Textbook Question
Perform the indicated operations and/or simplify each expression. Assume all variables represent positive real numbers. √(x⁵y³)/z²
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0. Review of Algebra
Radical Expressions
7:16 minutesProblem 148
Textbook Question
Perform the indicated operations and/or simplify each expression. Assume all variables represent positive real numbers.
Verified step by step guidance1
Rewrite each cube root in the denominators as an exponent of 1/3. For example, express \(\sqrt[3]{2}\) as \$2^{1/3}\(, \)\sqrt[3]{16}\( as \)16^{1/3}\(, and \)\sqrt[3]{54}\( as \)54^{1/3}\(. This gives the expression: \)\frac{5}{2^{1/3}} - \frac{2}{16^{1/3}} + \frac{1}{54^{1/3}}$.
Simplify the radicands where possible by expressing them as products of prime factors or perfect cubes. For example, \$16 = 2^4\( and \)54 = 2 \times 3^3\(. Use this to rewrite the cube roots: \)16^{1/3} = (2^4)^{1/3} = 2^{4/3}\( and \)54^{1/3} = (2 \times 3^3)^{1/3} = 2^{1/3} \times 3$.
Rewrite each term using the simplified exponents: \(\frac{5}{2^{1/3}} - \frac{2}{2^{4/3}} + \frac{1}{2^{1/3} \times 3}\). This will help in combining like terms later.
Find a common denominator for all three terms. Since the denominators involve powers of 2 and possibly 3, the common denominator will be the least common multiple of \$2^{1/3}\(, \)2^{4/3}\(, and \)2^{1/3} \times 3$. Express each term with this common denominator.
Combine the numerators over the common denominator by performing the indicated addition and subtraction. After combining, simplify the numerator if possible, and write the final expression as a single fraction.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Properties of Radicals and Cube Roots
Understanding how to work with cube roots is essential, including simplifying expressions like ∛16 or ∛54 by factoring under the radical. Recognizing that cube roots can be expressed as fractional exponents (e.g., ∛x = x^(1/3)) helps in manipulation and simplification.
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Operations with Fractions
Performing addition and subtraction with fractions requires finding a common denominator. In this problem, the denominators involve cube roots, so identifying a common radical denominator or rewriting terms with a common base is necessary to combine the fractions correctly.
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Simplification of Expressions with Variables and Radicals
Simplifying expressions involving radicals and variables includes reducing radicals to simplest form and combining like terms. Since variables represent positive real numbers, this allows for certain simplifications, such as removing absolute value considerations and applying standard radical rules.
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