(Solved): Describe the zero vector (the additive identity) of the vector space. \[ R^{6} \] LARLINALG8 4.2.00 ...

Describe the zero vector (the additive identity) of the vector space. \[ R^{6} \] LARLINALG8 4.2.003. Describe the zero vector (the additive identity) of the vector space. \[ M_{3}, 3 \] LARLINALG \( 84.3 .001 \) Is \( W \) is a subspace of \( V \) ? If not, state why. Assume that \( V \) has the standard operat \( W=\left\{\left(x_{1}, x_{2}, x_{3}, 0\right): x_{1}, x_{2}\right. \) and \( x_{3} \) are real numbers \( \} \) \( V=R^{4} \) W is a subspace of \( V \) W is not a subspace of \( V \) because it is not closed under addition? Wh is not a subspace of \( V \) because it is noticiosed under scalar multilication