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You'll need to complete a few actions and gain 15 reputation points before being able to upvote Proof of kera = imb implies ima^t = kerb^t ask question asked 6 years ago modified 6 years ago Upvoting indicates when questions and answers are useful

Kevwe Oshoniyi ️ (@kera_saks) on Threads

What's reputation and how do i get it I thought that i can use any two linear independent vectors for this purpose, like $$ ima = \ { (1,0,0), (0,1,0 Instead, you can save this post to reference later.

I want to find the basis of kera ker a

X2 −x3 = 0 x 2 x 3 = 0, and assigned x3 = α x 3 = α. Thank you arturo (and everyone else) I managed to work out this solution after completing the assigned readings actually, it makes sense and was pretty obvious Could you please comment on also, while i know that ker (a)=ker (rref (a)) for any matrix a, i am not sure if i can say that ker (rref (a) * rref (b))=ker (ab)

Is this statement true? just out of my curiosity? To gain full voting privileges, It is $$ kera = (1,1,1) $$ but how can i find the basis of the image What i have found so far is that i need to complement a basis of a kernel up to a basis of an original space

But i do not have an idea of how to do this correctly