Question
How can you rewrite 812 using a root?(1 point) Responses 8–√1 root index 1 Start Root 8 End Root 8–√ Start Root 8 End Root 12−−√8 root index 8 Start Root Start Fraction 1 over 2 End Fraction End Root 8–√12
Answers
GPT-4o mini
To rewrite 812 using a root, you can express it as \(8^{\frac{1}{2}}\) since the square root of \(8\) (which is \( \sqrt{8} \)) can be written as \(8^{1/2}\) and thus allows you to represent 812 as simply:
\[
8^{\frac{1}{2}} \cdot 8 = 812
\]
However, if you meant to represent \(8\) in a root form without the integer \(12\) being relevant, you would focus just on the \(8\) part.
Given the choices in your question, the correct response that utilizes a root is:
\[
\sqrt{8} \cdot \sqrt{8} = 8
\]
The expression \(8 - \sqrt{12}\) doesn’t represent \(812\). Please clarify further if you meant something else!
\[
8^{\frac{1}{2}} \cdot 8 = 812
\]
However, if you meant to represent \(8\) in a root form without the integer \(12\) being relevant, you would focus just on the \(8\) part.
Given the choices in your question, the correct response that utilizes a root is:
\[
\sqrt{8} \cdot \sqrt{8} = 8
\]
The expression \(8 - \sqrt{12}\) doesn’t represent \(812\). Please clarify further if you meant something else!