(c) If S = {V₁, V2,..., Vn} is a set of vectors in a finite-dimensional vector space V, then S is called a basis for V if S is linearly independent and every vector b = (b₁,b2, ..., bn) in V can be expressed as b = C₁v₁ + C₂V₂ + + CnVn where C₁, C₂, ..., Cn are scalars. Calculate the basis for the solution space of the following system of linear equations and verify your answer. x₁ + 2x3 x4 = 0 -x₂ + 2x4 = 0 1

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(c) If S = {V₁, V2, ..., Vn} is a set of vectors in a finite-dimensional vector space V, then S is called a basis for V if S is linearly independent and every vector b = (b₁,b2, ..., bn) in V can be expressed as b = c₁v₁ + C₂V₂ + + CnVn where C₁, C₂, ...,Cn are scalars. Calculate the basis for the solution space of the following system of linear equations and verify your answer. X₁ + 2x3 x4 = 0 -x₂ + 2x4 = 0