Hey there mate ;)
Note that the quadratic function
A(x) = x(100-2x) gives the area.
Now, this equation is equivalent to:
A(x) = 100x - 2x²
To find maximum value of A, we first find the derivative of the given function:
[tex] \frac{dA}{dx} = 100 - 4x[/tex]
Now find the critical value by setting dA/dx=0, that is:-
[tex] \frac{dA}{dx} = 100 - 4x = 0[/tex]
Solving for x, we get:
[tex]x = \frac{100}{4} = 25[/tex]
Hence, the critical point is x=25
Now, Find 2nd derivative to check if the equation has maximum value:
[tex]A" = - 4[/tex]
Noting that the 2nd derivative is negative, hence, we have a maximum value. Infact, the maximum value in this case is when the value of x = 25.
The maximum area is therefore,
[tex]A = 25(100 - 2(25))[/tex]
→ The Correct answer is:
[tex]1250ft^{2} [/tex]
