Algebra T3 Today: 9.3 Check Up 9.4 Instruction Break Finish 9.4 Practice All Dreams can come true. If we have the courage to pursue them. Walt Disney
Assignment The future belongs to those who believe in the beauty of their dreams. Eleanor Roosevelt Due tomorrow: 9.3 p521 #21-57 x3 Quiz Monday Supplies Checked during Quiz
Geometry The future belongs to those who believe in the beauty of their dreams. Eleanor Roosevelt
Dividers Purpose/Goals Notes Assignments Check-Ups Paper/Graph Paper
Algebra T3 9.4 Solving Quadratic Equations by Graphing Objective: 1.Solve quadratic equations by graphing 2.Solve Real World problems involving quadratic equations Vocabulary: zeros, roots
Solve: 2x + 5 = -9 2x = 35 3x 2 + 2x = 35
Quadratic function: y = ax 2 + bx + c, but a ≠ 0 y = 4x 2 + x – 4 Is this a quadratic function? If yes, find a, b, c.
Quadratic equation in standard form: 0 = ax 2 + bx + c, but a ≠ 0 0 = 4x 2 + x - 4 Is this a quadratic equation? If yes, put into standard form and find a, b, c. Hint: A quadratic equation can have only 3 kinds of terms. - x 2, x, and numbers (constants).
Quadratic equation in standard form: 0 = ax 2 + bx + c, but a ≠ 0 2x = 4x Is this a quadratic equation? If yes, put into standard form and find a, b, c. Hint: A quadratic equation can have only 3 kinds of terms. - x 2, x, and numbers (constants).
Quadratic equation in standard form: 0 = ax 2 + bx + c, but a ≠ 0 0 = x Is this a quadratic equation? If yes, put into standard form and find a, b, c. Hint: A quadratic equation can have only 3 kinds of terms. - x 2, x, and numbers (constants).
Quadratic equation in standard form: 0 = ax 2 + bx + c, but a ≠ 0 -x 2 + 4x = 2x - 6 Is this a quadratic equation? If yes, put into standard form and find a, b, c. Hint: A quadratic equation can have only 3 kinds of terms. - x 2, x, and numbers (constants).
Quadratic equation in standard form: 0 = ax 2 + bx + c, but a ≠ 0 4x + 2 = x – 6 Is this a quadratic equation? If yes, put into standard form and find a, b, c. Hint: A quadratic equation can have only 3 kinds of terms. - x 2, x, and numbers (constants).
Quadratic equation in standard form: 0 = ax 2 + bx + c, but a ≠ 0 2x 2 + 5x - 2 = 2x 2 + x + 7 Is this a quadratic equation? If yes, put into standard form and find a, b, c. Hint: A quadratic equation can have only 3 kinds of terms. - x 2, x, and numbers (constants).
Quadratic equation in standard form: 0 = ax 2 + bx + c, but a ≠ 0 2x 2 + 5x - 2 = 25x 2 + x + 7 Is this a quadratic equation? If yes, put into standard form and find a, b, c. Hint: A quadratic equation can have only 3 kinds of terms. - x 2, x, and numbers (constants).
Quadratic equation in standard form: 0 = ax 2 + bx + c, but a ≠ 0 4x 2 = 16 Is this a quadratic equation? If yes, put into standard form and find a, b, c. Hint: A quadratic equation can have only 3 kinds of terms. - x 2, x, and numbers (constants). Solve it!Graph it! solutions = roots = zeros
Steps to graph a quadratic equation 1.Put equation into standard form 2.Replace the 0 with y 3.Graph the function by finding the x-coordinate of the vertex and other x’s in a table 4.Find the zeros – these are the solutions 5.Check answers! Graph: 4x 2 = 16
Steps to graph a quadratic equation with FRIEND 1.Put equation into standard form 2.Replace the 0 with y 3.Graph the function on your calculator using the Y= button 4.Find the zeros using the calc menu ( 2 nd TRACE ), setting left and right boundaries and making a guess. 5.Check answers! Graph: 4x 2 = 16 Super Tip: Don’t forget to find both answers!
Steps to graph a quadratic equation with FRIEND 1.Put equation into standard form 2.Replace the 0 with y 3.Graph the function on your calculator using the Y= button 4.Find the zeros using the calc menu ( 2 nd TRACE ), setting left and right boundaries and making a guess. 5.Check answers! Graph: x 2 - 4x = 5 Super Tip: Don’t forget to find both answers!
Steps to graph a quadratic equation with FRIEND 1.Put equation into standard form 2.Replace the 0 with y 3.Graph the function on your calculator using the Y= button 4.Find the zeros using the calc menu ( 2 nd TRACE ), setting left and right boundaries and making a guess. 5.Check answers! Graph: x 2 = -x + 6 Super Tip: Don’t forget to find both answers!
Steps to graph a quadratic equation with FRIEND 1.Put equation into standard form 2.Replace the 0 with y 3.Graph the function on your calculator using the Y= button 4.Find the zeros using the calc menu ( 2 nd TRACE ), setting left and right boundaries and making a guess. 5.Check answers! Graph: x 2 = -x + 6 Super Tip: Don’t forget to find both answers!
Steps to graph a quadratic equation with FRIEND 1.Put equation into standard form 2.Replace the 0 with y 3.Graph the function on your calculator using the Y= button 4.Find the zeros using the calc menu ( 2 nd TRACE ), setting left and right boundaries and making a guess. 5.Check answers! Graph: make one up! Super Tip: Don’t forget to find both answers!
A baseball is thrown at 100 mph ft/sec from left field toward home plate. The models below give paths of the ball for two initial angles, with height of y and horizontal distance x (both measure in feet) If home plate is 236 feet away, which angle(s) have the ball hitting the ground before reaching the plate?
A baseball is thrown at 100 mph ft/sec from left field toward home plate. The models below give paths of the ball for two initial angles, with height of y and horizontal distance x (both measure in feet) How high did the ball fly for each throw?
A baseball is thrown at 100 mph ft/sec from left field toward home plate. The models below give paths of the ball for two initial angles, with height of y and horizontal distance x (both measure in feet) What angle should a ball be thrown to maximize it’s distance?
Assignment Due tomorrow: #18-20, odd – make sketch of graph Quiz tomorrow All Dreams can come true. If we have the courage to pursue them. Walt Disney