# Order of Operations

*BODMAS*

### Operations

**"Operations"** mean things like add, subtract, multiply, divide, squaring, etc. If it isn't a number it is probably an operation.

But, when you see something like...

7 + (6 × 5^{2} + 3)

... what part should you calculate first?

Start at the left and go to the right?

Or go from right to left?

*Warning: Calculate them in the wrong order, and you can get a wrong answer !*

So, long ago people agreed to follow rules when doing calculations, and they are:

## Order of Operations

Do things in Brackets First

4 × (5 + 3) | = | 4 × 8 | = | 32 | |||

4 × (5 + 3) | = | 20 + 3 | = | 23 | (wrong) |

Exponents (Powers, Roots) before Multiply, Divide, Add or Subtract

5 × 2^{2} | = | 5 × 4 | = | 20 | |||

5 × 2^{2} | = | 10^{2} | = | 100 | (wrong) |

Multiply or Divide before you Add or Subtract

2 + 5 × 3 | = | 2 + 15 | = | 17 | |||

2 + 5 × 3 | = | 7 × 3 | = | 21 | (wrong) |

Otherwise just go left to right

30 ÷ 5 × 3 | = | 6 × 3 | = | 18 | |||

30 ÷ 5 × 3 | = | 30 ÷ 15 | = | 2 | (wrong) |

## How Do I Remember It All ... ? BODMAS !

B | Brackets first |

O | Orders (i.e. Powers and Square Roots, etc.) |

DM | Division and Multiplication (left-to-right) |

AS | Addition and Subtraction (left-to-right) |

Divide and Multiply rank equally (and go left to right).

Add and Subtract rank equally (and go left to right)

So do it this way:

After you have done "B" and "O", just go from left to right doing any "D" * or* "M" as you find them.

Then go from left to right doing any "A" * or* "S" as you find them.

*Note: the only strange name is "Orders". "Exponents" is used in Canada, and so you might prefer "BEDMAS". There is also "Indices" which makes it "BIDMAS". In the US they say "Parentheses" instead of Brackets, so it is "PEMDAS"*

## Examples

### Example: How do you work out **3 + 6 × 2** ?

**M**ultiplication before **A**ddition:

First **6 × 2 = 12**, then **3 + 12 = 15**

### Example: How do you work out **(3 + 6) × 2** ?

**B**rackets first:

First **(3 + 6) = 9**, then **9 × 2 = 18**

### Example: How do you work out **12 / 6 × 3 / 2** ?

**M**ultiplication and ** D**ivision rank equally, so just go left to right:

First **12 / 6 = 2**, then **2 × 3 = 6**, then **6 / 2 = 3**

A practical example:

### Example: Sam threw a ball straight up at 20 meters per second, how far did it go in 2 seconds?

Sam uses this special formula that includes gravity:

height = velocity × time − (1/2) × 9.8 × time^{2}

Sam puts in the velocity of 20 meters per second and time of 2 seconds:

height = 20 × 2 − (1/2) × 9.8 × 2^{2}

Now for the calculations!

^{2}

^{2}

^{2}=4):20 × 2 − 0.5 × 9.8 × 4

**20.4**

**The ball reaches 20.4 meters after 2 seconds**

## Exponents of Exponents ...

What about this example?

4^{32}

Exponents are special: **they go top-down** (do the exponent at the top first). So we calculate this way:

Start with: | 4^{32} | |

3^{2} = 3×3: | 4^{9} | |

4^{9} = 4×4×4×4×4×4×4×4×4: | 262144 |

So 4^{32} = 4^{(32)}, not (4^{3})^{2}

**And finally, what about the example from the beginning?**

^{2}+ 3)

*Brackets*first and then

*"Orders"*:7 + (6 × 25 + 3)

*Multiply*:7 + (150 + 3)

*Add*:7 + (153)

*Brackets*completed: 7 + 153

*Add*:

**160**