Properties of a normal curve

Properties Of A Normal Curve. In probability theory a normal or Gaussian or Gauss or LaplaceGauss distribution is a type of continuous probability distribution for a real-valued random variable. Mathematically a normal distribution is defined by the equation. The normal curve is unimodal 3. The curve is bellshaped with the highest point over the mean μ.

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The mean median and mode are equal. That is to say the area from negative infinity to one S away from the mean is always the same. 2 There is one maximum point of normal curve which occur at mean. Area Under the Normal Distribution Curve. In a normal distribution the mean mean and mode are equalie Mean Median Mode. Most of the cases are average in the measured trait and their percentage in the total population is about 6826.

Mathematically a normal distribution is defined by the equation.

Properties of normal distribution 1 The normal curve is bell shaped in appearance. The normal curve is symmetrical. A normal distribution comes with a perfectly symmetrical shape. Mean median and mode coincide 4. The height of the curve declines symmetrically and Others. The curve is bellshaped with the highest point over the mean μ.

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