Answer:
no
Explanation:
An investment is an asset or item that is purchased with the hope that it will generate income or appreciate in the future.
Answer:
transferred-out 135,000
Explanation:
We solve using the following identity:
beginning WIP + cost added during the period:
total cost to be accounted for.
Then this value can be either ransferred-out r remain at the ending WIP
so we construct as follows:
beginning 0
added 180,000
Total cost 180,000
ending <u> (45,000) </u>
transferred-out 135,000
Answer:
(A) Payback period for the machine= 3.5 years
(B) Simple rate of return for the machine= 87.5%
Explanation:
Alesu corporation is considering purchasing a machine that would cost $283,850
The useful life is 5 years
The machine would reduce cash operating costs by $81,100 per year
The salvage value is $107,100
(A) The payback period for the machine can be calculated as follows
= cost/amount of cash flow
= 283,850/81,100
= 3.5 years
(B) The simple rate of return for the machine can be calculated as follows
First we calculate the depreciation expense
= 283,850-107,100/5
= 176,750/5
= 35,350
Annual incremental income= cost savings -depreciation expenses
= 283,850-35,350
= 248,500
Simple rate of return = annual incremental income/cost × 100
= 248,500/283,850 × 100
= 0.875 × 100
= 87.5%
Answer:
Explanation:
1. The computation of the balance in retained earnings is shown below:
= Beginning retained earning balance + adjusted net income
where,
Beginning retained earning balance is $780,000
And, the adjusted net income is = Inventory × ( 1 - tax rate)
= $60,000 × (1 - 40%)
= $36,000
Now put these values to the above formula
So, the value would equal to
= $780,000 + $36,000
= $816,000
2. The journal entry is shown below:
Inventory A/c Dr $60,000
To Retained earning A/c $36,000
To Tax payable A/c $24,000
(Being inventory is adjusted and the remaining balance is credited to tax payable account)
Answer:
$1,172.97
Explanation:
We use the Present value formula i.e to be shown in the attached spreadsheet. Kindly find it below:
Given that,
Assuming figure Future value = $1,000
Rate of interest = 1.9% + 0.85% = 2.75%
NPER = 5 years
PMT = $1,000 × 6.5% = $65
The formula is shown below:
= -PV(Rate;NPER;PMT;FV;type)
So, after solving this, the price of the bond is $1,172.97