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matrices - How to find the basis of the kernel of this linear transformation? - Mathematics Stack Exchange
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abstract algebra - $\binom{n - 1 + k}{k}$ as the basis for a polynomial vector space, and the use of $\frac{1}{(1-x)^n}$ to derive generating functions for $a_n = n^k$ - Mathematics Stack
![SOLVED: Find the basis and dimension of subspace W of R3 where W is defined as: 3 marks) W = (a,b,c) € R3 a +b+c= 0. Let V = Mzx2(R) a,b,0,de R SOLVED: Find the basis and dimension of subspace W of R3 where W is defined as: 3 marks) W = (a,b,c) € R3 a +b+c= 0. Let V = Mzx2(R) a,b,0,de R](https://cdn.numerade.com/ask_images/2d8ee8c20fe44ada9de9d94ad6dd333a.jpg)
SOLVED: Find the basis and dimension of subspace W of R3 where W is defined as: 3 marks) W = (a,b,c) € R3 a +b+c= 0. Let V = Mzx2(R) a,b,0,de R
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