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Cross Section Pricing Intrinsic Value Options Option Price Stock Price
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Cross Section Pricing Intrinsic Value Options Option Price Stock Price
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Interest Rates Settlement Projects Computer software Options
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Components of the Option Price 1 - Underlying stock price = Ps 2 - Striking or Exercise price = S 3 - Volatility of the stock returns (standard deviation of annual returns) = v 4 - Time to option expiration = t = days/365 5 - Time value of money (discount rate) = r 6 - PV of Dividends = D = (div) e -rt
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Black-Scholes Option Pricing Model O C = P s [N(d 1 )] - S[N(d 2 )]e -rt
![Black-Scholes Option Pricing Model O C = P s [N(d 1 )] - S[N(d 2 )]e -rt](http://images.slideplayer.com/25/7713356/slides/slide_5.jpg "Black-Scholes Option Pricing Model O C = P s [N(d 1 )] - S[N(d 2 )]e -rt")
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Black-Scholes Option Pricing Model O C = P s [N(d 1 )] - S[N(d 2 )]e -rt O C - Call Option Price P s - Stock Price N(d 1 ) - Cumulative normal density function of (d 1 ) S - Strike or Exercise price N(d 2 ) - Cumulative normal density function of (d 2 ) r - discount rate (90 day comm paper rate or risk free rate) t - time to maturity of option (days/365) v - volatility - annual standard deviation of returns
![Black-Scholes Option Pricing Model O C = P s [N(d 1 )] - S[N(d 2 )]e -rt O C - Call Option Price P s - Stock Price N(d 1 ) - Cumulative normal density function of (d 1 ) S - Strike or Exercise price N(d 2 ) - Cumulative normal density function of (d 2 ) r - discount rate (90 day comm paper rate or risk free rate) t - time to maturity of option (days/365) v - volatility - annual standard deviation of returns](http://images.slideplayer.com/25/7713356/slides/slide_6.jpg "Black-Scholes Option Pricing Model O C = P s [N(d 1 )] - S[N(d 2 )]e -rt O C - Call Option Price P s - Stock Price N(d 1 ) - Cumulative normal density function of (d 1 ) S - Strike or Exercise price N(d 2 ) - Cumulative normal density function of (d 2 ) r - discount rate (90 day comm paper rate or risk free rate) t - time to maturity of option (days/365) v - volatility - annual standard deviation of returns")
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(d 1 )= ln + ( r + ) t PsSPsS v22v22 v t 32 34 36 38 40 Cumulative Normal Density Function N(d 1 )=
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(d 1 )= ln + ( r + ) t PsSPsS v22v22 v t Cumulative Normal Density Function (d 2 ) = d 1 -v t
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Call Option Example What is the price of a call option given the following?. P = 36r = 10%v =.40 S = 40t = 90 days / 365
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Call Option (d 1 ) = ln + ( r + ) t PsSPsS v22v22 v t (d 1 ) = -.3070N(d 1 ) = 1 -.6206 =.3794 Example What is the price of a call option given the following?. P = 36r = 10%v =.40 S = 40t = 90 days / 365
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Call Option (d 2 ) = -.5056 N(d 2 ) = 1 -.6935 =.3065 (d 2 ) = d 1 -v t Example What is the price of a call option given the following?. P = 36r = 10%v =.40 S = 40t = 90 days / 365
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Call Option Example What is the price of a call option given the following?. P = 36r = 10%v =.40 S = 40t = 90 days / 365 O C = P s [N(d 1 )] - S[N(d 2 )]e -rt O C = 36[.3794] - 40[.3065]e - (.10)(.2466) O C = $ 1.70
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Call Option Example What is the price of a call option given the following?. P = 36r = 10%v =.40 S = 40t = 90 / 365 days
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Call Option Example (same option) What is the price of a call option given the following?. P = 41r = 10%v =.42 S = 40t = 30 days/ 365 (d 1 ) = ln + (.1 + ) 30/365 41 40.42 2 2.42 30/365 (d 1 ) =.3335N(d 1 ) =.6306
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(d 2 ) =.2131 N(d 2 ) =.5844 (d 2 ) = d 1 -v t =.3335 -.42 (.0907) Call Option Example (same option) What is the price of a call option given the following?. P = 41r = 10%v =.42 S = 40t = 30 days/ 365
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Call Option O C = P s [N(d 1 )] - S[N(d 2 )]e -rt O C = 41[.6306] - 40[.5844]e - (.10)(.0822) O C = $ 2.67 Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365
![Call Option O C = P s [N(d 1 )] - S[N(d 2 )]e -rt O C = 41[.6306] - 40[.5844]e - (.10)(.0822) O C = $ 2.67 Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365](http://images.slideplayer.com/25/7713356/slides/slide_16.jpg "Call Option O C = P s [N(d 1 )] - S[N(d 2 )]e -rt O C = 41[.6306] - 40[.5844]e - (.10)(.0822) O C = $ 2.67 Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365")
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Call Option Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365
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Call Option Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365 Intrinsic Value = 41-40 = 1 Time Premium = 2.67 + 40 - 41 = 1.67 Profit to Date = 2.67 - 1.70 =.94 Due to price shifting faster than decay in time premium
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Call Option Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365 Q: How do we lock in a profit? A: Sell the Call
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Call Option Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365
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Call Option Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365
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Call Option Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365
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Put Option Black-Scholes O p = S[N(-d 2 )]e -rt - P s [N(-d 1 )] Put-Call Parity (general concept) Put Price = Oc + S - P - Carrying Cost + D Carrying cost = r x S x t Call + Se -rt = Put + P s Put = Call + Se -rt - P s
![Put Option Black-Scholes O p = S[N(-d 2 )]e -rt - P s [N(-d 1 )] Put-Call Parity (general concept) Put Price = Oc + S - P - Carrying Cost + D Carrying cost = r x S x t Call + Se -rt = Put + P s Put = Call + Se -rt - P s](http://images.slideplayer.com/25/7713356/slides/slide_23.jpg "Put Option Black-Scholes O p = S[N(-d 2 )]e -rt - P s [N(-d 1 )] Put-Call Parity (general concept) Put Price = Oc + S - P - Carrying Cost + D Carrying cost = r x S x t Call + Se -rt = Put + P s Put = Call + Se -rt - P s")
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Put Option Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365 Calculate the Value of The Put [N(-d 1 ) =.3694 [N(-d 2 )=.4156 Black-Scholes O p = S[N(-d 2 )]e -rt - P s [N(-d 1 )] O p = 40[.4156]e -.10(.0822) - 41[.3694] O p = 1.34
![Put Option Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365 Calculate the Value of The Put [N(-d 1 ) =.3694 [N(-d 2 )=.4156 Black-Scholes O p = S[N(-d 2 )]e -rt - P s [N(-d 1 )] O p = 40[.4156]e -.10(.0822) - 41[.3694] O p = 1.34](http://images.slideplayer.com/25/7713356/slides/slide_24.jpg "Put Option Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365 Calculate the Value of The Put [N(-d 1 ) =.3694 [N(-d 2 )=.4156 Black-Scholes O p = S[N(-d 2 )]e -rt - P s [N(-d 1 )] O p = 40[.4156]e -.10(.0822) - 41[.3694] O p = 1.34")
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Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365 Calculate the Value of The Put Put-Call Parity Put = Call + Se -rt - P s Put = 2.67 + 40e -.10(.0822) - 41 Put = 42.34 - 41 = 1.34 Put Option
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Put-Call Parity & American Puts P s - S < Call - Put < P s - Se -rt Call + S - P s > Put > Se -rt - P s + call Example - American Call 2.67 + 40 - 41 > Put > 2.67 + 40e -.10(.0822) - 41 1.67 > Put > 1.34 With Dividends, simply add the PV of dividends
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Volatility Calculate the Annualized variance of the daily relative price change Square root to arrive at standard deviation Standard deviation is the volatility
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Implied Volatility O PriceVolumeImplied V Jan30C4.5050.34 Jan35C1.5090.28 Apr35C2.5055.30 Apr40C1.505.38 200 Recalculate the volatility using volume & price deviation
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Implied Volatility VolumeVolume Weights Jan30C5050/200 =.25 Jan35C9090/200 =.45 Apr35C5555/200 =.275 Apr40C55 / 200=.025 200
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Implied Volatility Distance Factor (25% tolerance) Jan30C[(3/33)-.25] 2 /.25 2 =.41 Jan35C[(2/33)-.25] 2 /.25 2 =.57 Apr35C[(2/33)-.25] 2 /.25 2 =.57 Apr40C[(7/33)-.25] 2 /.25 2 =.02 Weight Adjusted Implied volatility = 298 =.41x.25x.334 +.57x.45x.28 +... =.298.41x.25 +.57x.45 +...
![Implied Volatility Distance Factor (25% tolerance) Jan30C[(3/33)-.25] 2 /.25 2 =.41 Jan35C[(2/33)-.25] 2 /.25 2 =.57 Apr35C[(2/33)-.25] 2 /.25 2 =.57 Apr40C[(7/33)-.25] 2 /.25 2 =.02 Weight Adjusted Implied volatility = 298 =.41x.25x x.45x](http://images.slideplayer.com/25/7713356/slides/slide_30.jpg "= x x")
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Expected Return Example P = 41 40C=2.67 Possible PriceProbProfitProbxProfit 35.10-7.67-.767 38.20-4.67-.934 41.40-1.67-.668 44.201.33.266 47.104.33.433 -1.67 Expected Profit = - 1.67
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Expected Return Steps for Infinite Distribution of Outcomes 1 - convert annual V to time adjusted V V t = V (t.5 ) 2 - Prob(below a price q ) = N [ln(q/p) /V t ] 3 - Prob (above price q ) = 1 - Prob (below)
![Expected Return Steps for Infinite Distribution of Outcomes 1 - convert annual V to time adjusted V V t = V (t.5 ) 2 - Prob(below a price q ) = N [ln(q/p) /V t ] 3 - Prob (above price q ) = 1 - Prob (below)](http://images.slideplayer.com/25/7713356/slides/slide_32.jpg "Expected Return Steps for Infinite Distribution of Outcomes 1 - convert annual V to time adjusted V V t = V (t.5 ) 2 - Prob(below a price q ) = N [ln(q/p) /V t ] 3 - Prob (above price q ) = 1 - Prob (below)")
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Expected Return Example V t =.42 (30/365).5 =.1204 Prob (<40) = N[ln(40/41) /.1204] = N[-.2051] =.4187 Prob (<42.67) = N[ln(42.67/41) /.1204] = N[.3316] =.6299 Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365Call = 2.67
![Expected Return Example V t =.42 (30/365).5 =.1204 Prob (<40) = N[ln(40/41) /.1204] = N[-.2051] =.4187 Prob (<42.67) = N[ln(42.67/41) /.1204] = N[.3316] =.6299 Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365Call = 2.67](http://images.slideplayer.com/25/7713356/slides/slide_33.jpg "Expected Return Example V t =.42 (30/365).5 =.1204 Prob (<40) = N[ln(40/41) /.1204] = N[-.2051] =.4187 Prob (<42.67) = N[ln(42.67/41) /.1204] = N[.3316] =.6299 Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365Call = 2.67")
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Expected Return Example (same option) P = 41r = 10%v =.42 S = 40t = 30 days/ 365Call = 2.67 $2.67 40 42.67 37% 58% 63%
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Dividends Example Price = 36Ex-Div in 60 days @ $0.72 t = 90/365r = 10% P D = 36 -.72 e -.10(.1644) = 35.2917 Put-Call Parity Amer D+ C + S - P s > Put > Se -rt - P s + C + D Euro Put = Se -rt - P s + C + D + CC
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Binomial Pricing Model
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Binomial Pricing Outcome Trees Example - one month option Price = $20Possible outcomes = 22 or 18 21call = ?Monthly risk free rate = 1% Intrinsic Value @ 22 = 1 Intrinsic Value @ 18 = 0
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T0T1ValueX Shares Pa=2222x -1 P=20 Pb=1818x 22x - 1 = 18x x=.25 at.25 shares A=B Binomial Pricing
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at.25 shares A=B T1 Value = 22(.25) - 1 = 4.5 T0 Value = 20 (.25) - Call = 5 - Call (T0 Value) (1+ r) = 4.5 (5-call) (1.01) = 4.5 call =.5446 Binomial Pricing
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Probability Up = p = (a - d)Prob Down = 1 - p (u - d) a = e r t d =e - [ t].5 u =e [ t].5 t = time intervals as % of year Binomial Pricing
![Probability Up = p = (a - d)Prob Down = 1 - p (u - d) a = e r t d =e - [ t].5 u =e [ t].5 t = time intervals as % of year Binomial Pricing](http://images.slideplayer.com/25/7713356/slides/slide_40.jpg "Probability Up = p = (a - d)Prob Down = 1 - p (u - d) a = e r t d =e - [ t].5 u =e [ t].5 t = time intervals as % of year Binomial Pricing")
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Example Price = 36 =.40 t = 90/365 t = 30/365 Strike = 40r = 10% a = 1.0083 u = 1.1215 d =.8917 Pu =.5075 Pd =.4925 Binomial Pricing
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40.37 32.10 36
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Binomial Pricing 40.37 32.10 36
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50.78 = price 40.37 32.10 25.52 Binomial Pricing 45.28 36 28.62 40.37 32.10 36
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Binomial Pricing 50.78 = price 10.78 = intrinsic value 40.37.37 32.10 0 25.52 0 45.28 36 28.62 36 40.37 32.10
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Binomial Pricing 50.78 = price 10.78 = intrinsic value 40.37.37 32.10 0 25.52 0 45.28 5.60 36 28.62 40.37 32.10 36
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Binomial Pricing 50.78 = price 10.78 = intrinsic value 40.37.37 32.10 0 25.52 0 45.28 5.60 36.19 28.62 0 40.37 2.91 32.10.10 36 1.51
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Binomial Pricing 50.78 = price 10.78 = intrinsic value 40.37.37 32.10 0 25.52 0 45.28 5.60 36.19 28.62 0 40.37 2.91 32.10.10 36 1.51
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Project Select a Call option (w/ high vol & expires next month) Use spreadsheet to calc BS value for this Friday Calc volatility (include div if necessary) Calc Expected Return Probability Intervals Use spreadsheet to calc Binomial value. Use weekly intervals. Chart Black Scholes position Create a cross section price chart (showing time value decay) - Calculate option price at various stock prices for 0, 30, 60, 90 days. Include 1 page executive summary
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