Write the 3×3 matrices for 180◦ rotations about the x, y, and z axes. Show that they commute; show that by including the identity matrix, they form a group—make a multiplication table. Is this group isomorphic to the Four’s Group or the Order-4 Cyclic Group?
Write the 3×3 matrices for 180◦ rotations about the x, y, and z axes. Show that...
10. The group of rotation matrices representing rotations about the z axis by an angle a: -sin α 0 cos α R,(a)--| sin α cos α 0 can be viewed as a coordinate curve in SO(3). Compute the tangent vector to this curve at the identity. Similarly, find tangent vectors at the identity to the curves representing rotations about the a axis and about the y axis. Is the set of these three tangent vectors a basis for the tangent...
Problem 3. Consider the general linear group GL2 = (M2,*) of 2 x 2 invertible matrices under matrix multiplication. In Homework Problem 9 of Investigation 6, you showed that Pow G 1-( )z is isomorphic to the group Z. Prove that the group (Pow 1 i
Let M be the set of 2 x 2 matrices of the form (82) where a, d ER-{0}. Consider the usual matrix multiplication, i.e: ae + bg af +bh ce + dg cf + dh (2)) = (ce ) (a) Show that (M,-) is an abelian group. (b) Compute the cyclic subgroup generated by M = What is the order of M? (6 -4) € M.
4. Let M be the set of 2 x 2 matrices of the form (62) where a, d E R - {0}. Consider the usual matrix multiplication ·, i.e: ae + bg af + bh ce + dg cf + dh (a) Show that (M,·) is an abelian group. 1 (b) Compute the cyclic subgroup generated by M = What is the order of M? 66 -4) (1) EM EM.
3. Determine the area moment of inertia about the x and y axes. Show all work, including drawings to receive credit y=√1-x2 0.3 ft I ft 0.6 I ft
11. Let G = Z4 Z4, H = {0,0), (2,0), (0,2), (2,2)). Write the Cayley table for G/H. Is G/H isomorphic to Z4 or Z2 x Z ? Justify your answer. 12. Show that G = {1, 7, 17, 23, 49, 55, 65, 71} is a group under multiplication modulo 96. Then express G as an external and an internal direct product of cyclic groups.
Matrices multiplication and Partitioned multiplication: matrix X= 2 1 5 4 2 3 Matrix Y= 1 2 4 2 3 1 1. Find the XY^(T) T means transpose 2.Compute the outer product expansion of XY^(T) . 3. did you get the same answer from 1 and 2?
Let M4x3 be the vector space of all 4 x 3 matrices with real entries. Note that M4x3 R12 (M4x3 is isomorphic to R12). Let Z4x3 = {A E M4x3 | all row and column sums of Z are zero}. For example, A= -5 3 2 1 -3 2 1 2 -3 3 -2 -1 is an element of Z4x3. (a) Find a 7 x 12 matrix C whose null space is isomorphic to Z4x3. In other words, find a...
16. Let Z(G), the center of G, be the set of elements of G that commute with all elements of G. (a) Find the center of the quaternions, defined in Example 19.16. (b) Find the center of Z5. (c) Show that Z(G) is a subgroup of G. (d) If Z(G) G, what can you say about the group G? b 0 Example 19.16 d We now work inside M2(C), the ring of 2 x 2 matrices with complex entries. Consider...
Show that the following are not vector spaces: (a) The set of all vectors [x, y] in R^2 with x ≥ y, with the usual vector addition and scalar multiplication. ------------------------------------------------[a b] (b) The set of all 2×2 matrices of the form [c d] in where ad = 0, with the usual matrix addition and scalar multiplication. I need help with this question. Could you please show your work and the solution.