Integrate d/dx(x^2): Include Constant?

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When integrating the derivative of a function, such as d/dx(x^2), it is essential to include a constant of integration in the indefinite integral. This constant accounts for all possible functions that have the same derivative, ensuring consistency in results regardless of the order of operations. However, when dealing with definite integrals, the constant is not included, as the result depends on the limits of integration. The distinction between indefinite and definite integrals is crucial for accurate mathematical representation. Therefore, always include the constant of integration when performing indefinite integrals.
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if i integrate d/dx(x^2), should i include the constant of integration? thanks
 
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If you are working on an equation, then presumably you are integrating both sides with respect to x in which case you will have a constant of Integration (arbitrarily) on either side.

The short answer is yes, in all cases.
 
so it doesn't matter that you know what the function was before differentiation?
 
I am tempted to say that it wouldn't matter, but that would lead to inconsistent results (i.e. a different answer depending on the chosen order of operations).
 
What in the world do you mean? If you start with a function f(x), differentiate it, then integrate that, whether you get the original function, that function plus an unknown constant, or that function plus a specific number depends on exactly what type of "integral" you are doing:

\int f(x)dx, the indefinite integral should have an unknown constant added because it means ALL functions whose derivative is f(x) but \int_a^xf(t)dt would not and the value will depend upon the choice of a.
 

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