The
present value of the following cash flow stream is $8,550 when
discounted at 9.3 percent annually. What is the value of the missing
cash flow? (Do not round intermediate calculations and round your final answer to 2 decimal places. (e.g., 32.16))
| Year | Cash Flow | |||||
| 1 | $ | 2,150 | ||||
| 2 | ||||||
| 3 | 2,750 | |||||
| 4 | 3,350 | |||||
| | ||||||
Explanation:
|
We
are given the total PV of all four cash flows. If we find the PV of the
three cash flows we know, and subtract them from the total PV, the
amount left over must be the PV of the missing cash flow. So, the PV of
the cash flows we know are:
|
| PV of Year 1 CF: $2,150 / 1.093 = $1,967.06 |
| PV of Year 3 CF: $2,750 / 1.0933 = $2,106.07 |
| PV of Year 4 CF: $3,350 / 1.0934 = $2,347.28 |
| So, the PV of the missing CF is: |
| $8,550 – 1,967.06 – 2,106.07 – 2,347.28 = $2,129.59 |
|
The
question asks for the value of the cash flow in Year 2, so we must find
the future value of this amount. The value of the missing CF is:
|
| $2,129.59(1.093)2 = $2,544.12 |
| Calculator Solution: |
|
Note: Intermediate answers are shown below as rounded, but the full answer was used to complete the calculation.
|
| CF0 | $0 | |
| C01 | $2,150 | |
| F01 | 1 | |
| C02 | $0 | |
| F02 | 1 | |
| C03 | $2,750 | |
| F03 | 1 | |
| C03 | $3,350 | |
| F04 | 1 | |
| I = 9.3% | ||
| NPV CPT | ||
| $6,420.41 | ||
| PV of missing CF = $8,550 – 6,420.41 = $2,129.59 |
| Value of missing CF: |
| Enter |
2
|
9.3%
|
$2,129.59
| | | ||||||||||
| | |
N
| | |
I/Y
| | |
PV
| | |
PMT
| | |
FV
| |
| Solve for | | | | |
$2,544.12
| ||||||||||
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