Chapter 1.
1.1 Problem Statement
The Gutenberg-Richter Law states that the number, N, of earthquakes per year worldwide of Richter magnitude at least M satisfies an approximate relation log10(N) = a − M for some constant a. Find a, assuming that there is one earthquake of magnitude M ≥ 8 per year. How many earthquakes of magnitude M ≥ $b occur per year?
1.2 Step 1
In the logarithmic equation, log10(N) = a − M, we can solve for either M, N, or a when we are given values for two others.
We'll solve this equation first for a.
If there is one earthquake of magnitude 8 or greater per year, then, by substituting appropriately and simplifying, we get the following.
Question Sequence
Question 1.1
log10(N) = a − M
log10(0VV1JcqyBrI=) = a - nc1ItEz0kR4=
Question 1.2
a = nc1ItEz0kR4=
1.3 Step 2
Question Sequence
Question 1.3
Substituting a = $a, the Gutenberg-Richter Law is log10(N) = $a − M.
For earthquakes of magnitude $b or greater, log10(N) = bPyFmFRwwelQ4hp0.
Question 1.4
To solve for N, we need the logarithm fact blogb(x): = pdlFLKGakEU= for any x ≥ 0 and any positive constant base b ≠ 1.
Question 1.5
In Step 3, we will apply this logarithm fact: 10log10(N) = Z83Mh9jMmzQ=.
1.4 Step 3
Thus, rewrite the equation, log10(N) = $diff, such that both sides become the exponent of 10. (Some authors refer to this as "exponentiating" both sides of the equation). We choose 10 for the base of the exponent since the given logarithm is base 10 and knowing that .
Question Sequence
Question 1.6
log10(N) = $diff
(Pz2PEfhsNWI=)$diff
Question 1.7
The expected number of earthquakes of magnitude $b or greater is as follows.
N = qjqZz1N+poo=