内容导航:
1、
random variable
2、
Expected value for continuous random variable
1、
random variable
英:
美:
常用释义:
随机变量:在统计实验中
随机变量,随机变数,无规变数
【数】随机变数,【数】随机变量;无规变量
1、Do The Function of A Continuous Type of Random Variable Also Belong To One?───连续型随机变量的函数还是连续型随机变量 吗 ?
2、The variance of a
random variable
is the square of its standard deviation.───方差的算术平方根为该组数据的标准差.
3、The weighted mean of the
random variable
is the expected value.───随机变量的加权平均值是期望值。
4、variable is a function that takes values based on a probability distribution.───变量是一个根据概率分布取值的函数。
5、This articles emphasis studies the
random variable
using the copula function to describe tail dependence.───本文的重点就是应用copula函数来研究随机变量的尾部相关性的问题.
6、might be an infinite number of possible values for the
random variable
x.───对于这个随机变量X,可能的取值个数是无限的。
7、Firstly, the definitions of complex quasi -
random variable
and primary norm are introduced.───引入复拟(概率)随机变量, 准范数的定义.
8、Property of symmetric
random variable
is discussed by introducing the concept of almost supremum and infimum.───讨论了具有倒对称随机变量的若干性质.
9、In credibility model, we regard risk X a
random variable
which is depend on a parameter.───在可信性模型中, 通常把风险X的视为依赖于一参数的随机变量.
10、Based on
random variable
expectation and variance, some inequalities are proved.───基于随机变量的数学期望与方差, 讨论随机变量数字特征的几个不等式.
1、response variable───反应变量
2、dummy variable───【数】哑变量;名义变数;虚变数
3、random variables───随机变量;随机变数
4、response variables───反应变数
5、dependent variable───因变量;他变数;【数】应变数
6、random rubble───乱砌毛石
7、random sample───【数】随机样本;随意抽取调查;【天】随机样品
2、
Expected value for continuous random variable
更新1:
myisland8132: 好嘢㖞
咁都记得
你讲得无错
虽然audrey个答法比较正路
但系你个答案又比较直接同技术性
点选好呢? 一于交付投票啦!
As follows~~~ As follows~~~ 图片参考:i182.photobucket/albums/x4/A_Hepburn_1990/A_Hepburn01Mar192036?t=1205930228
参考: Myself~~~
f(x)=1/9xe^(-x/3) for x>0 the expected water consumption of water for any given day =∫x【1/9xe^(-x/3)】 dx 【from 0 to infinity】 ==∫1/9x^2e^(-x/3) dx =(1/9) Gamma【3】/(1/3)^3 =(1/9)(2)(27) =54/9 =6 我明天再正式报答啦﹐因为无手机认证﹐今日已经用尽quota 2008-03-20 09:54:40 补充: f(x)=1/9xe^(-x/3) for x>0 the expected water consumption of water for any given day =∫x【1/9xe^(-x/3)】 dx 【from 0 to infinity】 ==∫1/9x^2e^(-x/3) dx =(1/9) Gamma【3】/(1/3)^3 =(1/9)(2)(27) =54/9 =6 2008-03-20 10:00:09 补充: 当然Audrey Hepburn没做错﹐不过可惜中六七没教Gamma distribution﹐所以用了2次integration by parts。不过我觉得朋友你一定识(因为你之前问过些好深的统计题)﹐所以用了些快方法答啦(而且条题目是精算题?) 我说过补答啦﹐所以我一定要「言出必行」啦