Light, Energy, & Electrons
Discrepant Events/Questions
Chapter 6 Part I
EM Spectrum Light as a wave
v=c Light as a particle
E=hv Line spectra Rydberg Equation Bohr’s Hydrogen Model Hydrogen Equation Wave equation of matter
Dual nature of light…
Light is a wave Light is a particle
Light as a wave….
Light acts as a wave Evidence:
Polarization
Light acts as a wave…
More Evidence Diffraction Grating (Prism)
Light acts as a wave…
More Evidence Laser Laser with Colored Lens Flashlight with 2 colored lenses 3D
Filtering Colored flashlight on other colors
Parts of a “wave”
Wavelength The distance between two adjacent peaks (or
troughs)
Parts of a “wave”
Frequency The number of waves that pass a given point
per second Frequency & Wavelength are related by:
vc V= Frequency C=speed of light (2.998 x 108 m/s) wavelength
SAMPLE EXERCISE 6.2 Calculating Frequency from Wavelength
The yellow light given off by a sodium vapor lamp used for public lighting has a wavelength of 589 nm. What is the frequency of this radiation?
Solution
Analyze: We are given the wavelength, of the radiation and asked to calculate its frequency, .Plan: The relationship between the wavelength (which is given) and the frequency (which is the unknown) is given by Equation 6.1. We can solve this equation for and then use the values of and c to obtain a numerical answer. (The speed of light, c, is a fundamental constant whose value is given in the text or in the table of fundamental constants on the back inside cover.)
Solve: Solving Equation 6.1 for frequency gives = c/ . When we insert the values for c and , we note that the units of length in these two quantities are different. We can convert the wavelength from nanometers to meters, so the units cancel:
Check: The high frequency is reasonable because of the short wavelength. The units are proper because frequency has units of “per second,” or s–1.
PRACTICE EXERCISE
(a) A laser used in eye surgery to fuse detached retinas produces radiation with a wavelength of 640.0 nm. Calculate the frequency of this radiation. (b) An FM radio station broadcasts electromagnetic radiation at a frequency of 103.4 MHz (megahertz; MHz = 106 s–1). Calculate the wavelength of this radiation.
Answers: (a) 4.688 1014 s–1, (b) 2.901 m
EM Spectrum
Electromagnetic Radiation All forms of energy that have “wave-like”
behavior” Electromagnetic Spectrum
A full scale of all the forms of EM radiation
Looking at the spectrum…
Why does Tennent do such a good job of blocking some waves?
Why do microwave windows have a grid?
Light as a Particle
Treating light as a wave accounts for a lot of behaviors, but not all
Examples: Why heated objects act
as they do (Their color changes) Why metals eject electrons
when certain lights shine on them (solar cells)
Energy Relates to Frequency
Absorbing & Emitting Energy Objects can only absorb/emit energy in
certain amounts (packets, quantum) Energy can be determined by:
E = H * frequency of light
Energy Constant Light Emitted or Absorbed
H = 6.626 x 10-34 Js
Quantized Energy
What if energy in a car was “quantized”? This would mean your car can only go at
certain speeds (10, 20, 30mph). Why doesn’t this happen?
Photoelectric Effect Light of certain frequencies can force electrons
out of metals solar cells (Calculators etc.)
Light Intensity does not matter – only frequency Photon: energy packet
Photoelectric Effect
SAMPLE EXERCISE 6.3 continued
Answers: (a) 3.11 10–19 J, (b) 0.16 J, (c) 4.2 1016 photons
PRACTICE EXERCISE(a) A laser emits light with a frequency of 4.69 x 1014 s–1. What is the energy of one photon of the radiation from this laser?(b) If the laser emits a pulse of energy containing 5.0 x 1017 photons of this radiation, what is the total energy of that pulse? (c) If the laser emits 1.3 10–2 J of energy during a pulse, how many photons are emitted during the pulse?
Flame Tests
What was responsible for the different colors?
What can we narrow it down to?
Low-Pressure High Voltage Gas Tubes
What color do you “see”? What color is given off? Are there any other wavelengths given off?
Continuous vs. Line Spectrum
Line Spectrum
Continuous Spectrum
Continuous vs. Line Spectrum
Continuous: The rainbow of colors containing all wavelengths
Line Spectrum: Spectrum containing radiation of only specific wavelengths
Balmer & Rydberg
Mid-1800’s Johann Balmer showed how the wavelengths of the 4
visible lines fit a formula Additional lines found
Ultraviolet & infrared regions
Rydberg Equation Calculation of the spectral lines of Hydrogen
Bohr’s Model
Bohr wanted to describe the hydrogen line spectrum more fully
“Planetary” model of electrons 3 Main Points:
1. Only orbits of certain “radii”, corresponding to certain energies, are allowed for an electron
2. An electron in a “level” has a certain energy 3. Energy is emitted or absorbed only when the
electron changes from one level to another
Bohr’s Model Summarized
Atom has distinct energy levels, starting with n=1 then n=2, n=3…
Ground State: lowest energy level When excited, it jumps to a higher state (excited
state)
When it goes back down, it emits energy (light) ‘Step ladder’
Small orbit = low energy stateLarge orbit = high energy state
Bohr Model ft. Rydberg
Rydberg’s equation showed wavelength
Bohr derived energy from this E=hv and v=c
Bohr’s Line Spectra Energy of light given off is due to how far
the electron is ‘falling’ through levels Not all of it is visible
Different jumps give different wavelengths
Grouped in “series” Lyman series: Emits light in the UV region Balmer series: Emits light in the visible spectrum Paschen series: Emits light in the IR region
Figure 4.16 – Prentice Hall Chemistry
1. It neither emits nor absorbs energy.
2. It both emits and absorbs energy simultaneously.
3. It emits energy.
4. It absorbs energy.
1. It neither emits nor absorbs energy.
2. It both emits and absorbs energy simultaneously.
3. It emits energy.
4. It absorbs energy.
Predict which of the following electronic transitions will produce the longest wavelengthspectral line.
1. n = 4 to n = 22. n = 5 to n = 23. n = 5 to n = 34. n = 6 to n = 4
Correct Answer:
1. n = 4 to n = 22. n = 5 to n = 23. n = 5 to n = 34. n = 6 to n = 4
The wavelength increases as frequency decreases. The lowest frequency (longest wavelength) is associated with the lowest energy, and the smallest energy difference here is between n = 6 and n = 4.
Practice Exercise 6.4
Indicate whether each of the following electronic transitions emits energy or requires the absorption of energy: (a) n = 3 to n = 1; (b) n = 2 to n = 4 .
Answers: (a) emits energy, (b) requires absorption of energy
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