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2.4 Continuous r.v. Definition2.8---P35 Suppose that F(x) is the distribution function of r.v. X,if there exists a nonnegative function f(x),(-<x<+),such that for any x,we have F ( x)=P( X x)= x f (t )dt The function f(x) is called the Probability density function (pdf)of X, i.e. X~ f(x) , (-<x<+) The geometric interpretation of density function Properties of f(x)-----P35 (1) f ( x ) 0 ; ( 2) f ( x ) d x 1; f ( x) Note: S f ( x)d x 1 1 o x (1) and (2) are the sufficient and necessary properties of a density function Suppose that the density function of X is specified by 0 x 3, kx, x f ( x) 2 , 3 x 4, 2 ot her wi es 0, Try to determine the value of K. P36 (3) For any a ,if X~ f(x), (<x<),then P{X=a}=0。 Proof Assume that x 0, then X a a x X a Therefore 0 P{X a} P a x X a F a F a x F x is right continuous x 0 F a F a x P{X a} 0 P{a X b} P{a X b} P{a X b} P{a X b}. P35 4 P{x1 X x2} F ( x2 ) F ( x1 ) x2 x1 f ( x)d x ; f ( x) S1 1 Proof x1 x2 o x P{x1 X x2 } P{x1 X x2 } F ( x2 ) F ( x1 ) x2 x1 x2 x1 f ( x) d x f ( x) d x f ( x ) d x. b P{a X b} P{a X b} P{a X b} P{a X b} a f ( x)d x. P35 (5) If x is the continuous points of f(x), then dF ( x) f ( x) i.e.F ( x ) f ( x ) dx Note:P36---(1) Example1 Suppose that the density function of X is specified by 1 0 x 3, 6 x, x f ( x) 2 , 3 x 4, 2 ot her wi es 0, Try to determine 1)the value of K 2)the d.f. F(x), 3)P(1<X≤3.5) 4)P(x=3) 5)P(x>3.5∣x>3) Example2 Suppose that the distribution function of X is specified by x 1 0 F ( x) ln x 1 x e 1 xe Try to determine (1) P{X<2},P{0<X<3},P{2<X<e-0.1}. (2)Density function f(x) Several Important continuous r.v. f (x) 1. Uniformly distribution 1 if X~f(x)= b a , a x b 0, el se 0 。 。 a b It is said that X are uniformly distributed in interval (a, b) and denote it by X~U(a, b) For any c, d (a<c<d<b),we have 1 d c P{c X d }= f ( x)dx= dx= c c ba ba d d x Example 2.14-P38 2. Exponential distribution f (x) e x , x 0 If X~ f ( x )= 0, x 0 x 0 It is said that X follows an exponential distribution with parameter >0, the d.f. of exponential distribution is 1 e x , x 0 F ( x)= 0, x 0 Example Suppose the age of a electronic instrument电子仪器 is X (year), which follows an exponential distribution with parameter 0.5, try to determine (1)The probability that the age of the instrument is more than 2 years. (2)If the instrument has already been used for 1 year and a half, then try to determine the probability that it can be use 2 more years. 0.5e0.5x x 0 f ( x) x 0, 0 (1)P{X 2} 0.5e0.5xdx e 1 0.37 2 ( 2) P{ X 3.5 | X 1.5} P{ X 3.5, X 1.5} P{ X 1.5} 0.5x 0.5e dx 3.5 0.5x 0.5e dx 1.5 e 1 0.37 3. Normal distribution The normal distribution are one the most important distribution in probability theory, which is widely applied In management, statistics, finance and some other areas. B A Suppose that the distance between A,B is ,the observed value of is X, then what is the density function of X ? Suppose that the density function of X is specified by 1 X ~ f ( x) e 2 x 2 2 2 x where is a constant and >0 ,then, X is said to follows a normal distribution with parameters and 2 and represent it by X~N(, 2). Two important characteristics of Normal distribution (1) symmetry the curve of density function is symmetry with respect to x= and f()=max f(x)= 1 . 2 (2) influences the distribution ,the curve tends to be flat, ,the curve tends to be sharp, 4.Standard normal distribution A normal distribution with parameters =0 and 2=1 is said to follow standard normal distribution and represented by X~N(0, 1)。 the density function of normal distribution is 1 e 2 ( x) x2 2 , x . and the d.f. is given by ( x ) P { X x } 1 2 x e t2 2 dt , x The value of (x) usually is not so easy to compute directly, so how to use the normal distribution table is important. The following two rules are essential for attaining this purpose. Note:(1) (x)=1-(-x); (2) If X~N(, 2),then F ( x ) P{ X x } ( x ). 1 X~N(-1,22), P{-2.45<X<2.45}=? 2. XN(,2), P{-3<X<+3}? EX 2 tells us the important 3 rules, which are widely applied in real world. Sometimes we take P{|X- |≤3} ≈1 and ignore the probability of {|X- |>3} Example The blood pressure of women at age 18 are normally distributed with N(110,122).Now, choose a women from the population, then try to determine (1) P{X<105},P{100<X<120};(2)find the minimal x such that P{X>x}<0.05 105 110 Answer: () 1 P{ X 105} 0.42 1 0.6628 0.3371 12 120 110 100 110 P{100 X 120} 12 12 0.83 0.83 2 0.7967 1 0.5934 ( 2) Let P{X x} 0.05 x 110 1 0.05 12 x 110 0.95 12 x 110 1.645 12 x 129.74 Example 2.15,2.16,2.17,2.18-P40-42 Homework: P50--- Q15,18 P51: 17,19,