Great refresher (Back from when I took Linear and Diff Eq in the "Stone Age (Well, not really, but it's been a very long time, nonetheless)"). Thank you, Brian!
Hey! I stumbled onto your videos while refreshing myself for tutoring Diff E! You're amazing at explaining tough concepts in a way that's understandable! Also I was wondering if you have or could make a video about working with matrices in general. Row echelon, dot product, the determinant of 3x3 matrices, things like that! Thank you so much in advance!
OMG! you are a star !!! ive been struggling with this forever and all the other videos i found were complicated and unclear. thanks so much, im def subscribing !!!!!
What is the purpose to find eigenvalue and eigenvactor ? Does it help to solve the original matrix ? Do elemination to the original matrix before adding landa I to it give different eigenvalue ?
Riemann Geometry one way to think of it is when a linear transformation (matrix) is applied to a vector and the image is the same vector (only scaled by a number), then that vector is an eigen vector of that transformation and the scaling factor is the eigen value of that vector
I hope this helps you all out!
Been trying to figure this out all week and your video made it all click. Thank you so much!
You’re very welcome , glad to help!
What nailed your session for me is how you find the fl Eigen vector where you mentioned the co efficiency of X and Y.
You are brilliant. After all the struggles you have made my semester in Higher Mathematics II
Very glad to help!
That shortcut involving swopping the co-efficients is an absolute godsend. Thanks man
Just learned more in 6 mins than 3 hours listening to my lecturer, thanks
Happy to help!
you did a great job at explaining how to find the eigenvectors! I watched so many other videos and couldn't figure it out
The only video I found which doesn't further complicate the subject. Thanks!
You are amazing. Solved it without row reduction that everybody just assumes you already understand.
Glad you liked it! Thanks for watching :)
You're So Humble.... That's How Good Teachers Actually Are 😇😇
Great refresher (Back from when I took Linear and Diff Eq in the "Stone Age (Well, not really, but it's been a very long time, nonetheless)"). Thank you, Brian!
Really glad you enjoyed it. Thanks very much for watching and have a great day!
that was really good
thank you
you dont know how much this means
that you have it for free on youtube 4 everyone
U r unique bro
Go ahead.
I understood concept,
Tq so much.
Thanks very much! Hope you have a nice day!
Thanks a bunch bro, Big data was busy kicking my ass for this one
Hey! I stumbled onto your videos while refreshing myself for tutoring Diff E! You're amazing at explaining tough concepts in a way that's understandable! Also I was wondering if you have or could make a video about working with matrices in general. Row echelon, dot product, the determinant of 3x3 matrices, things like that! Thank you so much in advance!
Are you literally writing from right to left or is there some tricks to the transparent board??
Thank you for making this short and sweet. I actually used this to understand the R output.
OMG! you are a star !!! ive been struggling with this forever and all the other videos i found were complicated and unclear. thanks so much, im def subscribing !!!!!
You might have just saved my grade 😂 I really appreciate this!
thanks for the good explanation :) it was really easy to follow your steps 👍
Very glad to be able to help! Have a nice day.
Thanks a lot l have a exam next week and l was scared to fail but now no so again thanks from all my heart
Do you always put the smallest eigenvalues' vectors first when you form the matrix?
how if the eigenvector for each eigenvalue is not the same? because ur example is the same for each eigenvalue
What is the purpose to find eigenvalue and eigenvactor ?
Does it help to solve the original matrix ?
Do elemination to the original matrix before adding landa I to it give different eigenvalue ?
Liked and subscribed just because I understood it all
thank you so much, you made it so simple and easy to understand
keep it up
Very glad to help :)
Thanks,I finally find this beautiful trick to find Eigen vectors of 2×2 matrices...🙂.
How did you make it so easy to understand?
Thanks! I’m glad you thought so.
Could you do a 3x3 using cramers's rule
I'll put it on my list of videos to make.
Thanks man, you're a lifesaver
Vj P glad to help!
You showed the mechanics of find eigen things. But what is the meaning? Show an application of its use.
only vid that helped me
Thanks for this video! :)
Glad it was helpful!
Thank you😊
Daxflame?
I have a matrix 2x2 which is [2 0, 0 2]. and I have eigenvalue = 2. Then How can I calculate eigenvector? Please help me with this! Thanks!
Thnks much it has helped more
Glad to help!
Well done thanks
3:58. Fucking blew my mind
Cool to hear :)
thanks bro
What is eigenvalue and eigenvector
Riemann Geometry one way to think of it is when a linear transformation (matrix) is applied to a vector and the image is the same vector (only scaled by a number), then that vector is an eigen vector of that transformation and the scaling factor is the eigen value of that vector
Thank you
Welcome!
Bro left hand player
Solve for a 3x3 matrix
Thank You!!!!!
brilliant video
Many thanks!
Thanks
You’re welcome :)
@@BriTheMathGuy I'm so glad you are nice and reply to everybody in your comment sections even though they are rude at times :)
This is very good content! It would be even better if you had wrote [-1 -1; 2 2][x; y] = [0; 0] instead of omitting the column vector [x; y].
You're right!
thank you so much!
Great video
Awesome!
Thanks man!
Thank u
Very welcome!
how are you writing backwards so easily..
It’s all due to video editing :)
Yeah that's what I weird
Thanks understood.
Glad to help!
you are wrong on eigenvectors
amazing
Glad you think so!
you right handed though , right?
lol
kind regards
I'm right handed :) (video is flipped horizontally)
you have been on youtube even at midnigth, have u ever pray till midnigth?
u go to God when u wants something, have u thank him for the last prayers he asnwer?