Finding Reciprocal Basis Vectors for Orthogonal Direct Space Lattice Vector. Step-by-step of concepts please.

Please only answer if you know the answer. Write clean. Find an orthogonal basis for the...

Please only answer if you know the answer. Write clean. Find an orthogonal basis for the vector space spanned by vectors a_1 = (1,2,2), a_2 = (-1,0,2) and a_3 = (0,0,1)

What does it mean if a set of basis vectors is complete? a. The only vector...

What does it mean if a set of basis vectors is complete? a. The only vector that is orthogonal to every basis vector is the 0 vector b. The inner product of any two basis vectors is 0 I was thinking it was B but how would it be justified

Prove that if a vector space V has a basis consisting of n vectors, then any...

Prove that if a vector space V has a basis consisting of n vectors, then any spanning set must contain at least n vectors.

Let V be an n-dimensional vector space and W a vector space that is isomorphic to...

Let V be an n-dimensional vector space and W a vector space that is isomorphic to V. Prove that W is also n-dimensional. Give a clear, detailed, step-by-step argument using the definitions of "dimension" and "isomorphic" the Definiton of isomorphic:  Let V be an n-dimensional vector space and W a vector space that is isomorphic to V. Prove that W is also n-dimensional. Give a clear, detailed, step-by-step argument using the definitions of "dimension" and "isomorphic" The Definition of dimenion: the...

If v1 and v2 are linearly independent vectors in vector space V, and u1, u2, and...

If v1 and v2 are linearly independent vectors in vector space V, and u1, u2, and u3 are each a linear combination of them, prove that {u1, u2, u3} is linearly dependent. Do NOT use the theorem which states, " If S = { v 1 , v 2 , . . . , v n } is a basis for a vector space V, then every set containing more than n vectors in V is linearly dependent." Prove without...

Find a basis for the space spanned by the following vectors, (1,1,1) (-2,3,5) (4,-1,3) (-7,3,7) Please...

Find a basis for the space spanned by the following vectors, (1,1,1) (-2,3,5) (4,-1,3) (-7,3,7) Please explain.

Please give an example- i) Normalize a basis by dividing each vector by its norm. ii)...

Please give an example- i) Normalize a basis by dividing each vector by its norm. ii) Given a subspace W with an orthogonal basis {u1,   u2}, write a vector y as the sum of a component y_hat in W and a second component z which is orthogonal to   y_hat.

Using a step by step proof format Please prove: Given that x is a vector in...

Using a step by step proof format Please prove: Given that x is a vector in the span of V, where V is a linearly independent set of vectors, show that there is ONLY ONE linear combination of the vectors in V that yields x. (Hint: to show that something is unique, assume that there is more than one such thing and show that this leads to a contradiction)

T/ F : Let V be an inner product space with orthogonal basis B = {v1,...

T/ F : Let V be an inner product space with orthogonal basis B = {v1, . . . , vn}. Let [v]B = (1, 2, 2, 0, . . . , 0). Then ||v|| = 3. The ans is F , but I don't understand why. Please explain.

A2. Let v be a fixed vector in an inner product space V. Let W be...

A2. Let v be a fixed vector in an inner product space V. Let W be the subset of V consisting of all vectors in V that are orthogonal to v. In set language, W = { w LaTeX: \in ∈V: <w, v> = 0}. Show that W is a subspace of V. Then, if V = R3, v = (1, 1, 1), and the inner product is the usual dot product, find a basis for W.