Order of Operations

When simplifying an expression, it is very important to follow the order of operations. We often times refer to PEMDAS as a reminder of the order we should preform the operations. PEMDAS represents parentheses, exponents, multiplication, division, addition, and subtraction. Each operation is discussed below.

  1. Parentheses
  2. First, simplify everything that appears inside each set of parentheses in the expression. Take the contents inside the parentheses to be a new expression, and simplify that expression following the order of operations.

    Note that if an expression is divided by another expression, such as:

    \[{{{3 + 2 \cdot 5} \over {4 - {{5 \over 7}}}}}\]

    You should consider the numerator to be in a set of parentheses, and the denominator to be in a set of parentheses:

    \[{{{\left( {3 + 2 \cdot 5} \right)} \over {\left( {4 - {{5 \over 7}}} \right)}}}\]

  1. Exponents
  2. Evaluate all exponents within the expression. For instance, $$2^3$$ should be simplified to 8.

  1. Multiplication and Division
  2. Perform whichever operation comes first in the expression as you read it from left to right. For example, consider the expression:

    $$3 \cdot 4/6 \cdot7$$

    We first multiply 3 by 4 to get 12. Then, we divide 12 by 6 to get 2, and finally multiply 2 by 7 and get a final answer of 14.

  1. Addition and Subtraction
  2. Perform whichever operation comes first in the expression as you read it from left to right. For example, if you have the expression:

    $$7 - 2 + 5 - 6$$

    We first subtract 2 from 7 to get 5. Then, we add 5 to get 10 and finally subtract 6 to get a final answer of 4.

     

Example 1:

Simplify using the order of operations:

\[5 - 3(2 + 3 \cdot 4^2 )\]

 

Some practice problems to check your skills:

1. Perform the operations to simplify:  $$3\left( {4 + {\large{{16} \over 4}}} \right) - 6 \cdot 2^2 $$

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2. Perform the operations to simplify:  $${\Large{1 \over 4}}\left( {3 + 11 \cdot {\large\left( {{2 \over {22}}}\right)}}\right) - {\Large{{35} \over 7}}$$

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3. Perform the operations to simplify:   $$8(4+3-5)^2 / 9$$

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4. Perform the operations to simplify:   $${\Large{{3 + 7\left( {6 - 2} \right)} \over {7^2 }}} + 6 \cdot \left( { - 3 + 4} \right)$$

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5. Perform the operations to simplify:  $$7+56/8 \cdot 6+3-4 \cdot 3+1$$

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