Answer:
2.8%
Explanation:
The formula to calculate value of a perpetuity is as follow:
V = Annuity payment in year 1 / (r-g)
V: Value of the perpetuity
r: Discount rate
g: Growth rate (missing value)
By inputting numbers into the formula, we have:
6225.81 = 386 / (0.09 - g)
--> g = 2.8%
Answer:
Aids to trade communication
<u><em>Aids to trade includes Transport, Communication, Warehousing, Banking, Insurance, Advertising, Salesmanship, Mercantile agents.</em></u>
Trade promotion organizations in a country and Global organizations for international trade. These important auxiliaries ensure a smooth flow of goods from producers to the consumers.
Hope this helpssss :)
Answer:
The present value of the machine is $35499
Explanation:
The annual amount or annuity amount = $4010 per year.
Total number of years = 13 years
Here, the interest rate is not given so we just assume the interest rate = 6% per annum.
Since we have a total number of years and annual payment that occurs for 13 years. We are required to find the present value of the machine. So use the formula to find the present value of the annuity.
The present value of machine = (Annuity amount x (1 – (1+r)^-n) ) / r
The present value of machine = (4010(1 – (1+6%)^-13) ) / 6%
The present value of machine = $35499
The machine's second year depreciation expense is $3,200.
Depreciation is a method that is used to expense the cost of an asset. The units-of-production depreciation method determines the depreciation expense based on the units of goods that the machine produces in a given year.
Unit of production depreciation expense = (unit of goods produced in year 2 / total units the machine can produce) x (cost of the asset - salvage value)
Total units the machine can produce = 1500 + 1250 + 1000 = 3750
(1000 / 3750) x ($15,000 - $3,000) = $3,200
A similar question was answered here: brainly.com/question/15858628?referrer=searchResults
