Answer:
38.27775 feet
Step-by-step explanation:
The bridge has been shown in the figure.
Let the highest point of the parabolic bridge (i.e. vertex of the parabola) be at the origin, [tex]O(0,0)[/tex] in the cartesian coordinate system.
As the bridge have the shape of an inverted parabola, so the standard equation, which describes the shape of the bridge is
[tex]x^2=4ay\;\cdots(i)[/tex]
where [tex]a[/tex] is an arbitrary constant (distance between focus and vertex of the parabola).
The span of the bridge = 166 feet and
Maximum height of the bridge= 40 feet.
The coordinate where the bridge meets the base is [tex]A(83, -40)[/tex] and [tex]B(-83, -40).[/tex]
There is only one constant in the equation of the parabola, so, use either of one point to find the value of [tex]a[/tex].
Putting [tex]A(83,-40)[/tex] in the equation (i) we have
[tex]83^2=4a(-40)[/tex]
[tex]\Rightarrow a=-43.05625[/tex]
So, on putting the value of [tex]a[/tex] in the equation (i), the equation of bridge is
[tex]x^2=-172.225y[/tex]
From the figure, the distance from the center is measured along the x-axis, x coordinate at the distance of 10 feet is, [tex]x=\pm 10[/tex] feet, put this value in equation (i) to get the value of y.
[tex](\pm10)^2=-172.225y[/tex]
[tex]\Rightarrow y=-1.72225[/tex] feet.
The point [tex]P_1(10,-1.72225)[/tex] and [tex]P_2(-10,-1.72225)[/tex] represent the point on the bridge at a distance of 10 feet from its center.
The distance of these points from the x-axis is [tex]d=1.72225[/tex] feet and the distance of the base of the bridge from the x-axis is [tex]h=40[/tex] feet.
Hence, height from the base of the bridge at 10 feet from its center
[tex]= h-d[/tex]
[tex]=40-1.72225=38.27775[/tex] feet.
