Show that the Frobenius norm is indeed a norm on the linear space of matrices.

Suppose X is a normed linear space with a norm || · ||. Show X is...

Suppose X is a normed linear space with a norm || · ||. Show X is a metric space.

Show that a norm on a vector space X is a sub linear functional on X.

Show that a norm on a vector space X is a sub linear functional on X.

Find a basis for the space of symmetric 2×2-matrices. and show the dim

Find a basis for the space of symmetric 2×2-matrices. and show the dim

Let X be a normed linear space. Let X* be its dual space with the usual...

Let X be a normed linear space. Let X* be its dual space with the usual dual norm ||T|| = sup{ |T(x)| / ||x|| : x not equal to 0}. Show that X* is always complete. Hint: If Tn is a Cauchy sequence in X*, show that i) Tn(x) converges for each fixed x in X, ii) the resulting limits define a bounded linear functional T on X, and iii) the sequences Tn converges to T in the norm of...

We can identify the set V of all 3×3-matrices (real coefficients) with vector space R9. Show...

We can identify the set V of all 3×3-matrices (real coefficients) with vector space R9. Show that the set of all 3 × 3 symmetric matrices is a vector subspace of V .

Find the matrices for the following linear operators, using the standard basis for the given vector...

Find the matrices for the following linear operators, using the standard basis for the given vector space: (a) T :P3 ?P3,T[p(x)]=x2p??(x)+p(x+1).

Linear Algebra: Show that the set of all 2 x 2 diagonal matrices is a subspace...

Linear Algebra: Show that the set of all 2 x 2 diagonal matrices is a subspace of M 2x2. I know that a diagonal matrix is a square of n x n matrix whose nondiagonal entries are zero, such as the n x n identity matrix. But could you explain every step of how to prove that this diagonal matrix is a subspace of M 2x2. Thanks.

Show that associates have the same norm, but that two Gaussian integers having same norm need...

Show that associates have the same norm, but that two Gaussian integers having same norm need not be associates.

Show that a weakly open subset U of a Banach space is also open in the...

Show that a weakly open subset U of a Banach space is also open in the norm topology.

Show that the set GLm,n(R) of all mxn matrices with the usual matrix addition and scalar...

Show that the set GLm,n(R) of all mxn matrices with the usual matrix addition and scalar multiplication is a finite dimensional vector space with dim GLm,n(R) = mn. Show that if V and W be finite dimensional vector spaces with dim V = m and dim W = n, B a basis for V and C a basis for W then hom(V,W)-----MatB--->C(-)--------> GLm,n(R) is a bijective linear transformation. Hence or otherwise, obtain dim hom(V,W). Thank you!