E(X^2)的期望如何求解?
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E(X^2) 是 X^2 的期望.
比如,P{X=1} = 2/3, P{X=0} = 1/6, P{X=-1} = 1/6.
EX = 1 * 2/3 + 0 * 1/6 +(-1) * 1/6 = 2/3 - 1/6 = 1/2.
EX^2 = 1^2 * 2/3 + 0^2 * 1/6 + (-1)^2 * 1/6 = 2/3 + 1/6 = 5/6.
DX = EX^2 - [EX]^2 = 5/6 - (1/2)^2 = 7/12
以上内来源于: 方差计算公式D(X) = E(X^2) - [E(X)]^2
但是根据期望的定义:EX=累计所有的P(Xi)*Xi
所以E(X^2) = 累加P(Xi^2) * Xi^2
本题P(X^2 = 1) = P(-1^2 = 1)+P(1^2 = 1) = 5/6, P(X^2 = 0) = 1/6
所以E(X^2) = 5/6 * 1+1/6 * 0 = 5/6
若取Y = X^2,则更好理解,因为Y的取值只有1和0
比如,P{X=1} = 2/3, P{X=0} = 1/6, P{X=-1} = 1/6.
EX = 1 * 2/3 + 0 * 1/6 +(-1) * 1/6 = 2/3 - 1/6 = 1/2.
EX^2 = 1^2 * 2/3 + 0^2 * 1/6 + (-1)^2 * 1/6 = 2/3 + 1/6 = 5/6.
DX = EX^2 - [EX]^2 = 5/6 - (1/2)^2 = 7/12
以上内来源于: 方差计算公式D(X) = E(X^2) - [E(X)]^2
但是根据期望的定义:EX=累计所有的P(Xi)*Xi
所以E(X^2) = 累加P(Xi^2) * Xi^2
本题P(X^2 = 1) = P(-1^2 = 1)+P(1^2 = 1) = 5/6, P(X^2 = 0) = 1/6
所以E(X^2) = 5/6 * 1+1/6 * 0 = 5/6
若取Y = X^2,则更好理解,因为Y的取值只有1和0
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