![]() ![]() In this example you get the result c = x^3, so that is the case. If your expression ( a + b) has a value that is constant over the solution set of the condition, and if Mathematica is able to simplify it, then you'll get a result that is independent of any of the variables in the expression ( a and b). Substitute either of these into the condition, a^3 + 3 a^2 b + 3 a b^2 + b^3 = c /. Solve the equation a + b = x for either a or b, giving a = x - b or b = x - a.What you can do sometimes is this: introduce a new variable to represent the value of your expression, solve the resulting equation for one of the original variables (perhaps manually), then substitute it into the condition. In general, that's not possible - that is, for an arbitrary expression subject to an arbitrary constraint, there's no guarantee that the expression will have the same value at all the points satisfied by the constraint. But I'm guessing that what you meant to ask was how you can find the value of an expression ( a+b) subject to a constraining equation ( a^3 + 3 a^2 b + 3 a b^2 + b^3 = c). As pointed out in the comments, you can't solve an expression. Compute answers using Wolfram's breakthrough technology & knowledgebase, relied on by millions of students & professionals. ![]()
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