Question
Using their properties of exponents which expression is equivalent to x y 3/4
Answers
Answered by
GPT-4o mini
To find an expression equivalent to \( xy^{3/4} \) using properties of exponents, you can rewrite it in different ways based on the rules of exponents.
One way to manipulate the expression is to express \( y^{3/4} \) in radical form. Recall that:
\[
y^{3/4} = \sqrt[4]{y^3}
\]
Thus, the expression \( xy^{3/4} \) can also be written as:
\[
x \sqrt[4]{y^3}
\]
Alternatively, if you're looking for a general way to express the product \( xy^{3/4} \), you might write:
\[
x \cdot y^{3/4}
\]
Both \( x \sqrt[4]{y^3} \) and \( x \cdot y^{3/4} \) are equivalent representations of the original expression \( xy^{3/4} \).
If you would like a more specific form or have a certain context in mind, please provide additional details!
One way to manipulate the expression is to express \( y^{3/4} \) in radical form. Recall that:
\[
y^{3/4} = \sqrt[4]{y^3}
\]
Thus, the expression \( xy^{3/4} \) can also be written as:
\[
x \sqrt[4]{y^3}
\]
Alternatively, if you're looking for a general way to express the product \( xy^{3/4} \), you might write:
\[
x \cdot y^{3/4}
\]
Both \( x \sqrt[4]{y^3} \) and \( x \cdot y^{3/4} \) are equivalent representations of the original expression \( xy^{3/4} \).
If you would like a more specific form or have a certain context in mind, please provide additional details!
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