Answer to Question #270755 in Algebra for stella

Consider a farmer plants 75 trees per acre, each tree will yield 20 bushels of fruit.

Let x be the number of trees, than for each new tree, 3 fewer bushels are yielded.

So for (75 + x) trees, there are (20-3x) bushels.

The total amount of fruit in bushels is,

"F(x) = (75+x)(20-3x) \\\\\n\n= -3x^2 -205x +1500"

Since the coefficient of x² is negative, the parabola opens downward and has a maximum value. To find the price that maximizes the fruit price, begin by finding the x-value of the vertex,

"h = \\frac{-b}{2a} \\\\\n\n= -\\frac{-205}{2(-3)} \\\\\n\n=-\\frac{205}{6}"

The number of trees should she plant per acre to maximize her harvest is,

"75 +x = 75 -\\frac{205}{6} \\\\\n\n= \\frac{245}{6} \\\\\n\n= 41"

Thus, the number of trees per acre to maximize the harvest is 41.

F(75) = 25

F(78) = 28

F(81) = 31

slope = 1

y = x+50