$z in mathbb{C}^-$ where $mathbb{C}^- := {z in mathbb{C} : Re(z) < 0}$ identity












0














Why is $|2-z|^2 = 4 + |z|^2 - 4Re(z)$,



where $z in mathbb{C}^-$ and $mathbb{C}^- := {z in mathbb{C} : Re(z) < 0}$.



Why is this true?










share|cite|improve this question




















  • 1




    What is $C^-$?....
    – greedoid
    Dec 6 at 21:54










  • the set of complex numbers z, where Re(z)<0
    – pablo_mathscobar
    Dec 6 at 21:56






  • 4




    But your equality holds always, not just when $operatorname{Re}z<0$.
    – José Carlos Santos
    Dec 6 at 21:58










  • Do not remove your question and replace it with a completely different one after it has been answered.
    – T. Bongers
    Dec 6 at 22:27
















0














Why is $|2-z|^2 = 4 + |z|^2 - 4Re(z)$,



where $z in mathbb{C}^-$ and $mathbb{C}^- := {z in mathbb{C} : Re(z) < 0}$.



Why is this true?










share|cite|improve this question




















  • 1




    What is $C^-$?....
    – greedoid
    Dec 6 at 21:54










  • the set of complex numbers z, where Re(z)<0
    – pablo_mathscobar
    Dec 6 at 21:56






  • 4




    But your equality holds always, not just when $operatorname{Re}z<0$.
    – José Carlos Santos
    Dec 6 at 21:58










  • Do not remove your question and replace it with a completely different one after it has been answered.
    – T. Bongers
    Dec 6 at 22:27














0












0








0







Why is $|2-z|^2 = 4 + |z|^2 - 4Re(z)$,



where $z in mathbb{C}^-$ and $mathbb{C}^- := {z in mathbb{C} : Re(z) < 0}$.



Why is this true?










share|cite|improve this question















Why is $|2-z|^2 = 4 + |z|^2 - 4Re(z)$,



where $z in mathbb{C}^-$ and $mathbb{C}^- := {z in mathbb{C} : Re(z) < 0}$.



Why is this true?







complex-numbers






share|cite|improve this question















share|cite|improve this question













share|cite|improve this question




share|cite|improve this question








edited Dec 6 at 22:36

























asked Dec 6 at 21:53









pablo_mathscobar

836




836








  • 1




    What is $C^-$?....
    – greedoid
    Dec 6 at 21:54










  • the set of complex numbers z, where Re(z)<0
    – pablo_mathscobar
    Dec 6 at 21:56






  • 4




    But your equality holds always, not just when $operatorname{Re}z<0$.
    – José Carlos Santos
    Dec 6 at 21:58










  • Do not remove your question and replace it with a completely different one after it has been answered.
    – T. Bongers
    Dec 6 at 22:27














  • 1




    What is $C^-$?....
    – greedoid
    Dec 6 at 21:54










  • the set of complex numbers z, where Re(z)<0
    – pablo_mathscobar
    Dec 6 at 21:56






  • 4




    But your equality holds always, not just when $operatorname{Re}z<0$.
    – José Carlos Santos
    Dec 6 at 21:58










  • Do not remove your question and replace it with a completely different one after it has been answered.
    – T. Bongers
    Dec 6 at 22:27








1




1




What is $C^-$?....
– greedoid
Dec 6 at 21:54




What is $C^-$?....
– greedoid
Dec 6 at 21:54












the set of complex numbers z, where Re(z)<0
– pablo_mathscobar
Dec 6 at 21:56




the set of complex numbers z, where Re(z)<0
– pablo_mathscobar
Dec 6 at 21:56




4




4




But your equality holds always, not just when $operatorname{Re}z<0$.
– José Carlos Santos
Dec 6 at 21:58




But your equality holds always, not just when $operatorname{Re}z<0$.
– José Carlos Santos
Dec 6 at 21:58












Do not remove your question and replace it with a completely different one after it has been answered.
– T. Bongers
Dec 6 at 22:27




Do not remove your question and replace it with a completely different one after it has been answered.
– T. Bongers
Dec 6 at 22:27










2 Answers
2






active

oldest

votes


















1














hint



$$|2-z|^2=(2-z)(2-bar{z})$$



$$=4+zbar{z}-2(z+bar{z})$$
$$=4+|z|^2-2(x+iy+x-iy)$$






share|cite|improve this answer





























    1














    This identity is true for any $zinmathbb C$



    $|2-z|^2=(2-z)overline{(2-z)}=(2-z)(2-overline z)=4 + zoverline z - 2(z+overline z)=4+|z|^2-4Re(z)$






    share|cite|improve this answer





















      Your Answer





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      2 Answers
      2






      active

      oldest

      votes








      2 Answers
      2






      active

      oldest

      votes









      active

      oldest

      votes






      active

      oldest

      votes









      1














      hint



      $$|2-z|^2=(2-z)(2-bar{z})$$



      $$=4+zbar{z}-2(z+bar{z})$$
      $$=4+|z|^2-2(x+iy+x-iy)$$






      share|cite|improve this answer


























        1














        hint



        $$|2-z|^2=(2-z)(2-bar{z})$$



        $$=4+zbar{z}-2(z+bar{z})$$
        $$=4+|z|^2-2(x+iy+x-iy)$$






        share|cite|improve this answer
























          1












          1








          1






          hint



          $$|2-z|^2=(2-z)(2-bar{z})$$



          $$=4+zbar{z}-2(z+bar{z})$$
          $$=4+|z|^2-2(x+iy+x-iy)$$






          share|cite|improve this answer












          hint



          $$|2-z|^2=(2-z)(2-bar{z})$$



          $$=4+zbar{z}-2(z+bar{z})$$
          $$=4+|z|^2-2(x+iy+x-iy)$$







          share|cite|improve this answer












          share|cite|improve this answer



          share|cite|improve this answer










          answered Dec 6 at 21:58









          hamam_Abdallah

          37.9k21634




          37.9k21634























              1














              This identity is true for any $zinmathbb C$



              $|2-z|^2=(2-z)overline{(2-z)}=(2-z)(2-overline z)=4 + zoverline z - 2(z+overline z)=4+|z|^2-4Re(z)$






              share|cite|improve this answer


























                1














                This identity is true for any $zinmathbb C$



                $|2-z|^2=(2-z)overline{(2-z)}=(2-z)(2-overline z)=4 + zoverline z - 2(z+overline z)=4+|z|^2-4Re(z)$






                share|cite|improve this answer
























                  1












                  1








                  1






                  This identity is true for any $zinmathbb C$



                  $|2-z|^2=(2-z)overline{(2-z)}=(2-z)(2-overline z)=4 + zoverline z - 2(z+overline z)=4+|z|^2-4Re(z)$






                  share|cite|improve this answer












                  This identity is true for any $zinmathbb C$



                  $|2-z|^2=(2-z)overline{(2-z)}=(2-z)(2-overline z)=4 + zoverline z - 2(z+overline z)=4+|z|^2-4Re(z)$







                  share|cite|improve this answer












                  share|cite|improve this answer



                  share|cite|improve this answer










                  answered Dec 6 at 22:00









                  Shubham Johri

                  3,433716




                  3,433716






























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