Suppose a stock has an expected return of 10% per year and a return volatility of...

A stock index currently stands at 300 and has a volatility of 20%. The risk-free interest...

A stock index currently stands at 300 and has a volatility of 20%. The risk-free interest rate is 8% and the dividend yield on the index is 3%. Use the Black-Scholes-Merton formula to calculate the price of a European call option with strike price 325 and the price of a European put option with strike price of 275. The options will expire in six months. What is the cost of the range forward created using options in Part (a)? Use...

An asset’s price is $41.14 and its volatility is 26% per year. A European call on...

An asset’s price is $41.14 and its volatility is 26% per year. A European call on the asset has nine months until expiration, a strike price of $40.00, and the risk-free interest rate is 2.6% per year. According to a two-period binomial option pricing model, what is the option’s value? 1) $3.88 2) $5.51 3) $3.47 4) $4.47 5) $4.89

Please show work. Consider a two-period binomial tree with the following parameters: S = 100, u...

Please show work. Consider a two-period binomial tree with the following parameters: S = 100, u = 1:20, d = 0:80, and R = 1:10. Suppose also that a dividend of $5 is expected after one period. Find the tree of prices of a European Put option with a strike of 100 expiring in two periods. Find the tree of prices of an American Put option with a strike of 100 expiring in two periods. Is there a difference between...

A stock’s current price S is $100. Its return has a volatility of s = 25...

A stock’s current price S is $100. Its return has a volatility of s = 25 percent per year. European call and put options trading on the stock have a strike price of K = $105 and mature after T = 0.5 years. The continuously compounded risk-free interest rate r is 5 percent per year. The Black-Scholes-Merton model gives the price of the European put as: please provide explanation

Consider an American put option and European put option with strike price x=60 dollars expiring at...

Consider an American put option and European put option with strike price x=60 dollars expiring at time 3 on a stock with initial price s(0)=60 dollars in a binomial model with u=0.2, d=-0.08, r=0.04. a) Find the European put price b) Find the American put price c) compare your observations

A stock index is currently 1,500. Its volatility is 18%. The risk-free rate is 4% per...

A stock index is currently 1,500. Its volatility is 18%. The risk-free rate is 4% per annum for all maturities and the dividend yield on the index is 2.5% (both continuously compounded). Calculate values for u, d, and p when a 6-month time step is used. What is value of a 12-month European put option with a strike price of 1,480 given by a two-step binomial tree? In the question above, what is the value of a 12-month American put...

Consider the following scenario: The price of a stock currently trading at $80 can go up...

Consider the following scenario: The price of a stock currently trading at $80 can go up by 10% or down by 15% per period for two periods. The risk-free rate is 3% p.a. (continuous compounding). A European put option expiring in 2-years has a strike price of $77. (Note: Present all your calculations regarding the values in each node of the binomial tree and round up your answers to 3 decimal digit) a. Calculate the current value of this European...

Great Edventure stock is at $800. The return has an annualized volatility (sigma) of 70%. IT...

Great Edventure stock is at $800. The return has an annualized volatility (sigma) of 70%. IT pays no dividend and we are given a zero interest rate. Compute the Black-Merton-Scholes value on a 6-month European call option onGreat adevtnrue with a strike price at $1000.

a stock index currently stands at 300 and has a volatility of 20% per year. the...

a stock index currently stands at 300 and has a volatility of 20% per year. the continuously compounded risk-free interest rate is 3% per year and the dividend yield on the index is 8%. a trader used a two-step binomial tree to value a six-month american call option on the index. what is the risk-neutral probability that the stock price moves up in 3 months?

TSLA stock price is currently at $800. The stock return has an annualized volatility (sigma) of...

TSLA stock price is currently at $800. The stock return has an annualized volatility (sigma) of 70%. The stock does not pay dividend and assume zero interest rate. Compute the Black-Merton-Scholes delta on a 6-month European call option on TSLA with a strike of $1000.