Showing Nul(A) (the nullspace/kernel of A) is a subspace of Rn Check out my Matrix Algebra playlist: • Matrix Algebra Subscribe to my channel: / @drpeyam
I believe that Null(A) is actually equal to the kernel of the linear transformation corresponding to matrix A, and it holds that the linear transformation is injective when its kernel is trivial.
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I love linear algebra videos
Just loved it....❤❤❤❤❤
Congratulation for 18k subscribers... And awesome explanation always.. 😘
Thanks Dr. Peyam... 🤓
Thank you!!! 😊
very very helpful, thank you dr peyam
The description should be "… *o* f Rn"
Anyway, great video as usual
Thanks!
thank you
Thank you!!!
Hahaha 6.20 i laughed
Genius
Please, Dr. Peyam, give an example of application of Null(A)
Are there any?
@@drpeyam Don't know, man! hahahahaha
I believe that Null(A) is actually equal to the kernel of the linear transformation corresponding to matrix A, and it holds that the linear transformation is injective when its kernel is trivial.
Dr Peyam rank nullity theorem
@@izakj5094 I'll search on your belief
These linear algebra ones are awesome, man. Are u planning on proving the fundamental theorem of linear algebra?
Which one? :)
Hi Dr. Peyam!
Hello :)