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Eulers theorem, Logarithmic Functions, Circular, Hyperbolic. Microsoft Excel Exponential Integral Functions' title='Microsoft Excel Exponential Integral Functions' />Put. Flag, double S, double X. T, double r, double v. Black. Scholes 0. Math. LogS X r v v 2. T v Math. SqrtT. Math. SqrtT. if Call. Put. Flag c. Black. Scholes S CNDd. X Math. Exp r T CNDd. Call. Put. Flag p. Black. Scholes X Math. Exp r T CND d. S CND d. Black. Scholes. public double CNDdouble X. L 0. 0. double K 0. CND 0. 0. const double a. L Math. AbsX. K 1. L. d. CND 1. 0 1. Math. Sqrt2 Convert. To. DoubleMath. PI. To. String Math. Exp L L 2. K a. 2 K K a. Math. PowK, 3. 0. Math. PowK, 4. 0 a. Math. PowK, 5. 0. X lt 0. CND. return d. CND. Black Scholes in KBy Tom Messmore, Germany. Black Scholes European Call Put in k. Tom Messmore tom. Abramowitz Stegun 2. Eur. Call 1Eur. Put. Eur Put Pr and Eur Call Pr. Description of k language Copied from http www. Arthur Whitney of KX Systems www. Black Scholes in Cold. Fusion. 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L RESULT 1 1 SQRT2 PI EXP POWERL, 2 2A1 K A2 POWERK, 2 A3 POWERK, 3 A4 POWERK, 4 A5 POWERK, 5 IF X lt 0 THENRESULT 1 RESULT END IF RETURN RESULT END CND BEGIN RESULT 0 D1 LNS X R POWERV, 2 2 T V SQRTT D2 D1 V SQRTT IF CALLPUTFLAG C THENRESULT S CNDD1 X EXP R T CNDD2 ELSIF CALLPUTFLAG P THENRESULT X EXP R T CND D2 S CND D1 END IF RETURN RESULT END Black Scholes in Prolog. By Lou Odette, MA USAI tested it in Arity Prolog, but it should work in any standard Prolog. Type,Spot,Strike,Expiry,Risk. Free. Rate,Volatily, Price call caseblackscholescall,S,X,T,R,V,Price D1 is lnSX RV2VqrtT,D2 is D1 VqrtT,cumulativenormalD1,CND1,cumulativenormalD2,CND2,Price is SND1 Xxp RND2. S,X,T,R,V,Price D1 is lnSX RV2VqrtT,D2 is D1 VqrtT,cumulativenormal D1,CND1,cumulativenormal D2,CND2,Price is Xxp RND2 SND1. Cumulative Normal DistributioncumulativenormalX,CND X lt 0,A1 is 0. A2 is 0. 3. 56. A3 is 1. A4 is 1. 8. 21. A5 is 1. L is absX,K is 1. L,CND is 1. 0sqrt2ixp L2A1 A2K A3K3 A4K4. A5K5, cumulativenormalX,CND A1 is 0. A2 is 0. 3. 56. A3 is 1. A4 is 1. 8. 21. A5 is 1. L is absX,K is 1. L,CND is 1. 0 1. L2A1 A2K A3K3. A4K4 A5K5. Black Scholes in LISPBy Robert Brown. I started with your C version. Once my Lisp code was producing the sameoutput, I added a few type declarations and did some speed tests. Mybenchmark computes. Effective Rake Angle Cutting Tools'>Effective Rake Angle Cutting Tools. Black. Scholesp, 1. Here are my timing results. I compiled the C version with gcc O2. Lisp version for maximum speed no type checking at run time. C version 1. 6. 9 seconds. Lisp version 1. 1. As you can see, Common Lisp is competitive with C and OCaml in terms ofexecution speed. The Common Lisp code is attached below. For COEFFS list a. Black Scholes in Ruby. Michael Neumann, Germany one to one translation from Python example Cumulative normal distributiondef cndxa. Math. sqrt2ath PIath. Black. Scholescall. Put. Flag, s, x, t, r, vd. Math. logsxrv2. Math. Math. sqrttif call. Put. Flag csndd. Math. Math. exp rnd d. Black Scholes in Clean By Isaac Gouymodule Black. Scholesimport Std. RealCleanhttp www. Pure functional language, performance similar to CStart blackscholes Put 1. Option Call Put The Black and Scholes 1. Stock option formulablackscholes o s x t r v  optionvalue owhereoptionvalue Call s nd. Put  x expr. The cumulative normal distribution functionn x  x lt 0. Pi expl2. A1   A2k   A3 A4 k4. A5 k5. Pi 3. 1. 41. A1 0. 3. 19. A2 0. A3 1. 7. 81. A4 1. A5 1. 3. 30. Black Scholes in VB. NET By Marco Sturlese, The Black and Scholes 1. Stock option formula. Public Function Black. Emulator Download Gba there. ScholesBy. Val Call. Put. Flag As String, By. Val S As Double,By. Val X As Double, By. Val T As Double, By. Val r As Double, By. Val v As Double As. Double. Dim d. 1 As Double, d. As Doubled. 1 Math. LogS X r v 2 2 T v Math. SqrtTd. 2 d. Math. SqrtTIf Call. Put. Flag c Then. Black. Scholes S CNDd. X Math. Exp r T CNDd. Else. If Call. Put. Flag p Then. Black. Scholes X Math. Exp r T CND d. S CND d. End If. End Function The cumulative normal distribution function. Public Function CNDBy. Val X As Double As Double. Dim L As Double, K As Double. Const a. 1 0. 3. Const a. Const a. 3 1. 7. Const a. Const a. 5 1. 3. L Math. AbsXK 1 1 0. LCND 1 1 Math. Sqrt2 Math. PI Math.