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How To Graph Quadratic Equations Standard Form
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Getting Started The standard form of a quadratic equation is y = ax2 + bx + c. The graph of a quadratic equation is a parabola. When a is positive, the graph opens up. When a is negative, the graph opens down. Every parabola has a vertex. For graphs opening up, the vertex is a minimum (low point). For graphs opening down, the vertex is a maximum (high point). The x-coordinate of the vertex is equal to
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Find the Vertex To find the x coordinate of the vertex, use the equation Then substitute the value of x back into the equation of the parabola and solve for y. You are given the equation y=-x2 + 4x –1. Find the coordinates of the vertex. - = a b 1 4 , 2 y x = - + 4 1 x b a = - 2 y = - + 2 4 1 ( ) y = - + 4 8 1 ( - x = 4 2 1 )( ) y = 3 The coordinates of the vertex are (2,3) x = 2
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Table of Values Choose two values of x that are to the right or left of the x coordinate of the vertex. Substitute those values in the equation and solve for y. Graph the points. Since a parabola is symmetric, you can plot those same y-values on the other side of the parabola, the same distance away from the vertex. x y = -x2 + 4x -1 y y = -(1)2 + 4(1) - 1 y = 1 2 y = -(-1)2 + 4(-1) -1 y = -6 -1
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Graph the Parabola x y Plot the vertex and the points from your table of values: (2,3), (1,2), (-1,-6). Since a parabola is symmetric and has a vertical line of symmetry through the vertex of the parabola, points which are the same distance to the right of the vertex will also have the same y-coordinate as those to the left of the vertex. Therefore, we can plot points at (3,2) and (5,-6). Sketch in the parabola.
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You Try It Find the vertex of the following quadratic equations. Make a table of values and graph the parabola.
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Problem 1 y x The vertex is at (2,-4)
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Problem 2 x y The vertex is at (0,3)
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Problem 3 x y The vertex is at (3,-5)
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