Explanation Given: By referring the figure (1), we can find the value of vertex and point of the parabola, Then the vertex is ( 0 , 0 ) and point of the parabola is ( − 1 , 1 ) respectively. Calculation: By referring the figure (1) equation is to be, y 2 = 4 p x (1) Substitute the value − 1 for x and 1 for y in the equation (1). 1 2 = 4 p × ( − 1 ) 1 = − 4 p p = − 1 4 Then, the focus of the graph is to be ( p , 0 ) . Therefore, the focus of the parabola is ( − 1 4 , 0 ) _ Compute the directrix of the parabola

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ISBN: 8220101383693

Author: Stewart

Publisher: Cengage Learning US

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Maximization

Have you ever seen a bridge in the shape of a parabola? Where is its maximum on the bridge? The maximum of that bridge is the highest point on that bridge. The process of finding the maximum of the bridge here is called the maximization.

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Chapter 10.5, Problem 9E

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To Find: The equation of the parabola, focus and the directrix by using figure (1).

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Chapter 10.5, Problem 8E

Chapter 10.5, Problem 10E

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The equation of the parabola, focus and the directrix by using figure (1).

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