# What does the term “BODMAS” mean?

What is BODMAS and why is it useful in programming?

• I usually use white space to show the order of operations on the four +-/* operations, like this: a + b*c For all other operators, I use parentheses to make the order of operations clear. – Jeremy Ruten Aug 15 '08 at 0:02
• Operator precedence in C and C++ – foxy Oct 22 '08 at 11:16
• I've never seen BODMAS before today. I learned PEMDAS (Parens, Exponents, Multiplication, Division, Addition, Subtraction). – FishBasketGordo May 21 '12 at 18:05

What do you think the answer to 2 + 3 x 5 is?

Is it (2 + 3) x 5 = 5 x 5 = 25 ?

or 2 + (3 x 5) = 2 + 15 = 17 ?

BODMAS can come to the rescue and give us rules to follow so that we always get the right answer:

(B)rackets (O)rder (D)ivision (M)ultiplication (A)ddition (S)ubtraction

According to BODMAS, multiplication should always be done before addition, therefore 17 is actually the correct answer according to BODMAS and will also be the answer which your calculator will give if you type in 2 + 3 x 5 .

Why it is useful in programming? No idea, but i assume it's because you can get rid of some brackets? I am a quite defensive programmer, so my lines can look like this:

``````result = (((i + 4) - (a + b)) * MAGIC_NUMBER) - ANOTHER_MAGIC_NUMBER;
``````

with BODMAS you can make this a bit clearer:

``````result = (i + 4 - (a + b)) * MAGIC_NUMBER - ANOTHER_MAGIC_NUMBER;
``````

I think i'd still use the first variant - more brackets, but that way i do not have to learn yet another rule and i run into less risk of forgetting it and causing those weird hard to debug errors?

Just guessing at that part though.

Mike Stone EDIT: Fixed math as Gaius points out

• To be honest, I'm with your "bracketty" style, rather than the supposedly optimised version. Maybe it's just me, but I find >result = (((i + 4) - (a + b)) * MAGIC_NUMBER) - ANOTHER_MAGIC_NUMBER; easier to parse mentally... – ZombieSheep Aug 6 '08 at 15:01

Another version of this (in middle school) was "Please Excuse My Dear Aunt Sally".

• Parentheses
• Exponents
• Multiplication
• Division
• Subtraction

The mnemonic device was helpful in school, and still useful in programming today.

Order of operations in an expression, such as:

``````foo * (bar + baz^2 / foo)
``````
• Brackets first
• Orders (ie Powers and Square Roots, etc.)
• Division and Multiplication (left-to-right)

I don't have the power to edit @Michael Stum's answer, but it's not quite correct. He reduces

``````(i + 4) - (a + b)
``````

to

``````(i + 4 - a + b)
``````

They are not equivalent. The best reduction I can get for the whole expression is

``````((i + 4) - (a + b)) * MAGIC_NUMBER - ANOTHER_MAGIC_NUMBER;
``````

or

``````(i + 4 - a - b) * MAGIC_NUMBER - ANOTHER_MAGIC_NUMBER;
``````

When I learned this in grade school (in Canada) it was referred to as BEDMAS:

Brackets
Exponents
Division
Multiplication