matt grime Posted April 23, 2005 Share Posted April 23, 2005 Sorry for a bit of necromancy, but this post has an obvious and useful answer. The answer being that the shorthand you're doing to get your answer is disguising the real maths. What you're actually doing is saying: dy/dx= x/y, therefore ydy/dx=x hence if we integrate both sides with respect to x we retain equality (up to adding a constant). You do not actally split it as a fraction. int y(dy/dx)dx = int xdx Also, your definite integrals magically become indefinite, by the way. now we apply the notion that integration is anti-differentiation, since we know that y^2 differentiates to 2ydy/dx. Link to comment Share on other sites More sharing options...
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