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Transcript
Solving Polynomial Equations At the end of this two-part lesson, you will: Solve Polynomial Equations by Factoring/Using Quadratic Formula Solve Polynomial Equations by Graphing X4 – 81 = (x2 + 9) (x + 3) (x-3) X3 – 125 = 0 (x-5) (x2 +5x + 25) x = 5; x = ? RECALL: Quadratic Formula NOTE: Equation must be in standard -b+±c =b20 , where - 4aca, b, form ax2 + bx x = and c are and a2a > 0. Sums and Differences of Cubes ( u + v) (u2 – uv + v2) u3 + v3 = ___________________________ u3 - v3 ( u - v) (u2 + uv + v2) = ___________________________ Review: Factoring Sums and Differences of Cubes Being familiar with perfect cubes will make factoring sums and differences much easier! x3 – 512 x 3 – 83 = x3 – 343 x 3 – 73 = x3 + 125 x 3 + 53 = x3 + 216 x 3 + 63 = (x – 8) (x2 + 8x + 64) (x + 5) (x2 - 5x + 25) (x – 7) (x2 + 7x + 49) (x + 6) (x2 - 6x + 36) SOLVING A POLYNOMIAL EQUATION Solve 8x3 + 125 = 0. Find all complex roots. You will need to use Quadratic Formula. ( )3 + __3 = MENTAL MATH: FACTORING HIGHER-DEGREE Factor completely. POLYNOMIALS BY USING A QUADRATIC FORM x4 – 3x2 – 10 x4 + 11x2 + 18 x4 – 8x2 + 12 x4 – 17x2 + 72 x4 – 5x2 + 6 x4 – 16x2 + 63 x4 – 7x2 + 12 x4 + 6x2 + 72 Solving Higher-Degree Examples Equations by Using a Quadratic Form Solve x4 – 6x2 -27 = 0. Pick your poison! Solve x4 – 3x2 - 10 = 0. Solve x4 + 11x2 +10 = 0. Solve x4 – 4x2 - 45 = 0. Example Solving Higher-Degree Polynomial Equations by Using Factoring By Grouping 30X3 + 40X2 + 3XPick + 4your =0 poison! 3X4 + 3X2 + 6X2 + 6X = 0 X4 + 12X3 + 4X2 + 48X = 0 …on a final note! Solving by Graphing y = x3 + 3x2 – x - 3 You can also solve a polynomial equation by graphing each side of the equation separately, and The solutions are -3, 1 & 1. finding the x-values 3 + 3x2 Step 1: Graph y = x 1 (zeros) at the point(s) of intersection. & y2 = x + 3x Step 2: Use the intersect feature to find the x-values (zeros) of the points of intersection. FINAL CHECKS FOR UNDERSTANDING 1. What does it mean for a polynomial with integer coefficients to be completely factored with respect to the integers? 2. Give an example of a second-degree polynomial that cannot be factored with respect to the integers. 3. Factor completely with respect to the integers: 81x4 – 1 16x3 – 4 1 – 64x3 2x3 – 8x2 + 3x - 12 Homework Assignment: Pages 324-325. 1-7 odd (calculator) 12-32 all. Column 1 (42-58 all), 61, 62. Reminder: Chapter 6 Exam on _____________________.
