If $a$ Is A Nonnegative Real Number And $n$ Is A Positive Integer, Then $a^{1/n}=\sqrt[n]{a}$.A. True B. False

Feb 27, 2025 by ADMIN 118 views

**The Power of Roots: Understanding the nth Root of a Nonnegative Real Number**

Introduction

In mathematics, the concept of roots is a fundamental aspect of algebra and number theory. The nth root of a number is a value that, when raised to the power of n, gives the original number. In this article, we will explore the properties of the nth root of a nonnegative real number and examine the statement: "If $a$ is a nonnegative real number and $n$ is a positive integer, then $a^{1/n}=\sqrt[n]{a}$. We will delve into the world of roots, discussing the definition, properties, and examples to determine the validity of this statement.

Definition of the nth Root

The nth root of a number $a$ is a value that, when raised to the power of n, gives the original number. In mathematical notation, this is represented as $\sqrt[n]{a}$. The nth root is also denoted as $a^{1/n}$, where $1/n$ is the exponent. For example, the square root of a number $a$ is $\sqrt{a}$, which is equivalent to $a^{1/2}$.

Properties of the nth Root

The nth root of a nonnegative real number $a$ has several important properties:

Existence: For any nonnegative real number $a$ and positive integer $n$, the nth root of $a$ exists.
Uniqueness: The nth root of a nonnegative real number $a$ is unique.
Order: The nth root of a nonnegative real number $a$ is nonnegative.
Monotonicity: The nth root function is a monotonically increasing function.

Proof of the Statement

To prove the statement, we need to show that $a^{1/n}=\sqrt[n]{a}$ for any nonnegative real number $a$ and positive integer $n$. We can start by using the definition of the nth root:

\sqrt[n]{a} = a^{1/n}

This equation is true by definition. Therefore, we can conclude that the statement is true.

Examples and Counterexamples

To illustrate the concept of the nth root, let's consider some examples:

Square root: The square root of a number $a$ is $\sqrt{a}$, which is equivalent to $a^{1/2}$.
Cube root: The cube root of a number $a$ is $\sqrt[3]{a}$, which is equivalent to $a^{1/3}$.
Fourth root: The fourth root of a number $a$ is $\sqrt[4]{a}$, which is equivalent to $a^{1/4}$.

On the other hand, we can also consider counterexamples to demonstrate the validity of the statement:

Negative number: If $a$ is a negative real number, then the nth root of $a$ does not exist.
Non-integer exponent: If $n$ is not an integer, then the nth root of $a$ does not exist.

Conclusion

In conclusion, the statement "If $a$ is a nonnegative real number and $n$ is a positive integer, then $a^{1/n}=\sqrt[n]{a}$" is true. The nth root of a nonnegative real number $a$ is a value that, when raised to the power of n, gives the original number. The properties of the nth root, including existence, uniqueness, order, and monotonicity, demonstrate the validity of this statement. Examples and counterexamples illustrate the concept of the nth root and its application in mathematics.

References

[1] "Algebra" by Michael Artin
[2] "Number Theory" by George E. Andrews
[3] "Calculus" by Michael Spivak

Q: What is the nth root of a nonnegative real number?

A: The nth root of a nonnegative real number $a$ is a value that, when raised to the power of n, gives the original number. In mathematical notation, this is represented as $\sqrt[n]{a}$ or $a^{1/n}$.

Q: What are the properties of the nth root?

A: The nth root of a nonnegative real number $a$ has several important properties:

Existence: For any nonnegative real number $a$ and positive integer $n$, the nth root of $a$ exists.
Uniqueness: The nth root of a nonnegative real number $a$ is unique.
Order: The nth root of a nonnegative real number $a$ is nonnegative.
Monotonicity: The nth root function is a monotonically increasing function.

Q: How do I calculate the nth root of a number?

A: To calculate the nth root of a number $a$, you can use the following formula:

\sqrt[n]{a} = a^{1/n}

You can also use a calculator or a computer program to calculate the nth root.

Q: What is the difference between the nth root and the mth root?

A: The nth root and the mth root are both roots of a number, but they have different exponents. The nth root has an exponent of $1/n$, while the mth root has an exponent of $1/m$.

Q: Can I take the nth root of a negative number?

A: No, you cannot take the nth root of a negative number. The nth root is only defined for nonnegative real numbers.

Q: Can I take the nth root of a non-integer exponent?

A: No, you cannot take the nth root of a non-integer exponent. The nth root is only defined for positive integer exponents.

Q: What are some examples of the nth root?

A: Some examples of the nth root include:

Square root: The square root of a number $a$ is $\sqrt{a}$, which is equivalent to $a^{1/2}$.
Cube root: The cube root of a number $a$ is $\sqrt[3]{a}$, which is equivalent to $a^{1/3}$.
Fourth root: The fourth root of a number $a$ is $\sqrt[4]{a}$, which is equivalent to $a^{1/4}$.

Q: What are some applications of the nth root?

A: The nth root has many applications in mathematics and science, including:

Algebra: The nth root is used to solve equations and inequalities.
Number theory: The nth root is used to study the properties of numbers.
Calculus: The nth root is used to study the properties of functions.

Q: Where can I learn more about the nth root?

A: You can learn more about the nth root by reading mathematics textbooks, online resources, and research papers. Some recommended resources include:

Mathematics textbooks: "Algebra" by Michael Artin, "Number Theory" by George E. Andrews, and "Calculus" by Michael Spivak.
Online resources: Khan Academy, MIT OpenCourseWare, and Wolfram Alpha.
Research papers: Search for academic papers on the nth root and its applications in mathematics and science.