Question 30029
<pre>A searchlight reflector is designed so that a crass section through its axis is
a parabola and the light source is at the focus. Find the focus if the
reflector is 3 feet across the opening and 1 foot deep. 
Where do I even start?!? I'm so lost!

The equation of a parabola whose vertex is at the origin (0,0) is

x² = 4py

where p is the distance from the vertex (0,0) to the focus.

The parabola must go through the points (±3/2,1) in order to be 3 feet across
and 1 foot deep.  Substituting ±3/2 for x and 1 for y:

(±3/2)² = 4p(1)

9/4 = 4p

Solve for p by dividing both sides by 4, and 9/4 divided by 4 = 9/16, so
p = 9/16 feet, or converting to inches 6 3/4 inches from the  

So the focus is 6 3/4 inches above the vertex and 5 1/4 inches below glass.

{{{ graph(100, 100, -1.5, 1.5, 0, 3, (4/9)*x^2) }}}


Edwin
AnlytcPhil@aol.com</pre>