Answer:
The correct answer is "$54000".
Explanation:
According to the question,
Annual depreciation rate will be:
= 
=
(%)
hence,
The depreciation as per double decline will be:
= 
By putting the values, we get
= 
=
($)
Answer:
The firm's unleveraged beta is 1.0251
Explanation:
Hamada's equation is used to separate the financial risk of a levered firm from its business risk.
The Hamada equation:
Bu= Bl/(1 + (1 − T)(D/E))
Bl = 1.4
wd = 0.36
Tax rate = 35%
D/E = wd / (1 – wd) = 0.5625 = 56.25%
= 1.4/ (1+(1-0.35)(0.5625))
=1.4/ 1 + (0.65)(0.5625)
=1.4/1.36
= 1.0251
Answer:
It is Business Impact Assessment (B)
Explanation:
Organizational plans and business decisions are vulnerable to various risks that could hinder them from materializing .
After business decisions have been made at strategic level, there is a need to carry out their business impact assessment to understand the relationship that exist between their impact and their likelihood of occurrence.
Having assessed the impact and likelihood of occurrence, some risks are accepted,transferred while some are completely avoided.
Answer: $352,000
Explanation:
The information needed to calculate the cash and cash equivalent are:
Balance in checking account, Bank of the East = $ 382,000
The restricted cash included in the checking account = $49,000
Treasury bills = $19,000
We subtract the restricted cash from the balance in the checking account and then add it to the treasury bills. This will be:
= ($382,000 - $49,000) + $19,000
= $333,000 + $19,000
= $352,000
Answer: Proposal C
Explanation:
The way to solve this is to calculate the Present Values of all these payments. The smallest present value is the best.
Proposal A.
Periodic payment of $2,000 makes this an annuity.
Present value of Annuity = Annuity * ( 1 - ( 1 + r ) ^ -n)/r
= 2,000 * (1 - (1 + 0.5%)⁻⁶⁰) / 0.5%
= $103,451.12
Proposal B
Present value = Down payment + present value of annuity
= 10,000 + [2,200 * ( 1 - ( 1 + 0.5%)⁻⁴⁸) / 0.5%]
= 10,000 + 93,676.70
= $103,676.70
Proposal C
Present value = Present value of annuity + Present value of future payment
= [500 * (1 - (1 + 0.5%)⁻³⁶) / 0.5%] + [116,000 / (1 + 0.5%)⁶⁰]
= 16,435.51 + 85,999.17
= $102,434.68
<em>Proposal C has the lowest present value and so is best. </em>