Solve The Following Equation: 2 R − 9 + 5 = 10 \sqrt{2r - 9} + 5 = 10 2 R − 9 ​ + 5 = 10

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Introduction to the Equation

The given equation is $\sqrt{2r - 9} + 5 = 10$. This is a quadratic equation that involves a square root. To solve for the variable $r$, we need to isolate it on one side of the equation. In this article, we will walk through the steps to solve this equation and provide a clear understanding of the process.

Step 1: Isolate the Square Root Term

The first step is to isolate the square root term on one side of the equation. We can do this by subtracting 5 from both sides of the equation. This gives us:

$\sqrt{2r - 9} = 10 - 5$

$\sqrt{2r - 9} = 5$

Step 2: Square Both Sides of the Equation

To eliminate the square root, we can square both sides of the equation. This will give us:

$(\sqrt{2r - 9})^2 = 5^2$

$2r - 9 = 25$

Step 3: Add 9 to Both Sides of the Equation

Next, we need to add 9 to both sides of the equation to isolate the term with the variable $r$. This gives us:

$2r - 9 + 9 = 25 + 9$

$2r = 34$

Step 4: Divide Both Sides of the Equation by 2

Finally, we need to divide both sides of the equation by 2 to solve for the variable $r$. This gives us:

$\frac{2r}{2} = \frac{34}{2}$

$r = 17$

Conclusion

In this article, we solved the equation $\sqrt{2r - 9} + 5 = 10$ using a step-by-step approach. We isolated the square root term, squared both sides of the equation, added 9 to both sides, and finally divided both sides by 2 to solve for the variable $r$. The solution to the equation is $r = 17$.

Understanding the Importance of Solving Equations

Solving equations is an essential skill in mathematics and is used in a wide range of applications, including physics, engineering, and economics. Equations are used to model real-world problems and to make predictions about the behavior of complex systems. By solving equations, we can gain a deeper understanding of the underlying relationships between variables and make informed decisions.

Types of Equations

There are several types of equations, including linear equations, quadratic equations, and polynomial equations. Each type of equation has its own unique characteristics and requires different techniques to solve. Linear equations involve a single variable and can be solved using basic algebraic operations. Quadratic equations involve a squared variable and can be solved using the quadratic formula. Polynomial equations involve multiple variables and can be solved using advanced algebraic techniques.

Real-World Applications of Solving Equations

Solving equations has numerous real-world applications, including:

• Physics: Equations are used to model the motion of objects and to predict the behavior of complex systems.
• Engineering: Equations are used to design and optimize systems, such as bridges and buildings.
• Economics: Equations are used to model economic systems and to make predictions about the behavior of markets.
• Computer Science: Equations are used to model complex systems and to make predictions about the behavior of algorithms.

Conclusion

In conclusion, solving equations is an essential skill in mathematics and has numerous real-world applications. By understanding the different types of equations and the techniques used to solve them, we can gain a deeper understanding of the underlying relationships between variables and make informed decisions. Whether you are a student, a professional, or simply someone who is interested in mathematics, solving equations is an essential skill that can be applied in a wide range of contexts.

Final Thoughts

Solving equations is not just about finding a solution to a mathematical problem; it is also about developing critical thinking skills and learning to approach complex problems in a logical and methodical way. By practicing solving equations, we can improve our problem-solving skills and become more confident in our ability to tackle complex challenges. Whether you are a math enthusiast or simply someone who wants to improve your problem-solving skills, solving equations is an essential skill that can be applied in a wide range of contexts.

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Introduction to the Q&A

In our previous article, we solved the equation $\sqrt{2r - 9} + 5 = 10$ using a step-by-step approach. In this article, we will answer some of the most frequently asked questions about solving this equation.

Q: What is the solution to the equation $\sqrt{2r - 9} + 5 = 10$?

A: The solution to the equation $\sqrt{2r - 9} + 5 = 10$ is $r = 17$.

Q: How do I isolate the square root term in the equation?

A: To isolate the square root term, you need to subtract 5 from both sides of the equation. This gives you $\sqrt{2r - 9} = 10 - 5$, which simplifies to $\sqrt{2r - 9} = 5$.

Q: Why do I need to square both sides of the equation?

A: Squaring both sides of the equation is necessary to eliminate the square root. By squaring both sides, you can get rid of the square root and solve for the variable $r$.

Q: What is the quadratic formula, and how is it used to solve equations?

A: The quadratic formula is a mathematical formula that is used to solve quadratic equations. It is given by $x = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a}$. The quadratic formula is used to solve quadratic equations of the form $ax^2 + bx + c = 0$.

Q: Can I use the quadratic formula to solve the equation $\sqrt{2r - 9} + 5 = 10$?

A: No, you cannot use the quadratic formula to solve the equation $\sqrt{2r - 9} + 5 = 10$. The quadratic formula is used to solve quadratic equations, but the equation $\sqrt{2r - 9} + 5 = 10$ is not a quadratic equation.

Q: What is the difference between a linear equation and a quadratic equation?

A: A linear equation is an equation that involves a single variable and can be written in the form $ax + b = 0$. A quadratic equation, on the other hand, is an equation that involves a squared variable and can be written in the form $ax^2 + bx + c = 0$.

Q: Can I use algebraic techniques to solve the equation $\sqrt{2r - 9} + 5 = 10$?

A: Yes, you can use algebraic techniques to solve the equation $\sqrt{2r - 9} + 5 = 10$. In fact, we used algebraic techniques to solve this equation in our previous article.

Q: What is the importance of solving equations in real-world applications?

A: Solving equations is an essential skill in mathematics and has numerous real-world applications. Equations are used to model real-world problems and to make predictions about the behavior of complex systems.

Q: Can I use a calculator to solve the equation $\sqrt{2r - 9} + 5 = 10$?

A: Yes, you can use a calculator to solve the equation $\sqrt{2r - 9} + 5 = 10$. However, it is always a good idea to check your work by plugging the solution back into the original equation.

Conclusion

In this article, we answered some of the most frequently asked questions about solving the equation $\sqrt{2r - 9} + 5 = 10$. We hope that this article has been helpful in clarifying any confusion and providing a better understanding of the solution to this equation.

Final Thoughts

Solving equations is an essential skill in mathematics and has numerous real-world applications. By understanding the different types of equations and the techniques used to solve them, we can gain a deeper understanding of the underlying relationships between variables and make informed decisions. Whether you are a student, a professional, or simply someone who is interested in mathematics, solving equations is an essential skill that can be applied in a wide range of contexts.