Given a parabola in standard form f(x)=ax2 + bx +c, where a, b, and c are real numbers with a ≠0 the parabola has the following properties.Opening and Extrema: Opens up and minimum if a>0 opens down and maximum if a < 0.
Axis of symmetry: The vertical line with the equation x_v=-b/2a.
The Vertex: The point 〖(x〗_v ,y_v) that can be found with the formula (-b/2a,f(-b/2a)).
The y-intercept: The y-value y=c, where the graph intercepts the y axis.
Axis of symmetry: The vertical line with the equation x_v=-b/2a.
The Vertex: The point 〖(x〗_v ,y_v) that can be found with the formula (-b/2a,f(-b/2a)).
The y-intercept: The y-value y=c, where the graph intercepts the y axis.
TRANSFORMATION OF FUNCTIONS
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