Answer :
Answer:
24 trees per acre
Step-by-step explanation:
Let x be the optimal tree density per acre and y be the number of bushels yield per tree
Since for each unit change of x from 28 trees/acre, we have 2 unit change of y from 40 bushels per tree in the reversed direction
Change of x from 28 is x - 28
Change of y from 40 is y - 40
Therefore we have y - 40 = -2(x - 28) or y = 40 - 2(x - 28) = -2x + 96
The total bushels per acre should be y bushels/tree * x tree/acre. We want to optimize this. Substitute the above equation in for y and we have
[tex]T = xy = x(-2x+96) [/tex]
[tex]T = -2x^2 + 96x[/tex]
To find the maximum value of this, we can take the first derivative and set it to 0
[tex]T^{'} = -4x + 96 = 0[/tex]
[tex]4x = 96[/tex]
[tex]x = 24[/tex]
We know this is a maxima because [tex] T{''} = -4 < 0[/tex]. So T is maximum when x = 24 trees per acre