A mirror with a parabolic cross section is used to collect sunlight on a pipe located at the focus of the mirror. The pipe is located 9 inches from the vertex of the mirror. Write an equation of the parabola that models the cross section of the mirror. Assume that the parabola opens upward.(1 point)

Question

A mirror with a parabolic cross section is used to collect sunlight on a pipe located at the focus of the mirror. The pipe is located 9 inches from the vertex of the mirror. Write an equation of the parabola that models the cross section of the mirror. Assume that the parabola opens upward.(1 point)
A y = 1/81 x^2
B y = -1/36 x^2
C y = -1/81 x^2
D y = 1/36 x^2

GPT 3.5 · Answer

Since the parabola opens upward and the pipe is located at the focus, we can use the standard form equation of a parabola:

y = ax^2

To find the value of a, we need to use the information given.

The pipe is located 9 inches from the vertex of the mirror, which means it is located 9 units above the x-axis.

The distance from the vertex to the focus is given by the equation:

p = 1/4a

Since the pipe is located at the focus, p = 9.

9 = 1/4a

Solving for a:

4a = 1/9

a = 1/(9*4) = 1/36

Thus, the equation of the parabola that models the cross section of the mirror is:

y = (1/36)x^2

So the correct answer is D.