Thirty One percent <span>of the u.s. adult population has a college or post-college education (as of 2012).</span>
Answer and Explanation:
A bond premium which is payable on bond is amortized will be amortized with a charge to the premium and an a good representative for intrigue cost, lessening it. On the off chance that amortization isn't recorded, intrigue cost isn't appropriately decreased and is exaggerated. The exaggeration of intrigue cost will bring modest representation of the truth of net gain and a modest representation of the truth of value
The answer choice which is not a cleverly crafted and well-executed strategy is that:
- produces a mediocre financial performance
<h3>What is a Well Executed Strategy?</h3>
This refers to the careful planning which is done where analysis is done and there is the maximization of potential for profit and expansion.
With this in mind, we can see that from the complete text, we are asked to show the answer choice which is NOT a clever and well executed strategy and it is that it produces a mediocre financial performance.
Read more about planning here:
brainly.com/question/25453419
Answer:
The value of the stock today is $60.48 and option A is the correct answer.
Explanation:
The two stage growth model of DDM will be used to calculate the value of this stock today. The two stage growth model is used when there are 2 different dividend growth rates. The 30% growth rate can be termed as g1 while the 7% growth rate which is assumed to remain constant forever can be termed as g2.
The formula for price/value under this model is,
Value or P0 = D1 / (1+r) + D2 / (1+r)^2 + ... + Dn / (1+r)^n +
[Dn * (1+g2) / (r - g2)] / (1+r)^n
Value today = 0.8 * (1+0.3) / (1+0.1) + 0.8 * (1+0.3)^2 / (1+0.1)^2 +
0.8 * (1+0.3)^3 / (1+0.1)^3 + 0.8 * (1+0.3)^4 / (1+0.1)^4 +
[ (0.8 * (1+0.3)^4 * (1+0.07) / (0.1 - 0.07)) / (1+0.1)^4 ]
Value today = $60.60 which is closest to $60.48 and A is the answer.
The difference of $0.12 in the answer is because of the rounding off as the immediate calculations were not rounded off in the calculation of $60.60
Answer: Macaulay Duration = 2.6908154485 = 2.69
Explanation:
Macaulay Duration = Sum of Cash flows Present Value/ current bond price
Cash flows: year 1 = $12
Cash flows: year 2 = 12
Cash flows: year 3 = 100 + 12 = 112
Sum of Cash Flow PV = (1×12÷ (1.118)^1) + (2×12÷ (1.118)^2) +(3×112÷(1.118)^3)
Sum of Cash Flow PV = 270.37857712
Current Bond Price or Value = Face Value/ (1+r)^n + PV of Annuity
Current Bond Price or Value = 1000/ (1.118)^3 + (30×(1 - (1+0.118)^-3)/0.118
Current Bond Price or Value = 100.48202201
Macaulay Duration = 270.37857712 ÷ 100.48202201
Macaulay Duration = 2.6908154485 = 2.69