key term - Principal nth root
Definition
The principal nth root of a number $a$ is the unique real number $b$ such that $b^n = a$, where $n$ is a positive integer. When $n$ is even, the principal nth root is non-negative.
5 Must Know Facts For Your Next Test
- $\sqrt[n]{a}$ represents the principal nth root of $a$.
- For any real number $a \geq 0$ and even integer $n$, the principal nth root is always non-negative.
- When $n$ is odd, every real number $a$ has exactly one real nth root which could be negative or positive.
- The principal square root (when $n = 2$) of a non-negative number is always positive or zero.
- The notation for the principal nth root can also be expressed using rational exponents as $a^{1/n}$.
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