BODMAS

Definition: BODMAS stands for:

Brackets
Orders (i.e., powers and square roots, etc.)
Division
Multiplication
Addition
Subtraction The order of operations dictates the sequence in which you should solve parts of a mathematical expression. If you don't follow this order, you might get the wrong answer.

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Example Problem: Question: What is $3+2×4?$

Step 1: According to BODMAS, multiplication should be done before addition.
Step 2: First, solve the multiplication part of the expression: $2×4=8.$
Step 3: Then, add the result to $3$ : $3+8=11$ So, the correct answer is 11.

Common Mistake: If you were to add first and then multiply, you might do this:

                                                                  $(3+2)×4=5×4=20$

This gives an incorrect answer of 20.

Why BODMAS?

BODMAS is used to ensure that everyone solves mathematical expressions in the same order, leading to the same answer. It's a set of rules that tells you which operation to perform first when you have a mix of operations like addition, subtraction, multiplication, and division.

Breaking Down BODMAS:

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B: Brackets:

Solve anything inside brackets first.

Example: $(2+3)×4=5×4=20$

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O or I: Order or Indices

Order refers to powers or indices, such as $2³$ .
Always solve powers before moving on to multiplication or division.

Example: $3²+4=9+4=13$

Here, $3²$ (which is $9$ ) is calculated first.

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D: Division

Division comes next, and it can appear in different forms:
$÷$ as in $8÷2$
Fraction form like $\frac{4}{9}$

Example: $12÷3+5=4+5=9$ Here, division is performed before addition.

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M: Multiplication

Multiplication follows division, and like division, it is performed from left to right.

Example: $6×3+4=18+4=22$

Here, multiplication is done before addition.

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A: Addition

After handling any multiplication or division, move on to addition.

Example: $7+3×2=7+6=13$

Multiplication comes before addition, so $3×2$ is done first.

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S: Subtraction

Finally, perform subtraction, after all other operations have been completed.

Example: $15−3+2=12+2=14$

Since addition and subtraction are of the same priority, we go from left to right.

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Example 1 – Simple

Let's go through an example to see how BODMAS is applied in practice. This example will help you understand how to break down a problem step-by-step using the BODMAS rules.

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Problem: Solve the following expression using BODMAS:

                                               $20−(3+2)×3$

Solution:

Step 1: Solve Brackets First

According to BODMAS, we need to handle any brackets first.
Inside the brackets, we have $3+2$ , which equals $5$ .
So, the expression simplifies to: $20−5×3$

Step 2: Multiplication Next

There are no powers or indices, so we move on to multiplication.
Multiply $5$ by $3$ to get $15$ .
The expression now becomes: $20−15$

Step 3: Final Operation - Subtraction

Now, perform the subtraction.
Subtract $15$ from $20$ , which gives us: $5$

Answer:

The final answer is 5.

Example 2: A Bit Tricker

In this example, we will apply the BODMAS rules to a slightly more complex expression. This will help reinforce your understanding of how to deal with different operations in the correct order.

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Problem: Solve the following expression using BODMAS:

                                               $3+(2×3²−3)÷5$

Step 1: Solve Brackets First

Just like in the previous example, we start by solving everything inside the brackets.
The expression inside the brackets is $2×3²−3$ .

Step 2: Deal with the Power (Order)

According to BODMAS, within the brackets, powers come before multiplication.
Calculate $3²=9$ .
Now, the expression inside the brackets is: $2×9−3$

Step 3: Perform Multiplication Next

Next, multiply $2×9=18$ .
The expression inside the brackets now simplifies to: $18−3$

Step 4: Complete the Subtraction in the Brackets

Subtract $3$ from $18$ : $18−3=15$

Step 5: Return to the Original Expression

Now that the brackets are simplified, substitute back into the original expression: $3+15÷5$

Step 6: Perform Division Next

Division is next according to BODMAS: $15÷5=3$

Step 7: Complete the Final Addition

Now, add the result to $3$ : $3+3=6$

Answer:

The final answer is 6.

Example 3: Difficult

This example involves a more complex expression with division and powers. Following BODMAS correctly here is crucial, especially when dealing with expressions involving fractions and multiple operations.

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Problem: Solve the following expression using BODMAS:

\frac{10 + 2 \times 3}{10 - 2^3}

Step 1: Recognising Hidden Brackets

Even though there are no explicit brackets, the division line acts as a bracket. You need to treat the entire top and bottom of the fraction separately, as if they were enclosed in brackets.

Step 2: Simplify the Top of the Fraction

Start by solving the top part: $10+2×3$ .
According to BODMAS, multiplication comes before addition, so: $2×3=6$
Now add: $10+6=16$
The top part simplifies to $16$ .

Step 3: Simplify the Bottom of the Fraction

Now, move to the bottom part of the fraction: $10−2³$ .
According to BODMAS, powers come before subtraction. So, calculate $23$ : $2³=8$
Now subtract: $10−8=2$

The bottom part simplifies to $2$ .

Step 4: Perform the Division

Now, divide the simplified top by the simplified bottom:

\frac{16}{2} = 8

Answer:

The final answer is 8.

BODMAS Simplified Revision Notes for GCSE OCR Maths

BODMAS

Why BODMAS?

Breaking Down BODMAS:

Example 1 – Simple

Example 2: A Bit Tricker

Example 3: Difficult

500K+ Students Use These Powerful Tools to Master BODMAS For their GCSE Exams.

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