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Bell Ringer 1. (๐ ๐ ๐ )(๐ ๐ ๐ ) A.๐ 2. ๐ ๐ โ๐ ๐ ๐ ๐ B. ๐๐ ๐๐ ๐๐
Match each word in Column A with the matching answer of Column B. Column A Column B 1. (๐ ๐ ๐ )(๐ ๐ ๐ ) 2. ๐ ๐ โ๐ ๐ ๐ ๐ 3. ๐ ๐ ๐ ๐ ๐ ๐ 4. ๐ ๐ ๐ ๐ ๐ โ๐ 5. ๐ ๐ โ๐ โ๐ โ ๐ ๐ ๐๐ ๐ ๐ ๐ A.๐ B. ๐๐ ๐๐ ๐๐ C. ๐๐ ๐ ๐ D. ๐ ๐ ๐ ๐ ๐ E. ๐ ๐ ๐ ๐ ๐ ๐๐ F. ๐ ๐ ๐
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Bell Ringer Mrs. Rivas ๐+๐ ๐ =๐๐ ๐ ๐ +๐๐๐+ ๐ ๐ =๐๐ ๐ ๐ +๐๐๐+ ๐ ๐ =๐๐
ISCHS Bell Ringer Suppose ๐๐=๐ and ๐+๐ ๐ =๐๐, what is ๐ ๐ + ๐ ๐ ?. ๐+๐ ๐ =๐๐ ๐ ๐ +๐๐๐+ ๐ ๐ =๐๐ ๐ ๐ +๐๐๐+ ๐ ๐ =๐๐ ๐ ๐ +๐(๐)+ ๐ ๐ =๐๐ ๐ ๐ +๐๐+ ๐ ๐ =๐๐ โ๐๐ โ๐๐ ๐ ๐ + ๐ ๐ =๐๐
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Roots and Radical Expressions.
Mrs. Rivas ISCHS Section 6-1 Roots and Radical Expressions. Objective: To find nth roots. Corresponding to every power there is a root. Example: 5 is a square root of 25. ๐ ๐ =๐๐ 5 is a cube root of 125. ๐ ๐ =๐๐๐ 5 is a fourth root of 625. ๐ ๐ =๐๐๐ 5 is a fifth root of 3125. ๐ ๐ =๐๐๐๐ This pattern suggests a definition of an nth root.
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Roots and Radical Expressions.
Mrs. Rivas ISCHS Section 6-1 Roots and Radical Expressions. ๐ ๐ =๐ ๐ฐ๐ ๐ ๐๐ ๐๐
๐
โฆ ๐ฐ๐ ๐ ๐๐ ๐ฌ๐๐๐โฆ there is ๐จ๐ง๐ ๐ซ๐๐๐ฅ ๐๐๐ root of ๐, denoted in radical form as ๐ ๐ . and ๐ ๐ข๐ฌ ๐ฉ๐จ๐ฌ๐ข๐ญ๐ข๐ฏ๐, there are two real nth roots of b. The positive root is the PRINCIPAL ROOT and its symbol is ๐ ๐ . The negative root is its opposite, or โ ๐ ๐ . ๐๐
๐
๐ = ๐ ๐๐ =๐ ๐๐๐๐ ๐ = ๐ ๐๐ =๐ ๐๐
๐
โ๐ = ๐ โ๐๐ =โ๐ and b is negative, there are NO real nth roots of b. The only nth root of 0 is 0. ๐๐๐๐ โ๐ = ๐ โ๐๐ =๐ต๐ ๐๐๐๐ ๐๐๐๐
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Roots and Radical Expressions.
Mrs. Rivas ISCHS Section 6-1 Roots and Radical Expressions. ๐ ๐ ๐ ๐ ๐ ๐ Means: You must Include the absolute value ๐ when n is EVEN. ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐ You must Omit the absolute value when n is ODD. ๐ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐ ๐ =๐ ๐ ๐
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Roots and Radical Expressions.
Mrs. Rivas ISCHS Section 6-1 Roots and Radical Expressions. Example # 1 Simplifying radical expressions. What is a simpler form of each radical expression? A ๐๐ ๐ ๐ The index 2 is even, USE absolute value symbols ๐๐ ๐ ๐ = ๐ 2 ๐ ๐ 2 |4 ๐ฅ 4 | = 4 ๐ฅ 4 because ๐ฅ 4 is never negative. = ๐๐ ๐ 2 = ๐๐ ๐ =๐ ๐ ๐
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The index 3 is ODD, DO NOT USE absolute value symbols
Mrs. Rivas ISCHS Section 6-1 Roots and Radical Expressions. Example # 1 Simplifying radical expressions. What is a simpler form of each radical expression? B ๐ ๐ ๐ ๐ ๐ The index 3 is ODD, DO NOT USE absolute value symbols ๐ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐
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Roots and Radical Expressions.
Mrs. Rivas ISCHS Section 6-1 Roots and Radical Expressions. You Do It Simplifying radical expressions. What is a simpler form of each radical expression? C ๐ ๐ ๐๐ ๐ ๐๐ A ๐๐ ๐ ๐ B ๐ ๐ ๐๐ ๐ ๐๐ = ๐๐ ๐ = ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐
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Mrs. Rivas ISCHS Section 6-2 Multiplying and Dividing Radical Expressions. Objective: To multiply radical expressions ๐ ๐ โ ๐ ๐ = ๐ ๐๐
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๐ ๐ฒ Mrs. Rivas Simplify a product. = ๐๐ ๐ ๐ ๐ ๐ ๐๐ ๐ ๐ ๐ ๐
ISCHS Section 6-2 Multiplying and Dividing Radical Expressions. Example # 1 Simplify a product. What is the simplest form of 12 ๐ฅ 4 ๐ฆ 2 โ 15 ๐ฅ 2 ๐ฆ 3 ? = ๐๐ ๐ ๐ ๐ ๐ ๐๐ ๐ ๐ ๐ ๐ = ๐๐โ๐๐ ๐ ๐+๐ ๐ ๐+๐ = ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐ ๐ ๐ฒ =๐โ๐โ ๐ ๐ โ ๐ ๐ ๐๐ =๐ ๐ ๐ ๐ ๐ ๐๐
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๐ ๐ Mrs. Rivas You Do It = ๐๐ ๐ ๐ ๐ ๐ ๐๐๐ ๐ ๐ = ๐๐โ๐๐ ๐ ๐+๐ ๐ ๐+๐
ISCHS Section 6-2 Multiplying and Dividing Radical Expressions. You Do It Simplify a product. What is the simplest form of 15 ๐ฅ 5 ๐ฆ 3 โ 20๐ฅ ๐ฆ 4 ? = ๐๐ ๐ ๐ ๐ ๐ ๐๐๐ ๐ ๐ = ๐๐โ๐๐ ๐ ๐+๐ ๐ ๐+๐ = ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐โ๐ ๐ ๐ =๐โ๐โ ๐ ๐ โ ๐ ๐ ๐๐ =๐๐ ๐ ๐ ๐ ๐ ๐๐
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Mrs. Rivas ISCHS Section 6-2 Multiplying and Dividing Radical Expressions. Objective: To divide radical expressions ๐ ๐ ๐ ๐ = ๐ ๐ ๐
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Dividing radical expressions.
Mrs. Rivas ISCHS Section 6-2 Multiplying and Dividing Radical Expressions. Example # 4 Dividing radical expressions. What is the simplest form of each quotient. = ๐๐ ๐ ๐ ๐ ๐ ๐ A ๐๐๐ ๐ ๐๐ ๐ = ๐ ๐๐๐ ๐ ๐ ๐ ๐ ๐ B ๐ ๐๐๐๐ ๐ ๐ ๐๐ ๐ = (๐๐รท๐)( ๐ ๐โ๐ ) = ๐ (๐๐๐รท๐)( ๐ ๐โ๐ ) = ๐ ๐โ๐โ๐โ๐โ (๐) ๐ = ๐ ๐ ๐ = ๐ ๐๐ ๐ ๐ =๐๐ ๐ ๐ =๐ ๐
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Mrs. Rivas You Do It = ๐๐ ๐ ๐ ๐ ๐ ๐ = (๐๐รท๐)( ๐ ๐โ๐ ) = ๐๐ ๐ ๐ =๐ ๐
ISCHS Section 6-2 Multiplying and Dividing Radical Expressions. You Do It Dividing radical expressions. What is the simplest form of ๐ฅ ๐ฅ 4 ? = ๐๐ ๐ ๐ ๐ ๐ ๐ = (๐๐รท๐)( ๐ ๐โ๐ ) = ๐๐ ๐ ๐ =๐ ๐
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Rationalizing the denominator.
Mrs. Rivas ISCHS Section 6-2 Multiplying and Dividing Radical Expressions. Example # 5 Rationalizing the denominator. What is the simplest form of ๐ฅ ๐ฆ 2 ๐ง ? = ๐ ๐ ๐ ๐ ๐ ๐๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐ ๐ ๐โ๐โ๐โ ๐ ๐ โ๐ ร ๐ ๐โ ๐ ๐ โ๐โ ๐ ๐ ๐ ๐โ ๐ ๐ โ๐โ ๐ ๐ = ๐ (๐โ๐โ ๐ ๐ )โ ๐ ๐ โ๐โ ๐ ๐ ๐ (๐โ๐โ๐)(๐โ๐โ๐)( ๐ ๐+๐ )( ๐ ๐+๐ ) = ๐ ๐๐ ๐ ๐ ๐ ๐ ๐ ๐โ๐โ๐โ๐ = ๐ ๐๐ ๐ ๐ ๐ ๐ ๐ ๐๐๐
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Mrs. Rivas You Do It ร ๐ ๐ ๐ โ๐ ๐ ๐ ๐ โ๐ = ๐ ๐๐ ๐ ๐ ๐ ๐
ISCHS Section 6-2 Multiplying and Dividing Radical Expressions. You Do It Rationalizing the denominator. What is the simplest form of 3 7๐ฅ 5๐ฆ 2 ? = ๐ ๐๐ ๐ ๐ ๐ ๐ ร ๐ ๐ ๐ โ๐ ๐ ๐ ๐ โ๐ = ๐ (๐โ๐โ๐)๐โ๐ ๐ (๐โ๐โ๐) ๐ ๐+๐ = ๐ ๐๐๐๐๐ ๐๐
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. Objective: To add and subtract radical expressions Like radicals: are radical expressions that have the same index and radicand. ๐ +๐ ๐ =๐ ๐ ๐๐๐ +๐ ๐๐๐ =๐ ๐๐๐ ๐ ๐ โ๐ ๐ ๐ =โ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ โ๐ ๐ ๐ ๐ ๐ ๐ =โ๐ ๐ ๐ ๐ ๐ ๐
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๐ ๐ ๐ฅ +๐ ๐ ๐ฅ =(๐+๐) ๐ ๐ฅ ๐ ๐ ๐ฅ โ๐ ๐ ๐ฅ =(๐โ๐) ๐ ๐ฅ
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. ๐ ๐ ๐ฅ +๐ ๐ ๐ฅ =(๐+๐) ๐ ๐ฅ ๐ ๐ ๐ฅ โ๐ ๐ ๐ฅ =(๐โ๐) ๐ ๐ฅ
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. Example # 1 Simplifying before adding or subtracting. What is the simplest form of the expression? โ 3 โ 3 = 2โ2โ3 + 3โ5โ5 โ 3 = โ 3 =7 3 โ 3 =๐ ๐
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. You Do It Simplifying before adding or subtracting. What is the simplest form of the expression? โ 3 16 โ 3 16 = 3 2โ5โ5โ โ3โ3โ3 โ 3 2โ2โ2โ2 = โ2 3 2 =8 3 2 โ2 3 2 =๐ ๐ ๐
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๐ โ ๐ = ๐ ๐ =๐ Binomial Radical Expressions. Square root Property
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. Objective: Multiply binomial radical expressions Square root Property ๐ โ ๐ = ๐ ๐ =๐ Ex โ 5 = 5 2 =๐ Ex. 3๐ฅ๐ฆ โ 3๐ฅ๐ฆ = ๐ฅ 2 ๐ฆ 2 =๐๐๐ Ex โ 7 = =3(7) =๐๐
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๐ ( ๐ โ ๐ )= ๐๐ โ ๐๐ Binomial Radical Expressions. Distribute Roots
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. Objective: Multiply binomial radical expressions Distribute Roots ๐ ( ๐ โ ๐ )= ๐๐ โ ๐๐ Ex = =4+ 2โ2โ5 =๐+๐ ๐ Rational number Irrational number
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. You Do It A ๐ ๐๐ โ ๐๐ B ๐๐ ๐ +๐ ๐ ๐๐ โ ๐๐ ๐๐ + ๐ ๐๐ ๐โ ๐โ๐โ๐โ๐โ๐ ๐โ๐โ๐ +๐ ๐โ๐โ๐ ๐โ๐ ๐ ๐ ๐ +๐โ๐ ๐ ๐ ๐ +๐๐ ๐
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. Example # 2 Multiplying binomial radical expressions. What is the product of each expression? A (๐+๐ ๐ )(๐+๐ ๐ ) (๐+๐ ๐ )(๐+๐ ๐ ) ๐๐ + ๐๐ ๐ + ๐๐ ๐ + ๐ ๐ ๐๐+๐๐ ๐ +๐(๐) ๐๐+๐๐ ๐ +๐๐ ๐๐+๐๐ ๐
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. Example # 2 Multiplying binomial radical expressions. What is the product of each expression? B (๐โ ๐ )(๐+ ๐ ) (๐โ ๐ )(๐+ ๐ ) ๐๐ + ๐ ๐ โ ๐ ๐ โ ๐๐ ๐๐โ๐ ๐ โ๐ ๐โ๐ ๐
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. You Do It Simplifying before adding or subtracting. What is product ( )( )? (๐+๐ ๐ )(๐+๐ ๐ ) ๐ + ๐๐ ๐ + ๐ ๐ + ๐ ๐๐ ๐+๐๐ ๐ +๐(๐) ๐+๐๐ ๐ +๐๐ ๐๐+๐๐ ๐
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. Conjugates: are expressions, like ๐ + ๐ and ๐ โ ๐ , that differ only in the signs of the second term. When ๐ and ๐ are rational numbers, the product of two radical conjugates in a rational number. Hint The difference of squares factoring is ๐ ๐ โ ๐ ๐ = ๐+๐ ๐โ๐ .
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. Example # 3 Multiplying Conjugates. What is product (5โ 7 )(5+ 7 )? (๐ โ ๐ )(๐+ ๐ ) ๐๐ + ๐ ๐ โ ๐ ๐ โ ๐๐ ๐๐โ๐ ๐ โ๐ ๐๐
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. You Do It Multiplying Conjugates. What is each product? A (๐โ ๐๐ )(๐+ ๐๐ ) B (๐+ ๐ )(๐โ ๐ ) (๐ โ ๐๐ )(๐+ ๐๐ ) (๐+ ๐ )(๐โ ๐ ) ๐๐ + ๐ ๐๐ โ ๐ ๐๐ โ ๐๐๐ ๐ โ ๐ ๐ + ๐ ๐ โ ๐๐ ๐๐โ๐ ๐๐ โ๐๐ ๐โ๐ ๐ โ๐ ๐๐ ๐
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. Example # 5 Rationalizing the denominator. How can you write the expression with a rationalized denominator? ๐ ๐ ๐ โ ๐ ร ๐ + ๐ ๐ + ๐ Multiply the top and bottom by the conjugate of the denominator. = ๐ ๐ ๐ + ๐ ๐ ๐ โ ๐ ๐ = ๐ ๐๐ +๐ ๐ ๐โ๐ = ๐ ๐๐ ๐ + ๐ ๐ = ๐ ๐๐ +๐(๐) ๐ = ๐๐ +๐
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Binomial Radical Expressions.
Mrs. Rivas ISCHS Section 6-3 Binomial Radical Expressions. You Do It Rationalizing the denominator. How can you write the expression with a rationalized denominator? ร ๐ + ๐ ๐ + ๐ ร ๐+ ๐ ๐+ ๐ A ๐ ๐ ๐ โ ๐ B ๐๐ ๐โ ๐ = ๐๐ ๐+ ๐ ๐ ๐ โ ๐ ๐ = ๐ ๐ ๐ + ๐ ๐ ๐ โ ๐ ๐ = ๐ ๐๐ +๐ ๐๐ โ๐ = ๐๐๐+๐๐ ๐ ๐โ๐ = ๐๐๐ ๐ + ๐๐ ๐ ๐ = ๐ ๐๐ โ๐ + ๐ ๐๐ โ๐ =โ ๐๐ โ ๐๐ =๐๐+ ๐๐ ๐ ๐
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๐ ๐ ๐ = ๐ ๐ ๐ = ๐ ๐ ๐ Rational Exponents Mrs. Rivas
ISCHS Section 6-4 Rational Exponents Objective: To use rational exponents. ๐ ๐ ๐ = ๐ ๐ ๐ = ๐ ๐ ๐
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Rational Exponents Mrs. Rivas Example # 1
ISCHS Section 6-4 Rational Exponents Example # 1 Simplifying Expressions with rational exponents. What is the simplest form of each expression? ๐๐๐ ๐ ๐ A B ๐ ๐ ๐ โ ๐ ๐ ๐ ๐๐๐ ๐ ๐ = ๐ ๐๐๐ ๐ ๐ ๐ โ ๐ ๐ ๐ = ๐ โ ๐ = ๐ ๐โ๐โ๐โ๐โ๐โ๐ = ๐๐ =๐ =๐ Note: exponent of is the same as Note: exponent of is the same as 3
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Rational Exponents Mrs. Rivas Example # 1
ISCHS Section 6-4 Rational Exponents Example # 1 Simplifying Expressions with rational exponents. What is the simplest form of each expression? ๐ ๐ ๐ โ ๐๐๐ ๐ ๐ C ๐ ๐ ๐ โ ๐๐๐ ๐ ๐ = ๐ ๐ โ ๐ ๐๐๐ = ๐ ๐โ๐โ๐โ๐ =๐ Note: exponent of is the same as 4
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๐ ๐ ๐ = ๐ ๐ ๐ Rational Exponents = ๐ ๐ ๐ ๐ = ๐ ๐ ๐ 1) ๐ ๐ ๐ 2) ๐ โ๐ ๐
Mrs. Rivas ISCHS Section 6-4 Rational Exponents Example # 2 Converting between exponential and radical form. ๐ ๐ ๐ = ๐ ๐ ๐ = ๐ ๐ ๐ ๐ = ๐ ๐ ๐ 1) ๐ ๐ ๐ 2) ๐ โ๐ ๐ = ๐ ๐ ๐ = ๐ ๐ ๐ ๐ = ๐ ๐ ๐ = ๐ โ๐ ๐ 3) ๐ โ๐.๐
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๐ ๐ ๐ =๐ ๐ ๐ Rational Exponents 1) ๐ = ๐ ๐ ๐ 2) ๐ ๐ ๐ = ๐ ๐ ๐ 3) ๐ ๐
Mrs. Rivas ISCHS Section 6-4 Rational Exponents Example # 3 Converting between exponential and radicals form. =๐ ๐ ๐ ๐ ๐ ๐ 1) ๐ = ๐ ๐ ๐ 2) ๐ ๐ ๐ = ๐ ๐ ๐ 3) ๐ ๐ = ๐ ๐ ๐ 4) ๐ ๐ ๐ = ๐ ๐ ๐
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Rational Exponents ๐ ๐ โ ๐ ๐ = ๐ ๐+๐ ๐ ๐ ๐ = ๐ ๐ โ ๐ ๐๐ ๐ = ๐ ๐ โ ๐ ๐
Mrs. Rivas ISCHS Section 6-4 Rational Exponents Objective: To use rational exponents. Properties Examples ๐ ๐ ๐ โ ๐ ๐ ๐ = ๐ ๐ ๐ + ๐ ๐ = ๐ ๐ =๐ ๐ ๐ โ ๐ ๐ = ๐ ๐+๐ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ โ ๐ ๐ = ๐ ๐ =๐๐ ๐ ๐ ๐ = ๐ ๐ โ ๐ ๐โ๐ ๐ ๐ = ๐ ๐ ๐ โ ๐ ๐ ๐ = ๐โ๐ ๐ ๐ ๐๐ ๐ = ๐ ๐ โ ๐ ๐
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Rational Exponents ๐ โ๐ = ๐ ๐ ๐ ๐ ๐ ๐ ๐ = ๐ ๐ โ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐
Mrs. Rivas ISCHS Section 6-4 Rational Exponents Objective: To use rational exponents. Properties Examples ๐ โ๐ = ๐ ๐ ๐ ๐ โ ๐ ๐ = ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ โ ๐ ๐ = ๐ ๐ =๐ ๐ ๐ ๐ ๐ = ๐ ๐ โ ๐ ๐ ๐๐ ๐ ๐ = ๐ ๐ ๐ ๐๐ ๐ ๐ = ๐ ๐ ๐ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ ๐
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Rational Exponents = ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ โ ๐ ๐
Mrs. Rivas ISCHS Section 6-4 Rational Exponents Example # 4 Combining Radicals. What is ๐ ๐ ๐ ๐ ๐ ๐ in simplest form? ๐ ๐ ๐ ๐ = ๐ ๐ โ ๐ = ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ ๐ = ๐ ๐ ๐ โ ๐ ๐ = ๐ ๐ ๐ ๐จ๐ซ ๐
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Rational Exponents ๐ ๐ ๐ ๐ ๐๐ Mrs. Rivas You Do It ๐ ๐ ๐ ๐ ๐ A B ๐ ๐ ๐
ISCHS Section 6-4 Rational Exponents You Do It Simplifying Expressions with rational exponents. What is each quotient or product in simplest form? ๐ ๐ ๐ ๐ ๐ A ๐ ๐ ๐ ๐ = ๐ ๐ โ ๐ B ๐ ๐ ๐ ๐ ๐ โ ๐ ๐ = ๐ ๐+๐ ๐ ๐ ๐ ๐ ๐๐
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Rational Exponents Mrs. Rivas Example # 5
ISCHS Section 6-4 Rational Exponents Example # 5 Simplifying Numbers with Rational Exponents. What is each number in simplest form? โ๐๐ ๐ ๐ A ๐๐ โ๐.๐ B ๐๐ โ ๐ ๐ = ๐ ๐๐ ๐ ๐ = ๐ ๐๐ ๐ โ๐๐ ๐ ๐ = ๐ โ๐๐ ๐ = โ๐ ๐ = ๐ ๐ ๐ =๐๐ = ๐ ๐๐๐๐
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Rational Exponents ๐ ๐ ๐ ๐ Mrs. Rivas You Do It
ISCHS Section 6-4 Rational Exponents You Do It Writing expressions in simplest form. What is ๐ ๐ ๐๐ โ ๐ ๐ each expression in simplest form? ๐ โ๐ = ๐ ๐ ๐ ๐๐ ๐ = ๐ ๐ โ ๐ ๐ ๐ ๐ ๐ ๐
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Mrs. Rivas ISCHS Pg # 1-43 All
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