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Chabot Mathematics §7.1 Cube th & n Roots Bruce Mayer, PE Licensed Electrical & Mechanical Engineer [email protected] Chabot College Mathematics 1 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Review § 7.1 MTH 55 Any QUESTIONS About • §7.1 → Square-Roots and Radical Expessions Any QUESTIONS About HomeWork • §7.1 → HW-30 Chabot College Mathematics 2 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Cube Root The CUBE root, c, of a Number a is written as: 3 a, The number c is the cube root of a, if the third power of c is a; that is; if c3 = a, then 3 a c. Chabot College Mathematics 3 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Example Cube Root of No.s Find Cube Roots a) 3 0.008 b)3 27 c) 3 2197 64 SOLUTION • a) b. 3 0.008 0.2 • b) 3 2197 13 As (−13)(−13)(−13) = −2197 27 3 c. 3 • c) 64 4 Chabot College Mathematics 4 As 0.2·0.2·0.2 = 0.008 As 33 = 27 and 43 = 64, so (3/4)3 = 27/64 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Cube Root Functions Since EVERY Real Number has a Cube Root Define the Cube Root Function: f x x 5 3 4 2 1 • Domain = {all Real numbers} x 0 -10 -8 -6 -4 -2 0 2 4 6 -1 -2 • Range = {all Real numbers} -3 -4 M55_§JBerland_Graphs_0806.xls 5 y f x 3 x 3 The Graph Reveals Chabot College Mathematics y -5 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt 8 10 Evaluate Cube Root Functions Evaluate Cube Root Functions a) u y 3 2 y 19 u73 b) vz 3 7 z 37 v17 SOLUTION (using calculator) a) u 73 3 273 19 3 146 19 3 127 5.025 3 717 37 3 119 37 v 17 b) 3 82 4.344 Chabot College Mathematics 6 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Simplify Cube Roots For any Real Number, a 3 a a 3 Use this property to simplify Cube Root Expressions. For EXAMPLE Simplify 3 27 x3 . SOLUTION 3 3 a. 27 x 3 x Chabot College Mathematics 7 because (–3x)(–3x)(–3x) = –27x3 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt nth Roots nth root: The number c is an nth root of a number a if cn = a. The fourth root of a number a is the number c for which c4 = a. We write n a for the nth root. The number n is called the index (plural, indices). When the index is 2 (for a Square Root), the Index is ommitted. Chabot College Mathematics 8 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Odd & Even nth Roots → n a When the index number, n, is ODD the root itself is also called ODD • A Cube-Root (n = 3) is Odd. Other Odd roots share the properties of Cube-Roots – the most important property of ODD roots is that we can take the ODD-Root of any Real Number – positive or NEGATIVE – Domain of Odd Roots = (−, +) – Range of Odd Roots =(−, +) Chabot College Mathematics 9 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Example nth Roots of No.s Find ODD Roots a) 5 243 b) 5 243 c) 11 11 m SOLUTION • a) 5 243 3 Since 35 = 243 • b) 5 243 3 As (−3)(−3)(−3)(−3)(−3) = −243 m m When the index equals the exponent under the radical we recover the Base • c) 11 Chabot College Mathematics 10 11 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Odd & Even nth Roots → n a When the index number, n, is EVEN the root itself is also called EVEN • A Sq-Root (n = 2) is Even. Other Even roots share the properties of Sq-Roots – The most important property of EVEN roots is that we canNOT take the EVEN-Root of a NEGATIVE number. – Domain of Even Roots = {x|x ≥ 0} – Range of Even Roots = {y|y ≥ 0} Chabot College Mathematics 11 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Example nth Roots of No.s Find EVEN Roots a) 4 b) 81 4 81 c)4 16m 4 SOLUTION • a) 4 81 3 Since 34 = 81 • b) 4 81 Even Root is Not a Real No. • c) 4 16m 2 m Chabot College Mathematics 12 4 Use absolute-value notation since m could represent a negative number Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Simplifying nth Roots n a n a n n a a Positive Positive Negative |a| Positive Not a real number Positive Negative Negative a Even a Odd Chabot College Mathematics 13 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Example Radical Expressions Find nth Roots a) 4 u 2 7 4 b) 5 3v 115 c) 6 136 SOLUTION • a) 4 u 7 • b) 5 3v 11 • c) 6 13 6 n a n a if n is EVEN 3v 11 as n a n a if n is ODD 13 13 as n a n a if n is EVEN 5 Chabot College Mathematics 14 u 7 as 4 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt WhiteBoard Work Problems From §7.1 Exercise Set • 50, 74, 84, 88, 98, 102 Principal nth Root Chabot College Mathematics 15 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt All Done for Today SkidMark Analysis Skid Distances Chabot College Mathematics 16 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Chabot Mathematics Appendix r s r s r s 2 2 Bruce Mayer, PE Licensed Electrical & Mechanical Engineer [email protected] – Chabot College Mathematics 17 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt Graph y = |x| 6 Make T-table x -6 -5 -4 -3 -2 -1 0 1 2 3 4 5 6 Chabot College Mathematics 18 5 y = |x | 6 5 4 3 2 1 0 1 2 3 4 5 6 y 4 3 2 1 x 0 -6 -5 -4 -3 -2 -1 0 1 2 3 -1 -2 -3 -4 -5 file =XY_Plot_0211.xls -6 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt 4 5 6 y 4 y 2 x 0 -18 -16 -14 -12 -10 -8 -6 -4 -2 0 2 -2 -4 -6 x -8 -10 -12 -14 M55_§JBerland_Graphs_0806.xls Chabot College Mathematics 19 -16 Bruce Mayer, PE [email protected] • MTH55_Lec-37_sec_7-1a_Radical_Expressions.ppt