Continuous Random Variable: Difference between revisions

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The probability density function (pdf) maps a continuous variable to a
The probability density function (pdf) maps a continuous variable to a
probability density. As the name "density" suggests, the area under the
probability density. As the name "density" suggests, the area under the
pdf curve between a range is the probability of the variable being in
pdf curve between a range is the probability of the variable being in that range.
that range.
 
<math>
P(c \leq x \leq d) = \int_c^d f(x) dx = F(d) - F(c)
</math>
 
 
Total area under the curve must be <math> 1 </math>, as chances of
events happening is 100% if the range includes all possible events.
 
<math>
\int_-\infty^\infty f(x) dx = 1
</math>


= Uniform Distribution <math> X \sim Uniform(a, b) </math> =
= Uniform Distribution <math> X \sim Uniform(a, b) </math> =
<math> a </math> is minimum, and <math> b </math>
<math> a </math> is minimum, and <math> b </math>

Revision as of 07:29, 1 March 2024

Continuous random variables have an inifinite number of values for any given interval. While similar, the approach to analysis is very different from discrete variables

  • Summation becomes integration
  • Probability becomes area under a curve

Probability Distribution Function

The probability density function (pdf) maps a continuous variable to a probability density. As the name "density" suggests, the area under the pdf curve between a range is the probability of the variable being in that range.


Total area under the curve must be , as chances of events happening is 100% if the range includes all possible events.

Uniform Distribution

is minimum, and