Answer:
Step-by-step explanation:
Given that a rectangle is inscribed in a circle of radius r.
Since diameter subtends right angle at the circumference we get diagonal of the rectangle is diameter of the circle
Let l and w be the dimensions
Then [tex]l^2+w^2 = 4r^2[/tex]
Hence A =lw maximum when A square is maximum
i.e. [tex]A^2=l^2 w^2 = l^2 (4r^2-l^2)\\= 4r^2l^2 -l^4\\[/tex]
Use derivative test
I derivative = [tex]8r^2l-4l^3=0\\l=0 or l = \sqrt{2} r[/tex]
II derivative <0 for non zero value of l
Hence maximum when [tex]l=\sqrt{2} r\\w=\sqrt{2} r[/tex]
Or rectangle is a square with equal sides
