Homework SourseDetermine whether the set x1 x2x1 x2 0 forms a subspace of
Determine whether the set {[x_1 x_2]|x_1 x_2 = 0} forms a subspace of R^2. Determine whether the set of all 2 times 2 diagonal matrices forms a subspace of M_2, 2 (the vector space consisting of all 2 times 2 matrices with the usual addition and scalar multiplication).![Determine whether the set {[x_1 x_2]|x_1 x_2 = 0} forms a subspace of R^2. Determine whether the set of all 2 times 2 diagonal matrices forms a subspace of M_2](/WebImages/40/determine-whether-the-set-x1-x2x1-x2-0-forms-a-subspace-of-1124435-1761599193-0.webp "Determine whether the set {[x_1 x_2]|x_1 x_2 = 0} forms a subspace of R^2. Determine whether the set of all 2 times 2 diagonal matrices forms a subspace of M_2")
Solution
a)
No
Consider two elements in thsi set
[0 1]^T and [1 0]^T
BOth belong to this set
BUt their sum which is [1 1]^T does not
Hence it is not a subspace
b)
Yes.
1. 0 belongs to this set
2. Sum of any 2 diagonal matrices is a diagonal matrix hence closed under addition.
Hence it forms a subspace
