Answer:
First Expected Dividend will come in at the end of Year 3 or t=3 assuming current time is t=0.
D3 = $ 4.25, Growth Rate for year 4 and year 5 = 22.1 %
Therefore, D4 = D3 x 1.221 = 4.25 x 1.221 = $ 5.18925 and D5 = D4 x 1.221 = 5.18925 x 1.221 = $ 6.33607
Growth Rate post Year 5 = 4.08 %
D6 = D5 x 1.0408 = 6.33607 x 1.0408 = $ 6.59459
Required Return = 13.6 %
Therefore, Current Stock Price = Present Value of Expected Dividends = [6.59459 / (0.136-0.0408)] x [1/(1.136)^(5)] + 4.25 / (1.136)^(3) + 5.18925 / (1.136)^(4) + 6.33607 / (1.136)^(5) = $ 45.979 ~ $ 45.98
Price at the end of Year 2 = P2 = Present Value of Expected Dividends at the end of year 2 = [6.59459 / (0.136-0.0408)] x [1/(1.136)^(3)] + 4.25 / (1.136) + 5.18925 / (1.136)^(2) + 6.33607 / (1.136)^(3) = $ 59.3358 ~ $ 59.34
Dividend Yield at the end of year 3 = DY3 = D3 / P2 = 4.25 / 59.34 = 0.07612 or 7.612 %
Total Required Return = 14. 6 %
Therefore, Required Capital Gains Yield = 14.6 % - 7.612 % = 6.988 %
A purchasing department may have difficulty getting a product quickly as it may not be readily available so may have to wait for it and also, there may be a problem getting a product at a reasonable price which means the purchaser would have to search elsewhere for it which could take time.
Answer:
The correct answer is True.
Explanation:
Product differentiation is a competitive strategy that aims to make the consumer perceive the good or service offered by a company differently from those of the competition.
The cost leadership strategy is to find and maintain a low cost position compared to the competition, this will allow the company to obtain higher returns than the industry average.
There is a relationship between the cost leadership strategy and the possession of a high market share, this is because having a high market share allows the appearance of economies of scale and economies of experience, both contribute to reducing unit costs.
Your money will double in approximately 11 years and quadruple in approximately 22.
Use the Rule of 72 for doubling (72/interest rate= number of years to double) and the Rule of 144 to quadruple (144/interest rate= number of years to quadruple).