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Exponents and Radicals Objective: To review rules and properties of exponents and radicals.
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Exponential Notation
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Properties of Exponents
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Example 1 Use the properties of exponents to simplify each expression. a)
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Example 1 Use the properties of exponents to simplify each expression. a)
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Example 1 Use the properties of exponents to simplify each expression. You Try: b)
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Example 1 Use the properties of exponents to simplify each expression. You Try: b)
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Example 1 Use the properties of exponents to simplify each expression. You Try: c)
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Example 1 Use the properties of exponents to simplify each expression. You Try: c)
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Example 1 Use the properties of exponents to simplify each expression. You Try: d)
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Example 1 Use the properties of exponents to simplify each expression. You Try: d)
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Example 2 Rewrite each expression with positive exponents. a)
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Example 2 Rewrite each expression with positive exponents. a)
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Example 2 Rewrite each expression with positive exponents. b)
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Example 2 Rewrite each expression with positive exponents. b)
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Example 2 Rewrite each expression with positive exponents. You Try: c)
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Example 2 Rewrite each expression with positive exponents. You Try: c)
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Example 2 Rewrite each expression with positive exponents. You Try: d)
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Example 2 Rewrite each expression with positive exponents. You Try: d)
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Radicals and Their Properties Definition of nth Root of a Number. Let a and b be real numbers and let n > 2 be a positive integer. If a = b n then b is an nth root of a. If n = 2, the root is a square root. If n = 3, the root is a cube root.
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Radicals and Their Properties Principal nth Root of a Number. Let a be a real number that has at least one nth root. The principal nth root of a is the nth root that has the same sign as a. It is denoted by a radical symbol The positive integer n is the index of the radical, and the number a is the radicand. If n = 2, omit the index and write
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Example 5 Evaluate: a)
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Example 5 Evaluate: a)
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Example 5 Evaluate: b)
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Example 5 Evaluate: b)
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Example 5 Evaluate: c)
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Example 5 Evaluate: c)
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Example 5 Evaluate: d)
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Example 5 Evaluate: d)
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Example 5 Evaluate: You Try: d)
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Example 5 Evaluate: You Try: d)
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Example 5 Evaluate: e)
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Example 5 Evaluate: e)
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Properties of Radicals
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Example 6 Use the properties of radical to simplify each expression. a)
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Example 6 Use the properties of radical to simplify each expression. a)
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Example 6 Use the properties of radical to simplify each expression. b)
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Example 6 Use the properties of radical to simplify each expression. b)
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Example 6 Use the properties of radical to simplify each expression. c)
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Example 6 Use the properties of radical to simplify each expression. c)
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Example 6 Use the properties of radical to simplify each expression. d)
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Simplifying Radicals An expression involving radicals is in simplest form when the following conditions are satisfied. 1.All possible factors have been removed from the radical. 2.All fractions have radical-free denominators (accomplished by a process called rationalizing the denominator). 3.The index of the radical is reduced.
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Example 7 Simplify each radical. a)
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Example 7 Simplify each radical. a)
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Example 7 Simplify each radical. You Try: a)
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Example 7 Simplify each radical. You Try: a)
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Example 7 Simplify each radical. b)
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Example 7 Simplify each radical. b)
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Example 7 Simplify each radical. c)
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Example 7 Simplify each radical. c)
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Example 7 Simplify each radical. You Try: c)
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Example 7 Simplify each radical. You Try: c)
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Example 8 Simplify each radical. a)
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Example 8 Simplify each radical. a)
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Example 8 Simplify each radical. b)
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Example 8 Simplify each radical. b)
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Example 8 Simplify each radical. You Try: c)
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Example 8 Simplify each radical. You Try: c)
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Example 9 Combine each radical. a)
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Example 9 Combine each radical. a)
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Example 9 Combine each radical. You Try: b)
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Example 9 Combine each radical. You Try: b)
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Example 10 Rationalize the denominator of each expression. a)
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Example 10 Rationalize the denominator of each expression. a)
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You Try Rationalize the denominator of each expression. You Try: b)
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Example 10 Rationalize the denominator of each expression. You Try: b)
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Example 11 Rationalize the denominator of each expression. a)
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You Try Rationalize the denominator of each expression. You Try: b)
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You Try Rationalize the denominator of each expression. You Try: b)
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Rational Exponents The numerator of a rational exponent denotes the power to which the base is raised, and the denominator denotes the index or the root to be taken.
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Example 13 Change the base from radical to exponential form. a)
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Example 13 Change the base from radical to exponential form. a)
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Example 13 Change the base from radical to exponential form. b)
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Example 13 Change the base from radical to exponential form. b)
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You Try Change the base from radical to exponential form. You Try: c)
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You Try Change the base from radical to exponential form. You Try: c)
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Example 14 Change the base from exponential to radical form. a)
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Example 14 Change the base from exponential to radical form. a)
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You Try Change the base from exponential to radical form. b)
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You Try Change the base from exponential to radical form. b)
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Example 15 Simplify each rational expression. a)
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Example 15 Simplify each rational expression. a)
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Example 15 Simplify each rational expression. You Try: b)
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Example 15 Simplify each rational expression. You Try: b)
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You Try Simplify each rational expression. You Try: c)
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You Try Simplify each rational expression. You Try: c)
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You Try Simplify each rational expression. You Try: d)
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You Try Simplify each rational expression. You Try: d)
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Homework Pages 21-22 5-11 odd 17-35 odd 51-72 multiples of 3
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