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Create your own worksheets like this one with Infinite Algebra 2. Free trial available at KutaSoftware.com.
Given a quadratic equation in vertex form, find the vertex, axis of symmetry, whether the graph opens up or down, the maximum or minimum, and the y-intercept. Graph it!
Rewrite this function in vertex form and determine the maximum daily profit. Answers may vary. Sample: (Either p or q must [13] be zero) p 1 , q 0 , r 12. P ( n ) ( n 30 ) 2 500 ; $500 is the maximum [14] profit.
Worksheet by Kuta Software LLC Graphing Quadratic Equations in Vertex Form ©f ^2J0d1y9h kKWuZtTaX XSwoXfytbw]axreeg pLALXCK.J ^ zAMlUlm ZrKiLgzhftdsp BrFessveurkvDezdx.-1-Identify the vertex of each. Then sketch the graph. 1) y = (x + 5) 2 - 3 x y-8-6-4-22468-8-6-4-2 2 4 6 8 2) y = - (x - 6) 2 + 2 x y-8-6-4-22468-8-6-4-2 2 4 6 8 3) y = 2 (x ...
determine the vertex of f(x) =x2 −14x−15. State the coordinates of the vertex. 10 a) Given the function f(x) =−x2 +8x+9, state whether the vertex represents a maximum or minimum point for the function. Explain your answer. b) Rewrite f(x) in vertex form by completing the square.
Write f(x) = -2x2 – 16x + 4 in vertex form, and identify the vertex.
9.1-9.2 Solving Quadratic Equations in Vertex Form Worksheet Graph each quadratic equation and identify all the following information: 1) (𝑓 )=( −3)2+1 a. Circle one: Opens Up or Down b. Axis of Symmetry: _____ c. Vertex: _____ d. Circle one: Minimum or Maximum e. -intercept: _____ f.
Use the information provided to write the intercept form equation of each parabola. Create your own worksheets like this one with Infinite Algebra 2. Free trial available at KutaSoftware.com.
The Vertex Form of a quadratic equation is where represents the vertex of an equation and is the same a value used in the Standard Form equation. Converting from Standard Form to Vertex Form: Determine the vertex of your original
Use the information provided to write the vertex form equation of each parabola. 1) y = -x2 - 8x - 62) y = x2 + 10x + 28 3) Vertex: (5, -8), y-intercept: 174) Vertex: (2, 5), y-intercept: -3 5) Vertex: (8, -2), Passes through: (10, 10) 6) Vertex: (-6, 1), Passes through: (-9, -8) 7) x y-8-7-6-5-4-3-2-11-7-6-5-4-3-2-1 1 8) x y-4-2246810-14-12-10 ...