Q5. (a) Consider the region in the complex plane defined by: z = x+iy : 1,...
Complex affine transformation in plane s w = az+β, where:= x+iy, w = x, + iy'. For complex numbers α = αι + ia2, β = β1 + 2β2 rewrite this transformation as affine transformation in plane between coordi nates (x, y) and (x', y/). Identify corresponding linear 2x2 transforma- tion matrix A and translation vector t. Show that matrix representa- tion of this affine transformation is Complex affine transformation in plane s w = az+β, where:= x+iy, w =...
2. Shade the region of the complex plane defined by <z +4 + 3i : 3 < 3 < 5,2 EC}. Include the appropriate axis labels and any significant points.
transformation. Perform the mappings of lines x- 2 and y 3 under the transformation w = z2 where z = x + iy. Compute the angles between the curves in the u-v plane at the points of intersection. Hence check if the angles between the lines in the z-plane are the same as the angles between the curves in the u-v plane transformation. Perform the mappings of lines x- 2 and y 3 under the transformation w = z2 where...
(Complex Analysis) The linear mapping wFUz+p, where α, β e C maps the point ZFI+1 to the point wi-i, and the poin to the point w2-1i a) Determine α and β. b) Find the region in the w-plane corresponding to the upper half-plane Im(z) 20 in 9. the z-plane. Sketch the region in the w-plane. c) Find the region in the w-plane corresponding to the disk Iz 2 in the z-plane d) Find the fixed points of the mapping The...
23. Consider the function w(z) = 2-2 (a) Where in the complex z-plane are the poles of w(z)? (b) Determine the first three terms for the Taylor series expansion of w(z) about 0 (c) Identify the region of convergence for the Taylor series of part (b). (d) Determine the general expression for the n'h coefficient of the Taylor series expansion of part (b) 208 INTRODUCTION TO COMPLEX VARIABLES (e) There is a Laurent series expansion for wC) about-= 0 in...
1. (5 pts.) TRue or FALse: (a) Let R denote a plane region, and (u,u) = (u(x,y), u(x,y)) be a different set of l (b) Let R denote a plane region, and (u, v) - (u(x, y), v(x, y)) be a different set of coordinates for the Cartesian plane. Then for any function F(u, v F(u, u)dudu- F(u(x,y),o(x,y))dxdy coordinates for the Cartesian plane. Then (c) Let R denote a square of sidelength 2 defined by the inequalities |x-1, lul (3y,...
2. (1 Point) Let r-2u and y-3u. (a) Let R be the rectangle in the uv-plane defined by the points (0,0), (2,0), (2,1), (0 , 1). Find the area of the image of R in the ry plane? (b) Find the area of R by computing the Jacobian of the transformation from uv-space to xy-space Change of Variables When working integrals, it is wise to choose a coordinate system that fits the problem; e.g. polar coordinates are a good choice...
Urgent!! Please check my work Let Sbe the solid with flat base, whose base is the region in the z y plane defined by the curves y = ez. y =-2, z 0 and z = 1, and whose sections perpendicular to the a axis are equilateral triangles with bases that sit in the ax y plane. a) Find the area A () of the cross-section of S given by the equilateral triangle that stands perpendicular to the az ais,...
The electric field in the region defined by the y-z plane and the negative x axis is given by Ea where a is a constant. (There is no field for positive values of x.) As -x increases in magnitude relative to -0 at the origin, the electric potential in the region defined above is 9) A) a decreasing function proportional to B) a decreasing function proportional to C) constant. D) an increasing function proportional to + E) an increasing function...
3. (2 Points) Let Q be the quadrilateral in the ry-plane with vertices (1, 0), (4,0), (0, 1), (0,4). Consider 1 dA I+y Deda (a) Evaluate the integral using the normal ry-coordinates. (b) Consider the change of coordinates r = u-uv and y= uv. What is the image of Q under this change of coordinates?bi (c) Calculate the integral using the change of coordinates from the previous part. Change of Variables When working integrals, it is wise to choose a...