Answer:
C. lower, higher
The reason for this is that when growth rates are lower investors will be willing to pay less for the stock is because low growth rate mean that the capital gains will be less as stock price is less likely to increase in the future and dividend growth is also less. Also the DDM model D*(1+G)/1-R shows that mathematically a lower growth rate would mean lower stock price
Also Higher required returns mean that the investor requires higher returns to buy the stock, because he may view the stock as risky and requires higher returns for the risk he is taking or he may have a higher opportunity cost (for eg interest rates may be high) with other investments. Mathematically the DDM model D*(1+G)/R-G shows us that a higher R would mean lower stock price.
Explanation:
I think it’s “help desk specialists, PC support specialists”
Answer:
The straight-line depreciation method and the double-declining-balance depreciation method:
Produce the same total depreciation over an asset's useful life.
Explanation:
The straight-line and the double-declining-balance depreciation methods are two of the four depreciation methods allowed by US generally accepted accounting principles (GAAP). The other two methods are sum of the years' digit and units of production. The straight-line method is calculated by subtracting the salvage value from the asset's cost and either dividing the depreciable amount by the number of years or applying a fixed rate on the depreciable amount. For the double-declining-balance method, 100% is divided by the number of years of the asset's useful life and then multiplying by 2 to obtain the depreciation rate. Depreciation expense is then calculated on the declining balance until the salvage value is left. This is why they produce the same depreciation over the asset's useful life.
The answers to the question are:
- The machine that is the constraint is the machine c.
- The product m = 80 units and n = 80 units
- Net profit = $3600
<h3>1. How to solve for the constraint of the machine</h3>
We have to solve for the workload of the machines
For A. 20*100 = 2000
For B, 5 * 100 + 10 *80
= 500 + 800 = 1300
For Machine C = 15 * 100 + 15 * 80
= 1500 + 1200
= 2700
The time at the workstation in c is more than the constant time of 2400, hence the constraint that we have is machine c.
b. 2400- 1200 = 1200
The product mix would be 1200/15
= 80
Hence the product mix m = 80 units and that of n = 80 units
<h3>c. The total net profit</h3>
80*$90 = 7200 , 80 * 105 = 8400
7200 + 8400
= 15600
The net profit = 15600 - 12000
= $3600
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