Vertical compression no graph h reflection over the x

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Vertical compression: no Graph: H Reflection over the x- axis: no Show work for the second point here: Second Point: ( 0 , 3 ) 3. f ( x ) = 2( x + 3) 2 – 4 Vertex: ( -3 , -4 ) Domain: All real # Range: y -4 Axis of Symmetry: x = -3 Vertical stretch: yes Vertical compression: no Graph: A Reflection over the x- axis: no Show work for the second point here: Second Point: ( -1 , 4 ) 4. f ( x ) = - 1 2 ( x – 1) 2 + 4 Vertex: ( 1 , 4 ) Domain: All real # Range: y 4 Axis of Symmetry: x = 1 Vertical stretch: no Vertical compression: yes Graph: G Reflection over the x- axis: yes Show work for the second point here: Second Point: ( 3 , 2 )
Write the quadratic equation in vertex form. Identify the vertex, domain, range, and axis of symmetry. Answer yes or no to whether there is a vertical stretch, vertical compression, or reflection over the x-axis. Then, graph the function. 5. f ( x ) = 2 x 2 – 4x –1 Vertex Form: y = 2 (x - 1 ) 2 - 3 Show work here writing the equation in vertex form: Vertex: 1,-3 Axis of Symmetry: 1 Reflection over the x-axis: no Domain: All real # Vertical Stretch: yes Range: y -3 Vertical Compression: no Show work for the second point here: Second Point: (0,-1) Graph:
Vertex 2nd Point axis of symmetry
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