Answer:
b. $800
Explanation:
The calculation of maximum loss from this position is shown below:-
Maximum Loss from this position = (Assume figure × Call premium) + (Assume figure × Put premium)
= (100 × $5) + (100 × $3)
= $500 + $300
= $800
Therefore for computing the maximum loss from this position we simply applied the above formula.
Answer:
Dr Bonds payable $90,300,000
Dr loss on early redemption of bonds $5,106,000
Cr Discounts on bonds payable $3,300,000
Cr Cash $92,106,000
Explanation:
The amount of cash paid to bondholders by calling the bonds is the 102% of the face value of $90.3 million i.e $90.3*102%=$92,106,000
The proceeds would debited to cash while the face value of the bond of $90.3 million would be debited to bonds payable account.
In addition the remaining discount of $3.3 million would credited to discounts on bonds payable account.
The loss or gain on the bond call can then be determined as appropriate.
Given that, Reid Company's balance in prepaid insurance at the beginning and end of the year was $1,000 and $1,200, respectively. Hence, by doing calculations, it is found out that the correct option is-
an increase of $200 which shall be subtracted from net income.
The gap between the opening and closing balances is reflected in the prepaid expense account as an increase.
Prepaid expenses are asset accounts, and an increase implies that cash was spent on attaining the asset, so it is considered an application of cash and hence deducted from net income.
Net income is the amount of money left over after taxes as well as deductions are deducted from your paycheck. Net income is the money left over after paying operational expenses, administrative expenses, cost of products sold, taxes, insurance, and all other business expenses for a company.
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Answer:
Possible outcome of stock price at end of 6 months (0.5 years)
Outcome 1:
Stock price = 35
Strike price = 45
Payoff call = max{ST - K,0} = max{35-45,0} = 0
Present value =
PV = 0/(1+5%)^0.5 = 0
Outcome 2:
Stock price = 49
Strike price = 45
Payoff call = max{ST - K,0} = max{49-45,0} = 4
Present value =
PV = 4/(1+5%)^0.5 = 3.903
Probability of both outcomes = 0.5
Value of call option = 0.5*0 + 0.5*3.903 = 1.95
Short sale arbitrage opportunity:
Short the stock and buy a call option. Invest the proceeds at 5% for 6 months:
Short stock = +41.6
long call = -1.95
Proceeds = 41.6 - 1.95 = 39.65
Amount after 6 months = 39.65*(1+5%)^0.5 = 40.629
Case 1:
Stock price = 35
Payoff from long call = 0
Buy the stock at market price and close the short stock position = -35
Total payoff = 40.629 - 35 = 5.629
Case 2:
Stock price = 49
Payoff from long call = 49 - 45 = 4
Buy the stock from market price and close the short stock position = -49
Total payoff = 40.629 + 4 - 49 = -4.3708
Present value of payoff from both cases = (0.5*5.629 + 0.5*(-4.3708))/(1+5%)^0.5
= 1.2581/1.0246 = 1.2277
Arbitrage payoff = 1.2277
Answer:
The short sale proceeds in an arbitrage strategy is 1.2277
Explanation:
From the question given,
The Possible outcome of stock price at end of 6 months (0.5 years)
The Outcome is:
The Stock price = 35
The Strike price = 45
The Payoff call = max(ST - K,0) = max(35-45,0) = 0
The Present value = PV = 0/(1+5%)^0.5 = 0
The possible Outcome 2:
The Stock price = 49
The Strike price = 45
The Payoff call = max{ST - K,0} = max{49-45,0} = 4
The Present value =
PV = 4/(1+5%)^0.5 = 3.903
Then,
The Probability of both outcomes = 0.5
Value of call option = 0.5*0 + 0.5 x 3.903 = 1.95
Therefore, the Short sale arbitrage opportunity is:
The Short the stock and buy a call option.
Invest the proceeds at 5% for 6 months:
Short stock = +41.6
long call = -1.95
Proceeds = 41.6 - 1.95 = 39.65
Amount after 6 months = 39.65*(1+5%)^0.5 = 40.629
The Case 1:
Stock price = 35
Payoff from long call = 0
Buy the stock at market price and close the short stock position = -35
The Total payoff = 40.629 - 35 = 5.629
For Case 2:
Stock price = 49
Payoff from long call = 49 - 45 = 4
Buy the stock from market price and close the short stock position = -49
Total payoff = 40.629 + 4 - 49 = -4.3708
The Present value of payoff from both cases = (0.5*5.629 + 0.5*(-4.3708))/(1+5%)^0.5
= 1.2581/1.0246 = 1.2277
Then the Arbitrage payoff = 1.2277
She can find a more comfortable chair.
She can have more resources available.
She can remove any possible distractions.
She can choose an area with more light.
In this case, Alicia makes her studying environment more effective as she can remove any possible distractions. The correct option is c.
Studying is crucial for personal skill development in addition to educational advancement. Your confidence, skill, and self-esteem can all be increased by having effective study techniques. Additionally, it aids in lowering tension and worry related to tests and deadlines.
Take anything out of your study area that is not necessary for studying. To lessen auditory distractions, wear noise-canceling headphones, listen to white noise, or try utilizing earplugs. Eliminate electronic irritants. Put your phone in silent mode and away from your line of sight.
Therefore, the correct option is c. She can remove any possible distractions.
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Answer:
C
Explanation:
edgen 2020
Answer:
B. Fall to Zero
Explanation:
In a perfectly competitive market, product cost are all relatively the same. If a firm decides to raise its price on a product it's demanded quantity becomes relatively nonexistent due to the other competitors whos prices have either remained the same or even dropped in price.
Answer:
Increase in Variable costs= $45,000
Explanation:
Giving the following information:
Fixed expenses are $521,000 per month. The company is currently selling 7,000 units per month. Management is considering using a new component that would increase the unit variable cost by $6. Since the new component would increase the features of the company's product, the marketing manager predicts that monthly sales would increase by 500 units.
Increase in Variable costs= 7500 * 6= 45,000