Answer:
\frac{4(9c-4)}{27
Step-by-step explanation:
Assuming c positive, we find that this parabola is open down with vertex on the y axis above the origin.
If a rectangle is formed, then it would have two vertices on either side of the y axis of the parabola with remaining two vertices on x axis.
Due to symmetry let us take vertices on x axis as (a,0) and (-a,0)
Corresponding vertices on the parabola would be
[tex](b, c-a^2) and (b,c-a^2)[/tex]
Now the rectangle has width = 2b and
length = [tex]c-a^2[/tex]
So area of the rectangle =
[tex]A(a) =2a(c-a^2)\\A(a) = 2ac-a^3[/tex]
Use derivative test to find a which gives maximum area
[tex]A'(a) = 2a-3a^2\\A"(a) = 2-6a[/tex]
Equate I derivative to 0 to get
a =0 or a = 2/3
a cannot be 0
A" is negative for a = 2/3
So maximum when a =2/3
and maximum area
= [tex]2(\frac{2}{3} )(c-\frac{4}{9})\\ =\frac{4(9c-4)}{27}[/tex]
