What are the prices of $105 strike call and put? Assume S = $100, σ =...

Consider a call option with a strike price (X) of $100 that expires in six months...

Consider a call option with a strike price (X) of $100 that expires in six months (t=0.5). If the current stock price (S) is $100, the underlying’s stock’s volatility (σ) of the stock is 0.2, and the risk-free rate (rrf) is 5% what is N(d1)? The Excel NORMSDIST(z) function will be helpful for this problem.

Consider a call and a put option, both with strike price of $30 and 3 months...

Consider a call and a put option, both with strike price of $30 and 3 months to expiration. The call trades at $4, the put price is $5, the interest rate is 0, and the price of the underlying stock is $29. a.Suppose the stock does not pay dividends. Is there an arbitrage? If so, write down the sequence of trades and calculate the arbitrage profit you realize in 3 months. If not, explain why not. b.Suppose the stock will...

A put option maturing in 6 months is priced using the Black-Scholes model. Strike price is...

A put option maturing in 6 months is priced using the Black-Scholes model. Strike price is 105, current price is 111 and the stock pays no dividend value of d2= .390 and the current risk-free interest rate is 4%. The price of the put option is 4.45. Calculate the delta (Δ) of the put option? Show work please.

In addition to the five factors, dividends also affect the price of an option. The Black–Scholes...

In addition to the five factors, dividends also affect the price of an option. The Black–Scholes Option Pricing Model with dividends is:    C=S×e−dt×N(d1)−E×e−Rt×N(d2)C=S×e−dt×N(d1)⁢−E×e−Rt×N(d2) d1=[ln(S/E)+(R−d+σ2/2)×t](σ−t√)d1= [ln(S⁢  /E⁢ ) +(R⁢−d+σ2/2)×t ] (σ−t)  d2=d1−σ×t√d2=d1−σ×t    All of the variables are the same as the Black–Scholes model without dividends except for the variable d, which is the continuously compounded dividend yield on the stock.    A stock is currently priced at $88 per share, the standard deviation of its return is 44 percent...

Both a call and a put currently are traded on stock Xue; both have strike prices...

Both a call and a put currently are traded on stock Xue; both have strike prices of $50 and maturities of 6 months. What will be the profit/loss to an investor who buys one call contract at $3 a share? How about for the person who buys one put contract for $6.50 a share? [Hint: profit= value of the option at expiration- initial cost] Scenario Call option: Profit/Loss Put option: Profit/Loss $40 $45 $50 $55 $60

The price of a European put that expires in six months and has a strike price...

The price of a European put that expires in six months and has a strike price of $100 is $3.59. The underlying stock price is $102, and a dividend of $1.50 is expected in four months. The term structure is flat, with all risk-free interest rates being 8% (cont. comp.). What is the price of a European call option on the same stock that expires in six months and has a strike price of $100? Explain in detail the arbitrage...

5.7. The price of a European call that expires in six months and has a strike...

5.7. The price of a European call that expires in six months and has a strike price of $30 is $2. The underlying stock price is $29, and a dividend of $0.50 is expected in two months and again in five months. Risk-free interest rates (all maturities) are 10%. What is the price of a European put option that expires in six months and has a strike price of $30?

A stock currently sells for $100. A 9-month call option with a strike of $100 has...

A stock currently sells for $100. A 9-month call option with a strike of $100 has a premium of $10. Assuming a 5% continuously compounded risk-free rate and a 3% continuous dividend yield, (a) What is the price of the otherwise identical put option? (Leave 2 d.p. for the answer) (b) If the put premium is $10, what is the strategy for you to capture the arbitrage profit? a. Long call, short put, long forward b. Short call, long put,...

The strike price for a European call and put option is $56 and the expiration date...

The strike price for a European call and put option is $56 and the expiration date for the call and the put is in 9 months. Assume the call sells for $6, while the put sells for $7. The price of the stock underlying the call and the put is $55 and the risk free rate is 3% per annum based on continuous compounding. Identify any arbitrage opportunity and explain what the trader should do to capitalize on that opportunity....

A put option with a strike of $100 expires in 3 months. The underlying stock follows...

A put option with a strike of $100 expires in 3 months. The underlying stock follows a binomial process and does not pay dividends. Today, the stock price is $110, and in three months its price will be $125 or $90. The annual Risk free rate is 6%. calculate the fair price of the put option. 4.55, 3.51, 3.77, 4.02, OR 4.28.