Introduction
Simplifying expressions is a fundamental concept that is used in algebraic calculations. It involves reducing algebraic expressions to their simplest form by combining like terms and applying the order of operations. In this article, we will look at how to simplify the expression mc001-1.jpg mc001-2.jpg mc001-3.jpg mc001-4.jpg.Step-by-Step Solution
The expression mc001-1.jpg mc001-2.jpg mc001-3.jpg mc001-4.jpg can be simplified using the following steps:
Step 1: Simplify the brackets
The first step is to simplify the brackets. We can do this by multiplying the terms inside the brackets by the term outside the brackets. The expression then becomes:
mc001-5.jpgStep 2: Combine like terms
The next step is to combine like terms. We can do this by adding or subtracting terms that have the same variable and exponent. In this case, we have two terms with the variable x and exponent 2, and two terms with the variable x and exponent 1. Hence, we can combine these terms to get:
mc001-6.jpgStep 3: Simplify the expression
Finally, we can simplify the expression by factoring out the common factor of x. This gives us:
mc001-7.jpgConclusion
In conclusion, simplifying expressions is a crucial concept that is used in algebraic calculations. To simplify the expression mc001-1.jpg mc001-2.jpg mc001-3.jpg mc001-4.jpg, we followed the steps of simplifying the brackets, combining like terms, and simplifying the expression. By factoring out the common factor of x, we were able to reduce the expression to its simplest form.
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