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I recently became the owner of HP16c and I want make a program to convert hexadecimal number to decimal by a special rule.
I use the following formulas in Excel:
 Remove in the hexadecimal number the last two digits from left:
=LEFT(A2,(LEN(A2)2))
 Converts HEX to DEC:
=HEX2DEC(B2)
 Remove first digits starting with the “1“ for such a rule
=IF(LEFT(C2,4)="1000",RIGHT(C2,1),
(IF(LEFT(C2,3)="100",RIGHT(C2,2),
(IF(LEFT(C2,2)="10",RIGHT(C2,3),
(IF(LEFT(C2,1)="1",RIGHT(C2,4),
"???")))))))
For example:
HEX DEC
285801 328
271101 1
3e7F03 5999
3f7F03 6255
ae01 174
f02 15
3dA01 ???
3f3e02 6190
2b6799 1111
But I have difficulty trying to program HP16c begin at first stephow to remove two digit? Shifting Bits, or...?
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Posts: 325
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Joined: Jul 2006
That part is easy. Simply shift (not rotate) right eight bits. Converting from hex to decimal is also easy.
Stripping off leading ones from a decimal number is somewhat harder. Divide by 1000, see if the quotient is 1, divide by 100, see if the quotient is 1, etc.
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Posts: 735
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Or maybe:
 Subtract 1000
 Leave if it is between 0 and 1000
 Add 1000
 Subtract 100
 Leave if it is between 0 and 100
 Add 100
(...)
This is the program that illustrates the algorithm:
#!/usr/bin/python
def remove(n):
k = 1000
while k > 0:
n = k
if 0 <= n < k:
break
n += k
k /= 10
return n
for n in (0, 1, 3, 13, 45, 114, 144, 456, 1456, 1018, 3255):
print "%10d > %10d" % (n, remove(n))
0 > 0
1 > 0
3 > 3
13 > 3
45 > 45
114 > 14
144 > 44
456 > 456
1456 > 456
1018 > 18
3255 > 3255
This is the program for the HP16C:
001  43,22, A LBL A
002  1 1
003  0 0
004  0 0
005  10 /
006  24 DEC
007  1 1
008  0 0
009  0 0
010  0 0
011  0 0
012  43,22, 0 LBL 0
013  30 
014  43 2 x<0
015  22 1 GTO 1
016  43 36 LSTx
017  43 1 x<=y
018  22 2 GTO 2
019  22 3 GTO 3
020  43,22, 1 LBL 1
021  43 36 LSTx
022  43,22, 2 LBL 2
023  40 +
024  43 36 LSTx
025  1 1
026  0 0
027  10 /
028  43 30 x>0
029  22 0 GTO 0
030  43,22, 3 LBL 3
031  33 Rv
032  43 21 RTN
My table doesn't agree in all cases:
INPUT OUTPUT
285801 h 328 d
271101 h 1 d
3E7F03 h 5999 d
3F7F03 h 6255 d
AE01 h 74 d
F02 h 5 d
3DA01 h 986 d
3F3E02 h 6190 d
2B6799 h 1111 d
Nevertheless I hope this is what you were looking for.
Kind regards
Thomas
Edited: 3 June 2013, 2:58 p.m.
Posts: 735
Threads: 34
Joined: May 2007
Quote:
Stripping off leading ones from a decimal number
As the examples ae01 and f02 indicate that's not what Leonid wants. But then I wonder, what's happening with this formula in Excel with say 100037: is it just 7 as IF(LEFT(C2,4)="1000",RIGHT(C2,1) indicates? But then this isn't the description:
Quote:
Remove first digits starting with the “1“ for such a rule
Or is the length of the decimal numbers somehow limited to 5 digits? Do we just have to remove the first digit if the decimal number exceeds 9999? This program produces the same results as your table with the exception of 3DA01 h for which it returns 986 d:
001  43,22, A LBL A
002  1 1
003  0 0
004  0 0
005  10 /
006  24 DEC
007  1 1
008  0 0
009  0 0
010  0 0
011  0 0
012  42 9 RMD
013  43 21 RTN
However this will disagree with Excel for 6423 h as the result is 100 d and not 0 (or rather "00").
Now I'm curious what this program is supposed to do. And then I guess the most difficult part will be to produce three question marks.
Cheers
Thomas
Edited: 3 June 2013, 4:06 p.m.
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Quote:
that's not what Leonid wants
I stand corrected. If the leading digit is one then the number of immediately following zeroes determine the number of digits of the result.
Thomas, as for the discrepancies in your previous table: for ae01, strip the two rightmost digits to get ae, convert to decimal to get 174, which starts with "1" so retain the rightmost four digits 0174 or 174. For f02, strip to get f, convert to get 15, which again starts with "1" so the rightmost four digits gives 0015 or 15. In neither case does the "1" get removed.
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I think I understand the Excel formula and I know that both of my programs don't give the same result in all cases. But I still wonder why 3E800 h, shifted and converted to 1000 d should result in 0 d while A00 h, shifted and converted to 10 d rests as it is. Does that make sense to you?
Kind regards
Thomas
Edited: 3 June 2013, 4:37 p.m.
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Quote:
But I still wonder why 3E800 h, shifted and converted to 1000 d should result in 0 d while A00 h, shifted and converted to 10 d rests as it is. Does that make sense to you?
1000, because it begins "1000", is reduced to the rightmost digit to give "0". 10, because it begins "10", is "reduced" to the rightmost three digits to give "010" or "10".
It makes sense according to the rules. I don't see the sense or reason behind the rules, however. Perhaps Leonid could explain what this is all in pursuit of.
Posts: 3
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Thank you, short program is good solution for me
(Sorry I have not completely described, but you have correctly guessed conditions. This is a practical problem, and not all the possible numbers will be used in it)
By the way, for causes "???" (3dA01). HP16c has something visual, like Flag 9 in HP15c?
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Joined: May 2007
Quote:
short program is good solution for me
I'm just glad you don't need the equivalent of the Excelfunction because that would have been difficult to implement.
I'm not aware that you could make the HP16C blink as the HP15C but you can still set flags 4 or 5 to display either the
carry or the outofrangeannunciator.
This program sets the Gannunciator for 3DA01 h:
001  43,22, A LBL A
002  1 1
003  0 0
004  0 0
005  10 /
006  24 DEC
007  1 1
008  0 0
009  0 0
010  0 0
011  0 0
012  43 3 x>y
013  22 3 GTO 3
014  42 9 RMD
015  43 21 RTN
016  43,22, 0 LBL 0
017  30 
018  43 2 x<0
019  22 1 GTO 1
020  43 36 LSTx
021  43 1 x<=y
022  22 2 GTO 2
023  40 +
024  43 21 RTN
025  43,22, 1 LBL 1
026  43 36 LSTx
027  43,22, 2 LBL 2
028  40 +
029  43 36 LSTx
030  43,22, 3 LBL 3
031  1 1
032  0 0
033  10 /
034  43 30 x>0
035  22 0 GTO 0
036  43, 4, 5 SF 5
037  33 Rv
038  43 21 RTN
Cheers
Thomas
Edited: 3 June 2013, 10:22 p.m.
Posts: 528
Threads: 40
Joined: Dec 2008
Shift right 8 bits, then subtract 10,000(decimal). I haven't used a 16C so I don't know the details of programming it, but that's the idea.
Dave
