Question: Please, attach MATLAB code that you used to make computations. Note: A number Z appears in each of the three Problems. It is obtained by
Please, attach MATLAB code that you used to make computations.
Note: A number Z appears in each of the three Problems. It is obtained by dividing the last two digits of your student number by 10 and adding 0.05 to the result. For example, if your student number is 21339, then Z=39/10 + 0.05 = 3.95. Problem 1. Suppose in the next period there are two possible states of the world, a good weather state and a bad weather state, and that apples are the only product produced in the economy. A present apple is denoted by PA, an apple in the good weather state in the next period by GA, and an apple in the bad weather state in the next period by BA. Two securities are available on the market: a Bond and a Stock. Stock pays 40GA and 20BA and has a price of 26PA. Bond pays 20GA and 20BA. The discount factor is df=1/(1+Z/100). (i) That is the (arbitrage-free price of the Bond? What is the economic interpretation of Z? (ii) Compute the arbitrage-free price of the atomic or time-state securities (i.e., the price of 1GA and 1 BA measured in terms of PA). (iii) Suppose an investor wants 10GA and 20BA. Construct a portfolio of the available securities that will provide these time-state claims. Compute its arbitrage-free price. Note: A number Z appears in each of the three Problems. It is obtained by dividing the last two digits of your student number by 10 and adding 0.05 to the result. For example, if your student number is 21339, then Z=39/10 + 0.05 = 3.95. Problem 1. Suppose in the next period there are two possible states of the world, a good weather state and a bad weather state, and that apples are the only product produced in the economy. A present apple is denoted by PA, an apple in the good weather state in the next period by GA, and an apple in the bad weather state in the next period by BA. Two securities are available on the market: a Bond and a Stock. Stock pays 40GA and 20BA and has a price of 26PA. Bond pays 20GA and 20BA. The discount factor is df=1/(1+Z/100). (i) That is the (arbitrage-free price of the Bond? What is the economic interpretation of Z? (ii) Compute the arbitrage-free price of the atomic or time-state securities (i.e., the price of 1GA and 1 BA measured in terms of PA). (iii) Suppose an investor wants 10GA and 20BA. Construct a portfolio of the available securities that will provide these time-state claims. Compute its arbitrage-free price
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