It has been so long since I have taken, or even used, most of the math in your videos, but I watch them every time you post one. Thank you for giving me exercises to keep my brain in shape!
I cannot thank you enough. For the past two weeks, this topic had been a nightmare to me. Encountering you has put me in the driving seat now. Thank you so much.
Dayummm.... He's so smooth, nice looking and cheerful..... His cheerful spirit got me glued watching on 1x speed..... I usually watch tutorials on a faster speed and never comment buh i just had to..... He's a great teacher 😁
I really love your energy. You make it so fun to learn math and that is not something i have seen much on youtube. And your pace and small pauses really help to process what you're teaching! Great work. You earned a subscriber! I also think the blackboard makes it more interesting. Idk why but i get bored when i have to look at a greenboard or a whiteboard for a long time. The blackboard, the lighting, your outfit and you just blend well together and the whole picture is just visually appealing to look at for long period of time. Im sure there's some psychological explanation to that.
So I have a question, is it possible to first put the matrix in REF then later subtract lambda from the major diagonal and do the determinant directly?
finally a person that explains how to find the x for different λ and doesnt skip the whole process like it's already explained
ooh my God finally !!!🤗🤗
I got this in 12 mins, i couldn’t hear my lecture a full hour lesson. You earned a subscriber🎉
It has been so long since I have taken, or even used, most of the math in your videos, but I watch them every time you post one. Thank you for giving me exercises to keep my brain in shape!
Ul
There's something about the way you summarized yet explained EVERYTHING clearly!!
Thanks man
I call this transcendental instruction: lucid, precise, engaging and completely relaxed. Thank you!
this has to be the most helpful video for this subject, thank you so much
where have you been all my life ?
That’s what I’m saying
🤩🤩
He's actually good. Alhamdulillah.
Agree
You have got way too much style to be this good of a math teacher
you don't have any idea of how much grateful I am. i never understood it in the class but now i get it perfectly
THANK YOU VERY MUCH
I cannot thank you enough. For the past two weeks, this topic had been a nightmare to me. Encountering you has put me in the driving seat now. Thank you so much.
Just discovered this channel and it's a hidden gem 💎
Dayummm.... He's so smooth, nice looking and cheerful.....
His cheerful spirit got me glued watching on 1x speed.....
I usually watch tutorials on a faster speed and never comment buh i just had to.....
He's a great teacher 😁
Thank you.
same here fr
The way his face got serious at the end when he said "those who stop learning stop living" felt like a threat.
Prime Newtons makes this topic clear as a bell! 😊
i love how you talk so calmly and slowly ;-; cheers sir
by far the most easy to understand explanation of this subject.. thank you.
Thank you sir i saw your lecture first time and i am impressed and excited to see more video
bros handwriting is too good
big fan
I really love your energy. You make it so fun to learn math and that is not something i have seen much on youtube. And your pace and small pauses really help to process what you're teaching! Great work. You earned a subscriber!
I also think the blackboard makes it more interesting. Idk why but i get bored when i have to look at a greenboard or a whiteboard for a long time. The blackboard, the lighting, your outfit and you just blend well together and the whole picture is just visually appealing to look at for long period of time. Im sure there's some psychological explanation to that.
May God bless you I owe you my grade 😭😭
Love your explanation and calmness.❤
Thank you, man :D This is such a concise and simple explanation of something I've been struggling with so much.
I highly request that you make a video how to find the determinants ...especially when comes to the expanding and factorization
evaluate the integral of I = ∫[1,0] (x + y) dx from point A(0,1) to point B(0,-1) along the semicircle y = √(1-x²),
Professional and amicable.Thanks for the content.
Why didn’t I know you earlier 😢. I love this channel!!
I have been struggling with this topic forever but thank God I met you. + one more subscribe
literally best video covering this topic
thanks
Yo bro , i love how u simply explaining
i respect u
Thankyou sir ,great explanation cleared all my doubt.
Love this man.
This is just too elaborate thankyou so much
Man, you just earned a new subscriber!
you teach gracefully
finally, perfect teacher
I finally understand this work ,thnx dia a love this ❤
😂i love how bro Looks so cheerful.
Thank you for the explaination🙏
proly the best one on the point
bros explaining math like its not the worst fucking torture ever invented
"Never stop learning" ~ Prime Newtons
Absolutely amazing
YES! I finally found the perfect video that really does explain how to find the eigenvector with all the right steps. Keep up the work man!
I really appreciate your explanation and your videos 🖤🌠
Thanks for everything ❤
Exact same question i saw in my past questions 😮
Thanks Teacher❤
Iam from lraq thank you very much
Love the Explanation !! very clear
Excellent
I must say
Can u handle RSU topics
i appreciate the way of explaining , thanks 🙏
Nice example
you taught this well.
God bless you 🙏
Awesome video!
Thank you soo much. You solved my problem
great video, thank you
I love you man. I owe you my degree
Lovely video!!! Thank you brother!!
Great video❤
please more linear algebra
Like the new profile picture very much
nice presentation thank you
Keep it up bro
Love ur smile sir❤
If |P|=1 and D=diagonal matrix and A=(invP)DP then we can construct as many square matrix as we want whose eigen values all integers
thats why hIs the GOAT!
I like your video a lot
The math teacher with no scary face
Yeah I got a big fat F in linear algebra. I started trying to reduce this to reduced row echelon form.
Now you know
Hello! Excellent job I just wanted to know if I have a matrix 3*3 what happens to the eigenvalues if the det(A) equals to 0
You are great thanks guys so much 10Q a lot
❤❤❤❤ awesome
I dont often coment but great video
I appreciate the comment
Great video, so helpful!
Can you please do Singular value decomposition
That's amazing
You're the man
Hello Sir...
How do you factorize???😢
Thank You!!!!
Thanks Sir 🙏
Good video thank you
its good thank you
Maybe case when we dont have full set of eigenvectors
Thanks prime newtons
Not the best video to post on but would you consider doing a lecture series on differential equations more to the tune of how a class would look?
I am planning long classroom-videos but not now. I need to get some things out of the way first. I promise, many series are in the making.
@@PrimeNewtons I look forward to it!
Never stop learning
Those who stop learning stop living
Excellent
Thanks !!
at 4:50, is the answer for the lambda2 not meant to be -2 since its (2-Y)?
No, I will use x for lambda in this case. 2-x is the same as (-x+2) = 0 thus getting you 2.
So I have a question, is it possible to first put the matrix in REF then later subtract lambda from the major diagonal and do the determinant directly?
4:20 to 4:40 something is wrong 👍🏻 in the place of 2 sir writing 3 🙂
he factored out (2-Lambda) for example 2/2 = 1 , (2-lambda)/(2-lambda) = 1
How can join the lectures online
Please where are the exercises he said he will send?
Do you have to do the same thing for all three values of lander or just pick anyone
I've been kind of confuse why didn't you perform elementary row operation?
Why do you not use calculater to find eigenvalues
In some sources, we need to convert it to echelon form after lambda placement. What is the difference?
Legend
what shall we do when we plug in one of the eigen values then one of the column of the chxcs polynomial becomes zero?
thank you for your help.
I like