A stock price is currently $100. Over each of the next two six-month periods, it is...

A stock price is currently $40. Over each of the next two three-month periods it is...

A stock price is currently $40. Over each of the next two three-month periods it is expected to go up by 10% or down by 10%. The risk-free interest rate is 12% per annum with continuous compounding. What is the value of a six-month European put option with a strike price of $42? What is the value of a six-month American put option with a strike price of $42? What is the value of a six-month American put option with...

Assuming current stock price of ABC Company is $100. Over each of the next two six-month...

Assuming current stock price of ABC Company is $100. Over each of the next two six-month periods, the price is expected to go up by 10% or down by 10% during each six-month period. The risk-free interest rate is 8% per annum with annual compounding. Required: a. Calculate the option premium for a one-year European call option with an exercise price of $80. Show your calculation steps. b. Using the option premium calculated in Part a of Question 9, estimate...

A stock price is currently $100. Over each of the next two 3-month periods it is...

A stock price is currently $100. Over each of the next two 3-month periods it is expected to go up or go down with up-factor u and down-factor d. The risk-free interest rate is 6% per annum with continuously compounding. Consider a 6-month American put option with a strike price of K. Find the price of this American put option. Motivate your solutions, discuss early exercising decisions at each nodes prior to the maturity. K = 100, u = 1.3,...

A stock price is currently $40. Over each of the next two three-month periods it is...

A stock price is currently $40. Over each of the next two three-month periods it is expected to go up by10%. The risk-free interest rate is 12% per annum with continuous compounding. (a) What is the value of a six-month European put option with a strike price of $42? (b) What is the value of a six-month American put option with strike price of $42?

A stock price is currently $50. Over each of the next two three-month periods it is...

A stock price is currently $50. Over each of the next two three-month periods it is expected to go up by 8% with a probability of 50% or down by 4% with a probability of 50%. The risk-free interest rate is 4% per annum with continuous compounding. What is the value of a six-month European call option with a strike price of $50? Use binomial tree method to solve this problem.

The stock price is currently $110. Over each of the next two six-month periods, it is...

The stock price is currently $110. Over each of the next two six-month periods, it is expected to go up by 12% or down by 12%. The risk-free interest rate is 8% per annum with continuous compounding. What is the value of a one-year European call option with a strike price of $100?

Based on the spot price of $26 and the strike price $28 as well as the...

Based on the spot price of $26 and the strike price $28 as well as the fact that the risk-free interest rate is 6% per annum with continuous compounding, please undertake option valuations and answer related questions according to following instructions: Binomial trees: Additionally, assume that over each of the next two four-month periods, the share price is expected to go up by 11% or down by 10%. Use a two-step binomial tree to calculate the value of an eight-month...

A stock price is currently 100. Over each of the next to six months periods it...

A stock price is currently 100. Over each of the next to six months periods it is expected to go up by 10% or down by 10%. the risk free interest rate is 8% per annum. What is the value of the European call and put options with a strike price of 100? Verify that the put call parity is satisfied.

A stock price is currently $36. During each three-month period for the next six months it...

A stock price is currently $36. During each three-month period for the next six months it is expected to increase by 9% or decrease by 8%. The risk-free interest rate is 5%. Use a two-step tree to calculate the value of a derivative that pays off (max[(40-ST),0])2 where ST is the stock price in six months. What are the payoffs at the final nodes of the tree? [1 mark] Use no-arbitrage arguments (you need to show how to set up...

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...