![]() ![]() Another choice is ‘giac’.ĭomain - string (default: ‘complex’) setting this to ‘real’Ĭhanges the way SymPy solves single equations inequalities Note that SymPy is always usedįor diophantine equations. Some solutions of trigonometric equations are lost).Īlgorithm - string (default: ‘maxima’) to use SymPy’s To ‘force’ (string) omits Maxima’s solve command (useful when This keyword is incompatible with multiplicities=TrueĪnd is not used when solving inequalities. Solutions, but possibly encounter approximate solutions. Maxima’s to_poly_solver package to search for more possible ![]() To_poly_solve - bool (default: False) or string use Incompatible with to_poly_solve=True and does not makeĮxplicit_solutions - bool (default: False) require thatĪll roots be explicit rather than implicit. Multiplicities - bool (default: False) if True, There are a few optional keywords if you are trying to solve a singleĮquation. Return a list containing one dictionary with that solution. Likewise, if there’s only a single solution, If thereĪre no solutions, return an empty list (rather than a list containingĪn empty dictionary). Return a list of dictionaries containing the solutions. Solution_dict - bool (default: False) if True or non-zero, Inequalities and systemsį - equation or system of equations (given by a solve ( f, * args, ** kwds ) ¶Īlgebraically solve an equation or system of equations (over theĬomplex numbers) for given variables. William Stein (): added arithmetic with symbolic equations Sage: var ( 'x y' ) (x, y) sage: f = x + 3 = y - 2 sage: f x + 3 = y - 2 sage: g = f - 3 g x = y - 5 sage: h = x ^ 3 + sqrt ( 2 ) = x * y * sin ( x ) sage: h x^3 + sqrt(2) = x*y*sin(x) sage: h - sqrt ( 2 ) x^3 = x*y*sin(x) - sqrt(2) sage: h + f x^3 + x + sqrt(2) + 3 = x*y*sin(x) + y - 2 sage: f = x + 3 < y - 2 sage: g = 2 < x + 10 sage: f - g x + 1 < -x + y - 12 sage: f + g x + 5 < x + y + 8 sage: f * ( - 1 ) -x - 3 < -y + 2īobby Moretti: initial version (based on a trick that Robert ![]()
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