SECTION 6.3 Parameters and Statistics 365
- LetXbe an exponential random variable with failure rateλ, and
letY =X^1 /α, α >0. Using the idea developed on page 353, com-
pute the density function forY. This gives the so-calledWeibull
distribution.
6.3 Parameters and Statistics
Suppose that we have a continuous random variableXhaving density
functionfX. Associated with this random variable are a fewparame-
ters, themean(and also themedian and themode) and the vari-
anceofX. In analogy with discrete random variables they are defined
as follows.
Mean of X. We set
E(X) = μX =
∫∞
−∞
xfX(x)dx.
Median of X. This is just the half-way point of the distribution,
that is, ifmis the median, we haveP(X≤m) =^12 =P(X≥m).
In terms of the density function, this is just the valuemfor which
∫m
−∞fX(x)dx =
1
2
.
Mode ofX. This is just the value ofxat which the density function
assumes its maximum. (Note, then, that the mode might not be
unique: a distribution might be “bimodal” or even “multimodal.”)
Themean,median, andmodemeasure “central tendency.”
Variance of X. We set
Var(X) = σ^2 X = E((X−μX)^2 ).
As we shall see below,