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Title: John A. Schreifels

1
Chapter 7

2
Overview

3
The Wave Nature of the Light

Atomic structure elucidated by interaction of
matter with light.
Light properties characterized by wavelength, ?,
and frequency,?.
Light electromagnetic radiation, a wave of
oscillating electric and magnetic influences
called fields.
Frequency and wavelength inversely proportional
to each other.
c ??
where c the speed of light 3.00x108 m/s
units ? s?1, ? m
E.g. calculate the frequency of light with a
wavelength of 500 nm.
E.g.2 calculate the frequency of light if the
wavelength is 400 nm.

4
Electromagnetic Radiation and Atomic Spectra - 2

Line spectra result from the emission of
radiation from an excited atom.
Spectrum characteristic pattern of wavelengths
absorbed (or emitted) by a substance.
Emission Spectrum spontaneous emission of
radiation from an excited atom or molecule.
Line Spectrum spectrum containing only certain
wavelengths.
Balmer hydrogen has a line spectrum in the
visible region with wavelengths of 656.3 nm,
486.1 nm, 434.0 nm, 410.1 nm.
Balmer equation where n 3.

5
Quantized Energy and Photons

Light wave arriving as stream of particles
called "photons".
Each photon quantum of energy
where h (Planck's constant) 6.63x10?34Js.
An increase in the frequency an increase in the
energy
An increase in the wavelength gives an decrease
in the energy of the photon.
E.g. determine the energies of photons with
wavelengths of 650 nm, 700 nm and
frequencies 4.50x1014 s?1, 6.50x1014 s?1
Photoelectric effect E h? ? ? where ?
constant
the energy of the electron is directly related to
the energy of the photon.
the threshold of energy must be exceeded for
electron emission.
The total energy of a stream of particles
(photons) of that energy will be where n
1, 2, (only discrete energies).

6
Bohrs Model of the Hydrogen Atom

Line spectra in other spectral regions also were
observed
Lyman series ultraviolet
Paschen, Brackett, Pfund infrared
Balmer-Rydberg equation predicted the wavelengths
of emission.
where m 1, 2, 3, and n 2, 3, (always at
least m 1
Longest wavelength observed when n m 1.
Shortest wavelength observed when n ?.
E.g. Determine the wavelength of emission for the
first line in the Paschen series (m 3, n 4).
E.g. Determine the shortest wavelength in the
Paschen series (m 3 and n ?).

7
Bohr model of the Hydrogen Atom II

Duality of matter led to the hypothesis that
electrons behave as waves.
Bohr model assumed
Only circular orbits around the nucleus and that
the angular momentum around the atom must be
quantized.
Stable orbital where constructive interference
occurs.
Assumption led to the conclusions
Radius of an orbital rn n2r1.
Energy of an orbital En E1/n2
?21.93x10?19J/n2 where E1 energy of the most
stable hydrogen orbital. E1ltE2ltE3.
Most stable state E1,r1 ground state.
Higher energy states excited states.
A photon is emitted when the electron moves from
a higher energy state to a lower one.
Photon energy equals the difference in energy of
the two states.

8
Bohr model of the Hydrogen Atom III

If Ei the initial state energy and Ef final
state energy, then the energy of the transition
would be ?E Ei ? Ef.
R Rydberg constant 1.097x107m?1.
Theory and experiment agree for hydrogen and
hydrogen-like particles.

9
Wave Nature of Matter

Light behaves like matter since it can only have
certain energies.
Light had both wave- and particle-like properties
? matter did too.
Einstein equation helps describe the duality of
light
E mc2 Particle behavior
E h? Wave behavior
Wave and particle behavior
Duality of matter expressed by replacing the
speed of light with the speed of the particle to
get
where ? called the de Broglie wavelength of any
moving particle.
E.g. determine the de Broglie wavelength of a
person with a mass of 90 kg who is running 10
m/s.

10
Quantum Mechanics Hydrogen

Bohr model did not work with multielectron atoms,
i.e. line spectra not predicted.
Quantum mechanics provides universal description
of the electron distribution in atoms.
Heisenberg uncertainty principle impossible to
determine the position and momentum with absolute
precision or (position uncertainty)(momentum
uncertainty) ?
Schroedinger used wave concepts to derive the
wave equation.Electrons allowed to be in
anywhere.
Solution of the Schroedinger three dimensional
wave equation, ?, led to the discrete energy
levels of the hydrogen atom.
Lowest level is spherical.
Predicts distribution of electrons in other
elements.

11
Quantum Mechanics and Atomic Orbitals

The first orbital of all elements is spherical.
Other orbitals have a characteristic shape and
position as described by 4 quantum numbers
n,l,ml,ms. All are integers except ms
Principal Quantum Number (n) an integer from
1... Total e? in a shell n2.
Angular quantum number (l). (permitted values l
0 to n?1) the subshell shape.
Common usage for l 0, 1, 2, 3, 4, and use s, p,
d, f, g,... respectively.
Subshell described as 1s, 2s, 2p, etc.
Magnetic quantum number,ml, (allowed ?l to l )
directionality of an l subshell orbital.
Total number of possible orbitals is 2l1.
E.g. s and p subshells have 1 3 orbitals,
respectively.
Spin quantum number,ms (allowed values ?1/2).
Due to induced magnetic fields from rotating
electrons.
Pauli exclusion principle no two electrons in an
atom can have the same four quantum numbers.

12
Permissible Quantum States
13
Figure 7.23 Orbital energies of the hydrogen
atom.
14
Orbital Energies of Multielectron Atoms

All elements have the same number of orbitals
(s,p, d, and etc.).
In hydrogen these orbitals all have the same
energy.
In other elements there are slight orbital energy
differences as a result of the presence of other
electrons in the atom.
The presence of more than one electron changes
the energy of the electron orbitals (click here)