发布时间 : 星期四 文章《概率论与数理统计》第三版-科学出版社-课后习题答案更新完毕开始阅读b228736c3b68011ca300a6c30c2259010202f326
2.21(1)
当?1?x?1时,F(x)?P{X??1}?0.3
当1?x?2时,F(x)?P{X??1}?P{X?1}?0.3?P{X?1}?0.8
P{X?1}?0.8?0.3?0.5
当x?2时,F(x)?P{X??1}?P{X?1}?P{X?2}?0.8?P{X?2}?1
P{X?2}?1?0.8?0.2
X P (2)
-1 0.3
1 0.5
2 0.2
P{Y?1}?P{X??1}?P{X?1}?0.3?0.5?0.8 P{Y?2}?P{X?2}?0.2
Y
qi
1 0.8
22 0.2
1?x22.22QX~N(0,1)?fX(x)?e2?(1)设FY(y),fY(y)分别为随机变量Y的分布函数和概率密度函数,则
y?1x?y?11FY(y)?P{Y?y}?P{2X?1?y}?P{X?}??2e2dx ??22?2对FY(y)求关于y的导数,得fY(y)?1e2?y?(??,?)
y?12)?22((y?11)??e222??(y?1)28
(2)设FY(y),fY(y)分别为随机变量Y的分布函数和概率密度函数,则
当y?0时,FY(y)?P{Y?y}?P{e?X当y?0时,有
FY(y)?P{Y?y}?P{e?X?y}?P{?X?lny}?P{X??lny}????y}?P{?}?0
?lny1e2??x22dx
对FY(y)求关于y的导数,得
(lny)?1?(?lny)?1e2(?lny)??e2??fY(y)??2?2?y??022y>0
y?0
(3)设FY(y),fY(y)分别为随机变量Y的分布函数和概率密度函数,则
当y?0时,FY(y)?P{Y?y}?P{X2?y}?P{?}?0 当y>0时,FY(y)?P{Y?y}?P{X2?y}?P{?y?X?y}???yy1?x2edx 2?2
对FY(y)求关于y的导数,得
?1?(e?fY(y)??2???0y)22(y)??1e2??(?y)22(?y)??1e2?y?(lny)22y>0
y?0
2.23 ∵X:U(0,?)∴
?1?fX(x)?????00?x??
其它
(1)
当2ln??y??时
FY(y)?P{Y?y}?P{2lnX?y}?P{lnX2?y}?P{?}?0
当???y?2ln?时yFY(y)?P{Y?y}?P{2lnX?y}?P{lnX2?y}?P{X2?ey}?P{X?ey}??yy?1212e?(e)??fY(y)???2??0?e210?dx
对FY(y)求关于y的导数,得到
???y?2ln?
2ln??y??(2)
当y?1或 y?-1时,FY(y)?P{Y?y}?P{cosX?y}?P{?}?0 当?1?y?1时,FY(y)?P{Y?y}?P{cosX?y}?P{X?arccosy}???1arccosy?dx
对FY(y)求关于y的导数,得到
1?1??(arccosy)??fY(y)????1?y2?0??1?y?1 其它
(3)当y?1或 y?0时FY(y)?P{Y?y}?P{sinX?y}?P{?}?0
当0?y?1时,
FY(y)?P{Y?y}?P{sinX?y}?P{0?X?arcsiny}?P{??arcsiny?X??}??arcsiny10?dx???1??arcsiny?dx
对FY(y)求关于y的导数,得到
12?1??arcsiny?(??arcsiny)???fY(y)????1?y2?0?0?y?1 其它
第三章 随机向量