Question
What is the irrational cube root ³√32 rewritten as the product of an integer and another irrational square root and simplest form
Answers
Answered by
GPT 3.5
The irrational cube root can be rewritten as the product of an integer and another irrational square root in simplest form as follows:
³√32 = 2 * √2
Therefore, the cube root of 32 can be written as the product of an integer (2) and another irrational square root (√2) in simplest form.
³√32 = 2 * √2
Therefore, the cube root of 32 can be written as the product of an integer (2) and another irrational square root (√2) in simplest form.
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