Answer the following questions given the following call option prices on Google (GOOG) and on Apple

Answer the following questions given the following call option prices on Google (GOOG) and on Apple (APPL). Note that these are actual option prices on 2/21/13 and these contracts have 60 days till expiration. The 2-month T-bill rate is about 4.75%. Show all work.
OPTION
STRIKE
EXP
VOL
LAST
GOOG
800
APR
378
28.20
S=795.53
690
APR
53
101.57
APPL
450
APR
530
18.55
S=446.06
480
APR
856
7.81
Part One
1.

Document Preview:

Answer the following questions given the following call option prices on Google (GOOG) and on Apple (APPL). Note that these are actual option prices on 2/21/13 and these contracts have 60 days till expiration. The 2-month T-bill rate is about 4.75%. Show all work.
OPTION
STRIKE
EXP
VOL
LAST
GOOG
800
APR
378
28.20
S=795.53
690
APR
53
101.57
APPL
450
APR
530
18.55
S=446.06
480
APR
856
7.81
Part One
1. Estimate the theoretical option values for the call on GOOG with K =800 and for the call on APPL with K = 450 using the Black-Scholes-Merton and Binomial Models program (available under doc sharing). You can also use the following website to calculate the option prices and implied volatility
http://www.option-price.comwww.option-price.com
2. When estimating the option values assume various standard deviations of returns of 10%, 15%, 20%, â€Ś up to 100% or until you find the theoretical option value is close to the actual one.
3. Draw a graph showing the relationship between standard deviations and option values.
4. Based on the graph, what does the actual option value imply about the expected future standard deviation (volatility)? Which option has higher implied volatility and is it surprising?
Part Two
1. Estimate the historical standard deviation of GOOG*.
2. Compare the implied standard deviation with the historical standard deviation.
3. What can you infer from the difference, if any, between the two numbers?
Part three
1. Compute the implied volatility for all options.
2. Do you have the same implied volatility for the two options on the same underlying? If not (in which case it is referred to as volatility smile), what might be able to explain the differences? (Hint: refer to the chapter on volatility smile).
_____________________________________________________________________________________
*: How to estimate the historical standard deviation:
1. You need to obtain historical stock prices. I recommend…

Attachments: 