Its output is
If you want output in exact form then use command
format rat
just in next line to the command clc
help finish the matlab script For this actvity, find the matrix represenatation (T) for the linear...
i need the matlab code MATLAB: Change of Bases In this activity you will find a matrix representation with respect to two ordered bases for a linear transformation Find the matrix represenatation (Ty for the linear transformation T: R? – R? defined by *+ x [x-x2] with respect to the ordered bases = {2-01 C= = {@:3} First find 7(u) and T'(uz) the images of each of the basis vectors in B T(u) = T(u) =7 Create the augmented matrix...
Let T be the linear transformation from R3 into R2 defined by (1) For the standard ordered bases a and ß for R3 and IR2 respectively, find the associated matrix for T with respect to the bases α and β. (2) Let α = {x1 , X2, X3) and β = {yı, ys), where x1 = (1,0,-1), x2 = - (1,0). Find the associated (1,1,1), хз-(1,0,0), and y,-(0, 1), Уг matrices T]g and T12
Find the matrix [T] C-B of the linear transformation T: VW with respect to the bases B and C of V and w, respectively. T: R2 + R3 defined by a + 2b -a b +[:] s={{ ;][-:} c-{{0}{} --13) [) CBT
Let x = [X1 X2 X3], and let T:R3 → R3 be the linear transformation defined by x1 + 5x2 – x3 T(x) - X2 x1 + 2x3 Let B be the standard basis for R3 and let B' = {V1, V2, V3}, where 4 4. ---- 4 and v3 -- 4 Find the matrix of T with respect to the basis B, and then use Theorem 8.5.2 to compute the matrix of T with respect to the basis B”....
Linear CHALLENGE ACTIVITY 5.7.1: Matrix representation with respect to nonstandard bases. Jump to level 1 1 2 Let T : R3 + R2 be defined by T (6)-1 = 2x1 - 22 3x3 3 6 0 3 4 Let B uj = 7 , U2 , U3 2 and C= {v} = [:'], x==(-2]} What augmented matrix should be used to find (T]%, the matrix representation of T with respect to the bases B and C. Ex: 5 2 3...
For real non-zero constants a and b, consider the linear transformation T: R3 + R3 defined by orthogonal reflection in the plane ay + b2 = 0 where orthogonality is defined with respect to the dot product on R3 x R3. Find in terms of a and b the numerical entries of the matrix Aſ that represents T with respect to the standard ordered basis {el, C2, C3} of R3.
For real non-zero constants a and b, consider the linear transformation T: R3 + R3 defined by orthogonal reflection in the plane ay + b2 = 0 where orthogonality is defined with respect to the dot product on R3 x R3. Find in terms of a and b the numerical entries of the matrix Aſ that represents T with respect to the standard ordered basis {el, C2, C3} of R3.
Assume that T is a linear transformation. Find the standard matrix of T T R3-R2 T (el) : (19), and T (e2): (-6,4), and T (e)-9-7), where el e2 and e3 are the columns of the 3x3 identity matrix A(Type an integer or decimal for each matrix element.)
Assume that T is a linear transformation. Find the standard matrix of T. T: R3-R2(e) = (1.4), and T (e) = (-9,6), and T (E3) =(4,-2), where ey, ez, and e; are the columns of the 3 x 3 identity matrix A- (Type an integer or decimal for each matrix element.)
Find the matrix [T], p of the linear transformation T: V - W with respect to the bases B and C of V and W, respectively. T:P, → P, defined by T(a + bx) = b - ax, B = {1 + x, 1 – x}, C = {1, x}, v = p(x) = 4 + 2x [T] C+B = Verify the theorem below for the vector v by computing T(v) directly and using the theorem. Let V and W...