Which Of The Following Is A Like Radical To $\sqrt[3]{6 X^2}$?A. $x(\sqrt[3]{6 X})$B. $6\left(\sqrt[3]{x^2}\right)$C. $ 4 ( 6 X 2 3 ) 4\left(\sqrt[3]{6 X^2}\right) 4 ( 3 6 X 2 ) [/tex]D. $x(\sqrt[3]{6})$
When dealing with radicals, it's essential to understand the concept of like radicals. Like radicals are expressions that have the same index and the same radicand. In this article, we will explore which of the given options is a like radical to $\sqrt[3]{6 x^2}$.
What are Like Radicals?
Like radicals are expressions that have the same index and the same radicand. The index of a radical is the number outside the radical sign, and the radicand is the expression inside the radical sign. For example, $\sqrt[3]{6 x^2}$ and $\sqrt[3]{6 x^2}$ are like radicals because they have the same index (3) and the same radicand ($6 x^2$).
Analyzing the Options
Let's analyze each of the given options to determine which one is a like radical to $\sqrt[3]{6 x^2}$.
Option A: $x(\sqrt[3]{6 x})$
This option is not a like radical to $\sqrt[3]{6 x^2}$ because it has a different radicand ($6 x$) and a different index (none, since it's not a radical expression).
Option B: $6\left(\sqrt[3]{x^2}\right)$
This option is not a like radical to $\sqrt[3]{6 x^2}$ because it has a different radicand ($x^2$) and a different index (none, since it's not a radical expression).
Option C: $4\left(\sqrt[3]{6 x^2}\right)$
This option is not a like radical to $\sqrt[3]{6 x^2}$ because it has a different coefficient (4) and a different index (none, since it's not a radical expression).
Option D: $x(\sqrt[3]{6})$
This option is not a like radical to $\sqrt[3]{6 x^2}$ because it has a different radicand ($6$) and a different index (none, since it's not a radical expression).
Conclusion
After analyzing each of the given options, we can conclude that none of them are like radicals to $\sqrt[3]{6 x^2}$. However, we can rewrite the original expression as $\sqrt[3]{6 x^2} = \sqrt[3]{6} \cdot \sqrt[3]{x^2} = \sqrt[3]{6} \cdot x \cdot \sqrt[3]{x}$.
Rewriting the Original Expression
We can rewrite the original expression as $\sqrt[3]{6 x^2} = \sqrt[3]{6} \cdot \sqrt[3]{x^2} = \sqrt[3]{6} \cdot x \cdot \sqrt[3]{x}$.
Finding the Like Radical
Now that we have rewritten the original expression, we can see that the like radical is $x(\sqrt[3]{6})$.
Conclusion
In conclusion, the like radical to $\sqrt[3]{6 x^2}$ is $x(\sqrt[3]{6})$.
Final Answer
In our previous article, we explored the concept of like radicals in algebra and analyzed the options to determine which one is a like radical to $\sqrt[3]{6 x^2}$. In this article, we will provide a Q&A guide to help you better understand like radicals and how to identify them.
Q: What is a like radical?
A: A like radical is an expression that has the same index and the same radicand. The index of a radical is the number outside the radical sign, and the radicand is the expression inside the radical sign.
Q: How do I identify like radicals?
A: To identify like radicals, you need to compare the index and the radicand of the expressions. If the index and the radicand are the same, then the expressions are like radicals.
Q: What is the difference between a like radical and a unlike radical?
A: A like radical is an expression that has the same index and the same radicand, while a unlike radical is an expression that has a different index or a different radicand.
Q: Can I add or subtract like radicals?
A: Yes, you can add or subtract like radicals. When adding or subtracting like radicals, you can combine the coefficients and keep the same radicand.
Q: Can I multiply or divide like radicals?
A: Yes, you can multiply or divide like radicals. When multiplying or dividing like radicals, you can multiply or divide the coefficients and keep the same radicand.
Q: How do I rewrite an expression with a cube root?
A: To rewrite an expression with a cube root, you can use the property of cube roots that states $\sqrt[3]{a^3} = a$. You can also use the property of cube roots that states $\sqrt[3]{a^2} = a \cdot \sqrt[3]{a}$.
Q: Can I simplify an expression with a cube root?
A: Yes, you can simplify an expression with a cube root. To simplify an expression with a cube root, you can use the properties of cube roots and combine like radicals.
Q: What is the final answer to the original problem?
A: The final answer to the original problem is $x(\sqrt[3]{6})$.
Common Mistakes to Avoid
When working with like radicals, it's essential to avoid common mistakes. Here are some common mistakes to avoid:
- Not identifying like radicals: Make sure to identify like radicals by comparing the index and the radicand.
- Not combining like radicals: Make sure to combine like radicals when adding or subtracting.
- Not using the properties of cube roots: Make sure to use the properties of cube roots when rewriting or simplifying expressions with cube roots.
Conclusion
In conclusion, like radicals are an essential concept in algebra that can help you simplify expressions and solve problems. By understanding like radicals and how to identify them, you can become a more confident and proficient math student. Remember to avoid common mistakes and use the properties of cube roots to simplify expressions with cube roots.
Final Tips
Here are some final tips to help you master like radicals:
- Practice, practice, practice: The more you practice working with like radicals, the more comfortable you will become with the concept.
- Use online resources: There are many online resources available that can help you learn about like radicals, including video tutorials and practice problems.
- Ask for help: Don't be afraid to ask for help if you are struggling with like radicals. Your teacher or tutor can provide you with additional support and guidance.
Final Answer
The final answer is: