The following is a Binomial Option Pricing Model question. There will be 7 questions asked about...

Consider the following case of a binomial option pricing. A stock is currently trading at $50....

Consider the following case of a binomial option pricing. A stock is currently trading at $50. Next period the stock price can go up to Smax or down to Smin.The call option with the exercise price of $50 is currently trading at $9.14. The risk-free rate is 7.5% and the hedge ratio is 5/7. Calculate numerical values of Smax and Smin.

Binomial Model and Option Pricing The shares of XYZ Inc. are currently selling for $120 per...

Binomial Model and Option Pricing The shares of XYZ Inc. are currently selling for $120 per share. The shares are expected to go up by 10 percent or down by 5 percent in each of the following two months (Month 1 and Month 2). XYZ Inc. is also expected to pay a dividend yield of 2 percent at the end of Month 1. The risk-free rate is 0.5 percent per month. a.        What is the value of an American call...

Suppose that, in each period of a two-period stock price model, the cost of a security...

Suppose that, in each period of a two-period stock price model, the cost of a security either goes up by a factor of u = 2 or down by a factor d = 1/2. Assume the initial price of the security is $80 and that the interest rate r is 0. a). Compute the risk neutral probabilities p (price moves up) and q = 1−p (price moves down) for this model. b). Sketch a diagram of this two period stock...

Assume a one-period (annual) binomial model with the following characteristics: current stock price is $25, the...

Assume a one-period (annual) binomial model with the following characteristics: current stock price is $25, the up factor for each period is 1.05, the down factor for each period is 0.95, and the risk-free rate is 3 percent. (a) (4 pts) Draw the binomial tree for the stock with the appropriate pricing. (b) (2 pts) What is the current hedge ratio for a European call for that stock if it has a strike price of $22 and will expire in...

a. Price a call option using the two-period binomial model assuming the following data. S=120,X=80,u=0.2, d=-.2,and...

a. Price a call option using the two-period binomial model assuming the following data. S=120,X=80,u=0.2, d=-.2,and r=0.10 per period b. What is the hedge ratio for this call option? c. If the call option were priced at $55, what would an arbitrageur do? Discuss an exact strategy?

Consider a European call with an exercise price of 50 on a stock priced at 60....

Consider a European call with an exercise price of 50 on a stock priced at 60. The stock can go up by 15% or down by 20% each of the two binomial periods. The risk-free rate is 10%. Determine the price of the option today. Then construct a risk-free hedge for a long stock and a short option. At each point in the binomial tree, show the composition and value of the hedge portfolio. For period 1 (that is h),...

Consider a call option. If, in a two-state model, a stock can take a price of...

Consider a call option. If, in a two-state model, a stock can take a price of $300 or $200, what would be the hedge ratio for each of the following exercise prices: $280, $270, $240, $200?   b. What do you conclude about the hedge ratio as the option strike price becomes progressively higher? - Increases to a maximum of 1.0 - Decreases to a minimum of 1.0 - Increases to a maximum of 0 - Decreases to a minimum of...

(1) (2 pts.) Please use binomial option pricing model to derive the value of a one-year...

(1) (2 pts.) Please use binomial option pricing model to derive the value of a one-year put option. The current share price is ?0=100 and exercise price ?=110. The T-bill rate is ?=10% per year and annual standard deviation is 20%. Please show: 1. binomial tree 2. Probability of increase and decrease 3. U/D or % or increase for each case

A stock price evolves in a standard binomial tree. Each period it can either go up...

A stock price evolves in a standard binomial tree. Each period it can either go up to u = 1.2 times its previous price or down to d = 0.8 times its previous price. Consider a two period model (t = 0, 1, and 2), as depicted below, where each period corresponds to one year. The risk-free (net) return between t = 0 and t = 1 is r1 = 5%, while between t = 1 and t = 2...

Question 34 Black-Scholes Option-Pricing S 45 Current stock price X 50 Exercise price r 5.00% Risk-free...

Question 34 Black-Scholes Option-Pricing S 45 Current stock price X 50 Exercise price r 5.00% Risk-free rate of interest T 9 months Time to maturity of option Variance 6.308% Stock volatility 1. Call option price = 4.63 2. Call option price = 2.83 3. Call option price = 2.93 4. Call option price = 2.63 5. None of Above