Final answer:
The benefit-cost ratio for System A is 2.63 and for System B is 2.95. Since System B has a higher B/C ratio, it is the preferred security system to be chosen for cost-effectiveness at the theme park.
Step-by-step explanation:
The student has asked for a calculation of the benefit-cost ratio for two different security systems under consideration at a theme park. To find the benefit-cost (B/C) ratio for each system, you compare the present worth of the benefits (PWbenefits) to the present worth of the costs (PWcosts) using the formula B/C = PWbenefits/PWcosts. Since neither system has a salvage value, the present worth of the benefits is equal to the annual savings for each, discounted at the given interest rate of 12%. For System A the calculation is $79,000 per year for a cost of $250,000, and for System B it is $53,100 per year for a cost of $150,000.
To calculate the present worth of the annual savings for each system, we use the formula PW = A × (P/A, i%, n), where 'A' is the annual savings, 'i' is the interest rate, and 'n' is the number of years. As the number of years is not specified and we assume an infinite time horizon, the formula simplifies to PW = A/i. Therefore, for System A the present worth is $79,000/0.12 = $658,333.33, and for System B it is $53,100/0.12 = $442,500.
Now we calculate the B/C ratio for each system. For System A, the B/C ratio is $658,333.33/$250,000 = 2.63, and for System B, the B/C ratio is $442,500/$150,000 = 2.95. Since System B has a higher B/C ratio, it is the more cost-effective security option and should be chosen according to the criteria provided by the CEO.