Answer to Question #251087 in Linear Algebra for Gab

We need to show that A is a subspace of "\\R^3"

Since "(0,0,0)\\in \\R^3" and satisfies the condition on A, then A is not empty.

Let "a=(a_1,a_2,a_3), b=(b_1,b_2,b_3)\\in A, \\alpha\\in \\R | a_1+3a_2+2a_3=0,b_1+3b_2+2b_3=0"

We shall show that "\\alpha(a+b)\\in A"

"\\alpha(a+b)=(\\alpha(a_1+b_1),(\\alpha(a_2+b_2),(\\alpha(a_3+b_3))\\\\\n(\\alpha(a_1+b_1)+3(\\alpha(a_2+b_2)+2(\\alpha(a_3+b_3)=\\alpha(a_1+3a_2+2a_3)+\\alpha(b_1+3b_2+2b_3)=0"

"\\implies \\alpha(a+b)\\in A"

Hence A is a subspace of "\\R^3"

Therefore, A build a set in "\\R^3"