Problem 6. ing holds. Let W₁ and W₂ be subspaces of a vector space V. Show that the follow- W₁UW₂ is a subspace of VW₁ W₂ or W₂ CW₁
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- Problem 3: (2 marks) Let V = R be a vector space and let W be a subset of ', where W = {a,b,c):b = c² }. Determine, whether W is a subspace of vector space or not.I need help for problem (h). Check that the set at (h) is a subspace of Rn or not.Suppose that S1 and S2 are subspaces of a vector space (V, F). Show that their intersection S1 ∩ S2 is also a subspace of (V, F). Is their union S1 ∪ S2 always a subspace?
- the subset H={(x,y,z)∈ℝ³∣ 2x+3y-3z=4} it can be assured: * if u ∈H, v∈H , then u⊕v∈H* if u∈H, then c⊙u∈H, for all c∈R * H is a subspace of V=ℝ³ answer in each one if it is: False, true or cannot be established.Suppose U and W are two-dimensional subspaces of R3. Show that U∩W≠{0}1-Suppose that S1and S2are nonzero subspaces, with S1 contained inside S2, and suppose that dim(S2)=3(a) What are the possible dimensions of S1? (b) If S1≠S2then what are the possible dimensions of S1? 2-Find the dimensions of the following linear spaces. (a) ℝ4×2(b) P3(c) The space of all diagonal 6×6 3-Find a basis {p(x),q(x)} for the vector space {f(x)∈P2[x]∣f′(4)=f(1)}where P2[x] is the vector space of polynomials in xx with degree at most 2. You can enter polynomials using notation e.g., 5+3xx for 5+3x^2p(x) , q(x)= 4-A square matrix is half-magic if the sum of the numbers in each row and column is the same. Find a basis BB for the vector space of 2×2 half-magic squares. B=
- Suppose V is finite-dimensional and U and W are subspaces of V with W^0 ⊂ U^0. Prove that U ⊂ W.If W1 and W2 are subspace of a vector space V(F), then show that W1+W2 is also a subspace of V(F)If -R 1s a vector space and let Hbe a subset of and is defined ass H a.b,c):c+b=0.a>0 Show that H is not a subspace of vector space. Problem 3: (2 marks) be a vector space and let W be a subset of V, where Let W={a,b,c) a=0 Determine, whether is a subspace of vector space or
- 1. In each item if W is a real vector subspace of V: a) V= ℳ 2 (IR) and W = {A ∈ V | A is not invertible}. If not, justify! b) V = IR4 and W = {(x, y, z, t) ∈ IR4 | z is an integer}. If not, justify!In P2 consider the subspace H = Span {f(x), g(x), h(x)} where f (x) = x2 + 3, g(x) = x + 1, and h(x) = 2x2 −3x + 3 a) Give 3 other elements in H.Note: Be certain to indicate how you selected your elements of choice. b) Determine if the set {f (x), g(x), h(x)} is linearly independent.An m×n matrix A is called upper triangular if all entries lying below the diagonal entries are zero, that is, if Aij= 0 whenever i > j. Prove that the upper triangular matrices form a subspace of Mm× n(F ).