Answer: Please refer to Explanation.
Explanation:
1. Honesty.
State the purpose of your call to the secretary and sell your product. For instance, " Hello, my name is Mr. Petal and I represent a fast rising Paper and Metal Container company. After researching about your company, I felt it most expedient to get in touch with Mr. Firestone as I believe this is business he will be interested in. We offer perks that are unmatched in the industry".
2. Persistence.
You can be persistent on the phone if you detect deceit in the secretary's tone.
For instance,
" Having been in the chemical industry myself, I know such an opportunity does not come often and I really do guarantee that we give the best benefits in the industry. If you can, just let me talk to Mr. Firestone, I promise that neither of you will regret it".
If it still doesn't work, ask for a convenient time you can call back.
Answer:
. All countries can gain from trade if they all specialize in production according to comparative advantage
Explanation:
Comparative advantage is when a country produces a product at a lower opportunity cost when compared with its trading partners.
Absolute advantage is when a country produces more quantities of goods and services than its trading partners.
A country can still have comparative advantage in production if opportunity cost is increasing once it's opportunity cost doesn't become greater than that of its trading partners.
A country can have comparative advantage without having absolute advantage.
I hope my answer helps you.
Answer:
D. $0.93
Explanation:
Upmove (U) = High price/current price
= 42/40
= 1.05
Down move (D) = Low price/current price
= 37/40
= 0.925
Risk neutral probability for up move
q = (e^(risk free rate*time)-D)/(U-D)
= (e^(0.02*1)-0.925)/(1.05-0.925)
= 0.76161
Put option payoff at high price (payoff H)
= Max(Strike price-High price,0)
= Max(41-42,0)
= Max(-1,0)
= 0
Put option payoff at low price (Payoff L)
= Max(Strike price-low price,0)
= Max(41-37,0)
= Max(4,0)
= 4
Price of Put option = e^(-r*t)*(q*Payoff H+(1-q)*Payoff L)
= e^(-0.02*1)*(0.761611*0+(1-0.761611)*4)
= 0.93
Therefore, The value of each option using a one-period binomial model is 0.93