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Item 1. Write as a single power, if possible. \(t^{16} \div t^{19} = ?\)
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Item 2. Simplify, if possible. \(t^8v^{-3} \div t^6v^{-5} = ?\)
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Item 4. Identify the coefficient \((c)\) and the base \((b)\) in the following expression. \(-12(st)^{-4}\)
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Item 8. Reorder from Least to Greatest. \((2^0 \times 2^2),\ \sqrt[3]{\frac{16}{2}},\ \left(\frac{1}{2}\right)^0,\ \sqrt{25},\ \sqrt[4]{81}\)
Evaluate each expression first: (1/2)^0 = 1 ∛(16/2) = ∛8 = 2 ⁴√81 = 3 (2^0 × 2^2) = 4 √25 = 5 From least to greatest: (1/2)^0 < ∛(16/2) < ⁴√81 < (2^0 × 2^2) < √25 Answer: A
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Item 7. Evaluate \(3^3 = ?\)
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Item 3. Simplify. \(\frac{15a^3b}{-14} \times \frac{-28ab^{-1}}{9a^5b^2} = ?\)
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Item 6. Which expression is the exponential form of \(\sqrt[7]{3^5}\)?
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Item 5. Simplify each, leave in exponential form. \(x^{\frac{1}{3}} \times x^{\frac{3}{4}} = ?\)
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