Simplify The Expression:$\[ \frac{2r-4}{r-2} \\]

Introduction

Simplifying algebraic expressions is a crucial skill in mathematics, and it is essential to understand the techniques involved in simplifying expressions with variables. In this article, we will focus on simplifying the expression $\frac{2r-4}{r-2}$ using various methods. We will start by understanding the concept of simplifying expressions and then move on to the step-by-step process of simplifying the given expression.

Understanding Simplification of Algebraic Expressions

Simplifying algebraic expressions involves reducing the expression to its simplest form by combining like terms, canceling out common factors, and rearranging the terms. The goal of simplification is to make the expression easier to work with and to understand its underlying structure. Simplification is an essential skill in mathematics, and it is used extensively in various branches of mathematics, including algebra, geometry, and calculus.

Step 1: Factor the Numerator

To simplify the expression $\frac{2r-4}{r-2}$, we start by factoring the numerator. The numerator can be factored as follows:

$$2r-4 = 2(r-2)$$

Step 2: Cancel Out Common Factors

Now that we have factored the numerator, we can cancel out the common factor between the numerator and the denominator. The common factor is $(r-2)$, which can be canceled out as follows:

$$\frac{2(r-2)}{r-2} = 2$$

Step 3: Simplify the Expression

Now that we have canceled out the common factor, we can simplify the expression by multiplying the remaining terms. In this case, there are no remaining terms, and the expression simplifies to:

$$2$$

Conclusion

In this article, we have simplified the expression $\frac{2r-4}{r-2}$ using various methods. We started by understanding the concept of simplifying algebraic expressions and then moved on to the step-by-step process of simplifying the given expression. We factored the numerator, canceled out common factors, and simplified the expression to its simplest form. The final simplified expression is $2$.

Tips and Tricks

• When simplifying algebraic expressions, it is essential to look for common factors between the numerator and the denominator.
• Canceling out common factors can help simplify the expression and make it easier to work with.
• Factoring the numerator can help identify common factors and make it easier to cancel them out.

Real-World Applications

Simplifying algebraic expressions has numerous real-world applications in various fields, including science, engineering, and economics. For example, in physics, simplifying expressions is used to describe the motion of objects and to calculate forces and energies. In engineering, simplifying expressions is used to design and optimize systems, such as electrical circuits and mechanical systems. In economics, simplifying expressions is used to model and analyze economic systems, such as supply and demand curves.

Common Mistakes to Avoid

When simplifying algebraic expressions, there are several common mistakes to avoid. These include:

• Not factoring the numerator
• Not canceling out common factors
• Not simplifying the expression to its simplest form
• Not checking for errors in the simplification process

Final Thoughts

Simplifying algebraic expressions is a crucial skill in mathematics, and it is essential to understand the techniques involved in simplifying expressions with variables. By following the step-by-step process outlined in this article, you can simplify the expression $\frac{2r-4}{r-2}$ and understand the underlying structure of the expression. Remember to look for common factors, cancel them out, and simplify the expression to its simplest form.

Additional Resources

For further practice and review, we recommend the following resources:

• Khan Academy: Algebra
• MIT OpenCourseWare: Algebra
• Wolfram Alpha: Algebra

Conclusion

In conclusion, simplifying algebraic expressions is a crucial skill in mathematics, and it is essential to understand the techniques involved in simplifying expressions with variables. By following the step-by-step process outlined in this article, you can simplify the expression $\frac{2r-4}{r-2}$ and understand the underlying structure of the expression. Remember to look for common factors, cancel them out, and simplify the expression to its simplest form.