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Section 8D Logarithmic Scales: Earthquakes, Sounds, & Acids. Pages 519-526. 8-D. Logarithmic Scales. Earthquake strength is described in magnitude . Loudness of sounds is described in decibels . Acidity of solutions is described by pH .
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Section 8DLogarithmic Scales: Earthquakes, Sounds, & Acids Pages 519-526
8-D Logarithmic Scales Earthquake strength is described in magnitude. Loudness of sounds is described in decibels. Acidity of solutions is described by pH. Each of these measurement scales involves exponential growth. Successive numbers on the scale increase by the same relative amount. e.g. A liquid with pH 5 is ten times more acidic than one with pH 6.
8-D Earthquakes – Relative Energy
8-D Magnitude Scale
8-D Earthquakes – Relative Energy
8-D The Earthquake Magnitude Scale • The scale is designed so that each magnitude (M) represents about 32 times as much energy as the prior magnitude.
8-D Examples: Sumatra: Dec. 26, 2004 magnitude = 9 283,106 deaths Mexico earthquake: Sept. 19, 1985 magnitude = 8 9,500 deaths Since each magnitude increase (of 1) means approximately 32 times as much energy- The December Sumatra released about 32 times as much energy as the 1985 Mexico earthquake, and resulted in almost 30 times as many deaths.
8-D The Earthquake Magnitude Scale • Where is the ‘almost 32 times as much energy’ coming from? • Ah ha!
8-D New Guinea earthquake (June 25, 1976): magnitude = 7.1 energy = 1.1167×1015 joules # deaths = 422 Afghanistan earthquake (May 30, 1998): magnitude = 6.9 energy = 5.5968×1014 joules # deaths = 4000 Energy New Guinea = 1.1167×1015= 1.995 Energy Afghanistan 5.5968×1014 New Guinea earthquake was about twice as strong as the Afghanistan earthquake.
8-D Another way: New Guinea earthquake: 7.1 magnitude Afghanistan earthquake: 6.9 magnitude Difference in magnitude = 7.1-6.9 = .2
8-D Measuring Sound • The decibel scale is used to compare the loudness of sounds. • Designed so that 0 dB represents the softest sound audible to the human ear.
Typical Sounds in Decibels decibels increase by 10 and intensity is multiplied by 10.
8-D Measuring Sound • The loudness of a sound in decibels is defined by the following equivalent formulas:
8-D Example What is the loudness, in dB, of a sound 25 million times as loud as the softest audible sound?
8-D Example What is the loudness, in dB, of a sound 25 million times as loud as the softest audible sound?
8-D Example How much more intense is a 47-dB sound than a 13-dB sound?
8-D pH Scale The pH scale is defined by the following equivalent formulas: pH = log10[H+] or [H+] = 10pH where [H+] is the hydrogen ion concentration in moles per liter.
8-D Hydrogen concentration: A mole is Avogadro’s number of particles = 6×1023 particles So [H+] is measured in number of 6×1023 particles per liter
8-D pH Scale The pH scale is defined by the following equivalent formulas: pH = log10[H+] or [H+] = 10pH Pure water is neutraland has a pH of 7. [H+] = 107 = .0000007 moles/liter Acids have a pH lower than 7 Bases (alkaline solutions) have a pH higher than 7.
8-D Typical pH values
8-D Example If the pH of a solution increases from 4 to 6, how much does the hydrogen ion concentration change? Does the change make the solution more acidic or more basic? Initial concentration = [H1+] = 10-pH = 10-4 =.0001 moles/liter New concentration = [H2+] = 10-pH = 10-6 = .000001 moles/liter So it decreases by a factor of .0001 = 10-4 = 100 .000001 10-6
8-D Example If the pH of a solution increases from 4 to 6, how much does the hydrogen ion concentration change? Does the change make the solution more acidic or more basic? Pure water is neutral and has a pH of 7. Acids have a pH lower than 7 Bases have a pH higher than 7. This makes the solution more basic (less acidic).
8-D Example How much more acidic is acid rain with a pH of 3 than ordinary rain with a pH of 6? We really want to know – how many times larger is the hydrogen concentration of the acid rain than that of ordinary rain? Which means we need to look at the ratio of their hydrogen concentrations:
8-D Example How much more acidic is acid rain with a pH of 3 than ordinary rain with a pH of 6? Ordinary rain: [H+] = 10-pH = 10-6 mole per liter Acid rain: [H+] = 10-pH = 10-3 mole per liter Ratio: 10-3 = 1000 10-6 That is, this acid rain is 1000 times more acidic than ordinary rain.
8-D Homework: Pages 526-527 # 10, 12, 16, 19, 20, 26, 28, 34