Solve for the unknown quantity shown in the following cash flow diagrams. The MARR is 3%...
Solve for the unknown quantity shown in the following cash flow diagrams. The MARR is 3% b. Hint: Try decomposing this cash flow into three simple cash flows, one of which is a uniform gradient. Remember that there is no cash flow in the first period of a uniform (arithmetic) gradient. $600 P $400 $300 $200 $100 4 2 3 1 5 6 LO n $600 P $400 $300 $200 $100 4 2 3 1 5 6 LO n
Problem 2 of 3.( 1 40 points) Cash flow diagrams required in area below given CF For the given cash flow, determine the unknown quantity, Q. ifi = 8%. Q is eq given series. Hint, discount all cash flows to year 4. Q, it i= 8%. Q is equivalent to the 400 500 200 200 200 200 % 1 1 2 3 4 5 6 7 8 9 10
Solve for the unknown in each cash flow diagram. Interest is 5%. Problem 8 (3pt each) Solve for the unknown in each cash flow diagram. Interest is 5%. A) A=$500 لللللي 50 P=? B) F=$15000 A=$500 0 12 2 3 4 5 15 $2000 P=? C) 1000 800 600 400 200 i = 5% F
Using excel formulas, refer to the accompanying cash‐flow diagram and solve for the unknown quantity in Parts (a) through (d) that makes the equivalent value of cash outflows equal to the equivalent value of the cash inflow, a) If F=$10,000, G=$600, and N=6, then i=? b) If F=$10,000, G=$600, and i=5% per period, then N=? c) If G=$1,000, N=12, and i=10% per period, then F=? d) If F=$8,000, N=6, and i=10% per period, then G=?
Write the expression for the cash flow. 7) (25 points) First draw a cash flow diagram for the cash flow series shown below. Then write an expression (e.g., P 500(P/A 5%, 3)+100(P/G 5%, 3) + ...) for the present worth of the following cash flow series. You must use at least one uniform series factor, one arithmetic gradient series factor, and one geometric gradient series factor. i=5% per period. No calculations are needed. EOY Cash Flow 4 5,00025,000 15,000 13,500...
Find the value of the unknown quantity, P0, that establishes equivalence in the cash flow diagram below. Suppose ,-18% per year. Use an annuity factor and a uniform gradient factor in your solution $1,400 $2,500 $800 $800 $800 $800 $800 1 2 3 4 5 67 89 10 End of Year Po- Po 4323(Round to the nearest dollar.)
7) (30 points) First draw a cash flow diagram for the cash flow series given below. Then, write an expression (e.g., F-500(PA 5%, 3) + 100(FIG 5%, 3)) to compute the future value of the cash flow series at the end of year 10. You must use at least one uniform series factor, one arithmetic gradient series factor, and one geometric gradient series factor and 10% per year compounded annually. No calculations are needed. 10 Cash 1,000 3,000 3,300 -3,600...
Need cash flow diagram 04) Three mutually exclusive alternative are being considered Initial Cost Benefit at the end of the first Year Uniform Annual Benefits at end of subsequent years Useful Life in years $500 $200 $100 $400 $200 $125 $300 $200 $100 At the end of its useful life, an alternative is not replaced. If MARR is 10%, which alternatives should be selected? a) Based on the payback period? b) Based on benefit-cost ratio analysis c) Benefit/Costs Analysis using...
The cash flow for two alternatives is shown in the table below. a) Determine which alternative should be selected based on present worth comparison (use i=10%). b) If your analysis period (study period) is just 3 years, what should be the salvage value of alternative A2 at the end of year 3 to make the two alternatives economically indifferent? A1 Year 0 -900 -400 A2 -1800 -300 -300 1 2 -400 3 -400+200 -300 4 5 6 -300 -300 -300...
16) You are offered an investment that will pay the following cash flows at the end of each of the next five years at a cost of $800. What is the Net Present Value (NPV) if the required rate of return is 12% per year? Period Cash Flow 0 $0 1 $100 2 $200 3 $300 4 $400 5 $500 Remember that Excel’s NPV function doesn't really calculate the net present value. Instead, it simply calculates the present value of...