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Chapter 7 Atomic Structure Dr. S. M. Condren
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ELECTROMAGNETIC RADIATION
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Electromagnetic Spectrum
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Electromagnetic Radiation
Electromagnetic wave A wave of energy having a frequency within the electromagnetic spectrum and propagated as a periodic disturbance of the electromagnetic field when an electric charge oscillates or accelerates. Dr. S. M. Condren
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Electromagnetic Radiation
Electromagnetic wave wavelength frequency amplitude Dr. S. M. Condren
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Electromagnetic Radiation
Figure 7.1 Dr. S. M. Condren
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Wave motion: wave length and nodes
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Wave Nature of the Electron
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Electromagnetic Radiation
Waves have a frequency Use the Greek letter “nu”, , for frequency, and units are “cycles per sec” Use the Greek letter “lambda”, l, for wavelength, and units are “meters” All radiation: • = c c = velocity of light = 3.00 x 108 m/sec Long wavelength --> small frequency Short wavelength --> high frequency Dr. S. M. Condren
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Electromagnetic Radiation
Long wavelength --> small frequency Short wavelength --> high frequency increasing frequency increasing wavelength Dr. S. M. Condren
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Fireworks Dr. S. M. Condren
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Flame Tests Dr. S. M. Condren
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The Electric Pickle Excited atoms can emit light.
Here the solution in a pickle is excited electrically. The Na+ ions in the pickle juice give off light characteristic of that element. Dr. S. M. Condren
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Line Emission Spectrum
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Electromagnetic Radiation
Example: Calculate the frequency, n, of red light that has a wavelength, l, of 700. nm. = (1/700. nm)(109nm/1m)(3.00x108m/sec) = 4.29x1014 s-1 = 4.29x1014 cycles/s = 4.29x1014 hertz Dr. S. M. Condren
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Electromagnetic Radiation
Short wavelength --> high frequency high energy Long wavelength --> small frequency low energy Dr. S. M. Condren
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Black Body Radiation http://www.cbu.edu/~mcondren/C11599/BBvis.mov
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Experiment demonstrates the particle nature of light.
Photoelectric Effect Experiment demonstrates the particle nature of light. Dr. S. M. Condren
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Energy of Radiation Energy of 1.00 mol of photons of red light.
E = h• = (6.63 x J•s)(4.29 x 1014 s-1) = x J per photon E per mol = (2.85 x J/ph)(6.02 x 1023 ph/mol) = kJ/mol This is in the range of energies that can break bonds. Dr. S. M. Condren
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Spectra Line Spectrum A spectrum produced by a luminous gas or vapor and appearing as distinct lines characteristic of the various elements constituting the gas. Emission Spectrum The spectrum of bright lines, bands, or continuous radiation characteristic of and determined by a specific emitting substance subjected to a specific kind of excitation. Absorption Spectrum Wavelengths of light that are removed from transmitted light. Dr. S. M. Condren
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Atomic Line Emission Spectra
and Niels Bohr Bohr’s greatest contribution to science was in building a simple model of the atom. It was based on an understanding of the SHARP LINE EMISSION SPECTRA of excited atoms. Niels Bohr ( ) Dr. S. M. Condren
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Energy of state = - C/n2 Atomic Spectra and Bohr
Bohr said classical view is wrong. e- can only exist in certain discrete orbits — called stationary states. e- is restricted to QUANTIZED energy states. Energy of state = - C/n2 where n = quantum no. = 1, 2, 3, 4, .... Dr. S. M. Condren
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Bohr Atom Dr. S. M. Condren
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Energy States Ground State
The state of least possible energy in a physical system, as of elementary particles. Also called ground level. Excited States Being at an energy level higher than the ground state. Dr. S. M. Condren
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Energy Adsorption/Emission
Active Figure 7.11 Dr. S. M. Condren
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Atomic Spectra and Bohr
C has been found from experiment (and is now called R, the Rydberg constant) R (= C) = kJ/mol or 3.29 x 1015 cycles/sec so, E of emitted light = (3/4)R = x 1015 sec-1 and l = c/n = nm This is exactly in agreement with experiment! Dr. S. M. Condren
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Line Emission Spectra of Excited Atoms
High E Short High Low E Long Low Visible lines in H atom spectrum are called the BALMER series. Dr. S. M. Condren
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Origin of Line Spectra Balmer series Active Figure 7.12
Paschen series Balmer series Active Figure 7.12 Dr. S. M. Condren
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Atomic Line Spectra and Niels Bohr
Bohr’s theory was a great accomplishment. Rec’d Nobel Prize, 1922 Problems with theory — theory only successful for H. introduced quantum idea artificially. So, we go on to QUANTUM or WAVE MECHANICS Niels Bohr ( ) Dr. S. M. Condren
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Quantum or Wave Mechanics
Schrodinger applied idea of e- behaving as a wave to the problem of electrons in atoms. He developed the WAVE EQUATION Solution gives set of math expressions called WAVE FUNCTIONS, Each describes an allowed energy state of an e- Quantization introduced naturally. E. Schrodinger Dr. S. M. Condren
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WAVE FUNCTIONS, •is a function of distance and two angles. • Each corresponds to an ORBITAL — the region of space within which an electron is found. • does NOT describe the exact location of the electron. • 2 is proportional to the probability of finding an e- at a given point. Dr. S. M. Condren
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Uncertainty Principle
Problem of defining nature of electrons solved by W. Heisenberg. Cannot simultaneously define the position and momentum (=m*v) of an electron. We define e- energy exactly but accept limitation that we do not know exact position. W. Heisenberg Dr. S. M. Condren
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Types of Orbitals s orbital p orbital d orbital Dr. S. M. Condren
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Orbitals s orbitals p orbitals d orbitals f orbitals
No more than 2 e- assigned to an orbital Orbitals grouped in s, p, d (and f) subshells s orbitals also p orbitals d orbitals f orbitals Dr. S. M. Condren
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1 3 5 7 2 6 10 14 s orbitals p orbitals d orbitals f orbitals
No. orbs. 1 3 5 7 No. e- 2 6 10 14 Dr. S. M. Condren
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n (principal) => shell l (angular) => subshell
QUANTUM NUMBERS The shape, size, and energy of each orbital is a function of 3 quantum numbers: n (principal) => shell l (angular) => subshell ml (magnetic) => designates an orbital within a subshell s (spin) => designates the direction of spin Dr. S. M. Condren
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Symbol Values Description
QUANTUM NUMBERS Symbol Values Description n (principal) 1, 2, 3, .. Orbital size and energy where E = -R(1/n2) l (angular) 0, 1, 2, .. n-1 Orbital shape or type (subshell) ml (magnetic) -l..0..+l Orbital orientation # of orbitals in subshell = 2 l + 1 s (spin) -1/2 or +1/2 Direction of spin of electron Dr. S. M. Condren
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Types of Atomic Orbitals
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Atomic Orbitals Types of orbitals found in the known elements: s, p, d, and f schools play defensive football Packer version: secondary pass defense fails Dr. S. M. Condren
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S Orbitals 1s 2s 3s Dr. S. M. Condren
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p Orbitals The three p orbitals lie 90o apart in space
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3px Orbital 2px Orbital Dr. S. M. Condren
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d Orbitals 3dxy Orbital 3dxz Orbital 3dyz Orbital 3dx2- y2 Orbital
3dz2 Orbital Dr. S. M. Condren
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