Does independence between random variables imply independence between related events?





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Say I have two random variables X1 and X2 and that they are independent. Am I guaranteed that the events "X1 is less than x1" and "X2 is less than x2" are independent?



If not, under which conditions is this the case? Or better, what is a sufficient condition for having independence between those two events?










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  • See stats.stackexchange.com/questions/94872/… inter alia.
    – whuber
    Nov 22 at 14:55

















up vote
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down vote

favorite












Say I have two random variables X1 and X2 and that they are independent. Am I guaranteed that the events "X1 is less than x1" and "X2 is less than x2" are independent?



If not, under which conditions is this the case? Or better, what is a sufficient condition for having independence between those two events?










share|cite|improve this question
























  • See stats.stackexchange.com/questions/94872/… inter alia.
    – whuber
    Nov 22 at 14:55













up vote
1
down vote

favorite









up vote
1
down vote

favorite











Say I have two random variables X1 and X2 and that they are independent. Am I guaranteed that the events "X1 is less than x1" and "X2 is less than x2" are independent?



If not, under which conditions is this the case? Or better, what is a sufficient condition for having independence between those two events?










share|cite|improve this question















Say I have two random variables X1 and X2 and that they are independent. Am I guaranteed that the events "X1 is less than x1" and "X2 is less than x2" are independent?



If not, under which conditions is this the case? Or better, what is a sufficient condition for having independence between those two events?







random-variable independence






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edited Nov 22 at 11:53

























asked Nov 22 at 11:39









mickkk

374313




374313












  • See stats.stackexchange.com/questions/94872/… inter alia.
    – whuber
    Nov 22 at 14:55


















  • See stats.stackexchange.com/questions/94872/… inter alia.
    – whuber
    Nov 22 at 14:55
















See stats.stackexchange.com/questions/94872/… inter alia.
– whuber
Nov 22 at 14:55




See stats.stackexchange.com/questions/94872/… inter alia.
– whuber
Nov 22 at 14:55










2 Answers
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I remember that the definition of two random variables $X_1$ and $X_2$ are independent is for any event generated by random variables $X_1$ and event generated by $X_2$ are independent. So events $(X_1<x_1)$ and $(X_2<x_2)$ are independent is the condition that two random variables $X_1$ and $X_2$ are independent.



Maybe you need to check the textbook or search the internet to find the definition of independent of two random variables.






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    If $X$ and $Y$ are independent random variables, then it is always the case that the events $A = {X leq a}$ and $B = {Y leq b}$ are independent events. Specifically, one of the (equivalent) definitions of independence of two random variables is that the joint CDF factors into the product of the individual (a.k.a. marginal) CDFs. That is, we are insisting that independence of $X$ and $Y$ means that
    $$F_{X,Y}(a,b) = F_X(a)F_Y(b)~text{for all real numbers}~a~text{and}~btag{*}$$
    But, $$F_{X,Y}(a,b)
    stackrel{Delta}{=} Pleft({X leq a, Y leq b}right) = Pleft({Xleq a}cap {Y leq b}right) = P(Acap B)$$

    while $$F_{X}(a)
    stackrel{Delta}{=} Pleft({X leq a}right) = P(A), quad F_{X}(b)
    stackrel{Delta}{=} Pleft({Y leq b}right) = P(B)$$

    and so $(*)$ is saying that
    $$P(Acap B) = P(A)P(B),$$
    that is, $A$ and $B$ are independent events.






    share|cite|improve this answer





















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      2 Answers
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      active

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      2 Answers
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      active

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      active

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      up vote
      2
      down vote













      I remember that the definition of two random variables $X_1$ and $X_2$ are independent is for any event generated by random variables $X_1$ and event generated by $X_2$ are independent. So events $(X_1<x_1)$ and $(X_2<x_2)$ are independent is the condition that two random variables $X_1$ and $X_2$ are independent.



      Maybe you need to check the textbook or search the internet to find the definition of independent of two random variables.






      share|cite|improve this answer

























        up vote
        2
        down vote













        I remember that the definition of two random variables $X_1$ and $X_2$ are independent is for any event generated by random variables $X_1$ and event generated by $X_2$ are independent. So events $(X_1<x_1)$ and $(X_2<x_2)$ are independent is the condition that two random variables $X_1$ and $X_2$ are independent.



        Maybe you need to check the textbook or search the internet to find the definition of independent of two random variables.






        share|cite|improve this answer























          up vote
          2
          down vote










          up vote
          2
          down vote









          I remember that the definition of two random variables $X_1$ and $X_2$ are independent is for any event generated by random variables $X_1$ and event generated by $X_2$ are independent. So events $(X_1<x_1)$ and $(X_2<x_2)$ are independent is the condition that two random variables $X_1$ and $X_2$ are independent.



          Maybe you need to check the textbook or search the internet to find the definition of independent of two random variables.






          share|cite|improve this answer












          I remember that the definition of two random variables $X_1$ and $X_2$ are independent is for any event generated by random variables $X_1$ and event generated by $X_2$ are independent. So events $(X_1<x_1)$ and $(X_2<x_2)$ are independent is the condition that two random variables $X_1$ and $X_2$ are independent.



          Maybe you need to check the textbook or search the internet to find the definition of independent of two random variables.







          share|cite|improve this answer












          share|cite|improve this answer



          share|cite|improve this answer










          answered Nov 22 at 15:01









          user158565

          4,2741316




          4,2741316
























              up vote
              1
              down vote













              If $X$ and $Y$ are independent random variables, then it is always the case that the events $A = {X leq a}$ and $B = {Y leq b}$ are independent events. Specifically, one of the (equivalent) definitions of independence of two random variables is that the joint CDF factors into the product of the individual (a.k.a. marginal) CDFs. That is, we are insisting that independence of $X$ and $Y$ means that
              $$F_{X,Y}(a,b) = F_X(a)F_Y(b)~text{for all real numbers}~a~text{and}~btag{*}$$
              But, $$F_{X,Y}(a,b)
              stackrel{Delta}{=} Pleft({X leq a, Y leq b}right) = Pleft({Xleq a}cap {Y leq b}right) = P(Acap B)$$

              while $$F_{X}(a)
              stackrel{Delta}{=} Pleft({X leq a}right) = P(A), quad F_{X}(b)
              stackrel{Delta}{=} Pleft({Y leq b}right) = P(B)$$

              and so $(*)$ is saying that
              $$P(Acap B) = P(A)P(B),$$
              that is, $A$ and $B$ are independent events.






              share|cite|improve this answer

























                up vote
                1
                down vote













                If $X$ and $Y$ are independent random variables, then it is always the case that the events $A = {X leq a}$ and $B = {Y leq b}$ are independent events. Specifically, one of the (equivalent) definitions of independence of two random variables is that the joint CDF factors into the product of the individual (a.k.a. marginal) CDFs. That is, we are insisting that independence of $X$ and $Y$ means that
                $$F_{X,Y}(a,b) = F_X(a)F_Y(b)~text{for all real numbers}~a~text{and}~btag{*}$$
                But, $$F_{X,Y}(a,b)
                stackrel{Delta}{=} Pleft({X leq a, Y leq b}right) = Pleft({Xleq a}cap {Y leq b}right) = P(Acap B)$$

                while $$F_{X}(a)
                stackrel{Delta}{=} Pleft({X leq a}right) = P(A), quad F_{X}(b)
                stackrel{Delta}{=} Pleft({Y leq b}right) = P(B)$$

                and so $(*)$ is saying that
                $$P(Acap B) = P(A)P(B),$$
                that is, $A$ and $B$ are independent events.






                share|cite|improve this answer























                  up vote
                  1
                  down vote










                  up vote
                  1
                  down vote









                  If $X$ and $Y$ are independent random variables, then it is always the case that the events $A = {X leq a}$ and $B = {Y leq b}$ are independent events. Specifically, one of the (equivalent) definitions of independence of two random variables is that the joint CDF factors into the product of the individual (a.k.a. marginal) CDFs. That is, we are insisting that independence of $X$ and $Y$ means that
                  $$F_{X,Y}(a,b) = F_X(a)F_Y(b)~text{for all real numbers}~a~text{and}~btag{*}$$
                  But, $$F_{X,Y}(a,b)
                  stackrel{Delta}{=} Pleft({X leq a, Y leq b}right) = Pleft({Xleq a}cap {Y leq b}right) = P(Acap B)$$

                  while $$F_{X}(a)
                  stackrel{Delta}{=} Pleft({X leq a}right) = P(A), quad F_{X}(b)
                  stackrel{Delta}{=} Pleft({Y leq b}right) = P(B)$$

                  and so $(*)$ is saying that
                  $$P(Acap B) = P(A)P(B),$$
                  that is, $A$ and $B$ are independent events.






                  share|cite|improve this answer












                  If $X$ and $Y$ are independent random variables, then it is always the case that the events $A = {X leq a}$ and $B = {Y leq b}$ are independent events. Specifically, one of the (equivalent) definitions of independence of two random variables is that the joint CDF factors into the product of the individual (a.k.a. marginal) CDFs. That is, we are insisting that independence of $X$ and $Y$ means that
                  $$F_{X,Y}(a,b) = F_X(a)F_Y(b)~text{for all real numbers}~a~text{and}~btag{*}$$
                  But, $$F_{X,Y}(a,b)
                  stackrel{Delta}{=} Pleft({X leq a, Y leq b}right) = Pleft({Xleq a}cap {Y leq b}right) = P(Acap B)$$

                  while $$F_{X}(a)
                  stackrel{Delta}{=} Pleft({X leq a}right) = P(A), quad F_{X}(b)
                  stackrel{Delta}{=} Pleft({Y leq b}right) = P(B)$$

                  and so $(*)$ is saying that
                  $$P(Acap B) = P(A)P(B),$$
                  that is, $A$ and $B$ are independent events.







                  share|cite|improve this answer












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                  answered Nov 22 at 15:03









                  Dilip Sarwate

                  29.3k252146




                  29.3k252146






























                       

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