Which Inequality Represents All Values Of X X X For Which The Quotient Below Is Defined? X + 2 ÷ 5 − X \sqrt{x+2} \div \sqrt{5-x} X + 2 ​ ÷ 5 − X ​ A. X ≥ − 2 X \geq -2 X ≥ − 2 B. − 2 ≤ X ≤ 5 -2 \leq X \leq 5 − 2 ≤ X ≤ 5 C. − 2 ≤ X \textless 5 -2 \leq X \ \textless \ 5 − 2 ≤ X \textless 5 D. X ≤ 5 X \leq 5 X ≤ 5

Introduction

When dealing with mathematical expressions involving square roots, it's essential to consider the domain of the expression to ensure that it's defined. In this case, we're given a quotient involving square roots, and we need to determine the inequality that represents all values of $x$ for which the quotient is defined. The quotient is $\sqrt{x+2} \div \sqrt{5-x}$.

Understanding the Domain of Square Roots

To determine the domain of the quotient, we need to consider the domain of each square root individually. The square root of a number is defined only if the number is non-negative. Therefore, we need to find the values of $x$ for which both $x+2$ and $5-x$ are non-negative.

Finding the Domain of $x+2$

The expression $x+2$ is non-negative when $x+2 \geq 0$. Solving this inequality, we get $x \geq -2$. This means that the domain of $x+2$ is all values of $x$ greater than or equal to $-2$.

Finding the Domain of $5-x$

The expression $5-x$ is non-negative when $5-x \geq 0$. Solving this inequality, we get $x \leq 5$. This means that the domain of $5-x$ is all values of $x$ less than or equal to $5$.

Combining the Domains

To find the domain of the quotient, we need to combine the domains of $x+2$ and $5-x$. Since the domain of $x+2$ is $x \geq -2$ and the domain of $5-x$ is $x \leq 5$, the combined domain is $-2 \leq x \leq 5$.

Conclusion

In conclusion, the inequality that represents all values of $x$ for which the quotient $\sqrt{x+2} \div \sqrt{5-x}$ is defined is $-2 \leq x \leq 5$. This means that the quotient is defined for all values of $x$ between $-2$ and $5$, inclusive.

Answer

The correct answer is B. $-2 \leq x \leq 5$.

Explanation

The other options are incorrect because:

• Option A, $x \geq -2$, is only the domain of $x+2$ and does not consider the domain of $5-x$.
• Option C, $-2 \leq x < 5$, is incorrect because it excludes the value $x=5$, which is part of the combined domain.
• Option D, $x \leq 5$, is only the domain of $5-x$ and does not consider the domain of $x+2$.

Final Answer

The final answer is B. $-2 \leq x \leq 5$.

Introduction

In our previous article, we discussed the inequality that represents all values of $x$ for which the quotient $\sqrt{x+2} \div \sqrt{5-x}$ is defined. In this article, we'll provide a Q&A section to help clarify any doubts and provide additional insights.

Q: What is the significance of the domain of a square root?

A: The domain of a square root is crucial because it determines when the expression is defined. If the expression under the square root is negative, the square root is undefined.

Q: How do I determine the domain of a square root?

A: To determine the domain of a square root, you need to find the values of the variable that make the expression under the square root non-negative. This can be done by setting the expression greater than or equal to zero and solving for the variable.

Q: What is the difference between the domain of $x+2$ and $5-x$?

A: The domain of $x+2$ is all values of $x$ greater than or equal to $-2$, while the domain of $5-x$ is all values of $x$ less than or equal to $5$. The combined domain is $-2 \leq x \leq 5$.

Q: Why is the value $x=5$ included in the combined domain?

A: The value $x=5$ is included in the combined domain because it satisfies both the domain of $x+2$ and the domain of $5-x$. In other words, $x=5$ makes both $x+2$ and $5-x$ non-negative.

Q: What happens if the value of $x$ is outside the combined domain?

A: If the value of $x$ is outside the combined domain, the quotient $\sqrt{x+2} \div \sqrt{5-x}$ is undefined. This is because one or both of the expressions under the square roots would be negative.

Q: Can I use the inequality $-2 \leq x \leq 5$ to solve other problems involving square roots?

A: Yes, the inequality $-2 \leq x \leq 5$ can be used to solve other problems involving square roots. However, you need to ensure that the problem is similar to the one we discussed, and the inequality is applicable to the specific problem.

Q: How do I apply the inequality $-2 \leq x \leq 5$ to solve a problem?

A: To apply the inequality $-2 \leq x \leq 5$ to solve a problem, you need to substitute the values of $x$ into the inequality and check if the resulting expression is defined. If the expression is defined, you can proceed with solving the problem.

Conclusion

In conclusion, the inequality $-2 \leq x \leq 5$ represents all values of $x$ for which the quotient $\sqrt{x+2} \div \sqrt{5-x}$ is defined. We hope this Q&A section has helped clarify any doubts and provided additional insights into the topic.

Final Answer

The final answer is B. $-2 \leq x \leq 5$.