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How would I round the result from two divided numbers, e.g.

3/2

As when I do

testOne=$((3/2))

$testOne contains "1" when it should have rounded up to "2" as the answer from 3/2=1.5

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Essentially a DUP of SO 2394988 (stackoverflow.com/questions/2394988) - same poster. –  Jonathan Leffler Mar 7 '10 at 7:19
    
Granted it's very similar, but I wouldn't call it a DUP, but feel free to close it now, since I have gotten my answer now anyway, thanks ghostdog! –  Mint Mar 7 '10 at 8:41
2  
Agreed! The two questions are not the same. One is asking for ceiling. This one asks for rounding which may be rounding up or down. –  shparekh Sep 16 '14 at 18:26

8 Answers 8

up vote 10 down vote accepted

bash will not give you correct result of 3/2 since it doesn't do floating pt maths. you can use tools like awk

$ awk  'BEGIN { rounded = sprintf("%.0f", 3/2); print rounded }'
2

or bc

$ printf "%.0f" $(echo "scale=2;3/2" | bc)
2
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1  
awk 'BEGIN { rounded = sprintf("%.0f", 1/2); print rounded }' returns 0 and not 1. –  tommy.carstensen Jan 24 '14 at 11:49
1  
You should note that this does unbiased rounding. –  anon Feb 11 '14 at 23:51

To do rounding up in truncating arithmetic, simply add (denom-1) to the numerator.

Example, rounding down:

N/2
M/5
K/16

Example, rounding up:

(N+1)/2
(M+4)/5
(K+15)/16

To do round-to-nearest, add (denom/2) to the numerator (halves will round up):

(N+1)/2
(M+2)/5
(K+8)/16
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Can you explain this a bit more? Whats denom mean for one? And I don't really get what all these brackets and letters are doing…? I feel I should know since there have been no other answers and 5+ ups –  Mint Mar 7 '10 at 7:48
2  
@Mint: He is showing a generalized answer using algebraic notation. Using your Bash example, it would look like this: testOne=$(( (3 + (2 - 1) / 2)). Even more generally, but in Bash syntax, it would be something like answer=$(( ($numerator + ($denominator - 1) / $denomonator)). You can also do it this way which eliminates all the dollar signs and allows more freedom with spaces (such as around the equal sign): ((answer = (numerator + (denominator - 1) / denomonator)) –  Dennis Williamson Mar 7 '10 at 14:25
    
@Dennis: right, except your parentheses are unbalanced. Unfortunately it looks like Mint is a cut+paste coder with no desire to understand what's going on or how the syntactic elements of his program function. –  Ben Voigt Mar 7 '10 at 18:51
    
Yeah, I made some typos on those parentheses. –  Dennis Williamson Mar 8 '10 at 5:58
1  
This only works for positive numbers. –  tommy.carstensen Jan 24 '14 at 11:45

Good Solution is to get Nearest Round Number is

var=2.5
echo $var | awk '{print int($1+0.5)}'

Logic is simple if the var decimal value is less then .5 then closest value taken is integer value. Well if decimal value is more than .5 then next integer value gets added and since awk then takes only integer part. Issue solved

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If you have integer division of positive numbers which rounds toward zero, then you can add one less than the divisor to the dividend to make it round up.

That is to say, replace X / Y with (X + Y - 1) / Y.

Proof:

  • Case 1: X = k * Y (X is integer multiple of Y): In this case, we have (k * Y + Y - 1) / Y, which splits into (k * Y) / Y + (Y - 1) / Y. The (Y - 1)/Y part rounds to zero, and we are left with a quotient of k. This is exactly what we want: when the inputs are divisible, we want the adjusted calculation to still produce the correct exact quotient.

  • Case 2: X = k * Y + m where 0 < m < Y (X is not a multiple of Y). In this case we have a numerator of k * Y + m + Y - 1, or k * Y + Y + m - 1, and we can write the division out as (k * Y)/Y + Y/Y + (m - 1)/Y. Since 0 < m < Y, 0 <= m - 1 < Y - 1, and so the last term (m - 1)/Y goes to zero. We are left with (k * Y)/Y + Y/Y which work out to k + 1. This shows that the behavior rounds up. If we have an X which is a k multiple of Y, if we add just 1 to it, the division rounds up to k + 1.

But this rounding is extremely opposite; all inexact divisions go away from zero. How about something in between?

That can be achieved by "priming" the numerator with Y/2. Instead of X/Y, calculate (X+Y/2)/Y. Instead of proof, let's go empirical on this one:

$ round()
> {
>   echo $((($1 + $2/2) / $2))
> }
$ round 4 10
0
$ round 5 10
1
$ round 6 10
1
$ round 9 10
1
$ round 10 10
1
$ round 14 10
1
$ round 15 10
2

Whenever the divisor is an even, positive number, if the numerator is congruent to half that number, it rounds up, and rounds down if it is one less than that.

For instance, round 6 12 goes to 1, as do all values which are equal to 6, modulo 12, like 18 (which goes to 2) and so on. round 5 12 goes down to 0.

For odd numbers, the behavior is correct. None of the exact rational numbers are midway between two consecutive multiples. For instance, with a denominator of 11 we have 5/11 < 5.5/11 (exact middle) < 6/11; and round 5 11 rounds down, whereas round 6 11 rounds up.

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If the decimal separator is comma (eg : LC_NUMERIC=fr_FR.UTF-8, see here):

$ printf "%.0f" $(echo "scale=2;3/2" | bc) 
bash: printf: 1.50: nombre non valable
0

Substitution is needed for ghostdog74 solution :

$ printf "%.0f" $(echo "scale=2;3/2" | bc | sed 's/[.]/,/')
2

or

$ printf "%.0f" $(echo "scale=2;3/2" | bc | tr '.' ',')
2
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Another solution is to do the division within a python command. For example:

$ numerator=90
$ denominator=7
$ python -c "print (round(${numerator}.0 / ${denominator}.0))"

Seems less archaic to me than using awk.

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I think this should be enough.

$ echo "3/2" | bc 
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That works for your example, however echo "2.5*3" | bc gives 7.5 –  mhwombat Aug 8 '14 at 12:17

To round up you can use modulus.

The second part of the equation will add to True if there's a remainder. (True = 1; False = 0)

ex: 3/2

answer=$(((3 / 2) + (3 % 2 > 0)))
echo $answer
2

ex: 100 / 2

answer=$(((100 / 2) + (100 % 2 > 0)))
echo $answer
50

ex: 100 / 3

answer=$(((100 / 3) + (100 % 3 > 0)))
echo $answer
34
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