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Dassinia
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Hello, I have this exercise and want to check if what i did is correct
Nuclei, typically of size $10^{-14}$ m, frequently emit electrons with energies of 1-10 MeV. Use the uncertainty principle to show that electrons of energy 1 MeV could not be contained in the nucleus before the decay.
Δx*Δp≥ h/4*pi
E=sqrt(p²c²+m²c4)
Searching for the minimum value of the energy
Δx ≈ x
Δp ≈ p
x*p≈h/4*pi
so x=10-14
p=h/(4*pi*x)
sqrt(p²c²+m²c4)=sqrt(h²/(4²*pi²*x²)+m²c4)
E=sqrt(h²/(4²*pi²*x²)+m²c4)
I found ≈ 5 Mev for the minimum energy for an electron in a nucleus, is my method correct ?
Thanks !
Homework Statement
Nuclei, typically of size $10^{-14}$ m, frequently emit electrons with energies of 1-10 MeV. Use the uncertainty principle to show that electrons of energy 1 MeV could not be contained in the nucleus before the decay.
Homework Equations
Δx*Δp≥ h/4*pi
E=sqrt(p²c²+m²c4)
The Attempt at a Solution
Searching for the minimum value of the energy
Δx ≈ x
Δp ≈ p
x*p≈h/4*pi
so x=10-14
p=h/(4*pi*x)
sqrt(p²c²+m²c4)=sqrt(h²/(4²*pi²*x²)+m²c4)
E=sqrt(h²/(4²*pi²*x²)+m²c4)
I found ≈ 5 Mev for the minimum energy for an electron in a nucleus, is my method correct ?
Thanks !