Complex Analysis 15 | Laurent Series

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  • Опубліковано 24 гру 2024

КОМЕНТАРІ • 26

  • @maxdemuynck9850
    @maxdemuynck9850 9 місяців тому +7

    best video I've found on the topic, thanks!

  • @Sarah-pu8un
    @Sarah-pu8un Рік тому +3

    Jetzt habe ich es endlich verstanden! Konnte mit meinem Uni Skript gar nichts anfangen. Danke!

  • @mastershooter64
    @mastershooter64 2 роки тому +16

    will you cover complex functions of several variables in this series?

  • @МахойЮти
    @МахойЮти 2 роки тому +10

    Мне рекомендуется это в 12 часов ночи. Довольно интересно.

  • @fawkes__
    @fawkes__ 4 місяці тому

    at 4:53 should it be z**-k or did I miss something?

  • @abublahinocuckbloho4539
    @abublahinocuckbloho4539 2 роки тому +7

    Where you combined the 2 series the subscript to b became negative but you kept the exponent K positive? This is confusing as you redefined reciprocal series into a power series by changing how K was defined, so what you did with combining the series doesn't logically follow

    • @brightsideofmaths
      @brightsideofmaths  2 роки тому

      I don't really understand what you mean. Sorry.

    • @samas69420
      @samas69420 2 роки тому +1

      @@brightsideofmaths i think he is talking about what you did at 4:50 when you rewrite the sum for b leaving exponent k positive but changing the interval for k to [1,inf]

    • @brightsideofmaths
      @brightsideofmaths  2 роки тому

      @@samas69420 Thanks. Do you also see a problem with that?

    • @samas69420
      @samas69420 2 роки тому +1

      ​@@brightsideofmaths not really but maybe it might be a bit complicated to understand at first glance, i think the misunderstanding is that abu assumed that the sum from 1 to +inf of b_{-k}*z^k should give the same result as the sum from -1 to -inf of b_{k}*z^k while if i understood it correctly it's not the same but it is the power series that we study using the same reasoning explained in the first part of the video to make considerations on where the series from -1 to -inf of b_{k}*z^k converges and it is done that way since because of the negative exponents the series from -1 to -inf of b_{k}*z^k is not a canonical power series

    • @higifnr
      @higifnr 2 роки тому +1

      For anyone who is having the same issue, b_k = a_-k, so he went back to the original power series and replaced a_k with b_-k while ignoring the constant a0. I was quite confused myself and I hope I didn't get it wrong

  • @saimasiddiqua5288
    @saimasiddiqua5288 2 роки тому +8

    hello, could you make a video about how to study new topic of mathematics, some tricks and strategy to follow. like, when i start a new topic i get stuck on one page for hours to understand and then take too much time to finish whole chapter. i dont have a lot of time. if i get some idea from you how to improve learning math properly or you make a video that would be helpful. sorry for long comments.
    Thank you for your patience.

  • @plegasus7308
    @plegasus7308 2 роки тому

    Good complex analysis book for someone who has done baby rudin?

  • @bumeegabentharavithana2572
    @bumeegabentharavithana2572 Місяць тому

    wonderful video , by the way love the french accent too

  • @MarkHadadcy26c
    @MarkHadadcy26c 2 місяці тому

    goat 🐐 🐐

    • @brightsideofmaths
      @brightsideofmaths  2 місяці тому

      So you watched my video about the Monty-Hall problem? ;)

  • @xtr3m385
    @xtr3m385 3 місяці тому

    *_666 like!_*