Answer to Question #298889 in Linear Algebra for Puchuuu

• First of all, let us remark that the zero matrix satisfies the property "a+b=0" so "0\\in S"

Let "M, N" be matrices in "S" and "\\lambda" "\\in \\mathbb{R}" a scalar. We will denote "a_M" the top-left coefficient of a matrix "M" and "b_M" the top-right one (as in the question).

• By definition of a sum of two matrices, we have "a_{M+N}=a_M+a_N", same for "b_{M+N}", so we have "a_{M+N}+b_{M+N}=(a_M+b_M)+(a_N+b_N)=0" and thus "M+N\\in S"
• By definition of a scalar multiplication we have "a_{\\lambda M} = \\lambda a_M", same for "b_{\\lambda M}" and thus we have "a_{\\lambda M}+b_{\\lambda M}= \\lambda(a_M+b_M)=0" and thus "\\lambda M\\in S".

Therefore, "S" is a vector subspace of "V".