Properties of the transpose of a matrix, linear algebra tutorial

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  • Опубликовано: 18 ноя 2024

Комментарии • 155

  • @blackpenredpen
    @blackpenredpen  4 года назад +103

    Good morning!

    • @nikhilpathania5108
      @nikhilpathania5108 4 года назад +4

      We r having evening here!!
      India 🇮🇳🇮🇳

    • @DJ-mr9tg
      @DJ-mr9tg 4 года назад +2

      It's nearly my bedtime when I saw this, about half an hour after release

    • @sigmaswan2969
      @sigmaswan2969 4 года назад +2

      Good evening

    • @muktisubhiantara3737
      @muktisubhiantara3737 4 года назад +1

      i'm from indonesia, now in indonesia is night

    • @bhaskarpandey8586
      @bhaskarpandey8586 4 года назад +2

      @@logicalproofs7276 His ❤ is his ❤ none of your ❤. Find your own gf

  • @anishjha8919
    @anishjha8919 4 года назад +38

    4:46, oh I love that look of a Mathematician.

  • @trueriver1950
    @trueriver1950 4 года назад +29

    Here's a note on where matrices can take you, once you get used to using the subscript notation rather than writing them out in full.
    AB in general does not equal BA, or as mathematicians and physicists say matrix multiplication is "non commutative".
    But (AB)C always equals A(BC) (associative)
    And
    A(B+C) always equals AB + BC (distributive)
    In Quantum Mechanics the non commutativity combined with the other two properties makes matrix algebra very useful.
    The difference AB - BA in particular turns out to have important physical meaning, sometimes called the commutator, and that in turn means that in QM the important matrices are square (otherwise that difference is undefined)
    It is also important for matrices to be useful to QM that associativity and distributivity do work as for scalars.
    The slight oddity to the incoming physicist is that some QM matrices have an infinite number of rows and columns... you don't usually meet that possibility in a maths course on matrices. When writing the equations with subscripts is actually no harder than a 2x2, just don't get stressed by the fact that you are covering infinities of elements. And if that feels strange for now, maybe come back to it later when you have had more experience with sensible sized matrices!
    Hint: don't try to write the elements out in full though...

  • @adrianarnaezsanchez4427
    @adrianarnaezsanchez4427 4 года назад +11

    I just saw this today in university. Thanks, you are the best man!!!

  • @kxnny2
    @kxnny2 Год назад

    that last prove was a lifesaver dude, thanks

  • @muhammadadrian4776
    @muhammadadrian4776 4 года назад +2

    This came at the right time tq mr blackpenredpen !!!!!

  • @jacobjohnferrerjr.1306
    @jacobjohnferrerjr.1306 3 года назад +3

    Thank You very much!
    I want this in my subject in linear Algebra in early 9th grade.🙏😱

  • @TaraKulshrestha
    @TaraKulshrestha 6 месяцев назад

    This was so helpful and well-explained, thank you so much!

  • @nekothecat
    @nekothecat 3 года назад +4

    Can I just prove property 4 by doing this? As dimension of A is m×n and n×p for B. Hence the dimension of the product should be m×p
    For (AB)^T, the dimension of their product should be p×m this time and the only way to get this, is p×n matrix times n×m martix, which are B^T times A^T

  • @nikhilpathania5108
    @nikhilpathania5108 4 года назад +3

    You r best 👍👍👍 maths teacher. And i want to be like u 😍😍😋 lots of love from india 🇮🇳🇮🇳

  • @neilgerace355
    @neilgerace355 4 года назад +8

    4:46 In general, AT.BT does not exist because the dimensions are incompatible. AT is n x m and BT is p x n. Is that correct?

    • @Apollorion
      @Apollorion 4 года назад

      'Only' when p is unequal to m.

    • @SimoneCasciaro54
      @SimoneCasciaro54 4 года назад +1

      Exactly. If m=p AT*BT may exist but it would be still different from BT*AT

    • @johnny_eth
      @johnny_eth 4 года назад +1

      (AB)^T=B^T*A^T

    • @dvnsyaswanth9936
      @dvnsyaswanth9936 4 года назад

      If both the matrices are square matrices of same order , then it is possible to apply the property

    • @trueriver1950
      @trueriver1950 4 года назад

      @@SimoneCasciaro54
      Not usually equal.
      There is nothing to stop a special case where they do happen to be equal.

  • @dognip
    @dognip 4 года назад

    I am excited because in this year I learn matrices and limits

  • @shivanshkumar355
    @shivanshkumar355 7 месяцев назад +1

    Love from India ❤❤

  • @ranjitsarkar3126
    @ranjitsarkar3126 4 года назад +5

    When you multiply matrices ...it's weird.'
    ---blackpenredpen

  • @yatogami7393
    @yatogami7393 4 года назад +6

    Just started transposition today .....And this will act as revision xd .
    Btw my man has grown a beard!!!

  • @Visputescooking
    @Visputescooking 4 года назад +4

    He is Mathbulious!!! 🔥🔥

  • @drpeyam
    @drpeyam 4 года назад +6

    No dual spaces? 😭😭😭

    • @blackpenredpen
      @blackpenredpen  4 года назад +5

      I don’t even have a space in the first place

  • @spicyramen01739
    @spicyramen01739 Год назад

    thank you so much you saved me

  • @holyshit922
    @holyshit922 Год назад

    1 and 4 properties are nearly the same for matrix inverse (but for matrix inverse we must have square and non singular matrices)

  • @Grassmpl
    @Grassmpl 4 года назад

    So easy. Can do it over any field. Or even a ring, where a matrix is invertible iff its det is a unit.

  • @ClahiCwahaab
    @ClahiCwahaab 14 дней назад

    Thanks bro🎉❤

  • @JerryTran-q2o
    @JerryTran-q2o 27 дней назад

    hi can I ask for property #3 why (kA)^T = k(A)^T but not K^T (A)^T

  • @motherflerkentannhauser8152
    @motherflerkentannhauser8152 4 года назад +1

    If a matrix represents a linear mapping, then what mapping does its transpose represent?

    • @drpeyam
      @drpeyam 4 года назад +1

      Check out my dual space playlist for an answer to this ;)

  • @adityadhar1358
    @adityadhar1358 3 года назад +2

    "It's kinda wierd because when you multiply matrices, it's wierd"

  • @silendil
    @silendil 4 года назад

    I have a question. Using properties 2 and 3 transposition is linear operator. My question- what the matrix of this operator?

    • @trueriver1950
      @trueriver1950 4 года назад

      It is a question worth asking. It turns out that it is fairly straightforward to show that the transpose operation is not capable of being performed by matrix multiplication.
      The formal way is by reductio ad absurdam.
      The crafty and unofficial way is to notice that mathematicians are usually rather parsimonious with notation. They probably would not have invented a specific transpose operator if it could be reduced to a matrix and a multiplication.
      But let's do the proof property
      Consider the two by two matrix
      ( a, b )
      ( c, d )
      Assume that there exists a matrix T that when it premultiplies A gives the transpose of A. Let T=
      ( p, q )
      ( r, s )
      The top left element of the transpose is just a.
      That means that for any a,c we have
      (p,q).(a,c) = a.
      ((Notice here I am using a dot product. You can imagine i am writing the second vector as a column if you prefer -- I am just mixing notations because of the restrictions that Y-T comments impose))
      Clearly (p, q) = ( 1, 0 )
      Likewise consider the bottom right: for that corner to work out we end up with
      ( r, s ) = ( 0, 1)
      Reassembling T we find that we have the identity matrix. That clearly is not the T we set out to find. That's the first contradiction.
      Had we tried the other two corners we would have found a matrix
      ( 0, 1 )
      ( 1, 0 )
      so we have found contradictory values for each of the four elements of T.
      The logic is impeccable, and can be done for any size matrix, so our assumption that any T exists must be false.
      A corollary of this result is that not all linear transformations can be expressed by matrix multiplication (at least under the definition you are using for a linear transformation)
      This is despite the fact that a matrix multiplication always gives a linear transformation. The relationship is not reflexive.

  • @cjnenin89
    @cjnenin89 3 года назад

    nice job

  • @EricBrunoTV
    @EricBrunoTV 3 года назад

    Hi why is the utility of finding Transpose of a Matrix? Thank you

  • @jofx4051
    @jofx4051 4 года назад

    Matrix Transpose:
    Rows become columns and columns become rows

  • @johndavecusi6990
    @johndavecusi6990 4 года назад

    (1-x^2)y'=1-xy-3x^2+2x^4 can u solve this equation

  • @Jared7873
    @Jared7873 4 года назад

    Why do you not add sung outro anymore? 🎶Black pen red pen...

  • @domanicmarcus2176
    @domanicmarcus2176 Год назад

    Hello sir, but I think that at 0:24, you said 2X4 matrix, but you wrote down a 4X2 Matrx which was transposed to a 4X2. I think you were thinking of the transposed, not the original.

  • @srivatsav9817
    @srivatsav9817 4 года назад

    Good night bruh ..... We from india... Waiting for your post

  • @rateeshk8175
    @rateeshk8175 4 года назад

    Morning Steve ☀

  • @noname-gd9gk
    @noname-gd9gk 4 года назад +2

    I got a test with an integration question, integrate the function ax²+bc+c. Everything was well and good and I got ax³/3+bx²/2+cx+constant.
    *BUT*
    They gave one option as ax³/3+bx²/2+cx+c (i.e; instead of constant they wrote c). But isn't that wrong. Because they have chosen a variable c for constant which is already present in the equation. I lost totally 5 marks due to this..

    • @yashsinghal1023
      @yashsinghal1023 4 года назад

      Wow that was unfortunate... this is exactly the reason why I have trust issues with mcq , like there would be error something like this and I would constantly think was it intentional or didn't caught examiner eye

    • @noname-gd9gk
      @noname-gd9gk 4 года назад +1

      @@yashsinghal1023 Everyone in my class blindly used formula and got full marks and the teacher who teaches also blindly uses formula. It seems only I got the answer wrong.

    • @chinni6613
      @chinni6613 3 года назад

      Marks doesn't equals to knowledge right!!

    • @noname-gd9gk
      @noname-gd9gk 3 года назад

      @@chinni6613 but my knowledge is tested only using marks.

  • @husseinelsayed8010
    @husseinelsayed8010 4 года назад

    You are the best teacher

  • @georgebakradze3202
    @georgebakradze3202 4 года назад

    Can you do some fuctional equations after linear algebra rush.

  • @toaj868
    @toaj868 4 года назад

    Is the condition of having the appropriate dimensions the only reason matrix multiplication is not commutative?

    • @trueriver1950
      @trueriver1950 4 года назад

      Did you mean commutative?
      AB is not generally equal to BA (non commutative), though there are special cases where that holds "by coincidence".

    • @toaj868
      @toaj868 4 года назад

      @@trueriver1950 Oh yeah sorry I'll edit it.

  • @divisix024
    @divisix024 10 месяцев назад

    In other words, the matrix transpose is a determinant-preserving linear involutive antiautomorphism on the set of matrices.

  • @JSSTyger
    @JSSTyger 4 года назад +1

    I learned to hate Linear Algebra quite immensely in my younger days.

  • @johnny_eth
    @johnny_eth 4 года назад

    Could you define a partial transpose operation P(n) such that A^P(0)=A, A^P(1)=A^T, A^P(2)=A, and A^P(1/2)^P(1/2)=A^T?
    What would A^P(1/2) look like?
    I kind of expect it to require something like imaginary matrices, kind like how complex numbers provide continuous behavior between positive and negative numbers.

    • @Grilnid
      @Grilnid 4 года назад

      I dont think it is possible to express transposition as a combination of matrices you could multiply your matrix A by. The transpose function is linear but from Mnp ->Mnp, so if you wanted to express that as a matrix you would have to define a matrix T which would have a size of n*p by n*p and and have it act on vectors of length n*p which would then represent your n by p matrices. With that in mind I don't doubt for a second that someone somewhere tried to figure out half-transposition lmao

    • @Grilnid
      @Grilnid 4 года назад

      Oh woops just noticed that you werent actually multiplying P and A together my bad pal, point still stands though

    • @johnny_eth
      @johnny_eth 4 года назад

      @@Grilnid regarding matrix dimensions, perhaps it could be first extended to a square matrix using rows and columns from an identity matrix.

    • @Grilnid
      @Grilnid 4 года назад

      Yeah so I tried something on paper and you could express transposition as a fourth-order tensor acting on matrices (aka second-order tensors) but honestly if we're delving into tensor territory I'm just way out of my depth lmao

  • @omshandilya8888
    @omshandilya8888 4 года назад +2

    2020 raise to the power 2019 - 2020 divided by 2020 square + 2021=N
    then find the sum of digits of n
    bro plz solve this?? trying from last 5 weeks

    • @tonyhaddad1394
      @tonyhaddad1394 4 года назад

      Pleaz can you write your question in order and use ( )

    • @omshandilya8888
      @omshandilya8888 4 года назад

      Tony Haddad
      when (2020^2019 - 2020) is divided by (2020^2 + 2021) then we get the remainder as N now you have to find sum of digits of the N
      Understood??

    • @omshandilya8888
      @omshandilya8888 4 года назад

      Tony Haddad Answer is proper numeric

    • @tonyhaddad1394
      @tonyhaddad1394 4 года назад

      @@omshandilya8888 thank u man

    • @tonyhaddad1394
      @tonyhaddad1394 4 года назад

      @@omshandilya8888 i will try my best

  • @anthonyyan3549
    @anthonyyan3549 4 года назад

    回憶在中學時的課程

  • @castilloguevaragiancarlomi6952
    @castilloguevaragiancarlomi6952 4 года назад

    if A and B are commutable,their transposes too.

  • @dragojakimovski6018
    @dragojakimovski6018 4 года назад

    Can you solve algebra problems

  • @alejrandom6592
    @alejrandom6592 3 года назад

    4:47 serious mode on

  • @ed.659
    @ed.659 29 дней назад

    4:45
    "you paying attention right?"

  • @ilickcatnip
    @ilickcatnip 3 года назад

    9:12 , your 'not a box' still looks more box than my boxes °Π°

  • @lukedevlin45
    @lukedevlin45 4 года назад

    where did 7:03 come from?

  • @achrafbelhadaoui5035
    @achrafbelhadaoui5035 4 года назад

    finally algebra seRIES!!!!!!

  • @toaj868
    @toaj868 4 года назад

    Are properties 2 and 3 because matrix addition and scalar multiplication point-wise?

    • @trueriver1950
      @trueriver1950 4 года назад

      Yes.
      And similarly multiplication is different because it's more complicated than pointwise

    • @toaj868
      @toaj868 4 года назад

      @@trueriver1950 But it's still a neat expression because it is row to column. Kind of like the transpose operator itself.

  • @tiborgrun6963
    @tiborgrun6963 4 года назад

    Can you solve (AB)^T = A^T B^T for A and B?

  • @prabhatsharma5751
    @prabhatsharma5751 4 года назад

    Love form Nepal❤

  • @Auii234
    @Auii234 6 месяцев назад

    Pf: 2 please

  • @tomatrix7525
    @tomatrix7525 3 года назад

    3:19 me with everything

  • @weekipi5813
    @weekipi5813 4 года назад

    already knew that.

  • @chessematics
    @chessematics 4 года назад +1

    Want a bprp best moments episode

  • @52.yusrilihsanadinatanegar79
    @52.yusrilihsanadinatanegar79 4 года назад

    Cool!

  • @MrBlonde58
    @MrBlonde58 4 года назад

    en.m.wikipedia.org/wiki/Symplectic_matrix not directly a transpose property but maybe you can explain in a future episode 😁

  • @박서진-n3q
    @박서진-n3q 4 года назад

    thats interested

  • @qwertyuiop5975
    @qwertyuiop5975 4 года назад +1

    🔥💖LOVE FROM INDIA 💖⚡💖

  • @revoltoff
    @revoltoff 4 года назад

    Dear blackpen redpen: Can you do a 1 hour CRASH course of elementary functions such as z(x,y)= e^xy2ln+ln(3y+x) find the derivative of that, and stuff like Change of X and change of Y gives this and this, how to work with the definition of the derivative. And stuff like Quick tips for basic optimizations, some basic integral rules and ways to do it, just an overall guide for math noobs

  • @dragojakimovski6018
    @dragojakimovski6018 4 года назад

    And number theory

    • @Grassmpl
      @Grassmpl 4 года назад

      Hermite and Smith normal forms

  • @channelbuattv
    @channelbuattv Год назад

    The transpose of 8 is infinity 😅

  • @junielamadayag1946
    @junielamadayag1946 3 года назад

    oh the pokemon ball is his mic.......

  • @gurindersinghkiom1
    @gurindersinghkiom1 4 года назад

    How to find the square root of matrix

  • @bhaskarpandey8586
    @bhaskarpandey8586 4 года назад

    I thought this video be about commutative matrices

  • @joeistead
    @joeistead 4 года назад

    1, 2, 3, 4, 5, 6, 7, ... 9!?!?!?!? How dare you, sir!

  • @اقاتࢦࢦوحديہِٰ
    @اقاتࢦࢦوحديہِٰ Год назад

    ❤️

  • @zeroregretsgiven
    @zeroregretsgiven 4 года назад

    This is so trivial.

  • @Mau-ME
    @Mau-ME 4 года назад +1

    Lo único que entendí fue pokeball.

  • @markzebian123
    @markzebian123 Месяц назад

    Why is he always holding a pokeball???

  • @Visputescooking
    @Visputescooking 4 года назад +2

    We, the people of the world would like you to see with the full-touch chalk. 🔥Will you?🔥

  • @BharatGhantala
    @BharatGhantala 6 месяцев назад

    Indian teachers are best...😊😊not foreign

  • @wesleysuen4140
    @wesleysuen4140 4 года назад

    u always hold something cute in your left hand... does it really help keeping people’s eyes on the screen?

    • @MrConverse
      @MrConverse 4 года назад

      Wesley Suen, it’s his microphone... and his trademark.

    • @trueriver1950
      @trueriver1950 4 года назад

      It always used to be a black sphere that (in my opinion) wasn't that cute. I used to wonder if it had remote controls for the video camera on it.
      Then one day his gf gave him a cute toy to use as a mic holder, and since then he has varied then from time to time.
      It's become his second trademark, his principal trademark being the way he swaps between two colours without putting either pen down.

  • @AyushMishra-uq6ce
    @AyushMishra-uq6ce 4 года назад +21

    What's up with the beard lmao 😂

    • @Sednas
      @Sednas Месяц назад +1

      Confucius

  • @nikhilpathania5108
    @nikhilpathania5108 4 года назад +1

    Pokemon ball?? 🙁

  • @اقاتࢦࢦوحديہِٰ
    @اقاتࢦࢦوحديہِٰ Год назад

    i love you 😘😘😘😘😘❤️

  • @Lumina1729
    @Lumina1729 4 года назад

    First

  • @tanmaysinghal3387
    @tanmaysinghal3387 4 года назад +1

    U look weird in that beard

  • @اقاتࢦࢦوحديہِٰ
    @اقاتࢦࢦوحديہِٰ Год назад

    ❤️

  • @omshandilya8888
    @omshandilya8888 4 года назад +1

    2020 raise to the power 2019 - 2020 divided by 2020 square + 2021=N
    then find the sum of digits of n
    bro plz solve this?? trying from last 5 weeks

    • @hamiltonianpathondodecahed5236
      @hamiltonianpathondodecahed5236 4 года назад +1

      (2020²⁰¹⁹ - 2020) / ( 2020² + 2020 + 1)
      x = 2020
      x(x²⁰¹⁸ - 1) /( x² + x + 1) = x(x - 1)( x²⁰¹⁸-1) / ( x³ - 1)
      Try using generating functions : )
      btw N is not an integer ig ಠ_ಠ, it leaves 4080402{in a previous version I had put 2019 here by mistake} as a remainder so doesn't make much sense to talk about sum of digits
      Actually polynomial reduction also works well

    • @omshandilya8888
      @omshandilya8888 4 года назад

      Hamiltonian Path on dodecahedron
      I am really grateful that you spend time in answering
      but can you plz tell ahead as I just watched a video on generating function and as told by him generating function is sum of a series and now i am not able to relate it to this Q
      pleases guide

    • @omshandilya8888
      @omshandilya8888 4 года назад

      ya actually we need to find sum of the digis of remainder of that division

    • @hamiltonianpathondodecahed5236
      @hamiltonianpathondodecahed5236 4 года назад

      @OMS PLAYER oh , for remainder , you should try polynomial reduction,
      ELABORATE METHOD:
      consider the eqn
      (x^2019 - x) = Q(x) (x^2 + x + 1) + R(x)
      Observe that R(x) would be linear , hence
      x^2019 - x = Q(x) (x^2 + x + 1) + ax + b
      substitute x = cbrt(1) = omega (I will represent it as w) and omega ^2
      so the eqn becomes
      w^2019 - w = Q(w)( 0 ) + a w + b - - - - - (1)
      similarly
      w^4038 - w^2 = a w^2 + b - - - - - - - (2)
      (1) can be written as
      1 - w = aw + b
      and (2) as
      1 - w^2 = a w^2 + b
      Solving gives a = -1, b = 1
      Hence
      x^2019 - x = Q(x) (x^2+x+1) + 1-x
      replacing x = 2020 , we get
      2020^2019 - 2020 = Q(2020)(2020^2 + 2020 + 1) - 2019
      Now adding 2020^2 + 2020 + 1 to -2019 gives the required remainder = 2020^2 + 2 = 4080402
      Shortcut Method avoiding complex numbers a bit
      we 'll again use remainder theorem but in a cleverer way
      in the previous method we basically substituted x such that divisor becomes 0
      ie (x^2 + x + 1) = 0 => (x^3 = 1)
      hence in a vague sense(actually modulo x^2 + x +1) x ^ 2019 = (x^3)^k = 1
      x^2019 - x = 1 -x
      now the previous method follows

    • @hamiltonianpathondodecahed5236
      @hamiltonianpathondodecahed5236 4 года назад

      @@omshandilya8888 You may ask if there are any queries regarding the solution

  • @authoryajat
    @authoryajat 4 года назад

    First

  • @اقاتࢦࢦوحديہِٰ
    @اقاتࢦࢦوحديہِٰ Год назад

    ❤️

  • @whiplash743
    @whiplash743 4 года назад +1

    First