In a frequency table, the upper boundary of each class interval has aconstant ratio to the lower boundary. Show that the geometric mean G may be expressed by thelog G = xo + fi (i-1),formula:where x, is the logarithm of the mid-value of the first interval and c is the logarithm of the ratiobetween upper and lower boundaries.

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In a frequency table, the upper boundary of each class interval has a constant ratio to the lower boundary. Show that the geometric mean G may be expressed by the formula: log G = xo + f(− 1), where x, is the logarithm of the mid-value of the first interval and c is the logarithm of the ratio between upper and lower boundaries.

In a frequency table, the upper boundary of each class interval has a constant ratio to the lower boundary. Show that the geometric mean G may be expressed by the formula: log G = xo + f(− 1), where x, is the logarithm of the mid-value of the first interval and c is the logarithm of the ratio between upper and lower boundaries.

College Algebra

1st Edition

ISBN:9781938168383

Author:Jay Abramson

Publisher:Jay Abramson

Chapter6: Exponential And Logarithmic Functions

Section: Chapter Questions

Problem 33PT: Enter the data from Table 2 into a graphing calculator and graph the ranking scatter plot. Determine...

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