That is very true. However Copenhagen interpretation I suppose at least has an experiment or two like Bell's and the two slit even if it is depressingly probabilistic; and tends to throw up more questions than answers. It's all a matter of taste though let's face it.
I suppose you are saying...
I find decoherence troubling even in MWI.
It seems a little well you know devoid of being able to be proved. I'm not sure natural law gives a toss about our subjective biases anyway. If a woods falls in the trees and there's no one around to see it what colour is it?
I voted for LQG. Btw but...
np Bhorok's answer is more elegant and easier, but I thought you might need a long winded explanation and there's often more than one way to swing a cat I guess. Hope it helped. :smile:
It's basically separating it into parts ie.\int \frac{x^2}{(x^2+1)^2}\rightarrow \int \frac{x}{1}.\frac{x}{(x^2+1)^2}\equiv x(x. \sin(\arctan(x)))
as
\frac{x}{1}=\frac{1}{2}x^2
and x\frac{x}{(1+x)^2}=x.\sin(\arctan(x))
By the trig identity.
Thus the answer is...