I'm sorry, but I was writing this proof down in my notes, and I must confess: I will never forget this simple proof to one of (if not the) most important theorems in Linear Algebra, and it's all thanks to you, kind sir.
@@LearningClassSince2020 thank you for your explanation, sir! 🙏 I have a qno-"if X is a eigen vector of a matrix A corresponding to eigen value lamda, then show that kx, k being a non zero scalar is also an eigen vector of A corresponding to lamda". Can you do a video on this qno? Pls! 🙏🙏🙏🙏
Lambda is a scalar/constant means that there will be some value of lambda for which the equation would be true. So, to substitute lambda as matrix A means to check whether that value of lambda is A matrix or not; in other words, whether matrix A satisfies the equation or not.
Assalam-o-alaikum jazak Allah sir Allah shower his countless blessings upon you ameeeeeen Allah succeeded us In every field of life ameeeeeen always live happy 🥰🥰🥰
Lakin Sr jo adjoint degree n-1 Lia Jo argument dia hai wo sirf 2*2 k Lia walid hai jab 3*3 ka matrix lain gay tab BHI spilt karny k bad bhi lemda ki power 1 hi ay gi ....
I'm sorry, but I was writing this proof down in my notes, and I must confess: I will never forget this simple proof to one of (if not the) most important theorems in Linear Algebra, and it's all thanks to you, kind sir.
Thank you for appreciating!
A big thankyou to the guy who is there 🙋....i understood each and every step very easily 🙆....and Oh yes, your handwriting....😍😍
Thankyou again....🙏😊
Thanks a lot for appreciating😄😄
Best video on youtube for this topic👍👍
Thankyou so much😍
Such a simpler proof than the one our prof showed us in the lecture. Thank you sir.
You're welcome
I doesn't intrest study cayley Hamilton theorem but ...... now clearly understand for me .....well explained sir
Thanks
Very well explained thank you sir
Thanks
best explanation among all the videos in RUclips
Thanks
Thanks sir I understand each and every point in this theorem thank U so much
Best teacher ❤️❤️❤️I understand each step and evry point .best video for this topic❤️❤️❤️
Thanks for appreciating!
Nice Sir G....Bundle Of Thanks Sir...
This video is very helpful..
Simplified very easily
Thank you
Thank you so much sir you are true teacher in the words because you make our tough work a piece of cake
Thank you for appreciating!
Very well explained... 👌🤝 Easy to understand 👍 u made the tough job easier 🙏 Thank u soooo much ♥️
Thanks for appreciating!
Well explained sir.it is very useful to me. thank you so much
Thank you for this video.. Much useful for our examinations 😊
Wlcm😄
That's Great!
My exam is near and i was searching for it.
Thanks.clearly understand
Good luck for your exam!
Very helpful sir thanks
Sir your teaching skill is amazing please provide more and more videos like thos
Thanks I'll try my best
Sir g you are good person
☺️
Worth of Watching ❤️
Very nice explanation thank you so much 😊
Thanks for appreciating!
Super explanation hatsof bro
Thnks
bro,very well...Carry on..!!!!you should upload more and more videos.I watched more videos but not able to understand like this..so great thakns bro..
Thankyou for appreciating😄
wow... wonderful comments influenced me to watch your video...
well undrstood thnku🙌🌼
Thanks a lot 😊
Mashallah beautiful explanation
Thanks
Super duper hit video sir
Well explained sir thank you sir
Very well explained thanku for that👍👍 and ur teaching technique with ur writing both excellent 👍❤️
Thanks for appreciating!
Explanation was clear... Tq
Thanks
Great teaching amplitude
Thnks
Very good explanation
Thanks
Best explanation 🔥🔥
Thanks!
Amazing explanation 👌👌
Thanks!
Great explanation! thankyou SO much sir
Thanks
Sir your writing and explanation is awesome 🤗🤗
Thankyou!
It was made simple..... Kudos
Thanks
thank you sir for simple proof
your voice is too sweet
Thanks!
Such a nice explanation lots of thanks sir ... support from mp...🙏🙏🙏
Thankyou!!
I swar that I have understood this very well thank you so much sir you
Helpful sir 😸😃😃😃😃
Thanku
Your explanation is too good thank u so much sir ☺️☺️☺️☺️
Thankyou!!
Very very much helpful and easier to understand
Really great👌👌👌
You made easier very tough theorem 💯
Thankyou so much!
You made it the easiest
Thank you so much 😊
Thanks!!
Thank you so much sir❤️❤️
Tq brother it helped me a lot❤️
Very helpful thanks
Such a great teacher
Thankyou!!
Excellent 🙏
Thanks!
Great explanation
Thanks
@@LearningClassSince2020 can u help me
I need help in linear algebra
@@faisalhussain9298 yeah sure
@@LearningClassSince2020 I need help in vector space
@@faisalhussain9298 okay
Thank, u explaine it Very well
Thanks!
Best vdo in this topic
Thnkuu
You teach very excellent i like it
Thankyou
Very well explained 👍
Thanks
Very easy to understand😀😀
Thanks!
Sir but how did you compare the coefficients could you elaborate
thank you very much, you are a life saver
Thanks!
Thanks a lot sir☺
Wlcm
Thank you so much sir.....
Wlcm😄
Thank you so much ❤😊😊
Wlcm😅
Mst video
Thnx
Wowww ❤️🔥
Thanks
Best explanation
Thankyou!
@@LearningClassSince2020 thank you for your explanation, sir! 🙏 I have a qno-"if X is a eigen vector of a matrix A corresponding to eigen value lamda, then show that kx, k being a non zero scalar is also an eigen vector of A corresponding to lamda". Can you do a video on this qno? Pls! 🙏🙏🙏🙏
@@reshmayamuna6565 Check this out: ruclips.net/video/pk1Jg5FqZOY/видео.html
Sir please cover Cardon's method.
Great explanation 👏❤️
Thankyou!
if lambda is constant, how can we substitute lambda as matrix A?
Lambda is a scalar/constant means that there will be some value of lambda for which the equation would be true. So, to substitute lambda as matrix A means to check whether that value of lambda is A matrix or not; in other words, whether matrix A satisfies the equation or not.
Assalam-o-alaikum jazak Allah sir Allah shower his countless blessings upon you ameeeeeen Allah succeeded us In every field of life ameeeeeen always live happy 🥰🥰🥰
Walekum Assalam
Thanks a lot!! I wish u the same.
Thanks sir.
Wlcm
Very well explained .... really appreciated 👍👍👍🥰
Thanks for appreciating!
السلام عليكم ورحمة الله وبركاته
بارك الله فيك
كيف يمكن أن أتواصل معك؟
Thanks a lot!
Whatsapp 9056520988
العفو ^_^
رقمي على Whatsapp :
00213674957690
لم أستطع إيجادك ،
أرجوا أن تقوم بإضافتي ^_^
Added😀
Good explanation 💫 thank you sir easily understood the theorem
Wlcm😄
Tq bro 😊
Good one ..
Thank u so much brother ❤️
Wlcm
Well done bro.
Gud job .....
Thanks!
Amazing
Thanks
Thanks
Hat's off to you sir 🙏🏻🙌🏻🙌🏻🙌🏻🙌🏻
Thankyou😄
Sound was not that much loud .
Out of the world for mere liye
Thankyou!!
Lakin Sr jo adjoint degree n-1 Lia Jo argument dia hai wo sirf 2*2 k Lia walid hai jab 3*3 ka matrix lain gay tab BHI spilt karny k bad bhi lemda ki power 1 hi ay gi ....
When the order of the matrix will be 3, adj(A - lambda I) will be a polynomial with degree 2.
Can I write this answer in the exam am I get the marks or do anything need to change anyone can reply, please
Yes you can write this in the exam, just skip the example part that's just for explaining you guys
Sir inverse of matrix heli plz
Check this out ruclips.net/video/EG7oXepwVFI/видео.html
Clear
Polinumilar kya h ye
Sorry but I came for the thumbnail part, can't understand what's unique in you teaching, it's average, except that fake English accent
Best video on this topic on youtube 👍👍
Thankyou!