A line L through the origin in
Given the vector
Vector T is the unit tangent vector, so the derivative r(t) is needed.
Vector N is the normal unit vector, and the equation for it uses the derivative of T(t).
The B vector is the binormal vector, which is a crossproduct of T and N.
Assume that G is a group of order , where m is a positive integer and p is a prime number. Display the presence of an element of order p in G.
Let D be the diagonal subset
Demonstrate that W is the collection of all upper triangular matrices.
forms a subspace of all matrices.
What is the dimension of W? Find a basis for W.
Give a correct answer for given question
(A) Argue why
(B) Find the coordinates of