![]() Step 5: When you can no longer combine any terms, stop and rewrite the final expression in standard form.ĭo these steps sound familiar? Because you’ve already encountered some of these rules in the form of the PEMDAS rule. Step 4: Add and subtract terms from left to right to combine like terms. Step 3: Multiply and divide terms when needed and when these operations are present. Step 2: Rewrite terms so that they share the same form, so evaluate terms with exponents and rewrite mixed numbers to fractions. Step 1: Eliminate the parentheses and brackets by evaluating, distributing, and combining terms inside them. This means that there are different approaches when simplifying expressions, but here are some steps to help guide you: Writing the final and simplified expression in its standard form is a great last step to follow. When simplifying expressions, group appropriate terms together and apply the rules of operation in the correct order. By the end of our discussion, you’ll feel confident to work on more complex expressions! What Are the Steps in Simplifying Expressions? You’ll have a chance to try different problems to also test your understanding. ![]() ![]() ![]() In this article, we’ll break down the fundamentals of PEMDAS and refresh the different algebraic properties that will come in handy when simplifying expressions. Throughout your algebra and more advanced math classes, you’ll be using these rules and techniques, so mastering the key steps in simplifying expressions will give you an edge later on. Simplifying expressions and the skillset needed to accurately simplify expressions are essential building blocks in algebra. ![]()
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