x11e0…1200 4e 44 20 3c 57 3e 20 4f 4e 4c 59 00 00 85 01 00 31 00 00 00 18 85 bd 00 3a 00 bd 20 3c 41 3e b3 ┆ND <W> ONLY 1 : <A> ┆ 0x1200…1220 3c 57 3e 20 4f 4e 20 52 4f 57 53 20 4f 46 20 3c 41 3e 20 41 4e 44 20 3c 57 3e 20 42 55 54 20 55 ┆<W> ON ROWS OF <A> AND <W> BUT U┆ 0x1220…1240 53 49 4e 47 20 47 52 41 44 45 20 46 4f 52 20 53 50 45 45 44 d8 85 d0 84 50 88 00 00 00 00 06 00 ┆SING GRADE FOR SPEED P ┆ 0x1240…1260 4d 41 54 4e 55 42 00 00 38 85 00 00 c0 85 b0 89 00 00 00 00 08 00 4d 41 54 55 4e 49 4f 4e 00 00 ┆MATNUB 8 MATUNION ┆ 0x1260…1280 b0 84 bd 00 17 00 bd 20 52 a2 41 2c 5b b9 49 4f 5d 28 a7 2f 57 a5 2e b7 aa 41 29 fb 57 49 bd 00 ┆ R A,Æ IOÅ( /W . A) WI ┆ 0x1280…12a0 1f 00 bd 20 46 4f 52 20 4d 41 54 52 49 43 45 53 20 3c 41 3e 20 41 4e 44 20 3c 57 3e 20 4f 4e 4c ┆ FOR MATRICES <A> AND <W> ONL┆ 0x12a0…12c0 59 00 bd 00 39 00 bd 20 55 4e 49 4f 4e 20 4f 46 20 4d 41 54 52 49 43 45 53 20 3c 41 3e 20 41 4e ┆Y 9 UNION OF MATRICES <A> AN┆ 0x12c0…12e0 44 20 3c 57 3e 20 42 55 54 20 55 53 49 4e 47 20 47 52 41 44 45 20 46 4f 52 20 53 50 45 45 44 00 ┆D <W> BUT USING GRADE FOR SPEED ┆ 0x12e0…1300 00 00 e8 81 a2 00 88 82 d8 85 d8 81 3b 00 d0 81 3b 00 c8 81 00 00 c8 81 a2 00 88 82 2c 00 5b 00 ┆ ; ; , Æ ┆ 0x1300…1320 f8 80 5d 00 d8 81 00 00 30 85 e0 85 01 00 31 00 6e 00 00 00 01 00 01 00 d0 83 b0 85 48 84 e8 84 ┆ Å 0 1 n H ┆ 0x1320…1340 08 86 c8 85 f8 87 f8 86 00 00 e8 81 a2 00 88 82 2c 00 5b 00 f8 80 5d 00 28 00 7e 00 28 00 28 00 ┆ , Æ Å ( ü ( ( ┆ 0x1340…1360 2d 00 70 85 a4 00 bc 00 d8 81 29 00 a4 00 d0 81 29 00 b1 00 28 00 08 87 a4 00 bc 00 88 82 29 00 ┆- p ) ) ( ) ┆ 0x1360…1380 a4 00 d0 81 29 00 fb 00 d8 81 10 87 01 00 31 00 6e 00 00 00 01 00 01 00 63 00 01 01 3e 00 3e 00 ┆ ) 1 n c > > ┆ 0x1380…13a0 53 70 65 63 69 61 6c 20 61 6c 67 6f 72 69 74 68 6d 73 20 65 6d 70 6c 6f 79 69 6e 67 20 67 72 61 ┆Special algorithms employing gra┆ 0x13a0…13c0 64 65 2d 75 70 20 61 72 65 20 75 73 65 64 20 74 6f 20 67 69 76 65 20 72 65 73 75 6c 74 73 63 00 ┆de-up are used to give resultsc ┆ 0x13c0…13e0 01 01 38 00 38 00 46 75 6e 63 74 69 6f 6e 73 20 66 6f 72 20 74 68 65 20 66 61 73 74 20 70 72 6f ┆ 8 8 Functions for the fast pro┆ 0x13e0…1400 63 65 73 73 69 6e 67 20 6f 66 20 63 68 61 72 61 63 74 65 72 20 6d 61 74 72 69 63 65 73 2e 6e 00 ┆cessing of character matrices.n ┆ 0x1400…1420 00 00 01 00 00 00 6e 00 02 00 01 00 ff ff e0 87 0c 00 00 00 00 00 00 00 01 00 4c 00 00 00 f0 88 ┆ n L ┆ 0x1420…1440 a2 00 88 89 bc 00 98 88 00 00 20 81 d0 88 00 00 00 00 03 00 51 4c 58 52 e8 81 00 00 88 82 00 00 ┆ QLXR ┆ 0x1440…1460 d8 81 00 00 d0 81 00 00 c8 81 00 00 00 00 d0 81 5b 00 d0 81 5d 00 a2 00 2b 00 5c 00 a5 00 2f 00 ┆ Æ Å + Ø / ┆ 0x1460…1480 c8 81 b7 00 e0 89 fd 00 c8 81 a2 00 c8 81 5b 00 d0 81 a2 00 af 00 c8 81 3b 00 5d 00 6e 00 02 00 ┆ Æ ; Å n ┆ 0x1480…14a0 01 00 ff ff 50 84 02 00 b8 31 00 00 c8 81 a2 00 88 82 2c 00 5b 00 f8 80 5d 00 d8 81 bd 00 1f 00 ┆ P 1 , Æ Å ┆ 0x14a0…14c0 bd 20 46 4f 52 20 4d 41 54 52 49 43 45 53 20 3c 41 3e 20 41 4e 44 20 3c 57 3e 20 4f 4e 4c 59 57 ┆ FOR MATRICES <A> AND <W> ONLYW┆ 0x14c0…14e0 bd 00 40 00 bd 20 52 4f 57 53 20 4f 46 20 3c 41 3e 20 57 49 54 48 20 52 4f 57 53 20 4f 46 20 3c ┆ @ ROWS OF <A> WITH ROWS OF <┆ 0x14e0…1500 57 3e 20 52 45 4d 4f 56 45 44 20 42 55 54 20 55 53 49 4e 47 20 47 52 41 44 45 20 46 4f 52 20 53 ┆W> REMOVED BUT USING GRADE FOR S┆ 0x1500…1520 50 45 45 44 d8 83 20 87 30 89 f0 86 a8 87 40 88 c0 83 28 86 b0 88 a8 83 f0 83 00 84 50 83 48 82 ┆PEED 0 @ ( P H ┆ 0x1520…1540 90 82 60 83 c8 87 02 00 b8 31 e8 81 00 00 88 82 00 00 d8 81 00 00 d0 81 00 00 c8 81 00 00 00 00 ┆ ` 1 ┆ 0x1540…1560 d0 81 5b 00 d0 81 5d 00 a2 00 2b 00 5c 00 a5 00 2f 00 c8 81 b7 00 00 88 fd 00 c8 81 a2 00 c8 81 ┆ Æ Å + Ø / ┆ 0x1560…1580 5b 00 d0 81 a2 00 af 00 c8 81 3b 00 5d 00 6e 00 02 00 01 00 ff ff 6e 00 02 00 01 00 ff ff e8 81 ┆Æ ; Å n n ┆ 0x1580…15a0 00 00 88 82 00 00 d8 81 00 00 d0 81 00 00 c8 81 00 00 e8 81 00 00 88 82 00 00 d8 81 00 00 d0 81 ┆ ┆ 0x15a0…15c0 00 00 c8 81 00 00 00 00 d0 81 5b 00 d0 81 5d 00 a2 00 2b 00 5c 00 a5 00 2f 00 c8 81 b7 00 40 86 ┆ Æ Å + Ø / @ ┆ 0x15c0…15e0 fd 00 c8 81 a2 00 c8 81 5b 00 d0 81 a2 00 af 00 c8 81 3b 00 5d 00 00 00 c8 81 a2 00 88 82 2c 00 ┆ Æ ; Å , ┆ 0x15e0…1600 5b 00 f8 80 5d 00 d8 81 50 87 70 82 38 82 e8 82 60 82 18 89 80 87 d0 82 c8 88 60 81 a8 82 18 84 ┆Æ Å P p 8 ` ` ┆ 0x1600…1620 e0 83 b0 83 70 86 a0 82 6e 00 02 00 01 00 ff ff c0 89 02 00 b8 31 00 00 18 8a 00 00 e8 81 a2 00 ┆ p n 1 ┆ 0x1620…1640 88 82 d0 84 d8 81 3b 00 d0 81 3b 00 c8 81 e8 81 00 00 88 82 00 00 d8 81 00 00 d0 81 00 00 c8 81 ┆ ; ; ┆ 0x1640…1660 00 00 00 00 b8 86 00 00 f8 83 00 00 d0 81 5b 00 d0 81 5d 00 a2 00 2b 00 5c 00 a5 00 2f 00 c8 81 ┆ Æ Å + Ø / ┆ 0x1660…1680 b7 00 40 84 fd 00 c8 81 a2 00 c8 81 5b 00 d0 81 a2 00 af 00 c8 81 3b 00 5d 00 6e 00 02 00 01 00 ┆ @ Æ ; Å n ┆ 0x1680…16a0 ff ff 48 88 02 00 b8 31 00 00 d0 81 5b 00 d0 81 5d 00 a2 00 2b 00 5c 00 a5 00 2f 00 c8 81 b7 00 ┆ H 1 Æ Å + Ø / ┆ 0x16a0…16c0 b8 88 fd 00 c8 81 a2 00 c8 81 5b 00 d0 81 a2 00 af 00 c8 81 3b 00 5d 00 6e 00 02 00 01 00 ff ff ┆ Æ ; Å n ┆ 0x16c0…16e0 20 89 02 00 b8 31 bd 00 10 00 bd 20 52 a2 28 a7 2f 41 a5 2e b7 aa 57 29 fb 41 6e 00 00 00 01 00 ┆ 1 R ( /A . W) An ┆ 0x16e0…1700 01 00 38 89 01 00 31 00 6e 00 00 00 01 00 01 00 d8 86 01 00 31 00 00 00 e8 81 a2 00 28 00 7e 00 ┆ 8 1 n 1 ( ü ┆ 0x1700…1720 28 00 28 00 90 87 a4 00 bc 00 88 82 29 00 a4 00 d0 81 29 00 b1 00 28 00 2d 00 20 88 a4 00 bc 00 ┆( ( ) ) ( - ┆ 0x1720…1740 d8 81 29 00 a4 00 d0 81 29 00 fb 00 88 82 e8 81 00 00 88 82 00 00 d8 81 00 00 d0 81 00 00 c8 81 ┆ ) ) ┆ 0x1740…1760 00 00 00 00 d0 81 5b 00 d0 81 5d 00 a2 00 2b 00 5c 00 a5 00 2f 00 c8 81 b7 00 88 88 fd 00 c8 81 ┆ Æ Å + Ø / ┆ 0x1760…1780 a2 00 c8 81 5b 00 d0 81 a2 00 af 00 c8 81 3b 00 5d 00 6e 00 02 00 01 00 ff ff a0 88 02 00 b8 31 ┆ Æ ; Å n 1┆ 0x1780…17a0 00 00 a3 00 e0 87 6e 00 02 00 01 00 01 00 00 00 20 83 78 87 00 82 10 83 18 88 00 00 d0 81 5b 00 ┆ n x Æ ┆ 0x17a0…17c0 d0 81 5d 00 a2 00 2b 00 5c 00 a5 00 2f 00 c8 81 b7 00 10 8a fd 00 c8 81 a2 00 d8 81 5b 00 d0 81 ┆ Å + Ø / Æ ┆ 0x17c0…17e0 a2 00 af 00 d8 81 3b 00 5d 00 00 00 f0 84 a8 81 02 00 b8 31 63 00 01 02 36 00 09 00 06 00 50 49 ┆ ; Å 1c 6 PI┆ 0x17e0…1800 47 4c 45 54 48 45 4e 20 20 20 43 41 54 20 20 20 44 4f 47 20 20 20 44 4f 47 20 20 20 50 49 47 20 ┆GLETHEN CAT DOG DOG PIG ┆ 0x1800…1820 20 20 48 4f 52 53 45 20 44 4f 47 20 20 20 50 49 47 20 20 20 00 00 30 81 00 00 d8 88 63 00 01 02 ┆ HORSE DOG PIG 0 c ┆ 0x1820…1840 18 00 04 00 06 00 43 41 54 20 20 20 44 4f 47 20 20 20 4e 45 57 54 20 20 50 49 47 4c 45 54 00 00 ┆ CAT DOG NEWT PIGLET ┆ 0x1840…1860 f0 88 a2 00 98 89 3b 00 68 82 3b 00 f8 89 00 00 f0 88 a2 00 28 00 28 00 28 00 e8 85 a4 00 bc 00 ┆ ; h ; ( ( ( ┆ 0x1860…1880 f0 88 29 00 2c 00 f8 89 29 00 a4 00 f0 88 29 00 2c 00 5b 00 f8 80 5d 00 f8 89 a4 00 68 82 00 00 ┆ ) , ) ) , Æ Å h ┆ 0x1880…18a0 f8 89 a2 00 28 00 60 89 a4 00 bc 00 f0 88 29 00 bf 00 bc 00 68 82 e0 81 0d 00 70 89 00 00 00 00 ┆ ( ` ) h p ┆ 0x18a0…18c0 08 00 4d 41 54 42 55 49 4c 44 38 86 01 00 30 00 00 00 16 00 00 00 00 00 00 00 01 00 56 00 6e 00 ┆ MATBUILD8 0 V n ┆ 0x18c0…18e0 00 01 02 00 02 00 00 00 6e 00 00 00 01 00 01 00 10 86 01 00 31 00 00 00 1a 00 00 00 00 00 00 00 ┆ n 1 ┆ 0x18e0…1900 01 00 5a 00 6e 00 00 00 01 00 00 00 63 00 01 01 00 00 00 00 98 87 03 00 30 20 30 00 e8 86 02 00 ┆ Z n c 0 0 ┆ 0x1900…1920 b8 31 00 00 f8 89 00 00 00 00 00 00 02 00 4c 50 c0 88 01 00 30 00 00 00 e0 87 3a 00 a3 00 28 00 ┆ 1 LP 0 : ( ┆ […truncated at 200 lines…]