Answer:
8th year
Step-by-step explanation:
The yearly income or loss of the investment is modeled by a quadratic function. The maximum or minimum value of the quadratic function occurs at its vertex. Since, the coefficient of the squared term is negative, the given function will have a maximum value at its vertex.
The vertex of a quadratic function occurs at = [tex]\frac{-b}{2a}[/tex]
Here,
a = coefficient of squared term = -0.1
b = coefficient of linear term = 1.6
Using these values, we get:
Vertex occurs at = t = [tex]\frac{-1.6}{2(-0.1)}=8[/tex]
This means, the real estate investment will reach its maximum in 8th year.
