Find the Möbius transformation that falls on the right half plane of the disk "| ?...

7. Transformations. (1) Find a Mo ̈bius transformation that maps the open half-disk S = {z...

7. Transformations. (1) Find a Mo ̈bius transformation that maps the open half-disk S = {z : |z| < 1, Im z > 0} to a quadrant. (2) Find a 1 − 1 conformal mapping of the quadrant to the upper half-plane. (3) Find a M ̈obius transformation mapping the upper half-plane to the unit disk D = {z : |z| < 1}. (4) Compose these to give a 1 − 1 conformal map of the half-disk to the unit...

In the right-half tx plane (t ≥ 0), plot the nullclines of the differential equation x′...

In the right-half tx plane (t ≥ 0), plot the nullclines of the differential equation x′ = 2x2(x − 4√t). Determine the sign of the slope field in the regions separated by the nullclines. Sketch the approximate solution curve passing through the point (1,4). Why can’t your curve cross the x = 0 axis?

The circle IZI = 2 is mapped onto the w plane by the transformation w =...

The circle IZI = 2 is mapped onto the w plane by the transformation w = (z+j)/(2z-j) Determine (a) The image of the circle in the w plane (b) The mapping of the region enclosed by IZI =2

Consider the linear transformation P : R3 → R3 given by orthogonal projection onto the plane...

Consider the linear transformation P : R3 → R3 given by orthogonal projection onto the plane 3x − y − 2z = 0, using the dot product on R3 as inner product. Describe the eigenspaces and eigenvalues of P, giving specific reasons for your answers. (Hint: you do not need to find a matrix representing the transformation.)

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.

Find a 3x3 matrix that performs the 2D transformation in homogeneous coordinates: a) Reflects across the...

Find a 3x3 matrix that performs the 2D transformation in homogeneous coordinates: a) Reflects across the y-axis and then translates up 4 and right 3. b) Dilate so that every point is twice as far from the point (-2,-1) in both the x direction and the y direction.

Find the image of the point (2,-1,3)in the plane 3x-2y+z=9.

Find the image of the point (2,-1,3)in the plane 3x-2y+z=9.

Find equations of the normal plane and osculating plane of the curve at the given point...

Find equations of the normal plane and osculating plane of the curve at the given point x = sin(2t), y = t, z = cos(2t) at (0, pi, 1)

Find an equation of the plane. The plane through the point (1, 0, 3) and perpendicular...

Find an equation of the plane. The plane through the point (1, 0, 3) and perpendicular to the line x = 6t, y = 6 − t, z = 5 + 3t

Find the point of intersection of the following 2 “lines” in the Poincare disk: (Poincare disk...

Find the point of intersection of the following 2 “lines” in the Poincare disk: (Poincare disk is all points on and interior to the unit circle) Line 1: The hyperbolic line containing ( −2/3 , 0 ) and ( 2/3 , 0 ) Line 2: The hyperbolic line containing ( 1/3 , 1/3 ) and ( 1/3 , −1/3 ) *Note that:  Line 2 is not a "straight " line. It will be an arc of an orthogonal circle. *Also note...