6.(15%) In the one-period binomial model, the stock price of Apple Inc. (AAPL) is $768 in the up move and $512 in the down move. Also, the one-period risk-free rate rf = 2% (per annum; NOT re), time to maturity = 1 year, and the current stock price S(O)=S640. One unit of asset or-nothing call (ANC) option pays the option holder one unit of asset or its equivalent cash value if Sr at expiration is greater than the exercise price of $640, and zero otherwise. (a) (2%; 2%) Find the martingale probability for the up and down move using the stock price as numeraire, respectively. Note: You may use Eq[B(T)/S(T)F(0)]=B(0)/S(0), where B(T)=l+rf and B(0)=1. F(0) represents the current information set (for instance, we know the current stock price is S(0)). (b) (2%) Find the current price of the ANC option using stock-measure. That is, E [ANC(T)/S(T)F(0)]=ANC(O)/S(O). (c) (3%; 3%) Find the martingale probability for the up and down move using the savings account as numeraire, respectively. Note: You may use Ep[S(T)/B(T)F(0)]=S(O)/B(0), where B(T)=1+rf and B(0)=1. F(0) represents the current information set. (d) (3%) Calculate the expected value Ep[ANC(T)/B(T) F(0). 6.(15%) In the one-period binomial model, the stock price of Apple Inc. (AAPL) is $768 in the up move and $512 in the down move. Also, the one-period risk-free rate rf = 2% (per annum; NOT re), time to maturity = 1 year, and the current stock price S(O)=S640. One unit of asset or-nothing call (ANC) option pays the option holder one unit of asset or its equivalent cash value if Sr at expiration is greater than the exercise price of $640, and zero otherwise. (a) (2%; 2%) Find the martingale probability for the up and down move using the stock price as numeraire, respectively. Note: You may use Eq[B(T)/S(T)F(0)]=B(0)/S(0), where B(T)=l+rf and B(0)=1. F(0) represents the current information set (for instance, we know the current stock price is S(0)). (b) (2%) Find the current price of the ANC option using stock-measure. That is, E [ANC(T)/S(T)F(0)]=ANC(O)/S(O). (c) (3%; 3%) Find the martingale probability for the up and down move using the savings account as numeraire, respectively. Note: You may use Ep[S(T)/B(T)F(0)]=S(O)/B(0), where B(T)=1+rf and B(0)=1. F(0) represents the current information set. (d) (3%) Calculate the expected value Ep[ANC(T)/B(T) F(0)