※ 引述《hidmey (:D)》之銘言： : Two coins are simultaneously tossed until one of them comes up a head : and the other a tail. The first coin comes up a head with probability 1/3 : and the second with probability 1/2. All tosses are assumed independent. : Let X be the number of tosses until the game is over. : 1. Find the expected value and the variance of X : 2. Given that X is greater than 3, what is the conditional probability : that X is greater than 5 ? : 請問這題要用甚麼方向去想呢? : 本來是想說開離散的機率表 : 但是似乎又不大對 : 麻煩板上高手指點迷津 : 謝謝 第一枚 第二枚 機率 正面 正面 1/6 正面 反面 1/6 反面 正面 1/3 反面 反面 1/3 所以一正一反的機率為p= 1/2 , 第一次成功所需試行的次數為X,則X為幾何分配 f(x)= p(1-p)^(x-1) ,X>=1 所以期望值E(x) = 1/p = 2 變異數V(x) = (1-p)/p^2 = 2 2.幾何分配有無異性質 P(X>5|X>3) = P(X>2) = 1 -P(X=1) - P(X=2) = 1 - 1/2 - 1/4 = 1/4 ※ 編輯: abc911230567 來自: 140.112.22.216 (03/04 15:46)