Answer:
increased
Explanation:
The correct answer is that the equilibrium wage increased as the equilibrium quantity of labor increased.
Answer:
The project return is lower than the minimum accepted of 15% thus not profitable for the company
Net Present Value -1.279,86
Explanation:
<u>Loan Present value</u>
PMT of the loan:
PV 65,000
time 4
rate 0.12
C $ 21,400.238
Present value at MARR:
C $21,400.24
time 4 years
rate 0.15
PV $61,097.2175
<u>Salvage value:</u>
Salvage $9,000
time 9 years
rate 0.15000
PV 2,558.36
<u>Cost savings present value:</u>
Cost savings per year: 25,000
less maintenance expenses (13,000)
net cash flow 12,000
C $ 12,000
time 9 years
rate 0.15
PV $57,259.0070
Net Present Value
PV cost savings + PV salvage - PV loan payment
57,259 + 2,558.36 - 61,097.22 = -1.279,86
Hey there!
The best answer would be D because you need to make a plan and do research. Doing research is good because they will make your essay more credible. Making a plan is always what you need to do when making an essay.
I hope this helps!
Answer:
Currently (assuming a 2020 tax schedule), Campbells tax liability = $47,367.50 + [35% x ($438,000 - $207,350)] = $128,095
municipal bonds are not taxed by the federal government, so Campbell will not pay any taxes on the interests earned on the State of New York bonds.
if he earns an additional $16,900, then his tax liability will be:
$47,367.50 + [35% x ($454,900 - $207,350)] = $134,010
his marginal tax rate = 35%
Answer:
a) 39
b) 58
Explanation:
Data provided in the question:
Mean = $70
Standard deviation, s = $8
Number of households, n = 40
Now,
a) number of households whose monthly utility bills are between $54 and $86
z score for $54 = [ 54 - 70 ] ÷ 8 [ z score = [ X - mean ] ÷ s]
or
z score for $54 = -2
z score for $86 = [ 86 - 70 ] ÷ 8 [ z score = [ X - mean ] ÷ s]
or
z score for $54 = 2
Therefore,
P(between $54 and $86) = P(z = 2) - P(z = -2)
= 0.9772498 - 0.0227501
= 0.9544997
Therefore,
number of households whose monthly utility bills are between $54 and $86
= P(between $54 and $86) × n
= 0.9544997 × 40
= 38.18 ≈ 39
b) In a sample of 20 additional house i.e n' = 40 + 20 = 60
thus,
number of households whose monthly utility bills are between $54 and $86
= P(between $54 and $86) × n'
= 0.9544997 × 60
= 57.27 ≈ 58