Simplify each radical. Assume all variables represent positive real numbers. ⁶√x¹⁸y²

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Identify the expression: \( \sqrt[6]{x^{18}y^2} \).

Apply the property of radicals: \( \sqrt[n]{a^m} = a^{m/n} \).

Rewrite the expression using the property: \( (x^{18}y^2)^{1/6} \).

Distribute the exponent \( \frac{1}{6} \) to each term inside the parentheses: \( x^{18/6} \cdot y^{2/6} \).

Simplify the exponents: \( x^3 \cdot y^{1/3} \).

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Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Radical Expressions

Radical expressions involve roots, such as square roots or cube roots. The notation ⁶√ indicates a sixth root, which means finding a number that, when raised to the sixth power, equals the expression inside the radical. Understanding how to manipulate and simplify these expressions is crucial for solving problems involving radicals.

Exponents and Roots

Exponents represent repeated multiplication, while roots are the inverse operation. For example, the sixth root of a variable raised to a power can be simplified using the property that ⁶√(a^b) = a^(b/6). This concept is essential for simplifying radical expressions, especially when dealing with variables and their powers.

Simplifying Radicals

Simplifying radicals involves reducing the expression to its simplest form by factoring out perfect powers. For instance, in the expression ⁶√(x¹⁸y²), we can separate the variables and simplify each part individually. This process helps in expressing the radical in a more manageable form, making it easier to work with in algebraic equations.

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