What is the irrational square root 63−−√ rewritten as the product of an integer and another irrational square root, in simplest form?(1 point)

To rewrite √63, we need to find the largest perfect square that is a factor of 63, which is 9. Rewrite √63 as √(9 × 7) = √9 × √7 = 3√7. Therefore, the product of an integer and the irrational square root √63 is 3√7.

What is the irrational cube root 81−−√3 rewritten as a product of an integer and another irrational cube root? Note: You will find the option to add a cubic root symbol in the Algebra ( × ) keyboard. (1 point)

To rewrite ∛81 as a product of an integer and another irrational cube root, we need to find the largest perfect cube that is a factor of 81, which is 27. Rewrite ∛81 as ∛(27 × 3) = ∛27 × ∛3 = 3∛3. Therefore, the product of an integer and the irrational cube root ∛81 is 3∛3.