Simplify 8 − X 8 + X \frac{8-\sqrt{x}}{8+\sqrt{x}} 8 + X 8 − X By Rationalizing The Denominator.

Mar 11, 2025 by ADMIN 103 views

$Simplify $\frac{8-\sqrt{x}}{8+\sqrt{x}}$ by Rationalizing the Denominator$

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Introduction

Rationalizing the denominator is a process used to eliminate any radical expressions in the denominator of a fraction. This is particularly useful when dealing with expressions that involve square roots or other types of radicals. In this article, we will explore how to simplify the expression $\frac{8-\sqrt{x}}{8+\sqrt{x}}$ by rationalizing the denominator.

Understanding the Problem

The given expression is a fraction with a square root in the denominator. Our goal is to simplify this expression by eliminating the radical in the denominator. To do this, we will use the process of rationalizing the denominator, which involves multiplying both the numerator and the denominator by a cleverly chosen expression that will eliminate the radical.

Rationalizing the Denominator

To rationalize the denominator, we need to multiply both the numerator and the denominator by the conjugate of the denominator. The conjugate of a binomial expression $a + b$ is $a - b$ . In this case, the denominator is $8 + \sqrt{x}$ , so its conjugate is $8 - \sqrt{x}$ .

\frac{8-\sqrt{x}}{8+\sqrt{x}} \cdot \frac{8-\sqrt{x}}{8-\sqrt{x}}

Simplifying the Expression

Now that we have multiplied both the numerator and the denominator by the conjugate of the denominator, we can simplify the expression. To do this, we will use the distributive property to multiply out the numerator and the denominator.

\frac{(8-\sqrt{x})(8-\sqrt{x})}{(8+\sqrt{x})(8-\sqrt{x})}

Expanding the Numerator and Denominator

Next, we will expand the numerator and the denominator by multiplying out the expressions.

\frac{64 - 16\sqrt{x} + x}{64 - x}

Canceling Out Common Factors

Now that we have expanded the numerator and the denominator, we can cancel out any common factors. In this case, we can cancel out the $64$ in the numerator and the denominator.

\frac{-16\sqrt{x} + x}{-x}

Simplifying the Expression Further

Finally, we can simplify the expression further by dividing both the numerator and the denominator by $-1$ .

\frac{x - 16\sqrt{x}}{x}

Conclusion

In this article, we have shown how to simplify the expression $\frac{8-\sqrt{x}}{8+\sqrt{x}}$ by rationalizing the denominator. We used the process of multiplying both the numerator and the denominator by the conjugate of the denominator, expanding the numerator and the denominator, and canceling out common factors. The final simplified expression is $\frac{x - 16\sqrt{x}}{x}$ .

Applications of Rationalizing the Denominator

Rationalizing the denominator is a useful technique that has many applications in mathematics and other fields. Some examples of applications include:

Simplifying expressions: Rationalizing the denominator can be used to simplify complex expressions and make them easier to work with.
Solving equations: Rationalizing the denominator can be used to solve equations that involve square roots or other types of radicals.
Graphing functions: Rationalizing the denominator can be used to graph functions that involve square roots or other types of radicals.
Optimization: Rationalizing the denominator can be used to optimize functions that involve square roots or other types of radicals.

Examples of Rationalizing the Denominator

Here are a few examples of rationalizing the denominator:

Example 1: Simplify the expression $\frac{3-\sqrt{2}}{3+\sqrt{2}}$ by rationalizing the denominator.
Example 2: Simplify the expression $\frac{4-\sqrt{3}}{4+\sqrt{3}}$ by rationalizing the denominator.
Example 3: Simplify the expression $\frac{2-\sqrt{5}}{2+\sqrt{5}}$ by rationalizing the denominator.

Tips and Tricks for Rationalizing the Denominator

Here are a few tips and tricks for rationalizing the denominator:

Use the conjugate: The conjugate of a binomial expression $a + b$ is $a - b$ . Use this to rationalize the denominator.
Multiply both the numerator and the denominator: Make sure to multiply both the numerator and the denominator by the conjugate of the denominator.
Expand the numerator and the denominator: Use the distributive property to multiply out the numerator and the denominator.
Cancel out common factors: Look for common factors in the numerator and the denominator and cancel them out.

Conclusion

In conclusion, rationalizing the denominator is a useful technique that can be used to simplify complex expressions and make them easier to work with. By following the steps outlined in this article, you can simplify expressions that involve square roots or other types of radicals. Remember to use the conjugate, multiply both the numerator and the denominator, expand the numerator and the denominator, and cancel out common factors. With practice, you will become proficient in rationalizing the denominator and be able to apply this technique to a wide range of problems.

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Frequently Asked Questions

Q: What is rationalizing the denominator?

A: Rationalizing the denominator is a process used to eliminate any radical expressions in the denominator of a fraction. This is particularly useful when dealing with expressions that involve square roots or other types of radicals.

Q: Why do we need to rationalize the denominator?

A: We need to rationalize the denominator because it makes the expression easier to work with. When the denominator is a radical, it can be difficult to simplify the expression or perform operations such as addition and subtraction.

Q: How do I rationalize the denominator?

A: To rationalize the denominator, you need to multiply both the numerator and the denominator by the conjugate of the denominator. The conjugate of a binomial expression $a + b$ is $a - b$ .

Q: What is the conjugate of a binomial expression?

A: The conjugate of a binomial expression $a + b$ is $a - b$ . For example, the conjugate of $3 + \sqrt{2}$ is $3 - \sqrt{2}$ .

Q: How do I multiply the numerator and the denominator by the conjugate?

A: To multiply the numerator and the denominator by the conjugate, you need to use the distributive property. This means that you need to multiply each term in the numerator by each term in the denominator.

Q: Can I rationalize the denominator of a fraction with a negative sign in the denominator?

A: Yes, you can rationalize the denominator of a fraction with a negative sign in the denominator. To do this, you need to multiply both the numerator and the denominator by the conjugate of the denominator.

Q: Can I rationalize the denominator of a fraction with a decimal in the denominator?

A: No, you cannot rationalize the denominator of a fraction with a decimal in the denominator. Rationalizing the denominator only works for fractions with radical expressions in the denominator.

Q: How do I know if I have rationalized the denominator correctly?

A: To check if you have rationalized the denominator correctly, you need to simplify the expression and see if the denominator is no longer a radical.

Q: Can I use rationalizing the denominator to simplify expressions with multiple radicals in the denominator?

A: Yes, you can use rationalizing the denominator to simplify expressions with multiple radicals in the denominator. However, you need to be careful and make sure to multiply each radical by the conjugate of the denominator.

Q: Are there any other ways to simplify expressions with radicals in the denominator?

A: Yes, there are other ways to simplify expressions with radicals in the denominator. One way is to use the fact that $\sqrt{a} \cdot \sqrt{b} = \sqrt{ab}$ .

Q: Can I use rationalizing the denominator to solve equations with radicals in the denominator?

A: Yes, you can use rationalizing the denominator to solve equations with radicals in the denominator. However, you need to be careful and make sure to follow the correct steps.

Q: Are there any tips or tricks for rationalizing the denominator?

A: Yes, here are a few tips and tricks for rationalizing the denominator:

Use the conjugate to rationalize the denominator.
Multiply both the numerator and the denominator by the conjugate.
Expand the numerator and the denominator using the distributive property.
Cancel out common factors in the numerator and the denominator.
Check your work by simplifying the expression and seeing if the denominator is no longer a radical.

Common Mistakes to Avoid

Mistake 1: Not using the conjugate

A: Make sure to use the conjugate of the denominator to rationalize the denominator.

Mistake 2: Not multiplying both the numerator and the denominator

A: Make sure to multiply both the numerator and the denominator by the conjugate.

Mistake 3: Not expanding the numerator and the denominator

A: Make sure to expand the numerator and the denominator using the distributive property.

Mistake 4: Not canceling out common factors

A: Make sure to cancel out common factors in the numerator and the denominator.