Search results
Vertex: (−5, 4) Axis of Sym.: x = −5 Max value = 4 15) f (x) = − 1 4 x2 + 7 Vertex: (0, 7) Axis of Sym.: x = 0 Max value = 7 16) f (x) = x2 − 12 x + 44 Vertex: (6, 8) Axis of Sym.: x = 6 Min value = 8 17) f (x) = 1 4 x2 − x + 9 Vertex: (2, 8) Axis of Sym.: x = 2 Min value = 8 18) f (x) = x2 + 4x + 5 Vertex: (−2, 1) Axis of Sym.: x ...
- 37KB
- 4
Practice Worksheet: Graphing Quadratic Functions in Vertex Form For #1-6, label the axis of symmetry, vertex, yr-intercept, and at least three more points on the graph. l] y = (x — 3)2+0 Axis of Symmetry is Vertex: ( 3 , O ) down? Slope to point one unit from the vertex is X y-intercept: (0, q ) Axis of Symmetr is x= Vertex: ( )
- 767KB
- 2
Worksheet 2.2B Find the vertex and axis of symmetry. 1. 𝑓(𝑥 )=3(𝑥+12−5 2. 𝑓(𝑥)=−2(𝑥−2)2+6 3. )𝑓 (𝑥=−1 4 (𝑥−4)2+7 4. 𝑓𝑥)=−5(𝑥+7)2−7 Find the vertex, axis of symmetry, and the minimum or maximum value. 5. )𝑓(𝑥=3𝑥2−6𝑥+7 ( ) 6. 𝑓𝑥=𝑥2+8𝑥+2 7.
Vertex: (−5, −3) Axis of Sym.: x = −5. Vertex: (1, 4) Axis of Sym.: x = 1. Vertex: (−5, 2) Axis of Sym.: x = −5. Vertex: (−2, −1) Axis of Sym.: x = −2. Create your own worksheets like this one with Infinite Algebra 2. Free trial available at KutaSoftware.com.
- 38KB
- 4
Students will determine the vertex, axis of symmetry and root (s) of each function, find their solution in the answer bank, Subjects: Math, Algebra, Other (Math) Grades: 8th - 12th. Types: Worksheets, Activities, Fun Stuff. Also included in: Quadratic Equations and Functions Growing Bundle of Engaging Activities.
Quiz & Worksheet Goals. To be clear, you will answer questions on: A graph's equation for the axis of symmetry. The axis of symmetry for parabolas based on quadratic equations. Ordered pairs of a ...
People also ask
What is the axis of symmetry of a graph with the vertex?
Is axis of symmetry the same as vertex?
What is the axis of symmetry?
What are two examples of an axis of symmetry?
What can I do with my knowledge of the axis of symmetry?
The given quadratic function is in standard form. Comparing y = ax2 + bx + c and y = -x2 - 4x + 1, we get. a = -1, b = -4 and c = 1. Axis of symmetry : x = 2. From the axis of symmetry x = 2, the x-coordinate of the vertex is 2. In the given quadratic function, substitute x = 2 to get the y-coordinate of the vertex.
