Answer:
x2 - 3x - 18
Explanation:
To find the average yield of corn per hectare we just need to divide the function F(x) by the function G(x).
First we need to divide the higher term of F(x) (2x3) by the higher term of G(x) (2x), then we have 2x3 / 2x = x2 (first part of the final result)
Multiplying x2 by G(x), we have 2x3 + 150x2
Subtracting this result from F(x), we have -6x2 - 486x - 2700
Dividing the higher term of the result (-6x2) by 2x again, we have -3x (second part of the final result)
Multiplying -3x by G(x), we have -6x2 - 450x
Subtracting this result from -6x2 - 486x - 2700, we have -36x - 2700
Dividing the higher term of the result (-36x) by 2x again, we have -18 (last part of the final result)
Multiplying -18 by G(x), we have -36x - 2700
Subtracting this result from -36x - 2700, we have 0
So the resulting polynomial that represents the average yield of corn per hectare is x2 - 3x - 18