???0axedx????x??0axde???x??axe?x|0??????0aedx?x

????????????????????ae?x|0?a得到 a?1.

x?0,F(x)?0, x?0,F(x)??x0tedt???tde0?x?tx?t??te?x?t|0??edt0?xxx?t

?????????????????????xe?e?t|?1?xex0?e,?0,??????????????????????x?0,F(x)??. ?x?x1?xe?e,???x?0.?

11. 解 1) 不能,由于不是单调不减；

2) 不能,由于不是单调不减；

3) 能,其他场合定义F(x)?1,x?0．

?2x,??0?x?1,12. 解 1) 是连续型随机变量，f(x)??

?0,??????其他.2) 不是，由于连续型随机变量取值与一点的概率为0，而P(X?1)?1/2．

13. 解 由规范性得到?????f(x)dx?1，

?x?????ae?|x|dx???12??02ade?2ae?x|0?2a ,

??得到 a?.

x?0,F(x)?x?0,F(x)???x??0??1212edt?exdx??t12x0e?x,

?t?12edt?12?e?t|0?1?x12e?x,

?1?xe,??????????????????????x?0,??2. F(x)???1?1e?x,?????????????????x?0.??2

214. 解 由方程 4x?4?x???2?0有实根得到

??16??16(??2)?0，

2解得 ??2????or????????1,

由于????U(0,5)，所以P(??2)?3/5．

15. 解 设Y为四次取值大于发生a的次数，则Y?b(4,p)，其中

p?P(X?a)?1?a,(0?a?1)

又 P(Y?1)?1?P(Y?0)?0.9，P(Y?0)?a?0.1 解得 a?0.5623.

4 13

16. 解 1) P(X?a)?P(??1X?52?a?52a2)?0.9,查标准正态分布表得到

(0.9)?1.2816,解得a? 7.5631.

|X?5|2?)?0.01,

2) P(|X?5|?a)?P(P(|X?5|2?aaa)?2??()?0.01,得到?()=0.995 222查标准正态分布表得到??1(0.995)=2.5758,a? 5.1517.

17. 解 设优秀的最低分为a,数学成绩为X,根据条件得到

P(X?a)?0.05,P(X?7010?a?7010)?0.95

查标准正态分布表得到??1(0.95)?1.645,解得 a?86.45.

18. 解

R 10 11 12 13 ξ 20π 22π 24π 26π η 100π 121π 144π 169π P 0.1 0.4 0.3 0.2

19. 证明 当a????y?b???时

F(y)?P(Y?y)?P(?X???y)?P(X?y??y???)

?p(y)???a1b?adx?1b?a(y????a)?y???a?b??a?,

1b??a?,a????y?b???,

其他 p(y)?0

1?,???????????a????y?b???,? p(y)??b??a??0,????????????????????????????????????????????????其他.?即Y服从[a???,b???]的均匀分布,

20. 解 1) 当y?0时

1F(y)?P(Y?y)?P(X?y)?P(X?y3)

13 ?p(y)??y301edx?1?e?213?x?y3,

13其他 p(y)?0

?21ye?y3,y?0,

1?13?y3??y?ye,?????y?0,?1?e3,??????????y?0,p(y)??3,F(y)??

??0,????????????????????其他.?0,????????????????????其他.? 14

2) 当0?y?1时

F(y)?P(Y?y)?P(e?X?y)?P(X??lny)?????lny?xedx?y,

p(y)?y,0?y?1, 其他 p(y)?0.

,y?0,?0?????????y,??????y?1,??,?y?1 F(y)??y???????? ,p(y)??0,?????????其他.??1?????????y?1?,

21. 解 1) 当1?y?e时，

F(y)?P(Y?y)?P(eX?y)?P(X?lny)??lny0dx,

p(y)?1y,1?y?e,

其他 p(y)?0

?1?,??????????????????1?y?e, p(y)??y?0,??????????????????其他.?2) 当0?y???时

?yF(y)?P(Y?y)?P(2lnX?y)?P(X?ep(y)?1?y2)??1?ye2dx.,

2其他 p(y)?0.

e2,0?y???,

?1?2y?e,????????????0?y???, p(y)??2?0,??????????????????其他.?3) 当1?y???时 F(y)?P(Y?y)?P(p(y)?1y21X?y)?P(X?1y)??11ydx.,

,1?y???,

其他 p(y)?0

?1?2,????????1?y???, p(y)??y?0,??????????????????其他.?

22. 解 1) 当y?0时

F(y)?P(Y?y)?P(eX?y)?P(X?lny)??lny??12?e?x22dx.,

p(y)?1y12?e?lny22,y?0,

15

其他 p(y)?0

lny?11?e2,????y?0,? p(y)??y2??.?0,??????????????????????其他.22) 当y?0时

F(y)?P(Y?y)?P(e?X?y)?P(X??lny)?????lny12?e?x22dx.,

p(y)?1y12?e?lny22,y?0,

其他 p(y)?0

lny?11?e2,????y?0,? p(y)??y2??.?0,??????????????????????其他.3) 当y?0时

2F(y)?P(Y?y)?P(|X|?y)?P(?y?X?y)??y?y12?e?x22dx.,

p(y)?212? 其他 p(y)?0

e?y22,y?0,

y??1e2,???????y?0,?2p(y)?? 2??.?0,??????????????????????其他.2

23. 证明 不妨设a?0

F(y)?P(Y?y)?P(aX?b?y)?P(X?y?b1), aa同理可得a?0的情形. f(y)?fX(y?bay?b)??a??fX(x)dx

24. 解 由上题的结论可得

y??时,f(y)?y??,f(y)?0

??e??y???

分布密度函数为

??????y?,?????y??,?e f(y)????0,????????????????y??.?

25. 解 设年化收益率为r,r?lnXX0?lnX?lnX0

16