Answer:
The parabolic shape of the door is represented by [tex]y - 32 = -\frac{2}{49}\cdot x^{2}[/tex]. (See attachment included below). Head must 15.652 inches away from the edge of the door.
Step-by-step explanation:
A parabola is represented by the following mathematical expression:
[tex]y - k = C \cdot (x-h)^{2}[/tex]
Where:
[tex]h[/tex] - Horizontal component of the vertix, measured in inches.
[tex]k[/tex] - Vertical component of the vertix, measured in inches.
[tex]C[/tex] - Parabola constant, dimensionless. (Where vertix is an absolute maximum when [tex]C < 0[/tex] or an absolute minimum when [tex]C > 0[/tex])
For the design of the door, the parabola must have an absolute maximum and x-intercepts must exist. The following information is required after considering symmetry:
[tex]V (x,y) = (0, 32)[/tex] (Vertix)
[tex]A (x, y) = (-28, 0)[/tex] (x-Intercept)
[tex]B (x,y) = (28. 0)[/tex] (x-Intercept)
The following equation are constructed from the definition of a parabola:
[tex]0-32 = C \cdot (28 - 0)^{2}[/tex]
[tex]-32 = 784\cdot C[/tex]
[tex]C = -\frac{2}{49}[/tex]
The parabolic shape of the door is represented by [tex]y - 32 = -\frac{2}{49}\cdot x^{2}[/tex]. Now, the representation of the equation is included below as attachment.
At x = 0 inches and y = 22 inches, the distance from the edge of the door that head must observed to avoid being hit is:
[tex]y -32 = -\frac{2}{49} \cdot x^{2}[/tex]
[tex]x^{2} = -\frac{49}{2}\cdot (y-32)[/tex]
[tex]x = \sqrt{-\frac{49}{2}\cdot (y-32) }[/tex]
If y = 22 inches, then x is:
[tex]x = \sqrt{-\frac{49}{2}\cdot (22-32)}[/tex]
[tex]x = \pm 7\sqrt{5}\,in[/tex]
[tex]x \approx \pm 15.652\,in[/tex]
Head must 15.652 inches away from the edge of the door.
