Standard deviation

Description

Standart deviation indicator statisticy measures the dispersion of a price relative to its mean(mathemetical expectation) and is calculated as the square root of the variance. It is widely used in finance and trading regardless of asset class or market. For example, if trader calculates a standard deviation of his performance report as the result he will receive the measurement of volatility of his balance and equity, the higher STD means the he can expect bigger drawdown.

In case of price movement, higher STD means higher volatility of an instrument, for example if we compare two assets, the asset with higher standard deviation will be more risky for an investment.

Formula

Where: N - period of calculation(number of observations) x - price value

Most useful cases

  • Volatility measurement - the most usefull case of STD usage is to determing a statistical volatility, understanding of this value is very usefull to find best positions of potential stop loss and take profit levels. It protects existing positions of small price fluctuations and random breakout of levels.

  • Divergence/Convergence - Divergence/Convergence pattern is a form of price action when new high(low) of the price not confirmed with a new high of STD. This is a very good approach to find a weakness of existing trend.

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