Answer:
A) according to put call parity:
price of put option = call option - stock price + [future value / (1 + risk free rate)ⁿ]
put = $6.93 - $125 + [$140 / (1 + 5%)¹/⁴] = $6.93 - $125 +$138.30 = $20.23
B)
you have to purchase both a put and call option ⇒ straddle
the total cost of the investment = $6.93 + $20.23 = $27.16, this way you can make a profit if the stock price increases higher than $125 + $20.23 = $145.23 or decreases below than $125 - $20.23 = $104.77
Answer:
$24.60
Explanation:
The computation of the price for 4 years from now is shown below:
Price = Dividend ÷(Required rate of return - growth rate)
where,
Dividend is
= Dividend × (1 + growth rate)^number of years
= $2.34 × (1 + 0.01)^5
= $2.46
All the other items would remain the same
So, the price is
= $2.46 ÷ (11% - 1%)
= $24.60
By paraphrasing, an individual is:
ANSWER C. Putting another person's idea into different words or context
