Put–Call Parity and Dividends [LO1] The put–call parity condition is altered when dividends are paid. The dividend-adjusted put–call parity formula is:
where d is again the continuously compounded dividend yield,
a. What effect do you think the dividend yield will have on the price of a put option? Explain.
b. From the previous question, what is the price of a put option with the same strike and time to expiration as the call option?
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Fundamentals of Corporate Finance
- Let X = strike price and S = share price. A put option is deep out-of-the-money if _____________ (choose the best answer from the list below to complete the sentence). X/S is between 1.01 and 1.05 X/S is between 1.06 and 1.15 X/S is between 0.95 and 0.99 X/S is between 0.85 and 0.94 X/S is equal to 1.00arrow_forwardWhat is the correct way to determine the value of a long forward position at expiration? The value is the price of the underlying ... ... multiplied by the forward price. ... divided by the forward price. ... plus the forward price. ... minus the forward price please need type answer not an imagearrow_forward2. In the context of binomial option pricing model, a decrease in the stock price volatility will reduce the current option value True or falsearrow_forward
- . Answer the following in a couple of sentences d) Compare swaps with forwards f) Why do you buy on margin?arrow_forwardSuppose stocks X and Y have equal current prices but different volatilities of returns, ax < øy; what would be more expensive: a call option on X or Y? Please discuss.arrow_forwardA. Realized return B. Ex ante alpha C. Ex post alpha D. Realized beta Question 7 (MCQ) One example of a build up model is: A. A macroeconomic model B. Capital Asset Pricing Model (CAPM) C. Bond yield plus risk premium D. Fama and French modelarrow_forward
- Who correctly identifies the effect of increases in volatility of the underlying asset on option prices? Johnny Kyle Linda Johnny Mike [↓ = decrease, t = increase] O Kyle O Linda Call price ↑ ↑ ↓ ↓ Mike Put Price ↑ ↓ ↓ ↑arrow_forwardProblem 4d: State whether the following statements are true or false. In each case, provide a brief explanation. d. In a binomial world, if a stock is more likely to go up in price than to go down, an increase in volatility would increase the price of a call option and reduce the price of a put option. Note that a static position is a position that is chosen initially and not rebalanced through time.arrow_forwardA) Explain the relationship between strike prices and implied volatilities under a price jump scenario. B) How does a dividend payment impact the option price?arrow_forward
- When the Black-Scholes and binomial tree models are used to value an option on a non- dividend-paying stock, which of the following is true? O The binomial tree price converges to a price above the Black-Scholes price as the number of time steps is increased O The binomial tree price converges to a price below the Black-Scholes price as the number of time steps is increased The binomial tree price converges to the Black-Scholes price as the number of time steps is increased O None of these ◄ Previous Next ▸arrow_forward6. Equilibrium pricing: Let the subscripts: j = 0 denote the risk-free asset, j = 1,...,n the set of available risky securities, and M the market portfolio. For the questions that follow, assume that CAPM provides an accurate description of reality. a. b. C. d. State the CAPM equation. (1) Use the CAPM equation to show that the following condition is true s; ≤ SM for any j. What is the significance of this condition when interpreted in the context of the capital market line? (5) Assume that B = 0.8, μM = 0.1 and r = 0.05. Using the CAPM, determine the expected return from holding one unit of asset j for one period. (2) Given your answer to c.), what could you conclude (from the perspective of the security market line) if a market survey indicated that the forecasted one- period return on asset j was 8 percent? Describe and motivate the rational trading response that is consistent with your conclusion. (4)arrow_forwardTick all those statements on options that are correct (and don't tick those statements that are incorrect). a. The put-call parity formula necessarily requires the assumption that the share price follows a geometric Brownain motion. b. In general the equation S(T) + (K − S(T))† = (S(T) – K)+ + K is valid. An American put option should never be exercised before the expiry time. C. d. The Black-Scholes formula is based on the assumption that the share price follows a geometric Brownian motion. e. If interest is compounded continuously then the put-call parity formula is P + S(0) = C + Ke¯T where T is the expiry time.arrow_forward
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