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Nuclear Physics The famous Geiger-Marsden Alpha scattering experiment (under Rutherford’s guidance) In 1909, Geiger and Marsden were studying how alpha particles are scattered by a thin gold foil. Thin gold foil Alpha source Geiger-Marsden As expected, most alpha particles were detected at very small scattering angles Thin gold foil Alpha particles Small-angle scattering Geiger-Marsden To their great surprise, they found that some alpha particles (1 in 20 000) had very large scattering angles Thin gold foil Alpha particles Large-angle scattering Small-angle scattering Explaining Geiger and Marsdens’ results The results suggested that the positive (repulsive) charge must be concentrated at the centre of the atom. Most alpha particles do not pass close to this so pass undisturbed, only alpha particles passing very close to this small nucleus get repelled backwards (the nucleus must also be very massive for this to happen). Remember on this scale, if the nucleus is 2 cm wide, the atom would be 200 m wide! Rutherford did the calculations! Rutherford calculated theoretically the number of alpha particles that should be scattered at different angles (using Coulomb’s law). He found agreement with the experimental results if he assumed the atomic nucleus was confined to a diameter of about 10-15 metres. Closest approach Using the idea of energy conservation, it is possible to calculate the closest an alpha particle could get to the nucleus during a head-on collision. Alpha particle nucleus Closest approach Initially, the alpha particle has kinetic energy = ½mu2 K.E. = ½mu2 Closest approach At the point of closest approach, the particle reaches a distance b from the nucleus and comes momentarily to rest. K.E. = 0 b Closest approach All the initial kinetic energy has been transformed to electrical potential energy. K.E. = 0 b Closest approach Using the formula for electrical potential energy which is derived from Coulomb’s law Kinetic energy lost = Electrical potential K.E. = 0 b ½mu2 = 1 q 1q 2 4πεo b Closest approach Rearranging we get; b= 1 4πεo K.E. = 0 b q1q2 ½mu2 Closest approach For an alpha particle, m = 6.7 x 10-27 kg, q1 = 2 x (1.6 x 10-19 C) and u is around 2 x 107 m.s-1. If the foil is made of gold, q2 is 79 x (1.6 x 10-19 C). b= b= 1 q1q2 4πεo ½mu2 1 4π x 8.854 x 10-12 Fm-1 b = 2.7 x 10-14 m x (2 x 1.6 x 10-19 C) x (79 x 1.6 x 10-19 C) ½ x 6.7 x 10-27 kg x (2 x 107 m.s-1)2 The mass spectrometer A VERY useful machine for measuring the masses of atoms (ions) and their relative abundances. What is it and how does it work Mr Porter? The Mass Spectrometer ions produced velocity selector Region of magnetic field ions accelerated ion beam detector The Mass Spectrometer Substance to be tested is turned into a gas by heating. Electrons are produced at a hot cathode and accelerated by an electric field. Collision with gas particles produces ions. The Mass Spectrometer Ions acclerated by an electric field The Mass Spectrometer Ions enter the velocity selector which contains an electric field (up the page) and magnetic field (into the page) at right angles to each other. By choosing a suitable value for the magnetic field the ions continue in a straight line. i.e. The force produced by the electric filed (eE) is equal to the force produced by the magnetic field (Bev). eE = Bev The Mass Spectrometer eE = Bev or v = E/B This means that only ions with a specific velocity pass through this region. (Hence ”velocity selector”) The Mass Spectrometer The selected ions all with the same velocity (but different masses of course) enter the second region of magnetic field (also into the page). They are deflected in a circular path. The Mass Spectrometer Heavier ions continue forward and hit the sides, as do ions that are too light. Only ions of one particluar mass reach the detector. The radius of the circle is given by R = mv/eB so the mass can be calculated from m = ReB/v The Mass Spectrometer The magnetic field can be varied so that ions of different mass can be detected (higher B would mean that ions of larger mass could be directed at the detector). The Mass Spectrometer The detector can measure the numbers of ions detected, hence giving an idea of relative abundance of different ions. The Mass Spectrometer The mass spectrometer is particulary useful for identifying isotopes of the same element. Nuclear energy levels We have seen previously that electrons exist in specific energy levels around the atom. There is evidence that energy levels exist inside the nucleus too. Wow! Nuclear energy levels When a nucleus decays by emitting an alpha particle or a gamma ray, the particles or photons emitted are only at specific energies (there is not a complete range of energies emitted, only certain specific levels). Nuclear energy levels An alpha particle or photon thus has an energy equal to the difference between energy levels of the nucleus. 51.57 energy levels in 235U (MeV) 0.051 0.013 0.000 Nuclear energy levels In the alpha decay of 239Pu to 235U, the plutonium nucleus with an energy of 51.57 MeV can decay into Uranium at 3 different energy levels. 51.57 energy levels in 235U (MeV) 0.051 0.013 0.000 Plutonium-239 Nuclear energy levels If the 239Pu (51.57 MeV) decays to the ground state of 235U (0 MeV), an alpha particle of energy 51.57 MeV is emitted. 51.57 energy levels in 235U (MeV) Plutonium-239 Alpha emission (51.57 MeV) 0.051 0.013 0.000 Nuclear energy levels If the 239Pu (51.57 MeV) decays to the 2nd excited state of 235U (0.051 MeV), an alpha particle of energy 51.570.051 = 51.52 MeV is emitted. The uranium nucleus is now in an excited state so can decay further by gamma emission to the ground state. 51.57 energy levels in 235U (MeV) Plutonium-239 Alpha emission (51.52 MeV) 0.051 0.013 0.000 Gamma emission (0.051 MeV) Nuclear energy levels In fact the nucleus could decay first to the 0.013 level, and then the ground state, thus emitting two gamma photons. 51.57 energy levels in 235U (MeV) Plutonium-239 Alpha emission (51.52 MeV) 0.051 0.013 0.000 Gamma emission (0.038 MeV) Gamma emission (0.013MeV) Radioactive decay Positron? That sounds interesting, what is it? Beta (β) and positron decay (β+) decay Radioactive decay In beta decay, a neutron in the nucleus decays into a proton, an electron and an antineutrino. 1 0 n 1 1 p+ 0 -1 e + 0 0 ve Radioactive decay In positron decay, a proton in the nucleus decays into a neutron, a positron (the antiparticle of the electron) and a neutrino. 1 1 p 1 0 n+ 0 +1 e + 0 0 ve Radioactive decay We must not think that the decaying particle actually consists of the three particles in which it splits. The antineutrino The antineutrino in beta decay was not detected until 1953, although its presence had been predicted theoretically. 1 0 n 1 1 p+ 0 -1 e + 0 0 ve The antineutrino The mass of the neutron is bigger than that of the proton and electron together. 1 0 n 1.008665 u 1 1 p+ 1.007276 u 0 -1 e + 0 0 ve 0.0005486 u 1.008665u – (1.007276 + 0.0005486)u = 0.00084u The antineutrino This corresponds (using E = mc2) to an energy of 0.783 MeV. 1 0 n 1 1 p+ 0 -1 e + 0 0 ve The antineutrino This extra energy should show up as kinetic energy of the products (proton and electron). Since the electron should carry most of the kinetic energy away, so we should observe electrons with an energy of about 0.783 MeV. 1 0 n 1 1 p+ 0 -1 e + 0 0 ve In fact we observe electrons with a range of energies from zero up to 0.783 MeV. The antineutrino Where is the missing energy? In 1933 Wolfgang Pauli and Enrico Fermi hypothesized the existence of a third very light particle produced during the decay. Enrico Fermi coined the term neutrino for the ”little neutral one” 1n 0 1p 1 + 0 e -1 + 0v 0 e Ahhhhh! The little neutral one! The radioactive decay law If the number of nuclei present in a sample at t = 0 is N0, the number N still present at time t later is given by N = Noe-λt where λ is the decay constant (the probability that a nucleus will decay in unit time) The radioactive decay law N = Noe-λt No Number of original nuclei present time Half-life After one half-life, the number of original nuclei present is equal to N0/2. Putting this into the radioactive decay law; N0/2 = N0e(-λt½) where t½ is the half-life Half-life N0/2 = N0e(-λt½) taking logarithms we find λt λt ½ ½ = ln2 = 0.693 This is the relationship between the decay constant and the half-life. Measuring half-life For short half-lives, the half life can usually be measured directly. Measuring half-life For longer half lifes, values of activity can be measured and the decay law can be used to calculate λ and thus t½. Measure the activity A and chemically find the number of atoms of the isotope. Use A = λN and then λt½ = ln2 Questions! • Page 412 Questions 1, 2, 3. • Page 413 Questions 6, 7, 8, 10.