Answer:
4.76%
Explanation:
The requirement in this question is determining the discount rate which gives the same present value in both cases since discount rates discount future cash flows to present value terms.
PV of a pertuity=annual cash flow/discount rate
PV of a pertuity=$17,000/r
PV of ordinary annuity=annual cash flow*(1-(1+r)^-n/r
PV of ordinary annuity=$30,000*(1-(1+r)^-18/r
$17,000/r=$30,000*(1-(1+r)^-18/r
multiply boths side by r
17000=30,000*(1-(1+r)^-18
divide both sides by 30000
17000/30000=1-(1+r)^-18
0.566666667=1-(1+r)^-18
by rearraging the equation we have the below
(1+r)^-18=1-0.566666667
(1+r)^-18=0.433333333
divide indices on both sides by -18
1+r=(0.433333333)^(1/-18)
1+r=1.047554315
r=1.047554315-1
r=4.76%
Answer:
Dictionary of Occupational Titles
Explanation:
The answer is the Dictionary of Occupational Titles because this is a document created by the United States Department of Labor in which it establishes a big amount of different jobs in many areas and what they involve to help employers and the government to be able to define them in their organizations.
Answer:
Price of bond= $1,922.92
Explanation:
<em>The value of the bond is the present value(PV) of the future cash receipts expected from the bond. The value is equal to present values of interest payment plus the redemption value (RV). </em>
Value of Bond = PV of interest + PV of RV
Semi-annual interest = 4.93% × 2,000 × 1/2 =49.3
Semi-annual yield = 5.29%/2= 2.65%
PV of interest payment
PV = A (1- (1+r)^(-n))/r
A- 49.3, r-0.02645, n- 16×2
= 49.3× (1-(1.02645)^(-10)/0.02645)
= 1,055.521
PV of redemption Value
<em>PV = F × (1+r)^(-n)
</em>
F-2000, r-0.02645, n- 16
×2
PV = 2,000 × 1.02645^(-16×2)
PV = 867.402
Price of Bond
1055.52 + 867.40 =1,922.92
= $1,922.92
Answer:
$433,900
Explanation:
The computation of the capitalized cost of the land is shown below:-
Capitalized cost of the land = Purchase price + Demolition of building + Title insurance + Attorney fee + Property taxes covered during the period - Scrap value from the building
= $420,000 + $12,000 + $900 + ($3,000 - $500) - $1,500
= $420,000 + $12,000 + $900 + $2,500 - $1,500
= $435,400 - $1,500
= $433,900