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H Atom 21 cm Line. Is the Milky Way a Spiral Galaxy like this one?. Because of the scattering by gas and dust in the disk. Because of the scattering by gas and dust in the disk S 1-4. Because of the scattering by gas and dust in the disk S 1-4
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Because of the scattering by gas and dust in the disk S 1-4
Because of the scattering by gas and dust in the disk S 1-4 We can only see (in the visible) about 1/6 (ca 6000ly) of the way to the Galactic Centre
Nuclear and electron spins paired Nuclear and electron spins parallel
Nuclear and electron spins paired Nuclear and electron spins parallel F = I+S = 0 F = I+S = 1
Fermi and Hargreaves Contact Term Nuclear and electron spins paired Nuclear and electron spins parallel F = I+S = 0 F = I+S = 1
Classical picture of the nucleus as a spinning charge shell which gives rise to two magnetic field regions B= Bint + Bext
Classical picture of the nucleus as a spinning charge shell which gives rise to two magnetic field regions B= Bint + Bext
Classical picture of the nucleus as a spinning charge shell which gives rise to two magnetic field regions B= Bint + Bext Bint internal uniform magnetic field
Classical picture of the nucleus as a spinning charge shell which gives rise to two magnetic field regions B= Bint + Bext Bint internal uniform magnetic field Bext external magnetic field dipolar
Electron density s electron r
Electron density s electron p electron r
Electron density s electron p electron r H = Bnucleus .electron
r H = Bnucleus(r).e(r) d
s electron density r H = Bnucleus(r).e(r) d
s electron density External dipolar term r H = Bnucleus(r).e(r) d
s electron density dipolar term r H = Bnucleus(r).e(r) d Bnucleus= (Bint + Bext)
s electron density dipolar term r H = Bnucleus(r).e(r) d Bnucleus= (Bint + Bext) H = Bint (r).e(r) d + Bext (r).e(r)d
s electron density dipolar term r H = Bnucleus(r).e(r) d Bnucleus= (Bint + Bext) H = Bint (r).e(r) d + Bext (r).e(r)d
s electron density dipolar term r H = Bnucleus(r).e(r) d Bnucleus= (Bint + Bext) H = Bint (r).e(r) d
s electron density dipolar term r Bnucleus I H = Bnucleus(r).e(r) d Bnucleus= (Bint + Bext) H = Bint (r).e(r) d
s electron density dipolar term r Bnucleus I e S H = Bnucleus(r).e(r) d Bnucleus= (Bint + Bext) H = Bint (r).e(r) d
s electron density dipolar term r Bnucleus I e S H = a I . S H = Bnucleus(r).e(r) d Bnucleus= (Bint + Bext) H = Bint (r).e(r) d
s electron density dipolar term r Bnucleus I e S H = a I . S Fermi contact term H = Bnucleus(r).e(r) d Bnucleus= (Bint + Bext) H = Bint (r).e(r) d
a = (8/3h) geBgH N(0)2 ge electron g factor
a = (8/3h) geBgH N(0)2 ge electron g factor B Bohr magneton
a = (8/3h) geBgH N(0)2 ge electron g factor B Bohr magneton gH proton g factor
a = (8/3h) geBgH N(0)2 ge electron g factor B Bohr magneton gH proton g factor N nuclear magneton
a = (8/3h) geBgH N(0)2 ge electron g factor B Bohr magneton gH proton g factor N nuclear magneton (0)2 absolute value of the electron density at the nucleus squared
1s = (ao3)-1/2 exp (-r/a0) 1s(0)2 = 1/ ao3
1s = (ao3)-1/2 exp (-r/a0) 1s(0)2 = 1/ ao3 a = 1420.4057 MHz
1s = (ao3)-1/2 exp (-r/a0) 1s(0)2 = 1/ ao3 a = 1420.4057 MHz ca 21 cm
Historical Summary Fermi and Hargreaves calculated a in 1930
Historical Summary Fermi and Hargreaves calculated a in 1930 Rabi measured in lab 1949
Historical Summary Fermi and Hargreaves calculated a in 1930 Rabi measured in lab 1949 Van der Hulst suggested that this line might be detectable from space about 1945
Historical Summary Fermi and Hargreaves calculated a in 1930 Rabi measured in lab 1949 Van der Hulst suggested that this line might be detectable from space about 1945 Ewan and Purcell detected radio spectrum in 1951 Harry Kroto 2004
-v Blue shifted +v Red shifted Doppler Shift / = / = v/c Harry Kroto 2004
