Answer:
Step-by-step explanation:
Given that a rectangle is inscribed with its base on the x-axis and its upper corners on the parabola
[tex]y=2-x^2[/tex]
the parabola is open down with vertex at (0,2)
We can find that the rectangle also will be symmetrical about y axis.
Let the vertices on x axis by (p,0) and (-p,0)
Then other two vertices would be (p,2-p^2) (-p,2-p^2) because the vertices lie on the parabola and satisfy the parabola equation
Now width = [tex]2-p^2[/tex]
Area = l*w = [tex]2(2p-p^3)[/tex]
Use derivative test
I derivative = [tex]2(2-3p^2)[/tex]
II derivative = [tex]-12p[/tex]
Equate I derivative to 0 and consider positive value only since we want maximum
p = [tex]\sqrt{\frac{2}{3} }[/tex]
Thus width= [tex]\sqrt{\frac{2}{3} }[/tex]
Length =[tex]2\sqrt{\frac{2}{3} }[/tex]
Width = [tex]2-2/3 = 4/3[/tex]
