Answer:
I believe that the answer would be true
Explanation:
Answer:
Margin of safety= $260,000
Explanation:
Giving the following information:
Sales= $485,000
Break-even point in dollars= $225,000
<u>To calculate the break-even point in sales dollars, we need to use the following formula:</u>
Margin of safety= (current sales level - break-even point)
Margin of safety= 485,000 - 225,000
Margin of safety= $260,000
Answer:
131.6%
Explanation:
Total assets is $50 billion
Liabilities = 50-stock holder equity which is $12 billion
= 50-12
= $38 billion
Therefore the debt to assets ratio can be calculated as follows
= 50 billion/38 billion
= 1.3157×100
°= 131.6
Hence the debts to assetsrayion is 131.6%
Valuation of a swap during its life will least likely involve in the application of the principle of no arbitrage.
<h3>What is Swap?</h3>
Swap involves two individual that exchanging properties or money. This individual use different tools for the exchange as desired by them.
Arbitrage allows for sale of goods or property at the highest asking price and valuation will most like involve in it.
Therefore, valuation of a swap during its life will least likely involve in the application of the principle of no arbitrage
Learn more on swap below,
brainly.com/question/22298763
#SPJ12
Answer:
$13.64
Explanation:
Given:
Exercise price,X = $100
Current price = $100
Value when price is up, uS = $120
Value when price is down, dS= $80
Risk free interest rate = 10%
First calculate hedge ratio, H:
Where,
Cu = uS - X
= 120 - 100
= $20
A risk free portfolio involves one share and two call options.
Find cost of portfolio:
Cost of portfolio = Cost of stock - Cost of the two cells.
= $100 - 2C
This portfolio is risk free. The table below shows that
_______________
Portforlio 1:
Buy 1 share $80; Write 2 calls: $0; Total: ($80 + 0) $80
____________________
Portforlio 2:
Buy 1 share: $120; Write 2 calls: -$40; Total: ($120 - $40) $80
Check for oresent value of the portfolio:
Present value 
Value = exercise price - value of option
$72.73 = $100 - 2C
Find call option, C
Call option's value = $13.64
