Why we use logarithm?

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Why we use logarithm?

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Answer 1 · 2017-03-30T20:13:24

Some thoughts...

Explanation:

I am not sure what the context of your question is, but logarithms - especially the natural logarithm - occur naturally in a variety of circumstances.

The natural logarithm $ln x$ $ln x$ is the inverse of the exponential function $e^{x}$ $e^x$ , which has lots of interesting properties.

When you get onto calculus, you will find that the natural logarithm occurs as the integral of $\frac{1}{x}$ $1/x$ ...

$\int \frac{1}{x} d x = ln | x | + C$ $int 1/x dx = ln abs(x) + C$

Logarithms are the basis upon which slide rules work.

On a practical note, logarithms allow us to express on a linear scale the measure of physical properties that vary exponentially.

For example, the pH of a solution is $- {log}_{10}$ $-log_10$ of the hydrogen ion concentration. In pure water there are about $10^{- 7}$ $10^(-7)$ parts $O H^{-}$ $OH^-$ ions and $10^{- 7}$ $10^(-7)$ parts $H^{+}$ $H^+$ (actually $H_{3} O^{+}$ $H_3O^+$ ) ions. So neutral pH is $7$ $7$ . As a solution becomes more acidic, the concentration of $H^{+}$ $H^+$ increases and the concentration of $O H^{-}$ $OH^-$ ions decreases in proportion. So an acid with pH $1$ $1$ has a $10^{- 1}$ $10^(-1)$ concentration of $H^{+}$ $H^+$ (i.e. one part in $10$ $10$ ) and a $10^{- 13}$ $10^(-13)$ concentration of $O H^{-}$ $OH^-$ .

Another example would be decibels, which are a logarithmic measure of loudness.

If you are trying to create a model of experimental data that you suspect is exponential, then you would typically take the logarithm of measured values against a variety of input values, then use linear regression to find a line of best fit. Then reverse the logarithm by taking the exponential of that line to get an exponential curve of best fit for your data.

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Why we use logarithm?

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