What is the irrational cube rood ^3√81 rewritten as a product of an integer and another irrational cube root?
The irrational cube root \( \sqrt[3]{81} \) can be rewritten as the product of an integer and another irrational cube root as follows:
\( \sqrt[3]{81} = \sqrt[3]{27 \times 3} = \sqrt[3]{27} \times \sqrt[3]{3} = 3 \times \sqrt[3]{3} \).