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当y?0时,FY(y)?P{?y?X?y}?FX(y)?FX(?y)
?3?8y,0?y?1????1?1,1?y?4[fX(y)?fX(?y)]??从而,fY(y)?? ??8y?2y????0,y?4(2) F(-1/2,4)=P{X?-1/2,Y?4}= P{X?-1/2,X2?4} =P{-2?X?-1/2}=
?12?2?fX(x)dx??12?1?11dx? 244.解:P{XY?0}=1-P{XY=0}=0 即 P{X=-1,Y=1}+P{X=1,Y=1}=0
由概率的非负性知,P{X=-1,Y=1}=0,P{X=1,Y=1}=0
由边缘分布律的定义,P{X=-1}= P{X=-1,Y=0}+ P{X=-1,Y=1}=1/4 得P{X=-1,Y=0}=1/4
再由P{X=1}= P{X=1,Y=0}+ P{X=1,Y=1}=1/4 得P{X=1,Y=0}=1/4
再由P{Y=1}=P{X=-1,Y=1}+ P{X=0,Y=1}+ P{X=1,Y=1}= P{X=0,Y=1} 知P{X=0,Y=1}=1/2
最后由归一性得:P{X=0,Y=0}=0 (X,Y)的分布律用表格表示如下:
Y X -1 0 1 P{Y=j} 0 1/4 0 1/4 1/2 1 0 1/2 0 1/2 P{X=i} 1/4 1/2 1/4 1 (2) 显然,X和Y不相互独立,因为P{X=-1,Y=0}? P{X=-1}P{Y=0}
??5 解:X与Y相互独立,利用卷积公式fZ(z)????fX(x)fY(z?x)dx计算
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x??)2?f1?(X(x)?2?2, f?1,y?(2??eY(y)????,?) ?2??0,其它?(x??)2f)f??1?e?2?2,???z?x??X(xY(z?x) ?2??2??0,其它??(x??)2fZ(z)?(z?x)dx???fX(x)fY??z??12?2z??2??2?e?dx?1z??1?(x??)22??2?2z???2?edx?12?P{z???X?z??}?12?[F(z??)?F(z??)] 1??????z????????????2??z???????????? 6.解:(X,Y)~U(G)
?f(x,y)??1?,(x,y)?G ?2?0,其它设F(x)和f(s)分别表示S=XY的分布函数和密度函数 F(s)=P{XY ?s?0时,F?1,s?2S??s1???12sx1 0?02dydx??s?02dydx??0,s?0所以,F?ss2S??2?2lns,s?2 ???1,s?2于是,S=XY概率密度为 ?1f???ln2,0?s?2S(s) ?2s?0,其它7.解:由全概率公式: FU(u)=P{U?u}={X+Y?u} =P{X=1}P{X+Y?u|X=1}+ P{X=2}P{X+Y?u|X=2} 27 28 = P{X=1}P{1+Y?u}+ P{X=2}P{2+Y?u} =0.3?FY(u-1)+0.7?FY(u-2) 所以,fU(u) =0.3?fY(u-1)+0.7?fY(u-2) 8. 解:(1) f(x,y)???1,0?x?1,0?y?x 0,其它?2x????1dy,0?x?1?2x,0?x?1 fX(x)??f(x,y)dy???0????0,其它??它?0,其?11dx,0?y?2?y????y?1?,0?y?2 fY(y)??f(x,y)dx??2??2????它它?0,其?0,其(2) FZ(z)?P{Z?z}?P{2X?Y?z}?如图所示,当z<0时,FZ(z)=0; 当z?2时,FZ(z)=1 当0?z<2时:FZ(z)?综上所述, 2x?y?z??f(x,y)dxdy ??z2x200z2 1dydx??z?1dydx?z?2x?z4212x?0.??FZ(z)??z????1,z?0z2,0?z?2 4z?2它?0,其?所以Z的概率密度为:fZ(z)?? z1?,0?z?2??29.解:(1) fX(x)???1,0?x?1 它?0,其?1?,0?y?x,0?x?1 fY|X(y|x)??x?它?0,其?1?,0?y?x?1 f(x,y)?fY|X(y|x)fX(x)??x?它?0,其 28 29 ?11(2) ff(x,y)dx????ydx,0?y?1??lny,0?y?Y(y)???????x??1 ?0,其它?0,其它(3) P{X?Y?1}?y)dxdy?1x???f(x,y?1??x10.51?xxdydx?1?ln2 10.解:(1)P{Z?1/2|X=0}=P{X+Y?1/2|X=0}=P{Y?1/2}=1/2 (2) 由全概率公式: FZ(z)=P{Z?z}=P{X+Y?z}=P{X=1}P{X+Y?z|X=1} +P{X=0}P{X+Y?z|X=0}=P{X=-1}P{X+Y?z|X=-1} = P{X=1}P{1+Y?z}+P{X=0}P{Y?z}=P{X=-1}P{-1+Y?z} =1/3?[FY(z-1)+ FY(z)+ FY(z+1)] ?从而,f?[f?1?3,?1?z?2Z(z) =1/3Y(z-1)+ fY(z)+ fY(z+1)]= ??0,其它11.解:f(x.y)???3x,0?x?1,0?y?x?0,其它 FZ(z)?P{Z?z}?P{X?Y?z}?P{Y?X?Z}?,y)dxdyy???f(xx?z如图,当z<0时,FZ(z)=0; 当z?1时,FZ(z)=1 当0?z<1时:F(z)??zx1x3zz3Z0?03xdydx??z?x?z3xdydx?2?2 ??0,z?0综上得:F?3zZ(z)???z3,0?z?112 ?22??0,z?1?Z的概率密度为f?3(1?z2),0?z?1Z(z)??2 ??0,其它x2212 解:fX(x)?122?e?,f?yY(y)?122?e, 29 30 1?f(x,y)?fX(x)fY(y)?e2?x2?y22 FZ(z)?P{Z?z}?P{x2?y2?z} 当z<0时,FZ(z)=0; 1222当z?0时,FZ(z)?P{X?Y?z}???f(x,y)dxdy?2?x2?y2?z2??z?2所以,Z的概率密度为fZ(z)??ze,z?0 ?它?0,其 第四章 4三、解答题 1. 设随机变量X的分布律为 X pi 2求E(X),E(X),E(3X?5). ?2??e002?z?r22rdrd??1?e?z22 – 2 0.4 0 0.3 2 0.3 解:E (X ) = 2 ?xpi?1i= ??2??0.4+0?0.3+2?0.3= -0.2 E (X ) = ?xi?1?2pi= 4?0.4+ 0?0.3+ 4?0.3= 2.8 E (3 X +5) =3 E (X ) +5 =3???0.2?+5 = 4.4 2. 同时掷八颗骰子,求八颗骰子所掷出的点数和的数学期望. 解:记掷1颗骰子所掷出的点数为Xi,则Xi 的分布律为 P{X?i}?1/6,i?1,2,?,6 记掷8颗骰子所掷出的点数为X ,同时掷8颗骰子,相当于作了8次独立重复的试验, E (Xi ) =1/6×(1+2+3+4+5+6)=21/6 E (X ) =8×21/3=28 3. 某图书馆的读者借阅甲种图书的概率为p1,借阅乙种图书的概率为p2,设每人借阅甲乙图书的行为相互独立,读者之间的行为也是相互独立的. (1) 某天恰有n个读者,求借阅甲种图书的人数的数学期望. (2) 某天恰有n个读者,求甲乙两种图书至少借阅一种的人数的数学期望. 解:(1) 设借阅甲种图书的人数为X ,则X~B(n, p1),所以E (X )= n p1 (2) 设甲乙两种图书至少借阅一种的人数为Y , 则Y ~B(n, p), 记A ={借甲种图书}, B ={借乙种图书},则p ={A ∪ B}= p1+ p2 - p1 p2 所以E (Y )= n (p1+ p2 - p1 p2 ) 4. 将n个考生的的录取通知书分别装入n个信封,在每个信封上任意写上一个考生的姓名、地址发出,用X表示n个考生中收到自己通知书的人数,求E(X). 30