Muon Lifetime Exp: Urgent Qs on Scintillator-PMT Setup

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SUMMARY

The discussion centers on the methodology for measuring the lifetime of muons using a scintillator connected to photomultiplier tubes (PMTs). Participants clarify that the experiment can accurately determine the average lifetime of muons despite their prior existence outside the scintillator. The analysis relies on the exponential decay formula N(t) = N(0)·e^(-λt), allowing for the calculation of the mean lifetime τ as τ = 1/λ. Key considerations include the treatment of stopped muons and the impact of measurement resolution on results.

PREREQUISITES
  • Understanding of muon decay and lifetime measurement
  • Familiarity with scintillator and PMT technology
  • Knowledge of exponential decay functions and their applications
  • Basic principles of quantum mechanics, particularly uncertainty relations
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  • Research the principles of scintillator operation and PMT functionality
  • Study the mathematical derivation of exponential decay in particle physics
  • Explore the concept of measurement resolution and its effects on experimental results
  • Investigate maximum likelihood estimation techniques in data analysis
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Physicists, experimental researchers, and students involved in particle physics experiments, particularly those focusing on muon lifetime studies and decay processes.

martinhiggs
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Homework Statement



In using the experiment where a scintillator is connected up to PMTs, and the data is then recorded on the computer... The muon has already lived outside the scintillator for a large amount of time before it decays in the scintillator, so how is it that the experiment still works in providing the actual lifetime of the muon??
 
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just a quick guess but your measuring the energy or momentum using the scintillator yeh?

If so ΔxΔp = hbar

But cΔx = Δt
and cΔp = ΔE

So you get ΔEΔT = hbar
So ΔT = hbar/ΔE

Try using this concept to get the average lifetime of the muon, i don't think you can calculate the exact lifetime but the resolution using the energy it has instead of measuring the time...if that makes sense...
 
venomxx said:
just a quick guess but your measuring the energy or momentum using the scintillator yeh?

My guess would be: a stopped muon starts your clock; whenever the corresponding decay positron gets registered, the clock is stopped. Neither energy nor impulse of the muon would be of interest in this case.

martinhiggs said:
The muon has already lived outside the scintillator for a large amount of time before it decays in the scintillator, so how is it that the experiment still works in providing the actual lifetime of the muon??

Your analysis will provide an average lifetime for muons in a muon ensemble. Basically, you assume that this is a similar scenario to nuclear decay, which follows:

N(t)=N(0)\cdot e^{(-\lambda t)}

If your data shows exponential dependence of this kind, you are able to determine the mean lifetime \tau, as \tau=1/ \lambda. It doesn't matter how long the muon has been outside your experiment*. This information wouldn't change the time constant of your exponential function. Further investigation would require you to consider the finite measurement time/resolution etc. (e.g., http://en.wikipedia.org/wiki/Maximum_likelihood" ).

*As long as you treat a stopped muon as if it was 'free'. This assumption is reasonable in this experiment for \mu^+
 
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