Is ∅ ∈ { {∅} } true?












2












$begingroup$


If $ {emptyset} ∈ {emptyset,{emptyset}} $ is true, does it mean this $ emptyset in {{emptyset}} $ true ? If it is not, why it is false?



Also, does $ {{emptyset}}$ mean ${emptyset,{emptyset,{emptyset}}}$ ?










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$endgroup$

















    2












    $begingroup$


    If $ {emptyset} ∈ {emptyset,{emptyset}} $ is true, does it mean this $ emptyset in {{emptyset}} $ true ? If it is not, why it is false?



    Also, does $ {{emptyset}}$ mean ${emptyset,{emptyset,{emptyset}}}$ ?










    share|cite|improve this question









    New contributor




    J.S is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
    Check out our Code of Conduct.







    $endgroup$















      2












      2








      2





      $begingroup$


      If $ {emptyset} ∈ {emptyset,{emptyset}} $ is true, does it mean this $ emptyset in {{emptyset}} $ true ? If it is not, why it is false?



      Also, does $ {{emptyset}}$ mean ${emptyset,{emptyset,{emptyset}}}$ ?










      share|cite|improve this question









      New contributor




      J.S is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
      Check out our Code of Conduct.







      $endgroup$




      If $ {emptyset} ∈ {emptyset,{emptyset}} $ is true, does it mean this $ emptyset in {{emptyset}} $ true ? If it is not, why it is false?



      Also, does $ {{emptyset}}$ mean ${emptyset,{emptyset,{emptyset}}}$ ?







      elementary-set-theory






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      edited 2 hours ago









      user549397

      1,2711315




      1,2711315






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      asked 3 hours ago









      J.SJ.S

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          1 Answer
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          9












          $begingroup$

          The notation $a in A$ says that among the elements of $A$ there is one element that is exactly equal to $a.$



          The notation ${emptyset, {emptyset}}$ describes a set with exactly two elements.



          The first element is $emptyset.$ The second element is ${emptyset}.$
          Is one of those two elements exactly equal to ${emptyset}$?



          The notation ${ {emptyset}}$ describes a set with one element.
          That element is ${emptyset}.$



          Which element of ${ {emptyset}}$ do you think is exactly equal to $emptyset$?
          Hint: there's only one element you have to check.



          The notation ${emptyset, {emptyset, {emptyset}}}$ again describes a set with two elements.
          One element is $emptyset$ and the other is
          ${emptyset, {emptyset}}.$
          So this is definitely not the same thing as any set that has only one element.






          share|cite|improve this answer









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            1 Answer
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            9












            $begingroup$

            The notation $a in A$ says that among the elements of $A$ there is one element that is exactly equal to $a.$



            The notation ${emptyset, {emptyset}}$ describes a set with exactly two elements.



            The first element is $emptyset.$ The second element is ${emptyset}.$
            Is one of those two elements exactly equal to ${emptyset}$?



            The notation ${ {emptyset}}$ describes a set with one element.
            That element is ${emptyset}.$



            Which element of ${ {emptyset}}$ do you think is exactly equal to $emptyset$?
            Hint: there's only one element you have to check.



            The notation ${emptyset, {emptyset, {emptyset}}}$ again describes a set with two elements.
            One element is $emptyset$ and the other is
            ${emptyset, {emptyset}}.$
            So this is definitely not the same thing as any set that has only one element.






            share|cite|improve this answer









            $endgroup$


















              9












              $begingroup$

              The notation $a in A$ says that among the elements of $A$ there is one element that is exactly equal to $a.$



              The notation ${emptyset, {emptyset}}$ describes a set with exactly two elements.



              The first element is $emptyset.$ The second element is ${emptyset}.$
              Is one of those two elements exactly equal to ${emptyset}$?



              The notation ${ {emptyset}}$ describes a set with one element.
              That element is ${emptyset}.$



              Which element of ${ {emptyset}}$ do you think is exactly equal to $emptyset$?
              Hint: there's only one element you have to check.



              The notation ${emptyset, {emptyset, {emptyset}}}$ again describes a set with two elements.
              One element is $emptyset$ and the other is
              ${emptyset, {emptyset}}.$
              So this is definitely not the same thing as any set that has only one element.






              share|cite|improve this answer









              $endgroup$
















                9












                9








                9





                $begingroup$

                The notation $a in A$ says that among the elements of $A$ there is one element that is exactly equal to $a.$



                The notation ${emptyset, {emptyset}}$ describes a set with exactly two elements.



                The first element is $emptyset.$ The second element is ${emptyset}.$
                Is one of those two elements exactly equal to ${emptyset}$?



                The notation ${ {emptyset}}$ describes a set with one element.
                That element is ${emptyset}.$



                Which element of ${ {emptyset}}$ do you think is exactly equal to $emptyset$?
                Hint: there's only one element you have to check.



                The notation ${emptyset, {emptyset, {emptyset}}}$ again describes a set with two elements.
                One element is $emptyset$ and the other is
                ${emptyset, {emptyset}}.$
                So this is definitely not the same thing as any set that has only one element.






                share|cite|improve this answer









                $endgroup$



                The notation $a in A$ says that among the elements of $A$ there is one element that is exactly equal to $a.$



                The notation ${emptyset, {emptyset}}$ describes a set with exactly two elements.



                The first element is $emptyset.$ The second element is ${emptyset}.$
                Is one of those two elements exactly equal to ${emptyset}$?



                The notation ${ {emptyset}}$ describes a set with one element.
                That element is ${emptyset}.$



                Which element of ${ {emptyset}}$ do you think is exactly equal to $emptyset$?
                Hint: there's only one element you have to check.



                The notation ${emptyset, {emptyset, {emptyset}}}$ again describes a set with two elements.
                One element is $emptyset$ and the other is
                ${emptyset, {emptyset}}.$
                So this is definitely not the same thing as any set that has only one element.







                share|cite|improve this answer












                share|cite|improve this answer



                share|cite|improve this answer










                answered 2 hours ago









                David KDavid K

                53.4k341115




                53.4k341115






















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