I have some large numbers in an Excel sheet and I want to convert them to binary.
e.g.
12345678
965321458
-12457896
If we are talking positive number between 0
and 2^32-1
you can use this formula:
=DEC2BIN(MOD(QUOTIENT($A$1,256^3),256),8)&DEC2BIN(MOD(QUOTIENT($A$1,256^2),256),8)&DEC2BIN(MOD(QUOTIENT($A$1,256^1),256),8)&DEC2BIN(MOD(QUOTIENT($A$1,256^0),256),8)
NOTE: =DEC2BIN()
function cannot handle numbers larger than 511 so as you see my formula breaks your number into four 8-bit chunks, converts them to binary format and then concatenates the results.
Well, theoretically you can extend this formula up to six 8-bit chunks. Maximum precision you can get in Excel is 15 (fifteen) decimal digits. When exceeded, only the most significant 15 digits remain, the rest is rounded. I.e. if you type 12345678901234567
Excel will store it as 12345678901234500
. So since 2^48-1
is 15 decimal digits long the number won't get rounded.
2^32-1
, and then check on this page, but I am not getting the same number. BASE
has a higher limit: 2^53
so maybe for numbers greater than this one, a similar logic can be applied
Mar 31, 2023 at 19:57
Perhaps a simpler option:
Positive numbers only, just use BASE (as in BASE2) for numbers between 0 to 2^53 in Excel 2013+. Here are some examples:
=BASE(13,2) # returns 1101
=BASE(3,2) # returns 11
=BASE(3,2,4) # returns 0011
Key: 3=number input 2=radix (binary) 4=Min_length--upvote "Micah Lindstrom's" comment for noticing
Credit for BASE answer goes here: https://ask.libreoffice.org/en/question/69797/why-is-dec2bin-limited-to-82bits-in-an-32-and-64-bits-world/
Negative numbers: Come to think of it, negative numbers could be handled as well by building upon howy61's answer. He shifts everything by a power of two (2^31 in his case) to use the 2's complement:
=BASE(2^31+MyNum, 2)
so (using 2^8 for only 8 bits):
=BASE(2^8+(-1),2,8) # returns 11111111
=BASE(2^8+(-3),2,8) # returns 11111101
The numbers given by the OP requires more bits, so I'll use 2^31 (could go up to 2^53):
=BASE(2^31+(-12457896),2,32) # returns 011111111010000011110100001011000
For either positive or negative, both formulas could be coupled in a single IF formula. Here are two ways you could do it that give the same answer, where MyNum is the decimal number you start with:
=IF(MyNum<0, BASE(2^31+MyNum, 2, 32), BASE(MyNum, 2, 32))
or
=BASE(IF(MyNum<0, MyNum+2^32, MyNum), 2, 32)
=BASE(15,2,10)
gives result 0000001111
.
Mar 25 at 22:23
See VBA posted here
' The DecimalIn argument is limited to 79228162514264337593543950245
' (approximately 96-bits) - large numerical values must be entered
' as a String value to prevent conversion to scientific notation. Then
' optional NumberOfBits allows you to zero-fill the front of smaller
' values in order to return values up to a desired bit level.
Function DecToBin(ByVal DecimalIn As Variant, Optional NumberOfBits As Variant) As String
DecToBin = ""
DecimalIn = CDec(DecimalIn)
Do While DecimalIn <> 0
DecToBin = Trim$(Str$(DecimalIn - 2 * Int(DecimalIn / 2))) & DecToBin
DecimalIn = Int(DecimalIn / 2)
Loop
If Not IsMissing(NumberOfBits) Then
If Len(DecToBin) > NumberOfBits Then
DecToBin = "Error - Number too large for bit size"
Else
DecToBin = Right$(String$(NumberOfBits, "0") & _
DecToBin, NumberOfBits)
End If
End If
End Function
I just tried the formula above, and found that Microsoft screwed up the DEC2BIN function in another way that keeps the formula from working correctly with negative numbers. Internally, DEC2BIN uses a ten bit result; leading zeroes are dropped from the text result, unless the optional length parameter is used, in which case the required number of leading zeroes are left in the string. But here's the rub: a negative number always starts with a one, so there are no leading zeroes to drop, so DEC2BIN will always show all ten bits! Thus, DEC2BIN(-1,8), which should show 11111111 (eight ones) will instead show 1111111111 (ten ones.)
To fix this, use RIGHT to trim each eight bit chunk to eight bits, dumb as that sounds.
=RIGHT(DEC2BIN(QUOTIENT(A1,256^3),8),8) & RIGHT(...
(I read through the VBA, and it does not have the same problem, but it doesn't look like it will handle negatives at all.)
To add easier to read formatting to Taosique's great answer, you can also break it up into chunks of 4 bits with spaces in between, although the formula grows to be a monster:
=DEC2BIN(MOD(QUOTIENT($A$1,16^7),16),4)&" "&DEC2BIN(MOD(QUOTIENT($A$1,16^6),16),4)&" "&DEC2BIN(MOD(QUOTIENT($A$1,16^5),16),4)&" "&DEC2BIN(MOD(QUOTIENT($A$1,16^4),16),4)&" "&DEC2BIN(MOD(QUOTIENT($A$1,16^3),16),4)&" "&DEC2BIN(MOD(QUOTIENT($A$1,16^2),16),4)&" "&DEC2BIN(MOD(QUOTIENT($A$1,16^1),16),4)&" "&DEC2BIN(MOD(QUOTIENT($A$1,16^0),16),4)
1101 0100 1111 0110 0011 0001 0000 0001
Of course, you can just use the right half of it, if you're just interested in 16 bit numbers:
=DEC2BIN(MOD(QUOTIENT($A$1,16^3),16),4)&" "&DEC2BIN(MOD(QUOTIENT($A$1,16^2),16),4)&" "&DEC2BIN(MOD(QUOTIENT($A$1,16^1),16),4)&" "&DEC2BIN(MOD(QUOTIENT($A$1,16^0),16),4)
0011 0001 0000 0001
While I didn't write this for negatives or decimals, it should be relatively easy to modify. This VBA will convert any super large (or not so large if you want, but that wasn't the point) decimal up to the converted binary result containing up to 32767 digits (maximum string length in VBA).
Enter decimal in cell "A1" as a string, result will be in "B1" as a string.
Dim NBN As String
Dim Bin As String
5 Big = Range("A1")
AA = Len(Big)
For XX = 1 To AA
L1 = Mid(Big, XX, 1) + CRY
CRY = 0
If L1 = 0 Then
FN = "0"
GoTo 10
End If
If Int(L1 / 2) = L1 / 2 Then
FN = L1 / 2
GoTo 10
End If
If Int(L1 / 2) <> L1 / 2 Then
FN = Int(L1 / 2)
CRY = 10
GoTo 10
End If
10 NBN = NBN & FN
Next XX
If Left(NBN, 1) = "0" Then
NBN = Right(NBN, (Len(NBN) - 1))
End If
If CRY = 10 Then Bin = "1" & Bin Else Bin = "0" & Bin
Range("A1") = NBN
Range("A2") = Bin
If Len(NBN) > 0 Then
NBN = ""
CRY = 0
GoTo 5
End If
Someone can find binary shift operations more clear and relevant here
=DEC2BIN(BITRSHIFT($A$1,24),8) & DEC2BIN(MOD(BITRSHIFT($A$1,16),256),8) & DEC2BIN(MOD(BITRSHIFT($A$1,8),256),8) & DEC2BIN(MOD($A$1,256),8)
This formula is for 32-bit values
This vba function solves the problem of binary conversion of numbers greater than 511 that can not be done with WorksheetFunction.dec2bin.
The code takes advantage of the WorksheetFunction.dec2bin function by applying it in pieces.
Function decimal2binary(ByVal decimal2convert As Long) As String
Dim rest As Long
If decimal2convert = 0 Then
decimal2binary = "0"
Exit Function
End If
Do While decimal2convert > 0
rest = decimal2convert Mod 512
decimal2binary = Right("000000000" + WorksheetFunction.Dec2Bin(rest), 9) + decimal2binary
decimal2convert = (decimal2convert - rest) / 512
Loop
decimal2binary = Abs(decimal2binary)
End Function
=IF(Decimal>-1,BASE(Decimal,2,32),BASE(2^32+(Decimal),2))
Does both positive and negative numbers. Took a bit LOL. Tech pun. You're welcome.
Without VBA and working with negative numbers as well (here: sint16), however, taking much more space:
You can download the excel file here: (sorry, didn't know where to put the file) int16 bits to decimal.xlsx
or alternatively follow these steps (if your Excel is not in English, use Excel Translator to "translate" the formula into your MS Office language):
=IF(NUMBERVALUE(A4)>=1000,TRUE,FALSE)
Enter the letter "A" in G2-J2, "B" in K2-N2, "C" in O2-R2, "D" in S2-V2
Enter "1" in G3, K3, O3 and S3; "2" in H3, L3, P3 and T3; "3" in I3, M3, Q3 and U3; "4" in J3, N3, R3 and V3
In G4, enter:
=MID(INDIRECT(G$2&ROW()),G$3,1)
Copy the formula to H4-V4
In X4, enter:
=IF(G4="1",0,1)
Copy X4 to Y4-AM4
In BD3 enter "1"
In BC4, enter:
=IF((AM$4+BD3)=2,1,0)
=IF((AM$4+BD3)=2,0,IF((AM$4+BD3)=1,1,0))
Copy BD4 and BD4 and insert it 15 times diagonally one row further down and one column further left (like in the screenshot), i.e. insert it to BB5 and BC5, then BA6 and BB6, ..., AN19 and AO19.
In AO20, enter "=AO19"; in AP20, enter "=AP18" and so on until BD20 ("=BD4") - i.e. bring down the numbers into one line as seen in the screenshot
In BE20, enter (this is your result):
=IF(F4=FALSE,BIN2DEC(A4&B4)*2^8+BIN2DEC(C4&D4),-1*(BIN2DEC(AO20&AP20&AQ20&AR20&AS20&AT20&AU20&AV20)*2^8+BIN2DEC(AW20&AX20&AY20&AZ20&BA20&BB20&BC20&BD20)))
There maybe a simple solution. I have several 4.2 billion cells that are actually a negative Two's Complement and this works to get the correct value: =SUM(2^31-(A1-2^31))
DEC2BIN
function?DEC2BIN
cannot handle number larger than 511.