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🔷15 - Eigenvalues and Eigenvectors of a 3x3 Matrix

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🔷14 - Eigenvalues and Eigenvectors of a 3x3 Matrix
Given that A is a square matrix (nxn),
Ax = kx -------(1), where
A = an nxn matrix (square matrix),
x = eigenvector of A corresponding to k,
k = eigenvalue of A corresponding to x
It is usually asked to find the eigenvalue as well as the eigenvector that satisfy the above equation.
Notice that we are only interested in the solution with x not equal to zero.
from (1), Ax = kx
Ax = kIx ------(2) ,
(A-kI)x = 0 ----(3)
the system will give a non-zero solution if and only if det (A-kI)x = 0 ,
det (A-kI) gives rise to a polynomial called the characteristic polynomial and the equation formed when det (A-kI) = 0 is called the characteristic equation. The solutions to the equation are the eigenvalues....
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Опубликовано:

26 авг 2024

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Комментарии : 419

@evansokosodo2791 Год назад

This is so straightforward. What a good teacher! Many thanks.

@SkanCityAcademy_SirJohn Год назад

Awww thanks so much

@azizb.tapeing9249 5 месяцев назад

So amazing teacher explained clearly. Can I request a lecture on complex root and equal root

@bitmesrassdsddddsa Год назад

Thanks for existing man

@SkanCityAcademy_SirJohn Год назад

Thanks be to God

@percyarthur5556 Год назад

16:03

@SkanCityAcademy_SirJohn Год назад

The reason is that since the RHS is zero, dividing through by 10 to obtain 1 does not change the value of x3, so it can be ignored.

@peridakingani 10 месяцев назад

Understandable 😊

@SkanCityAcademy_SirJohn 10 месяцев назад

@peridakingani thanks so much

@mr2seis388 4 месяца назад

Hey buddy, I want to thank you for taking on a matrix without 0's because most of these youtube videos i've come across have 0's at the top or bottom and its annoying because the problem i'm tryin to solve is anything but 0's! Thanks!

@SkanCityAcademy_SirJohn 4 месяца назад

You are most welcome, keep watching for more great content. I really appreciate your comments. Where do you watch me from?

@Dee_alh Год назад

you are explaining from the bottom of your heart thank you

@SkanCityAcademy_SirJohn Год назад

Thanks so much for your comment and encouragement.

@Salamanca-joro 2 месяца назад

Absolute cinema! i have final exam on Tuesday and you just saved me

@SkanCityAcademy_SirJohn 2 месяца назад

Aww I guess that's a great feeling for you.

@kwabenablessed4888 Год назад

Very clear explanations. This was very helpful. Thank you

@SkanCityAcademy_SirJohn Год назад

You are welcome

@petrkasanda4511 5 месяцев назад

Thanks very much for this teaching Much love ❤ and respect from zambia 🇿🇲🇿🇲🇿🇲

@SkanCityAcademy_SirJohn 5 месяцев назад

Thanks so much, Kasanda, I appreciate it. Kindly text me on +233243084034 whatsapp

@tomasito_2021 4 месяца назад

Your videos on linear algebra have so far been very helpful. I'd love videos on Diagonalisation of matrices, coordinate transformations and Jordan block decompositions. Thanks!

@SkanCityAcademy_SirJohn 4 месяца назад

Thanks so much. Kindly check this playlist ru-vid.com/group/PLInywrvFyvq7oAlPscVnXsd8CRTsh0b77

@Sylviadaniel 13 дней назад

This is the best channel ever God bless you ❤

@SkanCityAcademy_SirJohn 13 дней назад

Amen. And good luck

@humzaqureshi1391 9 месяцев назад

FOR THOSE STUCK ON 11:05: Apply synthetic division to the lambda equation that is given. Divide the polynomial by (x-1). After doing that, you should get the values (zeros) 1, 2, 21. The reason 1 is included is because the synthetic division ending in 0 allows that factor to be included in your solution as an eigonvalue.

@DevStuf 8 месяцев назад

how do you know what to divide by?

@SkanCityAcademy_SirJohn 8 месяцев назад

@DevourOrGetDevoured please kindly state the time in the video so I help you out.

@DevStuf 8 месяцев назад

@@SkanCityAcademy_SirJohn found out why alr

@gbgfgfc Месяц назад

YEP

@ace09wrld 4 месяца назад

there's a shortcut to the eigen values he solved for and it works; λ^3 - (sum of diagonal of the matrix)λ^2 + (sum of the diagonal of the adjoint of the matrix)λ - (the determinant of the matrix)

@SkanCityAcademy_SirJohn 4 месяца назад

Thanks so much for input❤️❤️

@D17D 5 месяцев назад

Thanks for this. You are explaining directly from your heart, with care and love

@SkanCityAcademy_SirJohn 5 месяцев назад

Thanks so much for watching, best wishes

@MulindwaAbdallahconc-sh4ct Год назад

What a good teacher so precise

@SkanCityAcademy_SirJohn Год назад

Thanks so so much

@palmershot2779 Год назад

I've got a test today and this is all. I needed

@SkanCityAcademy_SirJohn Год назад

That's great. Best wishes

@DhruvPatel-b9h 16 дней назад

Best teacher ever you are GOAT.

@SkanCityAcademy_SirJohn 16 дней назад

Aww... Thanks so much. Keep watching for more

@raghavyadav6121 8 месяцев назад

your videos are really helpful for calculus and linear algebra, thank you!!

@SkanCityAcademy_SirJohn 8 месяцев назад

You're most welcome. And thanks for your kind words too.

@SonnyTechAcademy Год назад

Thanks man. Well explained....the video is long but it's worth it :)

@SkanCityAcademy_SirJohn Год назад

Thanks so much

@wangster331 Месяц назад

Masterpiece. Writing my exam this morning. It sure would save me 😊

@SkanCityAcademy_SirJohn Месяц назад

Yes please, good luck

@wangster331 Месяц назад

@@SkanCityAcademy_SirJohn thanks, I love you

@SkanCityAcademy_SirJohn Месяц назад

@wangster331 aww thanks so much Where do you watch from

@wangster331 Месяц назад

From Nigeria

@SkanCityAcademy_SirJohn Месяц назад

@wangster331 great

@ai_enthusiast78 3 месяца назад

amazing teaching method

@SkanCityAcademy_SirJohn 3 месяца назад

thanks so much for your comment. And good luck in your academics

@paulowiredu7586 10 месяцев назад

From your accent, I could spot you're my Ghanaian brother..... Watching your video from the States. .

@SkanCityAcademy_SirJohn 10 месяцев назад

That is correct. I'm a Ghanaian

@SkanCityAcademy_SirJohn 10 месяцев назад

That's great, are you doing postgrad studies?

@rivieraokapi 8 месяцев назад

Thank you my friend, you made it a lot more digestible. What a teacher!!

@SkanCityAcademy_SirJohn 8 месяцев назад

You are most welcome. Please keep watching for more

@yahyadiaa9679 3 месяца назад

You saved me from failing my exam for the 4th time

@SkanCityAcademy_SirJohn 3 месяца назад

Wow, that's great

@plantmc9319 Месяц назад

Dang 4 times that’s crazy. Fr though this dude has the best explanation

@saja_22A Месяц назад

How did you get out? Lamda? Final output ? @@SkanCityAcademy_SirJohn

@chaimaahidji 5 месяцев назад

this lesson is very awesome , thanks so much ☺

@SkanCityAcademy_SirJohn 5 месяцев назад

You are most welcome

@cxndy_mocha8076 6 месяцев назад

This is so easy after listening to this. Tysm! 😭

@SkanCityAcademy_SirJohn 6 месяцев назад

Thanks so much for your comments and good luck in your studies.

@nehemiahbalozi5731 4 месяца назад

Well understood... Thanks

@SkanCityAcademy_SirJohn 4 месяца назад

Most welcome

@user-iy3rq7zg2v 4 месяца назад

Think you sif❤❤

@scenicsceneBD 6 месяцев назад

It’s to much helpful, love you man ❤❤

@SkanCityAcademy_SirJohn 6 месяцев назад

Thank you so so much

@selly0072 2 года назад

God richly bless you🙏🏽

@SkanCityAcademy_SirJohn 2 года назад

Amen... thank you very much. best wishes

@JosephOtieno-zu2rm 5 месяцев назад

I think you need an oscar award🥳🥳🎉

@SkanCityAcademy_SirJohn 5 месяцев назад

Thanks so so much

@annahkerubo6371 Год назад

In finding eigen values of 21, why did we use row two as the pivot row for reduction and not row 1

@user-gv5dd3bi5l Год назад

answer this question

@SABRINAHAMID-ok3cz 7 месяцев назад

THANKS A LOT

@SkanCityAcademy_SirJohn 7 месяцев назад

You're welcome!

@edsonsimbaya1993 Год назад

Thanks, this is very simple explanation

@SkanCityAcademy_SirJohn Год назад

You are most welcome

@wannurfatimahayunibintiwis2844 7 месяцев назад

thank you!!!

@SkanCityAcademy_SirJohn 7 месяцев назад

You are most welcome

@helifonseka9611 2 года назад

Thank you from Sri lanka! 🙏

@SkanCityAcademy_SirJohn 2 года назад

Youre most welcome

@sajjalsayjal3640 8 месяцев назад

How we find these eigen values that you write??

@pankajthakur8663 4 месяца назад

Excellent

@SkanCityAcademy_SirJohn 4 месяца назад

thanks so much

@habib97se 7 месяцев назад

thank you for the video, you helped med a lot.

@SkanCityAcademy_SirJohn 7 месяцев назад

You are most welcome

@AbbSalehi 10 месяцев назад

I have two original equations with three unknowns ( X, Y, Z). I've just added one extra equation to make the original equations solvable. What should I call this adding process in mathematics? I just need the correct wording for that. Any help would be appreciated. Thanks

@ut_9882 3 месяца назад

sorry sir i think there is a small mistake in the value of λ=1,λ=2 and it is equal to λ=-23 not -21

@SkanCityAcademy_SirJohn 3 месяца назад

Please double check your answer, the right values are 1, 2 and 21.

@OdongoKizito 9 месяцев назад

Thank for the wonderful explaination

@SkanCityAcademy_SirJohn 9 месяцев назад

Most welcome

@Twilightaria Год назад

Godddd bless youuu I've been struggling the wholeee day to understand thisss❤❤❤❤❤❤

@SkanCityAcademy_SirJohn Год назад

That's great, thanks you got sorted at the end. Where do you watch from?

@Twilightaria Год назад

@@SkanCityAcademy_SirJohn UAE 🇦🇪

@SkanCityAcademy_SirJohn Год назад

@idontcare7667 that's fine, im from Ghana 🇬🇭.

@SkanCityAcademy_SirJohn Год назад

@idontcare7667 Muslim or Christian?

@efosaomoregie5246 Год назад

Thank you bro we love and appreciate you

@SkanCityAcademy_SirJohn Год назад

You're welcome

@SkanCityAcademy_SirJohn Год назад

Thanks for watching

@BADURELGADIR-dd2ck Месяц назад

thank you for your useful lecture.

@SkanCityAcademy_SirJohn Месяц назад

thanks so so much....I'm grateful

@ChidiebubeAli Месяц назад

For the first eigenvalue, I thought it should not have zero as a value@@SkanCityAcademy_SirJohn

@OpareAddoNanaYaw-tg8ni Год назад

At 28:04 why was (-10-10) equal to 0. If I’m not mistaken it should be 20. More clarity on this please

@SkanCityAcademy_SirJohn Год назад

R2-R3. -10-(-10) = -10+10 = 0

@stevenkanguya5087 Год назад

THANK YOU VERY MUCH,,, YOU JUST EARNED YOURSELF A SUBCRIBER

@SkanCityAcademy_SirJohn Год назад

thanks so much Steven

@nesaaqlimakhan Месяц назад

hey , so for the values of eigenvector , our aim should be making R3 to 0 ?

@SkanCityAcademy_SirJohn Месяц назад

not necessarily, the aim is to convert the given matrix to an upper triangular matrix with the leading diagonals being 1. however when there is a zero row, ie a row with all zeros, it should be at the buttom.

@MORINGELOMANYAKI 7 месяцев назад

Nice and reasonable solution

@SkanCityAcademy_SirJohn 7 месяцев назад

Thanks so much

@cherrybuff5991 Год назад

Thank you from India♥

@SkanCityAcademy_SirJohn Год назад

You are welcome

@masked_man7745 Год назад

Explanation is very good and clear. Keep it up.

@SkanCityAcademy_SirJohn Год назад

Thank you so much

@masked_man7745 Год назад

@@SkanCityAcademy_SirJohn one of these questions came during my exams and I was able to attend it thankyou

@SkanCityAcademy_SirJohn Год назад

Aww you are most welcome.

@sanketkumbhar Год назад

How to find eigen values & eigen vector corresponding to smallest eigen value in 3 by 3 matrix

@sanketkumbhar Год назад

Plz give me thise question answer

@Enthub47 Год назад

Please can you tell me what app you used for this tutorial. The board and pens style in particular. It’s soo smooth 🙂

@SkanCityAcademy_SirJohn Год назад

I used smoothdraw

@Enthub47 Год назад

@@SkanCityAcademy_SirJohn no wonder it’s smooth ! You do all 🙌🏾🙌🏾

@SkanCityAcademy_SirJohn Год назад

Thank you

@ssalijovan123 3 месяца назад

Bless you, but so you have any videos about vector spaces and spaning a vector.

@SkanCityAcademy_SirJohn 3 месяца назад

Amen. No please

@manuelmakritos Год назад

Wow .....I love this explanation

@SkanCityAcademy_SirJohn Год назад

Thanks so so much

@georgeasabre6393 2 года назад

You be doing the most 💪🤲

@SkanCityAcademy_SirJohn 2 года назад

thanks so so much. good luck today

@ghost3826 2 месяца назад

Goated 🐐

@SkanCityAcademy_SirJohn 2 месяца назад

Thank you very much

@darcash1738 5 месяцев назад

This is awesome! I was wondering, is the best way for this usually the cofactor expansion? Or if we happen to have 1's in our matrix do you think it is more worth it to do Chio's decomposition to make it one dimension lower? I tried the normal 3x3 trick where we add the first two columns on the outside of it to do that but i found this pretty messy

@SkanCityAcademy_SirJohn 5 месяцев назад

Wow, really

@darcash1738 5 месяцев назад

@@SkanCityAcademy_SirJohn honestly I don’t know I guess it depends. This cofactor expansion would be nicest in the case everything else were zeros up top. And you have to get lucky for chio bc the whole diagonal is already excluded due to the -lambda part. I learned Chios condensation a bit ago and I think it’s so cool, it’s just that I rarely find a chance to use it 😂

@SkanCityAcademy_SirJohn 5 месяцев назад

yes actually@@darcash1738

@SkanCityAcademy_SirJohn 5 месяцев назад

where do you watch me from? which program do you read and level?@@darcash1738

@darcash1738 5 месяцев назад

@@SkanCityAcademy_SirJohn I’m from America, and I’m just taking some intro to linear algebra class. I like learning math on my own sometimes too so I just happened across Chios condensation one day. I wish we’d learn more cool tricks like that too. Just right now I learned that the characteristic equation for 3x3 is λ^3 -trace(A)*λ^2+Diagonal Minors(A)*λ - |A| = 0. If you have any cool tricks too (determinants, eigenvalues or vectors, etc), please recommend them even if they might be a bit above my current level 😅

@InthipornBunkhan 9 дней назад

My textbook said λI - A and your is A-λI. Is these two method have a different answer? Because at the start I use λI-A but the rest I follow your method.

@SkanCityAcademy_SirJohn День назад

Well you can solve more questions with that approach to see if the answers will be the same, but then my method is what you see in most textbooks.

@samaawagih7272 Год назад

Spectacular Explanation.

@SkanCityAcademy_SirJohn Год назад

thanks so much Wagih

@everything4editing. 4 месяца назад

Thanks so much ❤❤❤

@SkanCityAcademy_SirJohn 4 месяца назад

You are most welcome

@YasabnehAddisu 4 месяца назад

its so tebeda thanku

@SkanCityAcademy_SirJohn 4 месяца назад

You are most welcom

@reatbang 2 месяца назад

𝐓𝐡𝐚𝐧𝐤 you

@SkanCityAcademy_SirJohn 2 месяца назад

You are most welcome

@edvinaleksandrov1417 Год назад

very good explanation

@SkanCityAcademy_SirJohn Год назад

Thanks so much Edvin

@alexkim7270 Год назад

Wow thanks for the clear explanation! Can I understand why when you interchange the rows in matrix, it doesn't change the final result?

@Spartacus005 11 месяцев назад

I think it's because the rows are just stand-ins for the equations and the columns for the variables. Therefore, you can put the rows in any order and still be fine because you can solve the equation system in any order. It is once you change the order of the columns that you run into problems and change the finals result. If you were to swap Row 1 and Row 2, it'd be the same as completing Row 2 before Row 1. This does not have a bearing on the final result, so you're free to do that. If you were to swap Column 1 and Column 2, you would be switching the coefficients of x1 and x2 variables, which changes the whole system of equations. Is this making sense?

@SkanCityAcademy_SirJohn 11 месяцев назад

@Spartacus005 thanks so much for your contribution

@viktordowa 6 месяцев назад

Do you always have to make the last line to have all zeros or if you want you can just calculate without making the last line all zeros

@SkanCityAcademy_SirJohn 6 месяцев назад

Not necessarily, but if there appears a zero row, then it should be at the button

@user-ru4vf5se2s Год назад

Thank you very much

@SkanCityAcademy_SirJohn Год назад

You are most welcome

@watsonnampon2993 3 месяца назад

please could you show how to obtain 21 as the eigen values

@SkanCityAcademy_SirJohn 3 месяца назад

You can basically use a calculator, of the factor theorem

@mcnosike7935 Год назад

Thank much for this video it really help

@SkanCityAcademy_SirJohn Год назад

You're nost welcome

@Dee_alh Год назад

I wish my professor explains well like you

@SkanCityAcademy_SirJohn Год назад

awww thanks so much, where do you watch me from?

@nyambemukena5318 2 месяца назад

How did you jump to 21 as the value lambda

@SkanCityAcademy_SirJohn 2 месяца назад

Those are the roots of the equation

@calvinbasotho8437 Год назад

Hi. I need to know how you simplified that cubid equation to find 3 lambda values

@SkanCityAcademy_SirJohn Год назад

You can combine the factor theorem and the long-division method to obtain the factors of the polynomial. hope you are familiar with the two mentioned above. Especially with the factor theorem, if f(x) is a polynomial of degree more than one and 'a ' is a number, then if f(a) is zero, then (x-a) is a factor of f(x).

@NeverTHOUGHTofIT Год назад

Can you do a video about Eugene roots of symmetric matrix that would be good

@SkanCityAcademy_SirJohn Год назад

Okay...noted

@garpthehero3221 Год назад

god bless you thank you so much

@SkanCityAcademy_SirJohn Год назад

thanks so much

@norgac9103 Год назад

Excellent explenation. But one point. How i get lamba 1,2,21 without calc ?

@SkanCityAcademy_SirJohn Год назад

On your calculator, press mode, then equation in the form ax³ + bx²+cx = 0 Then type in the values of a b c and d as in the equations

@norgac9103 Год назад

@@SkanCityAcademy_SirJohn And if i cant use calc i must use cubic equation or is there another variety ?

@SkanCityAcademy_SirJohn Год назад

@@norgac9103 you can use the factor theorem

@norgac9103 Год назад

Thank you .

@norgac9103 Год назад

Bro can I send you one example on custom vectors. I've been counting for maybe 3 hours and I can't get to the vector. I'll send you some money for coffee if you want :D

@cclemon2531 Год назад

when calculating the eigenvectors in the case lamda equals to 1, can i just let the x1 be 1 rather than x2 be 1?

@SkanCityAcademy_SirJohn Год назад

Yes, you can

@frankenstein69 4 месяца назад

Watching 8 hours before final yearly exams Thanks Bro ❤

@SkanCityAcademy_SirJohn 4 месяца назад

You are most welcome

@shivanikumari680 9 месяцев назад

Can you tell me how to find eigen value of this equation x^3+25x^2+50x-1000 ????

@SkanCityAcademy_SirJohn 9 месяцев назад

The eigenvalues are -20, -10 and 5. Use the factor theorem to do so.

@allstar7778 7 месяцев назад

Any reason why you are not using krammer's rule which is much simpler than using charachteristic polynomial equation ?

@SkanCityAcademy_SirJohn 7 месяцев назад

No reason please, you can use crammer's to solve as well.

@allstar7778 7 месяцев назад

@@SkanCityAcademy_SirJohn Alright thanks a lot sir for your reply, your video is really helpful. I thought there must be some mathematical reason. Thanks for clearing this. I also prefer charahteristic polynomial, it somehow just clicks in my brain although it is slow process. One quick question, is it necessary to calculate REF as well for computing an eigen vector ? what if we just a put a quadratic equation directly without computing REF ?

@Algorithmic26 3 месяца назад

What's mean by eigen value?? Why do this

@OsazuwaEro 5 месяцев назад

Thank you sir.. Pls what software do you use?

@SkanCityAcademy_SirJohn 5 месяцев назад

Smooth draw

@kubabak4 Год назад

I have a 3x3 matrice [57 0 24, 0 50 0, 24 0 43] and all calculators and solutions indicate that the +-+ doesn't apply. I was wondering why could this be i.e. to get the right answer you must solve it with the negative : : (57-x)(50-x)(43-x) -24(50-x)(24). I expected it to be positive. Any idea why ?

@SkanCityAcademy_SirJohn Год назад

Are you sure you have punch in the calculator the right entries?

@kubabak4 Год назад

@@SkanCityAcademy_SirJohn So the issue was that I ignored the 0s therefore it was +24[(0x0)-(50-x)(24) instead which is non-intuitive.

@SkanCityAcademy_SirJohn Год назад

Okay

@meshackmwaniki924 5 месяцев назад

Wonderful sir.

@SkanCityAcademy_SirJohn 5 месяцев назад

Thank you very much

@fediMbf99 2 месяца назад

Please how you found lambda with third equation like in the video (10:32)

@SkanCityAcademy_SirJohn 2 месяца назад

It's a cubic equation, just punch on your calculator

@KadmielAcquah 5 месяцев назад

16:53 For lamda 1 ,i think the matrix was not in its row echelon form,if it was can u explain further??

@SkanCityAcademy_SirJohn 5 месяцев назад

It is in Row echelon form. For Row echelon form, diagonal entries are 1 and the elements of the upper triangular matrix can be any other value. Unless in a case where the elements in a row are all zeros, then it is adviced to put that row at the button. While for reduced row echelon looks like the identity matrix

@FatawYakubu-908 5 месяцев назад

Please for the cubic equation if u get the values to be decimals, How do we solve it

@SkanCityAcademy_SirJohn 5 месяцев назад

Usually you will get whole number values, if you get decimals, kindly check if the cubic equation is right

@FatawYakubu-908 5 месяцев назад

@@SkanCityAcademy_SirJohn okay thanks

@reginaldgoka5224 2 года назад

Coming in clutch I see

@SkanCityAcademy_SirJohn 2 года назад

nice

@akhileshakhil4390 5 месяцев назад

how did you get the roots of the equation, I mean how did you get the eigen values.

@SkanCityAcademy_SirJohn 5 месяцев назад

I used a calculator.

@bestanimerecaporiginal 11 месяцев назад

Please man what software do you use

@user-nf2jr2nh2r 9 месяцев назад

would like to teach me an easy method for getting the eigen vectors than eclon because I have failed to understand

@SkanCityAcademy_SirJohn 9 месяцев назад

Really. Sorry about that

@danielkadima571 5 месяцев назад

with another 3x3 matrix I found the characteristic polynomial, I put the equation which was cubic into the calculator. This way is still difficult to find the eigen values unless I am doing this wrong. So I took the same equation and plugged it into Mathway I found that the roots are decimals?

@prosperchidexogbodo5386 11 дней назад

Instead of doing that just factor your rh values

@lauren3441 Год назад

When solving for lambda 3, column 3 row 3 isn’t it supposed to be -20? 28:40

@SkanCityAcademy_SirJohn Год назад

No please, it's -10-(-10) = -10+10=0

@henokbezabih8648 Год назад

Thank you very much Sri

@SkanCityAcademy_SirJohn Год назад

You are most welcome

@curtixscapparrotti8141 Год назад

well simplified. Gracias

@SkanCityAcademy_SirJohn Год назад

Thanks so so much

@angelloparody3216 11 месяцев назад

why do I have to divide the equation by negative 1?

@SkanCityAcademy_SirJohn 11 месяцев назад

Nothing really, just to make the coefficient of x³ positive. But you can ignore it and still get the same answers for x(1, 2, 3)

@rizwann098 8 месяцев назад

Love from Kashmir 🍁❤️

@SkanCityAcademy_SirJohn 8 месяцев назад

Thanks so so much

@rizwann098 8 месяцев назад

@@SkanCityAcademy_SirJohn it's my pleasure to get a teacher like u ... I'm pursuing masters degree in economics but maths teacher isn't so good that's I was finding a teacher who can explain these things straight forward.... ❤️❤️Thank u so much again sir

@SkanCityAcademy_SirJohn 8 месяцев назад

@rizwann098 you are most welcome

@miracle_winter6118 6 месяцев назад

I'm confused....so is it the same for all examples or the swapping and multiplication will vary? Like.....how do you know what to do? Is the bottom row always supposed to have all 0s?? I'm confused...😢

@SkanCityAcademy_SirJohn 6 месяцев назад

It varies, it depends on the question you are solving. The idea is, if there is a zero row, then it should appear at the bottom.

@anshulbajpei935 Год назад

Bro i from india . Nice explain

@SkanCityAcademy_SirJohn Год назад

Okay. Thanks

@nelsonanthony9898 7 месяцев назад

17:33 why do you pick an arbitrary value for x2 but not x1? Will or does it make any difference?

@SkanCityAcademy_SirJohn 7 месяцев назад

Oh no, it doesn't make any difference, you can either choose for x1 then you use that to find x2. It depends on your preference.

@viktordowa 6 месяцев назад

But if there is a negative it will definitely affect your answer, won’t it?

@SkanCityAcademy_SirJohn 6 месяцев назад

@viktordowa please a negative where

@pianielmdk 4 месяца назад

God please help me remember all this for my exam 🙏🏽😢

@SkanCityAcademy_SirJohn 4 месяца назад

Amen. The LORD is our helper.

@pianielmdk 4 месяца назад

@@SkanCityAcademy_SirJohn thanks 🙏🏽 the question on eigenvalues contained 25% of the marks

@Gaayathri_Ganesh Год назад

Thank you so much!!

@SkanCityAcademy_SirJohn Год назад

You are welcome

@Zyscha Год назад

For Lambda= 21, my eigenvectors are coming out to be [6,6,1]. Can you please check yours once? I think you can not perform a row operation using a row if you have operated on that same row in the same step.

@SkanCityAcademy_SirJohn Год назад

Hi Zyscha, kindly check your approach one more time, if you are still not getting what I had, then you let me know, because what I've done in there is the actual thing. Thanks so much

@Zyscha 11 месяцев назад

@@SkanCityAcademy_SirJohn I don’t know I have done it multiple times, I reach the same answer. How do I show you my approach?

@SkanCityAcademy_SirJohn 11 месяцев назад

Please are you on WhatsApp?