Answer:
- auto: $535,500
- furniture: $144,500
- other secured: $391,000
- signature: $119,000
- risk-free: $510,000
- projected return: $160,480 (9.44%)
Step-by-step explanation:
We can let the variables a, f, o, s, r stand for the amounts invested in auto loans, furniture loans, other secured loans, signature loans, and risk-free securities, respectively. The restrictions imposed are ...
- r ≤ 0.30(1.7·10^6)
- s ≤ 0.10(a +f +o +s)
- f +o ≤ a
- o +s ≤ r
- a +f +o +s +r = 1.7·10^6
And the objective is to maximize ...
p = 0.08a +0.10f +0.11o +0.12s +0.09r
We can write the constraints in standard form as ...
- r -510000 ≤ 0
- -a -f -o +9s ≤ 0
- -a +f +o ≤ 0
- o +s -r ≤ 0
- a +f +o +s +r -1700000 = 0
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It is convenient to formulate this problem as a "solver" problem in a spreadsheet program. The spreadsheet and the solver setup are shown in the attachments. The result is ...
- Automobile Loans $535,500
- Furniture Loans $144,500
- Other Secured Loans $391,000
- Signature Loans $119,000
- Risk Free Securities $510,000
The projected total annual return: $160,480 (9.44%)
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Comment on the attachments
The first attachment shows the NeoOffice spreadsheet used to solve this problem. The formula shown is filled in all cells G3:G8. The second attachment shows the Solver setup used to solve this problem. There are actually five constraints. The one not showing is $G$7 = 0.