I was working two different but superficially related problems, and noticed that if I did something that is generally not allowed, the results were connected by a negative sign. My questions are whether this will always turn out this way, and if so, why.
The two problems were
Coincidence, or can this be generalized (that dy/dx = the negative of working with the partial derivatives in this way), and the sloppiness justified?
The two problems were
- implicit differentiation: given f(x, y(x)) = f(x,y) =(x^3)(y^2) = c for a constant c, then dy/dx = -3y/2x
- partial differentiation: given f(x,y) =z=(x^3)(y^2) , then \(\displaystyle \delta\)f/\(\displaystyle \delta\)x = 3(x^2)(y^2) & \(\displaystyle \delta\)f/\(\displaystyle \delta\)y =2(x^3)y so doing something that is not allowed, (\(\displaystyle \delta\)f/\(\displaystyle \delta\)x)/(\(\displaystyle \delta\)f/\(\displaystyle \delta\)y) = \(\displaystyle \delta\)y/\(\displaystyle \delta\)x = 3y/2x.
Coincidence, or can this be generalized (that dy/dx = the negative of working with the partial derivatives in this way), and the sloppiness justified?
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