![]() ![]() Simplifying Variable Expressions – Example 4: ![]() Then: \((10x 2x 3)=12x 3\) (remember you cannot combine variables and numbers). Write in standard form (biggest powers first): \(x^2 \ 5 x \ 12\) Simplifying Variable Expressions – Example 3: Simplifying Variable Expressions – Example 2: Then: \(2x 3 x \ 4=5x \ 4\) (remember you cannot combine variables and numbers). The terms must not only have the same variable, but also the same exponent. When dealing with variable expressions, it's important to remember that terms with the same variable and exponent (or 'like terms') can be added and subtracted like normal numbers. Then: \(2 x \ \ 3 x \ = 5x \) (remember you cannot combine variables and numbers). Simplifying Complex Expressions 1 Add like variable terms. Simplifying Variable Expressions Simplifying Variable Expressions – Example 1: (values with same variable and same power) In an expression, we can combine “ like” terms.An algebraic expression is an expression contains integers, variables, and math operations such as addition, subtraction, multiplication, division, etc.The most common letters are: \(x, y, z, a, b, c, m\) and \(n\). In algebra, a variable is a letter used to stand for a number.Step by step guide to simplifying variable expressions #SIMPLIFYING EXPRESSIONS HOW TO#How to Translate Phrases into an Algebraic Statement.Basically, youre turning a long expression. Ratio, Proportion and Percentages Puzzles Simplifying algebraic expressions is the same idea, except you have variables (or letters) in your expression. ![]()
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