文書の過去の版を表示しています。
とりあえず配付資料をアップロード。今年度はちゃんとしたノートになっているのは第10回目以降のみ。他については昨年度のノートや掲げた参考書の参照を薦める。
第10回: 中間試験
第11回: 二項分布と幾何分布と負の二項分布
休講(出張)
第12回: ポアソン分布と指数分布とガンマ分布
第13回: 正規分布
第14回: 各種不等式と大数の法則と中心極限定理
中間試験(4)
1.
1.
Pr[Z=k]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=k|Y=1]
+ Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=k|Y=1]
+ Pr[X=3] * Pr[Y=1|X=3] * Pr[Z=k|Y=1]
+ Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=k|Y=2]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=k|Y=2]
+ Pr[X=3] * Pr[Y=2|X=3] * Pr[Z=k|Y=2]
+ Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=k|Y=3]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=k|Y=3]
+ Pr[X=3] * Pr[Y=3|X=3] * Pr[Z=k|Y=3]
Pr[Z=1]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=1|Y=1]
+ Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=1|Y=1]
+ Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=1|Y=2]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=1|Y=2]
+ Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=1|Y=3]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=1|Y=3]
= (8/10) * (1/10) * (6/10)
+ (2/10) * (6/10) * (6/10)
+ (8/10) * (3/10) * (2/10)
+ (2/10) * (3/10) * (2/10)
+ (8/10) * (6/10) * (1/10)
+ (2/10) * (1/10) * (1/10)
= (48+72+48+12+48+2)/1000
= 230/1000
Pr[Z=2]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=2|Y=1]
+ Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=2|Y=1]
+ Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=2|Y=2]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=2|Y=2]
+ Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=2|Y=3]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=2|Y=3]
= (8/10) * (1/10) * (3/10)
+ (2/10) * (6/10) * (3/10)
+ (8/10) * (3/10) * (6/10)
+ (2/10) * (3/10) * (6/10)
+ (8/10) * (6/10) * (3/10)
+ (2/10) * (1/10) * (3/10)
= (24+36+144+36+144+6)/1000
= 390/1000
Pr[Z=3]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=3|Y=1]
+ Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=3|Y=1]
+ Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=3|Y=2]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=3|Y=2]
+ Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=3|Y=3]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=3|Y=3]
= (8/10) * (1/10) * (1/10)
+ (2/10) * (6/10) * (1/10)
+ (8/10) * (3/10) * (2/10)
+ (2/10) * (3/10) * (2/10)
+ (8/10) * (6/10) * (6/10)
+ (2/10) * (1/10) * (6/10)
= (8+12+48+12+288+12)/1000
= 380/1000
| Z=1 | Z=2 | Z=3
Prob | 23/100 | 39/100 | 38/100
| 0.23 | 0.39 | 0.38
2.
Pr[X=i|Z=k]
= Pr[X=i, Y=1|Z=k]+ Pr[X=i, Y=2|Z=k]+ Pr[X=i, Y=3|Z=k]
= Pr[X=i] * Pr[Y=1|X=i] * Pr[Z=k|Y=1] / Pr[Z=k]
+ Pr[X=i] * Pr[Y=2|X=i] * Pr[Z=k|Y=2] / Pr[Z=k]
+ Pr[X=i] * Pr[Y=3|X=i] * Pr[Z=k|Y=3] / Pr[Z=k]
Pr[X=1|Z=1]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=1|Y=1] / Pr[Z=1]
+ Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=1|Y=2] / Pr[Z=1]
+ Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=1|Y=3] / Pr[Z=1]
= (8/10) * (1/10) * (6/10) / Pr[Z=1]
+ (8/10) * (3/10) * (2/10) / Pr[Z=1]
+ (8/10) * (6/10) * (1/10) / Pr[Z=1]
= (48+48+48) / Pr[Z=1] / 1000
= 144 / Pr[Z=1] / 1000
Pr[X=2|Z=1]
= Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=1|Y=1] / Pr[Z=1]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=1|Y=2] / Pr[Z=1]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=1|Y=3] / Pr[Z=1]
= (2/10) * (6/10) * (6/10) / Pr[Z=1]
+ (2/10) * (3/10) * (2/10) / Pr[Z=1]
+ (2/10) * (1/10) * (1/10) / Pr[Z=1]
= (72+12+2) / Pr[Z=1] / 1000
= 86 / Pr[Z=1] / 1000
144 / Pr[Z=1] / 1000
+ 86 / Pr[Z=1] / 1000 = 1
Z=1 | X=1 | X=2
Prob | 144/230 | 86/230
| 0.626087 | 0.373913
3.
Pr[Y=j|Z=k]
= Pr[X=1, Y=j|Z=k]+ Pr[X=2, Y=j|Z=k]
= Pr[X=1] * Pr[Y=j|X=1] * Pr[Z=k|Y=j] / Pr[Z=k]
+ Pr[X=2] * Pr[Y=j|X=2] * Pr[Z=k|Y=j] / Pr[Z=k]
Pr[Y=1|Z=1]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=1|Y=1] / Pr[Z=1]
+ Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=1|Y=1] / Pr[Z=1]
= (8/10) * (1/10) * (6/10) / Pr[Z=1]
+ (2/10) * (6/10) * (6/10) / Pr[Z=1]
= (48+72) / Pr[Z=1] / 1000
= 120 / Pr[Z=1] / 1000
Pr[Y=2|Z=1]
= Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=1|Y=2] / Pr[Z=1]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=1|Y=2] / Pr[Z=1]
= (8/10) * (3/10) * (2/10) / Pr[Z=1]
+ (2/10) * (3/10) * (2/10) / Pr[Z=1]
= (48+12) / Pr[Z=1] / 1000
= 60 / Pr[Z=1] / 1000
Pr[Y=3|Z=1]
= Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=1|Y=3] / Pr[Z=1]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=1|Y=3] / Pr[Z=1]
= (8/10) * (6/10) * (1/10) / Pr[Z=1]
+ (2/10) * (1/10) * (1/10) / Pr[Z=1]
= (48+2) / Pr[Z=1] / 1000
= 50 / Pr[Z=1] / 1000
120 / Pr[Z=1] / 1000
+ 60 / Pr[Z=1] / 1000
+ 50 / Pr[Z=1] / 1000 = 1
Z=1 | Y=1 | Y=2 | Y=3
Prob | 120/230 | 60/230 | 50/230
E[Y|Z=1] = (1*12+2*6+3*5)/23
= 39/23
= 1.695652
中間試験(5)
1.
1.
Pr[Z=k]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=k|Y=1]
+ Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=k|Y=1]
+ Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=k|Y=2]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=k|Y=2]
+ Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=k|Y=3]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=k|Y=3]
Pr[Z=1]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=1|Y=1]
+ Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=1|Y=1]
+ Pr[X=3] * Pr[Y=1|X=3] * Pr[Z=1|Y=1]
+ Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=1|Y=2]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=1|Y=2]
+ Pr[X=3] * Pr[Y=2|X=3] * Pr[Z=1|Y=2]
+ Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=1|Y=3]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=1|Y=3]
+ Pr[X=3] * Pr[Y=3|X=3] * Pr[Z=1|Y=3]
= (8/10) * (6/10) * (7/10)
+ (1/10) * (0/10) * (7/10)
+ (1/10) * (0/10) * (7/10)
+ (8/10) * (3/10) * (1/10)
+ (1/10) * (6/10) * (1/10)
+ (1/10) * (0/10) * (1/10)
+ (8/10) * (1/10) * (1/10)
+ (1/10) * (4/10) * (1/10)
+ (1/10) *(10/10) * (1/10)
= (336+0+0+24+6+0+8+4+10)/1000
= 388/1000
Pr[Z=2]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=2|Y=1]
+ Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=2|Y=1]
+ Pr[X=3] * Pr[Y=1|X=3] * Pr[Z=2|Y=1]
+ Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=2|Y=2]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=2|Y=2]
+ Pr[X=3] * Pr[Y=2|X=3] * Pr[Z=2|Y=2]
+ Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=2|Y=3]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=2|Y=3]
+ Pr[X=3] * Pr[Y=3|X=3] * Pr[Z=2|Y=3]
= (8/10) * (6/10) * (2/10)
+ (1/10) * (0/10) * (2/10)
+ (1/10) * (0/10) * (2/10)
+ (8/10) * (3/10) * (7/10)
+ (1/10) * (6/10) * (7/10)
+ (1/10) * (0/10) * (7/10)
+ (8/10) * (1/10) * (2/10)
+ (1/10) * (4/10) * (2/10)
+ (1/10) *(10/10) * (2/10)
= (96+0+0+168+42+0+16+8+20)/1000
= 350/1000
Pr[Z=3]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=3|Y=1]
+ Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=3|Y=1]
+ Pr[X=3] * Pr[Y=1|X=3] * Pr[Z=3|Y=1]
+ Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=3|Y=2]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=3|Y=2]
+ Pr[X=3] * Pr[Y=2|X=3] * Pr[Z=3|Y=2]
+ Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=3|Y=3]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=3|Y=3]
+ Pr[X=3] * Pr[Y=3|X=3] * Pr[Z=3|Y=3]
= (8/10) * (6/10) * (1/10)
+ (1/10) * (0/10) * (1/10)
+ (1/10) * (0/10) * (1/10)
+ (8/10) * (3/10) * (2/10)
+ (1/10) * (6/10) * (2/10)
+ (1/10) * (0/10) * (2/10)
+ (8/10) * (1/10) * (7/10)
+ (1/10) * (4/10) * (7/10)
+ (1/10) *(10/10) * (7/10)
= (1000-388-350)/1000
= 262/1000
| Z=1 | Z=2 | Z=3
Prob | 388/1000 | 350/1000 | 262/1000
| 0.388 | 0.350 | 0.262
2.
Pr[X=i|Z=k]
= Pr[X=i, Y=1|Z=k]+ Pr[X=i, Y=2|Z=k]+ Pr[X=i, Y=3|Z=k]
= Pr[X=i] * Pr[Y=1|X=i] * Pr[Z=k|Y=1] / Pr[Z=k]
+ Pr[X=i] * Pr[Y=2|X=i] * Pr[Z=k|Y=2] / Pr[Z=k]
+ Pr[X=i] * Pr[Y=3|X=i] * Pr[Z=k|Y=3] / Pr[Z=k]
Pr[X=1|Z=1]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=1|Y=1] / Pr[Z=1]
+ Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=1|Y=2] / Pr[Z=1]
+ Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=1|Y=3] / Pr[Z=1]
= (8/10) * (6/10) * (7/10) / Pr[Z=1]
+ (8/10) * (0/10) * (1/10) / Pr[Z=1]
+ (8/10) * (0/10) * (1/10) / Pr[Z=1]
= 336 / Pr[Z=1] / 1000
Pr[X=2|Z=1]
= Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=1|Y=1] / Pr[Z=1]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=1|Y=2] / Pr[Z=1]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=1|Y=3] / Pr[Z=1]
= (1/10) * (3/10) * (7/10) / Pr[Z=1]
+ (1/10) * (6/10) * (1/10) / Pr[Z=1]
+ (1/10) * (0/10) * (1/10) / Pr[Z=1]
= (21+6) / Pr[Z=1] / 1000
= 27 / Pr[Z=1] / 1000
Pr[X=3|Z=1]
= Pr[X=3] * Pr[Y=1|X=3] * Pr[Z=1|Y=1] / Pr[Z=1]
+ Pr[X=3] * Pr[Y=2|X=3] * Pr[Z=1|Y=2] / Pr[Z=1]
+ Pr[X=3] * Pr[Y=3|X=3] * Pr[Z=1|Y=3] / Pr[Z=1]
= (1/10) * (1/10) * (7/10) / Pr[Z=1]
+ (1/10) * (4/10) * (1/10) / Pr[Z=1]
+ (1/10) *(10/10) * (1/10) / Pr[Z=1]
= (7+4+10) / Pr[Z=1] / 1000
= 21 / Pr[Z=1] / 1000
336 / Pr[Z=1] / 1000
+ 27 / Pr[Z=1] / 1000
+ 21 / Pr[Z=1] / 1000 = 1
Z=1 | X=1 | X=2 | X=3
Prob | 336/384 | 27/384 | 21/384
| 0.875 | 0.0703125 | 0.0546875
3.
Pr[Y=j|Z=k]
= Pr[X=1, Y=j|Z=k]+ Pr[X=2, Y=j|Z=k]
= Pr[X=1] * Pr[Y=j|X=1] * Pr[Z=k|Y=j] / Pr[Z=k]
+ Pr[X=2] * Pr[Y=j|X=2] * Pr[Z=k|Y=j] / Pr[Z=k]
+ Pr[X=3] * Pr[Y=j|X=3] * Pr[Z=k|Y=j] / Pr[Z=k]
Pr[Y=1|Z=1]
= Pr[X=1] * Pr[Y=1|X=1] * Pr[Z=1|Y=1] / Pr[Z=1]
+ Pr[X=2] * Pr[Y=1|X=2] * Pr[Z=1|Y=1] / Pr[Z=1]
+ Pr[X=3] * Pr[Y=1|X=3] * Pr[Z=1|Y=1] / Pr[Z=1]
= (8/10) * (6/10) * (7/10) / Pr[Z=1]
+ (1/10) * (0/10) * (7/10) / Pr[Z=1]
+ (1/10) * (0/10) * (7/10) / Pr[Z=1]
= 336 / Pr[Z=1] / 1000
Pr[Y=2|Z=1]
= Pr[X=1] * Pr[Y=2|X=1] * Pr[Z=1|Y=2] / Pr[Z=1]
+ Pr[X=2] * Pr[Y=2|X=2] * Pr[Z=1|Y=2] / Pr[Z=1]
+ Pr[X=3] * Pr[Y=2|X=3] * Pr[Z=1|Y=2] / Pr[Z=1]
= (8/10) * (3/10) * (1/10) / Pr[Z=1]
+ (1/10) * (6/10) * (1/10) / Pr[Z=1]
+ (1/10) * (0/10) * (1/10) / Pr[Z=1]
= (24+6) / Pr[Z=1] / 1000
= 30 / Pr[Z=1] / 1000
Pr[Y=3|Z=1]
= Pr[X=1] * Pr[Y=3|X=1] * Pr[Z=1|Y=3] / Pr[Z=1]
+ Pr[X=2] * Pr[Y=3|X=2] * Pr[Z=1|Y=3] / Pr[Z=1]
+ Pr[X=3] * Pr[Y=3|X=3] * Pr[Z=1|Y=3] / Pr[Z=1]
= (8/10) * (1/10) * (1/10) / Pr[Z=1]
+ (1/10) * (4/10) * (1/10) / Pr[Z=1]
+ (1/10) *(10/10) * (1/10) / Pr[Z=1]
= (8+4+10) / Pr[Z=1] / 1000
= 22 / Pr[Z=1] / 1000
336 / Pr[Z=1] / 1000
+ 30 / Pr[Z=1] / 1000
+ 22 / Pr[Z=1] / 1000 = 1
Z=1 | Y=1 | Y=2 | Y=3
Prob | 336/388 | 30/336 | 22/336
E[Y|Z=1] = (1*336+2*30+3*22)/336
= 462/336
= 154/112
= 77/56
= 11/8
= 1.375