Computational Recreations in MathematicaAddison-Wesley, 1991 - Počet stran: 286 Presents some common problems in mathematics and how they can be investigated using the Mathematica computer system. Problems and exercises include the calendar, sequences, the n-Queens problems, digital computing, blackjack and computing pi. This book is for those that would like to see how Mathematica is applied to real-world mathematics. |
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Výsledky 1-3 z 5
Strana 40
... February has 28 days , then the list of months is { 31 , 28 , 31 , 30 , 31 , 30 , 31 , 31 , 30 , 31 , 30 , 31 } To find the month and day for the 100th day of the year one sees that 31 + 28 +30 ≤ 100 < 31 + 28 + 30 +31 in other words ...
... February has 28 days , then the list of months is { 31 , 28 , 31 , 30 , 31 , 30 , 31 , 31 , 30 , 31 , 30 , 31 } To find the month and day for the 100th day of the year one sees that 31 + 28 +30 ≤ 100 < 31 + 28 + 30 +31 in other words ...
Strana 238
... February are assumed to be months 11 and 12 of the previous year . A Mathematica program can be given by DayOfWeek [ year_Integer , month_Integer ... February would contain 30 days . February 238 APPENDIX A. ANSWERS TO EXERCISES.
... February are assumed to be months 11 and 12 of the previous year . A Mathematica program can be given by DayOfWeek [ year_Integer , month_Integer ... February would contain 30 days . February 238 APPENDIX A. ANSWERS TO EXERCISES.
Strana 239
Ilan Vardi. All months except February would contain 30 days . February would have 29 days in common years and 30 in leap years . After Caesar's death the number of days in each month was rear- ranged to their present form . Around 10 ...
Ilan Vardi. All months except February would contain 30 days . February would have 29 days in common years and 30 in leap years . After Caesar's death the number of days in each month was rear- ranged to their present form . Around 10 ...
Obsah
Searching for Numbers | 4 |
Elegant Programs in Mathematica | 6 |
Answer to Question | 12 |
Autorská práva | |
Další části 11 nejsou zobrazeny.
Běžně se vyskytující výrazy a sousloví
algorithm asymptotic base binomial Block calendar CalendarChange Catalan numbers Chapter coefficient Collatz compute Condom Problem condoms conjecture DateToNumber denoted digits DigitsToNumber efficient element Euler-Maclaurin formula evaluate example Exercise expansion Farey sequence Fo(a formula Fy(a gives Gregorian implementation Islamic calendar iterates Julian Julian calendar Khinchin's constant lattice paths Lisp log log log n log log(x log² lower bound M₁ Mathematica Mathematica function Mathematica program mathematical method mixed radix Möbius inversion formula mod p² multiplication MyDigits n_Integer NestList Niven numbers Note number of primes number system numbers less perm polynomial PowerMod powers powers2 prec prime number theorem Prime Range PrimePi PrimeQ problem Quotient recurrence relatively prime Riemann Riemann hypothesis Riemann zeta function rook rowsum RunEncode running Sc(n Section semigroup setf solutions squarefree subsets SuperPowerMod Table[1 TakTime0 term theory toroidal semiqueens TotalStoppingTime tree values W₁ Wieferich primes zero