How to represent sphere's surface with 2 dimensional vector? What would be the base?

Provide an example of a 10 dimensional vector space with a brief explanation of what sets...

Provide an example of a 10 dimensional vector space with a brief explanation of what sets such vector space aside of others. Trying to understand this concept for a linear algebra exam. Thank you!

How can a three-dimensional image of a surface be created based on measurements similar to that...

How can a three-dimensional image of a surface be created based on measurements similar to that performed in the activity?

Let F be the field of two elements and let V be a two dimensional vector...

Let F be the field of two elements and let V be a two dimensional vector space over F. How many vectors are there in V?How many one dimensional subspaces? How many different bases are there?

1. Suppose that ? is a finite dimensional vector space over R. Show that if ???(?...

1. Suppose that ? is a finite dimensional vector space over R. Show that if ???(? ) is odd, then every ? ∈ L(? ) has an eigenvalue. (Hint: use induction). (please provide a detailed proof) 2. Suppose that ? is a finite dimensional vector space over R and ? ∈ L(? ) has no eigenvalues. Prove that every ? -invariant subspace of ? has even dimension.

The Flux of the Vector field F(1, -2, 0) through any closed surface is zero? Why?...

The Flux of the Vector field F(1, -2, 0) through any closed surface is zero? Why? How do you find a vector field that the flux through any closed surface is equal to the volume enclosed?

Let V be a finite-dimensional vector space and let T be a linear map in L(V,...

Let V be a finite-dimensional vector space and let T be a linear map in L(V, V ). Suppose that dim(range(T 2 )) = dim(range(T)). Prove that the range and null space of T have only the zero vector in common

How can one use a vector valued function tor represent a curve in two dimensions? Explain...

How can one use a vector valued function tor represent a curve in two dimensions? Explain briefly please

The equation 4 = 2xy^3 - xyz is a level surface in 3-dimensional space. A person...

The equation 4 = 2xy^3 - xyz is a level surface in 3-dimensional space. A person is standing on this surface, at the point (1, 2, 6). a. Write the function f for which the above surface is a level surface, and find the gradient of this function f. What meaning does the gradient have for the person? b. Find an equation for the tangent plane to this surface at the point (1, 2, 6). c. Find the equations of...

Consider the vector x = (3, 11). a) What is the vector representation of x using...

Consider the vector x = (3, 11). a) What is the vector representation of x using the base B1 = {(1, −1), (1, 1)}. b) What is the vector representation of x using the base B2 = {(1, 1), (0, 2)}. c) Construct a linear mapping from base B1 to base B2 (Find the matrix P^−1 associated with mapping). d) Verify that P^−1 x, where x is the vector representation of part a).

Provide 1 zero-dimensional subspace, 2 one-dimensional subspaces, 2 two-dimensional sub spaces, and 1 three-dimensional subspace of...

Provide 1 zero-dimensional subspace, 2 one-dimensional subspaces, 2 two-dimensional sub spaces, and 1 three-dimensional subspace of 3-space. Draw a Venn diagram explaining how your collection of subspaces intersect.