Textbook Question
Use the rules for radicals to perform the indicated operations. Assume all variable expressions represent positive real numbers. ∜∛2
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0. Review of Algebra
Radical Expressions
4:31 minutesProblem 69
Textbook Question
Simplify each expression. Write answers without negative exponents. Assume all variables represent nonzero real numbers. 4a5(a-1)3/(a-2)-2
Verified step by step guidance1
Start by rewriting the expression clearly: \(\frac{4a^{5} \left(a^{-1}\right)^{3}}{\left(a^{-2}\right)^{-2}}\).
Apply the power of a power rule \(\left(x^{m}\right)^{n} = x^{m \cdot n}\) to simplify each term with exponents raised to another exponent: \(\left(a^{-1}\right)^{3} = a^{-3}\) and \(\left(a^{-2}\right)^{-2} = a^{4}\).
Substitute these back into the expression to get \(\frac{4a^{5} \cdot a^{-3}}{a^{4}}\).
Use the product rule for exponents \(a^{m} \cdot a^{n} = a^{m+n}\) to combine the terms in the numerator: \(a^{5} \cdot a^{-3} = a^{5 + (-3)} = a^{2}\).
Now the expression is \(\frac{4a^{2}}{a^{4}}\). Use the quotient rule for exponents \(\frac{a^{m}}{a^{n}} = a^{m-n}\) to simplify: \(a^{2 - 4} = a^{-2}\). Finally, rewrite to eliminate the negative exponent as \(\frac{4}{a^{2}}\).
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Laws of Exponents
The laws of exponents govern how to simplify expressions involving powers. Key rules include multiplying powers with the same base by adding exponents, raising a power to another power by multiplying exponents, and dividing powers by subtracting exponents. These rules allow for systematic simplification of expressions like the one given.
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Rational Exponents
Negative Exponents
A negative exponent indicates the reciprocal of the base raised to the corresponding positive exponent. For example, a^{-n} = 1/a^n. Understanding this helps rewrite expressions without negative exponents, as required in the problem, by converting them into positive exponents in the numerator or denominator.
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Simplifying Algebraic Expressions
Simplifying algebraic expressions involves combining like terms and applying exponent rules to write the expression in its simplest form. This includes carefully handling parentheses, exponents, and ensuring the final answer meets given conditions, such as no negative exponents and assuming variables are nonzero to avoid undefined expressions.
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