Chapter 3: The Most Popular Probability Distributions 235
Variance
a.Chi square Bounded below and unbounded above. It has
two parametersa≥0, the location;ν, an integer, the
degrees of freedom. Its probability density function is
given by
e−(x+a)/^2
2 ν/^2∑∞i= 0xi−^1 +ν/^2 ai
22 ij!(i+ν/2)x≥0,where(·) is the Gamma function. The chi-square distri-
bution comes from adding up the squares ofνnormally
distributed random variables. The chi-square distribu-
tion with one degree of freedom is the distribution of
the hedging error from an option that is hedged only
discretely. It is therefore a very important distribution
in option practice, if not option theory.Chi Square
00.050.10.150.20.250.300.511.522.533.5 4a = 0b = 3