Answer:
Price at issuance is $1,000 for both bonds.
Price of the 5 year bond after the market rate increased to 7.4% is:
PV of face value = $1,000 / (1 + 3.7%)⁸ = $747.77
PV of coupon payments = $27.50 x 6.81694 (PV annuity factor, 3.7%, 8 periods) = $187.47
Market price = $935.24
this bond's price decreased by 64.76/1,000 = 0.06476 = 6.48%
Price of the 10 year bond after the market rate increased to 7.4% is:
PV of face value = $1,000 / (1 + 3.7%)¹⁸ = $519.97
PV of coupon payments = $27.50 x 12.97365 (PV annuity factor, 3.7%, 18 periods) = $356.78
Market price = $876.75
this bond's price decreased by 123.25/1,000 = 0.12325 = 12.33%
Answer:
Budgeting, forecasting and planning
Explanation:
Service industries uses budgeting, which includes expected sales and operational cost, to forecast, plan and predict revenue. With regards to forecasting; historical or past company data are used to make sound prediction.
Answer:
Cash in-flow in the last year.
Explanation:
Salvage value, also known as residual value, is the amount that you receive from sale of Property, Plant, and Equipment at the end of useful life. When computing the NPV of any project, we consider all the relevant cash flows of that project. Since, $45,000 will be received when project ends from sale of Fixed asset, so this figure will be treated as Cash in-flow and discounted.
Answer:
2 more cars will be produced in the market equilibrium versus the social optimum. The right answer is a.
Explanation:
According to the given data we have the following:
demand for cars is given by the function P = 75 − 3q
private costs are given by the function P = 10 + 2q
75 − 3q= 10 + 2q
Therefore, 65=5q
q=13
P=36
Therefore, socially optimal number of cars is 13.
To calculate How many more cars will be produced in the market equilibrium versus the social optimum, we have to calculate the following:
social cost=10+2q+10
=20+2q
75 − 3q=20+2q
55=5q
q=11
P=20+2(11)=42
Therefore, Qm-Qs=13-11
Qm-Qs=2
2 more cars will be produced in the market equilibrium versus the social optimum
