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I can round the elements of A to the nearest integers greater than or equal to A

ceil(A)

But what about if I want to round it to the nearest 50 greater than or equal to A?

For example, given the following A array,

A=[24, 35, 78, 101, 199];

A subroutine should return the following

B=Subroutine(A)=[50, 50, 100, 150, 200];
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2 Answers

up vote 11 down vote accepted

You could just divide by 50, take ceil(), and multiply by 50 again:

  octave:1> A=[24, 35, 78, 101, 199];
  octave:2> ceil(A)
  ans =

    24    35    78   101   199

  octave:3> 50*(ceil(A/50.))
  ans =

    50    50   100   150   200
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Note that this could conceivably introduce floating-point rounding errors, for large values in A. –  Piet Delport Oct 3 '10 at 17:53
    
Meh, so get rid of the decimal point after the 50 in the division. Either the numbers are already floating-point values, in which case that issue has already come up elsewhere in the code, or the numbers are integers, in which case just get rid of the decimal point and now you're doing integer division and addition, in which case no floating point issues. So I don't see the problem here. –  Jonathan Dursi Oct 3 '10 at 22:29
    
The problem is that the results will be incorrect. :-) For example, try 77777777777777777 as input: this method gives the incorrect result 77777777777777792, while the modulus method correctly gives 77777777777777800. –  Piet Delport Oct 4 '10 at 22:03
    
Yes, and so does your method: "a = 77777777777777777; a + mod(-a,50)" also gives 77777777777777792. You may want go look at wikipedia's article on machine epsilon (en.wikipedia.org/wiki/Machine_epsilon) and note that you are never going to have numerical operations produce correct results in the 16th decimal place of a floating point number even in double precision. And of course, with (say) 64bit ints, either approach gives the correct result, because 50*ceil(a/50) in integer arithmetic is precisely the same thing as a+mod(-a,50). –  Jonathan Dursi Oct 4 '10 at 22:23
1  
@Piet and Jonathan: I tested both your answers in MATLAB (what the question asks about) and I got the exact same result from each. However, testing the output with a number like 77777777777777777 doesn't make much sense, since this is a larger integer than what a double (the default MATLAB type) can hold. You'd need a 64-bit integer to handle that number. –  gnovice Oct 5 '10 at 13:59
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An easy way is to just add each number's complement modulo 50:

octave> A = [24, 35, 78, 101, 199] 

octave> mod(-A, 50)       # Complement (mod 50)
ans =

   26   15   22   49    1

octave> A + mod(-A, 50)   # Sum to "next higher" zero (mod 50)
ans =

    50    50   100   150   200

octave> A - mod(A, 50)    # Can also sum to "next lower" zero (mod 50)
ans =

     0     0    50   100   150

(Note that this only depends on integer arithmetic, which avoids errors due to floating-point rounding.)

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