NEED HELP WITH BOTH QUESTIONS PLZ!!!!!
1.
Using put call parity:
P=C+Xe^(-rt)-S=1.75+30*e^(-10%*6/12)-29.8=0.486882735
2.
P=C+De^(-rt)+Xe^(-rT)-S=1.75+1*e^(-10%*3/12)+30*e^(-10%*6/12)-29.8=1.462192647
NEED HELP WITH BOTH QUESTIONS PLZ!!!!! 2. Consider call and put options on a non-dividend paying...
Consider a European put option on a non-dividend-paying stock. The current stock price is $69, the strike price is $70, the risk-free interest rate is 5% per annum, the volatility is 35% per annum and the time to maturity is 6 months. a. Use the Black-Scholes model to calculate the put price. b. Calculate the corresponding call option using the put-call parity relation. Use the Option Calculator Spreadsheet to verify your result.
Question 1 - 35 Points Consider a European put option on a non-dividend-paying stock where the stock price is $15, the strike price is $13, the risk-free rate is 3% per annum, the volatility is 30% per annum and the time to maturity is 9 months. Consider a three-step troc. (Hint: dt = 3 months). (a) Compute u and d. (b) Compute the European put price using a three-step binomial tree. (c) If the option in (b) is American instead...
2. (a) State the Black-Scholes formulas for the prices at time 0 of a European call and put options on a non-dividend-paying stock ABC.(b) Consider an option on a non-dividend paying stock when the stock price is $30, the exercise price is $29, the risk-free interest rate is 5% per annum, the volatility is 20% per annum, and the time to maturity is 5 months. What is the price of the option if it is a European call?
Question 3 - 20 Points Consider a European call option on a non-dividend-paying stock where the stock price is $33, the strike price is $36, the risk-free rate is 6% per annum, the volatility is 25% per annum and the time to maturity is 6 months. (a) Calculate u and d for a one-step binomial tree. (b) Value the option using a non arbitrage argument. (c) Assume that the option is a put instead of a call. Value the option...
(b) A 6-month European call option on a non-dividend paying stock is cur- rently selling for $3. The stock price is $50, the strike price is $55, and the risk-free interest rate is 6% per annum continuously compounded. The price for 6-months European put option with same strike, underlying and maturity is 82. What opportunities are there for an arbitrageur? Describe the strategy and compute the gain.
Consider a European call and a European put on a non-dividend-paying stock. Both the call and the put will expire in one year and have the same strike prices of $120. The stock currently sells for $115. The risk-free rate is 5% per annum. The price of the call is $7 and the price of the put is $5. Is there an arbitrage? If so, show an arbitrage strategy. (To show the arbitrage, present the table listing actions and resulting...
The prices of European call and put options on a dividend-paying stock with 6 months to maturity and a strike price of $125 are $20 and $5, respectively. If the current stock price is $140, what is the implied annual continuously compounded risk-free rate? Assume the present value of dividend to be paid out over the next 6 months is $3.
NEED HELP 1. The current stock price is $50. Consider a call and a put option on this stock with 1 year to maturity. If the interest rate is 8% per annum continuously compounded, at what strike price would the prices of the call and put options be the same? A. $43.18 B. $46.15 C. $54.16 D. $57.33 E. $60.12
The price of a European call option on a non-dividend-paying stock with a strike price of $50 is $6. The stock price is $51, the continuously compounded risk-free rate (all maturities) is 6% and the time to maturity is one year. What is the price of a one-year European put option on the stock with a strike price of $50? $2.09 $7.52 $3.58 $9.91
5.8. The prices of European call and put options on a non-dividend-paying stock with 15 months to maturity, a strike price of $118, and an expiration date in 15 months are $21 and $5, respectively. The current stock price is $125. What is the implied risk-free rate?