What is the need of logarithmic function in Richter scale? Is it just to simplify the value or something else? - Quora
Solved: 2. The following formula models the Richter scale which describes the magnitude, M, of an [algebra]
9.065 Applications of logarithmic functions | Year 11 Maths | NSW Mathematics Advanced 11- 2020 Edition | Mathspace
![SOLVED: The Richter scale is used to measure the magnitude (strength) of an earthquake. A commonly used formula for the magnitude of an earthquake is given by M = log10(K), where M SOLVED: The Richter scale is used to measure the magnitude (strength) of an earthquake. A commonly used formula for the magnitude of an earthquake is given by M = log10(K), where M](https://cdn.numerade.com/ask_images/b76eebbfc6a1450fa29ef4810bde42ef.jpg)
SOLVED: The Richter scale is used to measure the magnitude (strength) of an earthquake. A commonly used formula for the magnitude of an earthquake is given by M = log10(K), where M
![SOLVED: Recall that the Richter Scale equation for earthquake magnitude is given by M = 1og Arecent earthquake in China had an intensity of [ 122,942, 853 Io Find the Richter magnitude SOLVED: Recall that the Richter Scale equation for earthquake magnitude is given by M = 1og Arecent earthquake in China had an intensity of [ 122,942, 853 Io Find the Richter magnitude](https://cdn.numerade.com/ask_images/bb1534ae8c56423d8c3405ea4b60bde0.jpg)
SOLVED: Recall that the Richter Scale equation for earthquake magnitude is given by M = 1og Arecent earthquake in China had an intensity of [ 122,942, 853 Io Find the Richter magnitude
![SOLVED: Use the formula R=log((a)/(T))+B to find the intensity R on the Richter scale of the earthquakes that fit the descriptions given. Round answers to one decimal place. See Example 4. Amplitude SOLVED: Use the formula R=log((a)/(T))+B to find the intensity R on the Richter scale of the earthquakes that fit the descriptions given. Round answers to one decimal place. See Example 4. Amplitude](https://cdn.numerade.com/ask_previews/120f0daa-1e26-4c54-8c31-28379a580f08_large.jpg)