Chapter 17

Task 

In this assignment, you will solve problems about Options Trading using the “Greek” parameters.

Instructions 

  1. Use your textbook to answer the following questions from Chapter 17:
    1. Exercise 25, 26, 27, 31.
  2. Please, upload xls, xlsx file.
  3. Please, use the full computing power of Excel.

    

25. Suppose a stock is currently trading at 100. An at-the-money call with a maturity of

three months has the following price and greeks:

C = 5.598

  = 0.565

  = 0.032

  = −12.385

V = 19.685

ρ = 12.71

 

(a) If the stock price moves to S = 101, what is the predicted new option price (using

the delta alone)?

(b) If the stock price moves to S = 101, what is the predicted new call delta?

(c) Repeat these questions assuming the stock price moves to 98 instead.

(d) If the stock price registers a large jump increase to 120, what is the new call value

predicted by the delta alone? By the delta and gamma combined?

(e) Go back to the original parameters. If the time to maturity falls by 0.01, what is the

new call value predicted by the theta?

(f) Repeat the last question if the time to maturity falls by 0.05.

(g) Go back to the original parameters. If the volatility increases by 1%, what is the

predicted new value of the call? What if volatility fell by 2%?

(h) Go back to the original parameters. If interest rates should rise by 50 basis points,

what is the new call value predicted by the rho?

 

26.    A stock is currently trading at 55. You hold a portfolio of the following instruments:

• Long 200 shares of stock.

• Long 200 puts with a strike of 50 and maturity of three months.

• Short 200 calls with a strike of 60 and maturity of three months.

You are given the following information:

Instrument.                Price       Delta        Gamma       Vega          Theta           Rho

Call with K = 50        6.321.       0.823        0.038          7.152        −5.522.         9.730

Put with K = 50         0.700       −0.177.       0.038         7.152        −3.053         −2.615

Call with K = 55        3.079.       0.565          0.057         10.827.     −6.812          6.993

Put with K = 55         2.396      −0.435          0.057         10.827      −4.096         −6.586

Call with K = 60        1.210        0.297.          0.050          9.515      −5.513          3.779

Put with K = 60         5.465      −0.703.          0.050         9.515        −2.551         −11.035

(a) What is the current value of your portfolio?

(b) What is the delta of your portfolio? the gamma? the vega? the theta? the rho?

(c) Suppose you want to make your portfolio gamma neutral. What is the cost of

achieving this using the 55-strike call? What is the theta of your new position?

(d) What is the cost if you used the 55-strike put? What is the theta of the new position?

 

27.    Using the same information as in Question 26, calculate the following quantities:

(a) The delta and gamma of a covered call portfolio with K = 55 (i.e., a portfolio

where you are long the stock and short a call with a strike of 55).

(b) The delta and gamma of a protective put portfolio with K = 50 (long the stock

and long a put with a strike of 50).

(c) The delta and gamma of a bull spread using calls with strikes of 55 and 60 (long a

55-strike call, short a 60-strike call).

(d) The delta and gamma of a butterfly spread using calls with strikes of 50, 55, and

60 (long a 50-strike call, long a 60-strike call, and short two 55-strike calls).

(e) The delta and gamma of a collar with strikes 50 and 60 (long position in the stock,

long a 50-strike put, short a 60-strike call).

 

31.   You hold two types of calls and two types of puts on a given stock. The deltas and gammas

of the respective types are (+0.40, +0.03), (+0.55, +0.036), (−0.63, +0.028), and

(−0.40, +0.032). You have a long position in 1,000 of the first type of call, a short

position in 500 of the second type of call, a long position in 1,000 of the first type of

put, and a short position in 500 of the second type of put.

(a) What is the aggregate delta of your portfolio? The aggregate gamma?

(b) Suppose you decide to gamma hedge your portfolio using only the first type of call.

What is the resulting delta of the new portfolio? What position in the underlying

is now required to create a delta-neutral gamma-neutral portfolio?

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