As a financial advisor at RedHat International (RHI), you have been asked to evaluate two capital investment alternatives submitted by the shipping department. Before beginning your analysis, you note that company policy has set the minimum desired rate of return at 16% for all proposed projects. You also learn that the corporate tax rate is 22%.
The proposed capital project calls for the shipping department to fully automate a warehouse using one of two different advanced robotics systems. System A will incur development costs of $2,400,000. System B will cost $3,800,000 to develop. Both systems will be capitalized and amortized using a CCA rate of 20%. In addition, the firm believes that Net Working Capital will rise by $40,000 at time zero and then by an additional $10,000 at the end of each year for each year that the new system is operating (except at the end of the final year of the project). This applies to both alternatives. However, all of the increase in Net Working Capital will be recovered at the end of the project.
If the new automated robotics system is put into use, the pre-tax cost savings each year are estimated as follows:
Year System A System B
1 $1,400,000 $2,000,000
2 $1,200,000 $1,650,000
3 $1,100,000 $1,450,000
4 $ 975,000 $1,200,000
5 $ 950,000 $1,100,000
Calculate the NPV of each alternative using the six steps of capital budgeting and the cost savings shown in Figure 1 above. Assume that there is no salvage value. At this stage of the analysis, we are assuming that at the end of the equipment's five-year life, it will be scrapped for zero value.
The Six Steps of Capital Budgeting:
1. PV Initial Investment = Initial Cost - Trade-in + Installation Costs
2. PV After-tax Net Benefits = Sum[(Revenue - Expenses)(1 - T) / (1 + r)^t]
3. PV Tax Shield Due to CCA = UCC * (dT / (d + r)) * ((1 + .5r) / (1 + r))
4. PV Salvage = Salvage / (1 + r)^t
5. PV Tax Shield Lost Due to Salvage = Salvage * (dT / (d + r)) * (1 / (1 + r)^t)
6. PV Delta NWC = -up NWC / (1 + r)^t + down NWC / (1 + r)^t