How to prove the standard Norm is a Norm in the complex plane?

Prove that the diameter of a solid triangle in complex plane the length of it's longest...

Prove that the diameter of a solid triangle in complex plane the length of it's longest edge. Prove in logically and general case. Not particular case.

Let G be a region in the complex plane. Prove that the set of functions that...

Let G be a region in the complex plane. Prove that the set of functions that are harmonic in G is a vector space (over R)

Prove or disprove: there is an inner product on R2 such that the associated norm is...

Prove or disprove: there is an inner product on R2 such that the associated norm is given by ∥(x1, x2)∥ = |x1| + |x2| for all (x1, x2) ∈ R2.

Prove in general that the norm of T ∈ L(V) equals the largest singular value of...

Prove in general that the norm of T ∈ L(V) equals the largest singular value of T.

In each of the following, prove that the specified subset H is a subgroup of the...

In each of the following, prove that the specified subset H is a subgroup of the given group G. Note: in each case, you may assume that the given operation is associative. (a) G = (C ∗ , ·), H is the set of complex numbers of norm 1; i.e., the unit circle in the complex plane. (b) G = (Q, +), for fixed n, H is the set of rational numbers whose denominators divide n. (c) G = (Dn,...

Sketch the set in the complex plane. {z = a + bi | a + b...

Sketch the set in the complex plane. {z = a + bi | a + b < 4}

Complex Analysis Proof - Prove the uniqueness of the limit.

Complex Analysis Proof - Prove the uniqueness of the limit.

Prove that the isometries of the plane form a group.

Prove that the isometries of the plane form a group.

Prove Parseval's identity using complex Fourier series

Prove Parseval's identity using complex Fourier series

Prove that diagonal matrices over the complex numbers commute.

Prove that diagonal matrices over the complex numbers commute.