Answer:
d. 13.31%
Explanation:
IRR is the rate at which NPV = 0
IRR 13.31%
Year 0 1 2 3
Cash flow stream -1100.000 450.000 470.000 490.000
Discounting factor 1.000 1.133 1.284 1.455
Discounted cash flows project -1100.000 397.136 366.060 336.804
NPV = Sum of discounted cash flows
NPV Project = 0.000
Where
Discounting factor = (1 + discount rate)^(Corresponding period in years)
Discounted Cashflow = Cash flow stream/discounting factor
IRR = 13.31%
Therefore, The project's IRR is 13.31%
Answer:
Do = $2.00
D1= Do(1+g)1 = $2(1+0.2)1 = $2.40
D2= Do(1+g)2 = $2(1+0.2)2 = $2.88
D3= Do(1+g)3 = $2(1+0.2)3 = $3.456
D4= Do(1+g)4 = $2(1+0.2)4 = $4.1472
D5= Do(1+g)5 = $2(1+0.2)5 = $4.97664
PHASE 1
V1 = D1/1+ke + D2/(1+ke)2 + D3/(1+ke)3 +D4/(1+ke)4 + D5/(1+ke)5
V1 = 2.40/(1+0.15) + 2.88/(1+0.15)2 + 3.456/(1+0.15)3 + 4.1472/(1+0.15)4 + 4.97664/(1+0.15)5
V1 = $2.0870 + $2.1777 + $2.2723 + $2.3712 + $2.4742
V1 = $11.3824
PHASE 2
V2 = DN(1+g)/ (Ke-g )(1+k e)n
V2 = $4.97664(1+0.02)/(0.15-0.02)(1+0.02)5
V2 = $5.0762/0.1435
V2 = $35.3742
Po = V1 + V2
Po = $11.3824 + $35.3742
Po = $46.76
Explanation: This is a typical question on valuation of shares with two growth rate regimes. In the first phase, the value of the share would be obtained by capitalizing the dividend for each year by the cost of equity of the company. The dividend for year 1 to year 5 was obtained by subjecting the current dividend paid(Do) to growth rate. The growth rate In the first regime was 20%.
In the second phase, the value of shares would be calculated by taking cognizance of the second growth rate of 2%. In this phase, the last dividend paid in year 5 would be discounted at the appropriate discount rate after it has been adjusted for growth.
Credit limit refers to the maximum amount of credit a financial institution extends to a client through a line of credit as well as the maximum amount a credit card company allows a borrower to spend on a single card.
Answer:
$20.833
Explanation:
Given that,
Number of order operators = 30
Cost associated with these order = $1,000,000 per year
Each operator worked = 2,000 hours per year
Productive work provided by each operator = 1,600 per year
Cost for each order = Total Cost associated ÷ Number of order operators
= $1,000,000 ÷ 30
= $33,333.3333
Rate per hour for each order entry employee:
= Cost for each order ÷ Productive work provided by each operator
= $33,333.3333 ÷ 1,600
= $20.833
