350 CHAPTER 6 Inferential Statistics
6
1
t
y y=fx(t) =2t
Two important observations are in order.
(a) For any observationxofX, 0≤x≤1.
(b)
∫ 1
0 f(x)dx= 1
(See Exercise 1, below.)
We see that the above density curve has quite a bit of “skew” to it;
in particular it’s clear that a random measurement ofXis much more
likely to produce a value greater than .5 than less than .5.
6.2.1 The normal distribution
Thenormal density functionhas the general form
f(x) =
1
√
2 πσ
e−
(^12) (x−σμ)^2
whereμandσare constants, orparameters^13 of the distribution. The
graph is indicated below forμ= 1 andσ= 2:
(^13) We’ll have much more to say about parameters of a distribution. In fact, much of our statistical
study will revolve around the parameters.