godnotgod
Thou art That
Disregarding a human observer for the moment, we have this:
Q:
There's a lot of confusion between the uncertainty principle and the observer effect... So, to be clear (because there's a lot of conflicting info out there), when we talk about "observing" an electron and thereby changing its state, we're talking about using equipment to measure it, not simply observing with the naked eye, right?
A:
Right...there is a relation between the "observer effect" and the uncertainty principle. Mathematics requires that any wave, including purely classical ones, have a "spread" relation: ΔkΔx >= 1/2. That says that the spread (Δ
in the wavevector (k, sort of the inverse of the wavelength) times the spread in position (x) is greater than or equal to 1/2. The classical wave simply must have spreads in both these attributes, just as you can easily picture for water waves. We don't call this "uncertainty" or make a philosophical fuss about it because, as you can see by eye, the spreads in position and wavevector are real, persistent things.What's weird about quantum waves, though, is that when they're "observed" or "measured" we don't see the full spread that was there in the wave. If you set up apparatus to measure x, you see an output that has a very narrow range of x, even if the input is a big spread of x. Likewise if you measure k, the output has a narrow range of k. It's as if the wavefunction "collapsed" in a way guided by the type of measurement made. As to which particular little range of, say, x it collapses to, there's just a probability rule. The detailed result is purely random, not guided by any prior content of the universe. That's what converts the quantum spread into quantum uncertainty.
3/5/13
Q & A: Observer Effect? | Department of Physics | University of Illinois at Urbana-Champaign
