Answer: $44,518
Step-by-step explanation:
Using the formula:
PV = P( [tex]\frac{1-(1+r)^{-n} }{r}[/tex] )
PV = present value
P = Principal
r = rate
n = number of periods
From the question :
PV = ?
P = $10,000
r = 0.04
n = 5
Substituting into the formula , we have
PV = 10,000 ( [tex]\frac{1-(1+0.04)^{-5} }{0.04}[/tex] )
PV = 10,000 ( [tex]\frac{1-0.8219271068}{0.04}[/tex] )
PV = 10,000 ( [tex]\frac{0.1780728932}{0.04}[/tex]
PV = 10,000 ( 4.451822331 )
PV = 44518.22331
Therefore :
PV≈ $ 44,518
Answer:
$44, 520.
Step-by-step explanation:
Because the equal payments occur at the end of each year, we know we have an ordinary annuity.
The equation for calculating the present value of an ordinary annuity is:
PVOA = FV {[1 - (1 / (1 + i)ⁿ)] / i}
PVOA = $10,000 {[1 - (1 / (1 + 0.04)⁵)] / 0.04}
PVOA = $10,000 {4.452}
Here PVOA Factor is 4.452 for n = 5 and i = 4%
PVOA = $44,520
This PVOA calculation tells you that receiving $44,520 today is equivalent to receiving $10,000 at the end of each of the next five years, if the time value of money is 4% per year. If the 4% rate is Antonia's required rate of return, this tells you that Antonia could pay up to $44,520 for the five-year annuity.
1st Year:
PV = $10,000 [1 / (1 + 0.04)]
PV = $10,000 [1 / 1.04]
PV = $10,000 [0.962]
Here PV Factor is 0.962 for n = 1 and i = 4%
PV = $9,620
$10,000 at the end of First year has a present value of $9,620
2nd Year:
PV = $10,000 [1 / (1 + 0.04)²]
PV = $10,000 [1 / (1.0816)]
PV = $10,000 [0.925]
Here PV Factor is 0.925 for n = 2 and i = 4%
PV = $9,250
$10,000 at the end of Second year has a present value of $9,250
3rd Year:
PV = $10,000 [1 / (1 + 0.04)³]
PV = $10,000 [1 / 1.1249]
PV = $10,000 [0.889]
Here PV Factor is 0.889 for n = 3 and i = 4%
PV = $8,890
$10,000 at the end of Third year has a present value of $8,890
4th Year:
PV = $10,000 [1 / (1 + 0.04)⁴]
PV = $10,000 [1 / 1.1699]
PV = $10,000 [0.855]
Here PV Factor is 0.855 for n = 4 and i = 4%
PV = $8,550
$10,000 at the end of Fourth year has a present value of $8550
5th Year:
PV = $10,000 [1 / (1 + 0.04)⁵]
PV = $10,000 [1 / 1.2167]
PV = $10,000 [0.822]
Here PV Factor is 0.822 for n = 5 and i = 4%
PV = $8,220
$10,000 at the end of Fifth year has a present value of $8,220
The total of those five present values:
$9,620 + $9,250 + $8,890 + $8,550 + $8,220
= $44,520
The difference between the $50,000 of total future payments and the present value of $44,520 is the interest Antonia money earns while she wait to receive the payments. This $5,480 difference is referred to as Antonia's return on its investment.
