Respuesta :
Answer:
To maximize return, A with 390000 and B with 210000
Step-by-step explanation:
Given that a financier plans to invest up to $600,000 in two projects
Let x be the amount invested in 8% and y in 16%
Other information given is the investment in project B is riskier than the investment in project A, she has decided that the investment in project B should not exceed 35% of the total investment.
i,.e. [tex]y\leq 0.35(600000)\\y\leq 210000[/tex]
Also [tex]x+y = 600000[/tex]
The objective is to maximize interest function
[tex]Z=0.08x+0.16y[/tex]
subject to the above two constraints.
The corner points would be P(390000,210000) or Q(600000,0)
Calculate Z for these two points
Profit at P = [tex]390000(0.08)+210000(0.16)\\= 64800[/tex]
Profit at Q = [tex]600000(0.08)\\= 48000[/tex]
So to maximize return, A with 390000 and B with 210000
