The price of a non-dividend-paying stock is $100. Suppose that thecontínuously compounded risk-free rate is 1% per year, the market expected return is 7%(continuously compounded), the stock beta is 1.2, and the stock price volatility is 30%per year. Assume that the stock price follows the Geometric Brownian Motion.a) Solve for the expected stock return per year0.32(0.01 + 1.2 * 0.07) + = 0.139b) A derivative pays off $100 if the stock price is in the range between $90 and $110 inyear two and 0 otherwise. Determine its current price.1000.1392= 75.73c) What is the two-year 95% VaR if you short 100 shares of the stock today giventhat N (0.05) = -1.645? Note that the stock price follows a log normal distributionrather than a normal distribution

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Description: The price of a non-dividend-paying stock is $100. Suppose that thecontínuously compounded risk-free rate is 1% per year, the market expected return is 7%(continuously compounded), the stock beta is 1.2, and the stock price volatility is 30%per year.

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The price of a non-dividend-paying stock is $100. Suppose that the continuously compounded risk-free rate is 1% per year, the market expected return is 7% (continuously compounded), the stock beta is 1.2, and the stock price volatility is 30% per year. Assume that the stock price follows the Geometric Brownian Motion. a) Solve for the expected stock return per year (0.01 + 1.2 0.07) + 0.3² 2 100 0.139+2 b) A derivative pays off $100 if the stock price is in the range between $90 and $110 in year two and 0 otherwise. Determine its current price. 0.139 = 75.73 c) What is the two-year 95% VaR if you short 100 shares of the stock today given that N¹(0.05) = -1.645? Note that the stock price follows a log normal distribution rather than a normal distribution

The price of a non-dividend-paying stock is $100. Suppose that the continuously compounded risk-free rate is 1% per year, the market expected return is 7% (continuously compounded), the stock beta is 1.2, and the stock price volatility is 30% per year. Assume that the stock price follows the Geometric Brownian Motion. a) Solve for the expected stock return per year (0.01 + 1.2 0.07) + 0.3² 2 100 0.139+2 b) A derivative pays off $100 if the stock price is in the range between $90 and $110 in year two and 0 otherwise. Determine its current price. 0.139 = 75.73 c) What is the two-year 95% VaR if you short 100 shares of the stock today given that N¹(0.05) = -1.645? Note that the stock price follows a log normal distribution rather than a normal distribution

EBK CONTEMPORARY FINANCIAL MANAGEMENT

14th Edition

ISBN:9781337514835

Author:MOYER

Publisher:MOYER

Chapter8: Analysis Of Risk And Return

Section: Chapter Questions

Problem 14P

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