(a) Find the standard matrix for the plane linear operator T which rotates every point 60...

Find the standard matrix for the linear transformation f(a, b, c, d)=(b-c+d, 2b-3d). Find the standard...

Find the standard matrix for the linear transformation f(a, b, c, d)=(b-c+d, 2b-3d). Find the standard matrix for the linear transformation that flips the xy plane over the y axis and rotates it by π/4 radians CCW.

Assume that T is a linear Transformation. a) Find the Standard matrix of T is T:...

Assume that T is a linear Transformation. a) Find the Standard matrix of T is T: R2 -> R3 first rotate point through (pie)/2 radian (counterclock-wise) and then reflects points through the horizontal x-axis b) Use part a to find the image of point (1,1) under the transformation T Please explain as much as possible. This was a past test question that I got no points on. I'm study for the final and am trying to understand past test questions.

Let T be the linear transformation from R2 to R2, that rotates a vector clockwise by...

Let T be the linear transformation from R2 to R2, that rotates a vector clockwise by 60◦ about the origin, then reflects it about the line y = x, and then reflects it about the x-axis. a) Find the standard matrix of the linear transformation T. b) Determine if the transformation T is invertible. Give detailed explanation. If T is invertible, find the standard matrix of the inverse transformation T−1. Please show all steps clearly so I can follow your...

Find the matrix of the linear transformation which reflects every vector across the y-axis and then...

Find the matrix of the linear transformation which reflects every vector across the y-axis and then rotates every vector through the angle π/3.

(12) (after 3.3) (a) Find a linear transformation T : R2 → R2 such that T...

(12) (after 3.3) (a) Find a linear transformation T : R2 → R2 such that T (x) = Ax that reflects a vector (x1, x2) about the x2-axis. (b) Find a linear transformation S : R2 → R2 such that T(x) = Bx that rotates a vector (x1, x2) counterclockwise by 135 degrees. (c) Find a linear transformation (with domain and codomain) that has the effect of first reflecting as in (a) and then rotating as in (b). Give the...

Find Eigenvalues and Eigenspaces for matrix: The 2 × 2 matrix AT associated to the linear...

Find Eigenvalues and Eigenspaces for matrix: The 2 × 2 matrix AT associated to the linear transformation T : R2 → R2 which rotates a vector π/4-radians then reflects it about the x-axis.

Can someone explain linear transformations which rotates vectors by certain degrees? Examples: R^3--> R^3: A linear...

Can someone explain linear transformations which rotates vectors by certain degrees? Examples: R^3--> R^3: A linear transformation which rotates vectors 90 degrees about the x axis/y axis/z-axis (how would the matrix look if about a different axis) what if it rotates 180 degrees? R^2-->R^2?

Find the matrix A in the linear transformation y = Ax,where a point x = [x1,x2]^T...

Find the matrix A in the linear transformation y = Ax,where a point x = [x1,x2]^T is projected on the x2 axis.That is,a point x = [x1,x2]^T is projected on to [0,x2]^T . Is A an orthogonal matrix ?I any case,find the eigen values and eigen vectors of A .

Find the matrix operator T: P3 --> P2 where T [= T(a + bx + cx^2...

Find the matrix operator T: P3 --> P2 where T [= T(a + bx + cx^2 + dx^3) = b + 2cx + 3dx^2 with respect to bases B = {1, x, x^2, x^3} and C = {1, x, 2x^2, -1}.

b) More generally, find the matrix of the linear transformation T : R3 → R3 which...

b) More generally, find the matrix of the linear transformation T : R3 → R3 which is u1  orthogonal projection onto the line spanu2. Find the matrix of T. Prove that u3 T ◦ T = T and prove that T is not invertible.