In: Finance
The technique for calculating a bid price can be extended to many other types of problems. Answer the following questions using the same technique as setting a bid price; that is, set the project NPV to zero and solve for the variable in question. Guthrie Enterprises needs someone to supply it with 151,000 cartons of machine screws per year to support its manufacturing needs over the next five years, and you’ve decided to bid on the contract. It will cost $1,910,000 to install the equipment necessary to start production; you’ll depreciate this cost straight-line to zero over the project’s life. You estimate that in five years this equipment can be salvaged for $161,000. Your fixed production costs will be $276,000 per year, and your variable production costs should be $10.50 per carton. You also need an initial investment in net working capital of $141,000. The tax rate is 21 percent and you require a return of 11 percent on your investment. Assume that the price per carton is $17.10. |
a. |
Calculate the project NPV. (Do not round intermediate calculations and round your answer to 2 decimal places, e.g., 32.16.) |
b. |
What is the minimum number of cartons per year that can be supplied and still break even? (Do not round intermediate calculations and round your answer to the nearest whole number, e.g., 32.) |
c. |
What is the highest fixed costs that could be incurred and still break even? (Do not round intermediate calculations and round your answer to 2 decimal places, e.g., 32.16.) |
CF0=-Cost of equipment-working capital
CF1, CF2, CF3, CF4, CF5=((number of cartons*(price per
carton-variable cost per carton)-fixed costs per
year-depreciation)*(1-tax rate)+depreciation)
Additional cash flow in year 5=Salvage value*(1-tax rate)+working
capital
Depreciation=Initial cost of equipment/5
NPV=CF0+CF1/(1+r)+CF2/(1+r)^2+CF3/(1+r)^3+CF4/(1+r)^4+CF5/(1+r)^5+Additional
cash flow in year 5/(1+r)^5
a. Calculate the project NPV. (Do not round intermediate
calculations and round your answer to 2 decimal places, e.g.,
32.16.)
NPV=-1910000+161000*(1-21%)/1.11^5-141000+141000/1.11^5+((151000*(17.10-10.50)-276000-1910000/5)*(1-21%)+1910000/5)/11%*(1-1/1.11^5)=508620.6493
b. What is the minimum number of cartons per year that can be
supplied and still break even?
At breakeven, NPV=0
-1910000+161000*(1-21%)/1.11^5-141000+141000/1.11^5+((P*(17.10-10.50)-276000-1910000/5)*(1-21%)+1910000/5)/11%*(1-1/1.11^5)=0
=>Q=124606.128405
c. What is the highest fixed costs that could be incurred and
still break even?
-1910000+161000*(1-21%)/1.11^5-141000+141000/1.11^5+((151000*(17.10-10.50)-F-1910000/5)*(1-21%)+1910000/5)/11%*(1-1/1.11^5)=0
=>F=450199.552524