Black-Scholes Model Assume that you have been given the following information on Purcell Industries: Current stock...

Assume that you have been given the following information on Purcell Industris: (Formula in Excel) Current...

Assume that you have been given the following information on Purcell Industris: (Formula in Excel) Current stock price = $15.00 Strike price of option = $15.00 Time of maturity of option = 6 months Risk-free rate = 6% Variance of stock return = 0.12 d1 = 0.24495 N(d1) = 0.59675 d2= 0 N(d2) = 0.5 Binomial Lattice of stock prices: P= P(u)= Cu = P(d) = Cd= πu = πd According to the Black-Scholes option pricing model, what is the...

4.  Problem 18.04 (Black-Scholes Model) Assume that you have been given the following information on Purcell Industries:...

4.  Problem 18.04 (Black-Scholes Model) Assume that you have been given the following information on Purcell Industries: Current stock price = $16 Exercise price of option = $16 Time until expiration of option = 6 months Risk-free rate = 11% Variance of stock price = 0.07 = 0.38753 = 0.20045 = 0.65082 = 0.57943 Using the Black-Scholes Option Pricing Model, what is the value of the option? Round intermediate calculations to 4 decimal places. Round you answer to the nearest cent....

Excel Online Structured Activity: Black-Scholes Model Black-Scholes Model Current price of underlying stock, P $33.00 Strike...

Excel Online Structured Activity: Black-Scholes Model Black-Scholes Model Current price of underlying stock, P $33.00 Strike price of the option, X $40.00 Number of months unitl expiration 5 Formulas Time until the option expires, t #N/A Risk-free rate, rRF 3.00% Variance, σ2 0.25 d1 = #N/A N(d1) = 0.5000 d2 = #N/A N(d2) = 0.5000 VC = #N/A

Black-Scholes Model Use the Black-Scholes Model to find the price for a call option with the...

Black-Scholes Model Use the Black-Scholes Model to find the price for a call option with the following inputs: (1) Current stock price is $21. (2) Strike price is $24. (3) Time to expiration is 5 months. (4) Annualized risk-free rate is 4%. (5) Variance of stock return is 0.17. Round your answer to the nearest cent. In your calculations round normal distribution values to 4 decimal places. Please show step by step calculations in excel. Thank you

Use the Black-Scholes model to find the price for a call option with the following inputs:...

Use the Black-Scholes model to find the price for a call option with the following inputs: (1) current stock price is $30, (2) strike price is $37, (3) time to expiration is 3 months, (4) annualized risk-free rate is 5%, and (5) variance of stock return is 0.16. Do not round intermediate calculations. Round your answer to the nearest cent. $ ?????? PLEASE SHOW THE FORMULA!! Thank you :)

Use the Black-Scholes option pricing model for the following problem. Given: stock price=$60, exercise price=$50, time...

Use the Black-Scholes option pricing model for the following problem. Given: stock price=$60, exercise price=$50, time to expiration=3 months, standard deviation=35% per year, and annual interest rate=6%.No dividends will be paid before option expires. What are the N(d1), N(d2), and the value of the call option, respectively?

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...

1. Calculate the value of the D1 parameter for a call option in the Black-Scholes model,...

1. Calculate the value of the D1 parameter for a call option in the Black-Scholes model, given the following information: Current stock price: $65.70 Option strike price: $74 Time to expiration: 7 months Continuously compounded annual risk-free rate: 3.79% Standard deviation of stock return: 22% 2. Calculate the value of the D2 parameter for a call option in the Black-Scholes model, given the following information: Current stock price: $126.77 Option strike price: $132 Time to expiration: 6 months Continuously compounded...

Use Black-Scholes model to price a European call option Use the Black-Scholes formula to find the...

Use Black-Scholes model to price a European call option Use the Black-Scholes formula to find the value of a call option based on the following inputs. [Hint: to find N(d1) and N(d2), use Excel normsdist function.] (Round your final answer to 2 decimal places. Do not round intermediate calculations.) Stock price $ 57 Exercise price $ 61 Interest rate 0.08 Dividend yield 0.04 Time to expiration 0.50 Standard deviation of stock’s returns 0.28 Call value            $

Working with the Black-Scholes model and a call option for a particular stock, you calculate the...

Working with the Black-Scholes model and a call option for a particular stock, you calculate the following values: d1 = 0.73 d2=0.58 N(d1)= 0.85 N(d2) = 0.57 C0 = 3.46 Given the information that you have, what is the best estimate as to what the new call price would be if shares of the underlying stock increased by $0.24? For this question, you do not need to calculate any of the Black-Scholes equations to solve for d1, d2, or C0