FactoringComplete the Square Quadratic Formula GraphingRoots $
100 $ 200 $ 300 $ 400 End
Slide 3
Factoring $100 Factor (x + 6)(x - 1) Home
Slide 4
Factoring $200 Factor: (x 3)(3x 4) Home
Slide 5
Factoring $300 Solve by factoring: (x 7)(x + 4) = 0 x = 7 x =
-4 Home
Slide 6
Factoring $400 Solve by factoring: (x 2)(5x + 6) = 0 x = 2 x =
-6/5 Home
Slide 7
Complete the Square $100 What does k need to be to Complete the
Square? k = 25 Home
Slide 8
Complete the Square $200 Home What needs to be added to both
sides of the equation to Complete the Square? Add 1 to both
sides.
Slide 9
Complete the Square $300 What needs to be added to both sides
of the equation to Complete the Square? Add 25/4 to both sides.
Home
Slide 10
Complete the Square $400 Solve for by Completing the Square:
Home
Slide 11
Quadratic Formula $100 Write the Quadratic Formula. Home
Slide 12
Quadratic Formula $200 Identify a, b & c: a = 3 b = -4 c =
-2 Home
Slide 13
Quadratic Formula $300 Solve using the Quadratic Formula: Home
x = 2 x = -17
Slide 14
Quadratic Formula $400 What is the next step in proving the
Quadratic Formula by Completing the Square? (What needs to be added
to both sides of the equation to complete the square?) Home
Slide 15
Graphing $100 Where does the graph of the equation cross the
y-axis? y-intercept: (o, 5) Home
Slide 16
Graphing $200 What is/are the x-intercept(s) of the graph of
x-intercepts: (5,0) and (-2,0) Home
Slide 17
Graphing $300 For what value(s) of x does y = 0? x-intercepts:
(0, 0) and (3, 0 ) Home
Slide 18
Graphing $400 Write a possible equation for the given graph. y
= (x +1)(x -2) or y = x^2 x - 2 Home
Slide 19
Roots $100 Give two more names for the roots of a quadratic
equation? Home x-intercepts Zeros Solutions
Slide 20
Roots $200 Find the root(s) of Home x = -14 x = -2
Slide 21
Roots $300 Find the zero(s) of Home
Slide 22
Roots $400 Determine the solution for Home No Real Solution
(Discriminant is Negative)
Slide 23
Home Mrs. Brown wants to jump off a cliff 20 feet above the
water. The distance d above the water t seconds after she jumps is
represented by the equation. How long will it take Mrs. Brown to
hit the water? Round your answer to the nearest tenth. 0.92
Seconds