# need clarification on BODMAS rule [closed]

In BODMAS rule the order of operations are brackets,order,division,multiplication addition and subtraction.here division,multiplication,addition and subtraction is following decrement,increment ,increment and decrement order.the BODMAS rule series is not following the same order.And my question is why addition is followed by subtraction but not subtraction is followed by addition.

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## closed as off topic by iiSeymour, Mark Rotteveel, Ben, Luc M, hlovdalApr 6 '13 at 16:11

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Because BOMDSA would be harder to pronounce? –  Andrei Apr 6 '13 at 10:57
I was taught it's BOMDAS –  James Apr 6 '13 at 11:07
I m not convinced but thanks. –  Jittu Apr 6 '13 at 11:12
This question is better suited for mathematics.stackexchange. –  Koushik Apr 6 '13 at 11:24
@Jittu check this out(gadgetopia.com/post/5878) –  Koushik Apr 6 '13 at 11:31

BODMAS or BOMDSA are exactly the same, since multiplication/division and addition/subtraction are at the same level of precedence (in facts, they should be written more correctly as B O DM AS, with whatever order you prefer inside the various groups); as said by the relevant Wikipedia page:

These mnemonics may be misleading when written this way, especially if the user is not aware that multiplication and division are of equal precedence, as are addition and subtraction.

In other words, what you are missing is that normally (both when doing math "manually" and in any sane programming language) the operators are actually grouped by classes of precedence, where multiplication and division have the same precedence (as well as sum and subtraction). So, your "BODMAS rule" actually is actually:

()
**
* /
+ -

(I use ** as the exponentiation operator - as it is in Python -, as Java does not provide one; also, () here are grouping symbols, not operators)

The precedence of operators on the same line is determined by their order in an expression and their associativity (which, for arithmetic operators, is left to right, although for exponentiation is not well defined).

Although for math on reals this is not really relevant unless talking about division (addition and subtraction are associative, if you consider subtraction as "addition of the opposite"), in programming it is double important, since math on FP numbers and on integers is often not associative.

Also, programming languages provide many more operators, not associative/commutative, with different associativity and not so well established precedence rules, so it's normal that they specify their rules for operators precedence in a more refined way.

See for example the operator precedence and associativity table of Java: it's way more complicated than the simple "BODMAS rule", which is inadequate to correctly express it (since there are many classes, more operators in each class, classes with different associativity, ...).

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Exponentiation is right-associative in mathematics, and hopefully in every programming language that has an exponentiation operator (or three). It is in Haskell and Python. –  Daniel Fischer Apr 6 '13 at 14:07
@DanielFischer: in mathematics normally there's no ambiguity because you use superscript notation; in programming languages, as you said it's normally right-associative, but in real code in case of multiple exponentiations I've almost always seen it "clarified" with parentheses, sign that its right associativity is not so intuitive. –  Matteo Italia Apr 6 '13 at 14:21
Even with superscript notation, you can still associate two ways. (I can't show it here, but if you can read LaTeX, \$2 ^ {(3^4)}\$ vs. \${\bigl( 2^3 \bigr)} ^ 4\$.) Absent explicit parentheses, \$2^{3^4}\$ means the first. –  Daniel Fischer Apr 6 '13 at 14:29

In Java, both subtraction and addition are, oddly enough, addition. Subtraction is simply the addition of a negative number.

Eg:

int x = 1;
int y = 2;
int z = x - y; // Is actually x + (-y)
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then what is the value of 6-4+2.irrespective of programming using BODMAS rule –  Jittu Apr 6 '13 at 11:01
Well look at BODMAS. 6 - 4 + 2. Add the terms first, so it's 6 - 6 which is 0. –  christopher Apr 6 '13 at 11:02
its not 6-4*2 but it is 6-4+2 –  Jittu Apr 6 '13 at 11:05
I edited my answer. –  christopher Apr 6 '13 at 11:05
In java its 4 its not 0 –  Jittu Apr 6 '13 at 11:08

well its just a term, in mathematics, it give same result if you + then - or - then +, so is for * and /.

(x - y) = (-y + x) And (x*y)/z = x*(y/z) And x-y*z = x-(y*z) = -(y*z)+x

Just only thing matter is, you must have calculate *,/ before +,- corresponding to the bracket they are in.

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then what is the value of 6-4+2.irrespective of programming using BODMAS rule We are getting two results 6-4+2=0 and other is 4 –  Jittu Apr 6 '13 at 11:06
look at the sign on numbers, its -4 & +2 its not -(+4, +2) –  ay89 Apr 6 '13 at 11:08
can you elobrate please –  Jittu Apr 6 '13 at 11:09
the result is based on sign on numbers, since we have bracket to group operation, it gives different meaning altogether -4 + 2 is as simple as it looks, but -(4 + 2) equals -4 -2 because the - is on the result not on individual number –  ay89 Apr 6 '13 at 11:13
@Jittu you have completely missed the point. how did you come up with 6-(4+2) for6-4+2? it should be 6+(-4+2) if at all you want to introduce parantheses –  Koushik Apr 6 '13 at 11:27