There will be a total of 31,400 more rupees would 20000 euros buy at peak exchange rate than at closing point. We can buy more rupees at the peak exchange rate than at the closing point using the currency of Europe which is euro. The answer in this question is 31,400 more rupees can buy at 20000 euros.
Answer:
9.9 %
Explanation:
he formula for calculating dividend yield is as follows,
Dividend yield= Annual dividend/stock price x 100
For this case: Annual dividend = 4 ( $ 2.1 per quarter)
=$ 8.4
Stock price: $85
Dividend yield = $8.4/$85 x 100
=9.88%
=9.9 %
Answer:
MILLER STORES
Ke = Rf + β(Market risk premium)
12.7 = Rf + 1.38(7.4)
12.7 = Rf + 10.212
Rf = 12.7 - 10.212
Rf = 2.488%
DIVISION A
Ke = Rf + β(Risk premium)
Ke = 2.488 + 1.52(7.4)
Ke = 2.488 + 11.248
Ke = 13.74%
Explanation:
First and foremost, we need to calculate risk-free rate using the data relating to Miller Stores. In this case, the cost of equity, beta and market risk premium of Miller Stores were provided with the exception of risk-free rate. Then, we will make risk-free rate the subject of the formula.
We also need to calculate the cost of capital of division A, which is risk-free rate plus beta multiplied by the market risk-premium.
Answer:
The annual breakeven point in sales dollars for Company X is $90,000
Explanation:
Hi, in order to find the break even point (BEP) in dollars, we need to use the following formula.
Everything should look like this.
Best of luck.
Answer:
correct option is a. $.05
Explanation:
given data
stock price S = $43
rate of return r= 10%
exercise price K = $40
time = 6 month
worth = $5
solution
we will apply here formula for worth that is
P = C - S + K × 
here C is given worth 5 and S is stock price and K is exercise price and t is time and r is rate
so put here all value in equation 1 we get
P = C - S + K ×
P = 5 - 43 + 40 × 
P = 5 - 43 + 38.05
P = 0.05
so here correct option is a. $.05
