Textbook Question
Match the rational exponent expression in Column I with the equivalent radical expression in Column II. Assume that x is not 0. (a) -3x1/3
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0. Review of Algebra
Radical Expressions
3:47 minutesProblem 5
Textbook Question
In Exercises 1–20, use radical notation to rewrite each expression. Simplify, if possible.-16^¼
Verified step by step guidance1
Identify the expression: \(-16^{\frac{1}{4}}\).
Recognize that the expression involves a negative base raised to a fractional exponent.
Rewrite the expression using radical notation: \(-16^{\frac{1}{4}} = \sqrt[4]{-16}\).
Understand that \(\sqrt[4]{-16}\) represents the fourth root of \(-16\).
Note that the fourth root of a negative number is not a real number, as even roots of negative numbers are not defined in the real number system.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Radical Notation
Radical notation is a mathematical notation used to represent roots of numbers. The symbol '√' denotes the square root, while 'n√' represents the nth root of a number. For example, the expression 'x^(1/n)' can be rewritten as 'n√x', indicating the nth root of x. Understanding this notation is essential for rewriting expressions involving roots.
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Exponents and Fractional Powers
Exponents are a way to express repeated multiplication of a number by itself. A fractional exponent, such as '1/4', indicates a root; specifically, 'x^(1/n)' means the nth root of x. In the case of '-16^(1/4)', it signifies the fourth root of -16, which is crucial for simplifying the expression correctly.
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Simplifying Radical Expressions
Simplifying radical expressions involves reducing them to their simplest form, which often includes factoring out perfect squares or cubes. For instance, when simplifying '√(a*b)', one can separate it into '√a * √b'. In the context of '-16^(1/4)', recognizing that -16 can be expressed as '(-1) * (16)' helps in simplifying the expression further.
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