Answer :
Answer:
Maximum area =18
The area of the quadrilateral as a function of x and y = xy/2
Step-by-step explanation:
As the quadrilateral has mutually perpendicular diagonals, it is a rhombus. The area of a rhombus is denoted by the formula xy/2.
So, the area of the quadrilateral is xy/2.
As the sum of the sides is 12
x + y = 12
y = 12- x
So, the area, as a function of x alone, becomes x(12- x)/2
To find the maximum area, we find the derivative of the area function with respect to x and equate it to 0.
d/dx(x(12 - x)/2) = 0
d/dx(12x - x^2) = 0
12- 2x = 0
x = 6
The maximum area will then be 6(12- 6)/2 = 36/2 = 18
So, the maximum area is 18.