Answer:
WACC= 17.95%
Explanation:
Weighted average cost of capital is the average cost of all of the long-term types of finance used by a company weighted according to the that amount of finance used in relation to the total pool of fund.
It is calculated using the formula below:
WACC = (We×Ke) + (Wd×Kd)
Ke-cost of equity- 22%
We- equity weight- 100% - 45% = 55%
Kd-After tax cost of debt-10.3%
Wd- 45%
After tax cost of debt = Before tax ×× (1- tax rate)
After tax cost of debt = 13%× (1-0.21) = 10.3%
Cost of equity = 22%
WACC =(0.55× 22%) + (0.45× 13%)=17.95%
WACC= 17.95%
Answer:
The answer is III) make simultaneous trades in two markets without any net investment.
Explanation:
Arbitrage is simultaneously buying an asset ( may be currency, securities...) in a low-priced market and sell it in a high-priced market.
As a results, the investor earns profit from price differences in the two markets without risk and net investment. It is because the two trading happens at the same time once price differences in any two markets are recognized ( arbitrage opportunities recognized) and the proceed of selling the asset is immediately used for financing/returning to the buying of the asset.
Thus, (III) is the correct answer.
<span>It does not include implementing change. The team is only responsible for stringent standards of conduct, self-enforcement of legal and ethical rules and
effective and efficient use of resources. Implementing change is the responsibility other people or outside forces.</span>
Answer:
$3.10 ; $2.10 and $14.20
Explanation:
The computation of the activity rates is shown below:
For Activity 1
= Budgeted cost ÷ Total budgeted activity of cost driver
= $94,550 ÷ (18,200 + 8,100 + 4,200)
= $94,550 ÷ 30,500
= $3.10
For Activity 2
= Budgeted cost ÷ Total budgeted activity of cost driver
= $53,550 ÷ (7,100 + 13,200 + 5,200)
= $53,550 ÷ 25,500
= $2.10
For Activity 3
= Budgeted cost ÷ Total budgeted activity of cost driver
= $59,995 ÷ (1,175 + 1,000 + 2,050)
= $59,995 ÷ 4,225
= $14.20
Answer:
P3 = $96.9425 rounded off to $96.94
Explanation:
To calculate the market price of the stock three years from today (P3), we will use the constant growth model of DDM. The constant growth model calculates the values of the stock based on the present value of the expected future dividends from the stock. The formula for price today under this model is,
P0 = D1) / (r - g)
Where,
- D1 is the dividend expected for the next period
- g is the constant growth rate
- r is the required rate of return on the stock
To calculate the price of the stock today (P0), we use the dividend expected for the next period (D1). So, to calculate the price at the end of 3 years (P3) we will use D4.
We first need to calculate r using the CAPM equation. The equation is,
r = rRF + Beta * rpM
Where,
- rRF is the risk free rate
- rpM is the market risk premium
r = 0.058 + 0.6 * 0.05
r = 0.088 or 8.8%
Using the price formula for DDM above and the values for P0, D1 and r, we can calculate the g to be,
80 = 1.75 / (0.088 - g)
80 * (0.088 - g) = 1.75
7.04 - 80g = 1.75
7.04 - 1.75 = 80g
5.29/80 = g
g = 0.066125 or 6.6125%
We first need to calculate D4.
D4 = D1 * (1+g)^3
D4 = 1.75 * (1+0.066125)^3
D4 = 2.12061793907
Using the formula from DDM for P3, we can calculate P3 to be,
P3 = 2.12061793907 / (0.088 - 0.066125)
P3 = $96.9425 rounded off to $96.94
