Concept explainers
a.
To find: The width of football field.
The width of football field is
Given data: The equation of the quadratic function representing the football field is an inverted parabola given by
Method/Formula used:
The intercepts made by the quadratic function ( inverted parabola) are obtained by solving the equation
Calculation:
The given quadratic function or the curve representing boundary of the football field whose graph is shown in Fig. (1), is
The intercepts made by the curve on the x-axis are:
That shoes boundary curve intersects x -axis at points
From the Fig. (1), w is the width of the football field.
Thus, the width of football field is
b.
To find: The maximum height of the field’s surface.
The height of the football field is
Given:
The information in part (a) Method used:
The axis of symmetry of the graph of a quadratic function is given by
If
Calculations:
As calculated in part (a), the intercepts of the function
The equation of axis of symmetry is
Now, substitute
But
Therefore, the height of the football field is
Chapter 1 Solutions
EBK ALGEBRA 2
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- Algebra And Trigonometry (11th Edition)AlgebraISBN:9780135163078Author:Michael SullivanPublisher:PEARSONIntroduction to Linear Algebra, Fifth EditionAlgebraISBN:9780980232776Author:Gilbert StrangPublisher:Wellesley-Cambridge PressCollege Algebra (Collegiate Math)AlgebraISBN:9780077836344Author:Julie Miller, Donna GerkenPublisher:McGraw-Hill Education